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¿cómo vas a descomponer esta expresión en fracciones?:
y/(y+3)+y/3+2/y
y*(y+((1/(x+(x^2+y^2)^(1/2))*(1+(2*x/(2*(x^2+y^2)^(1/2)))))))-(y/(x^2+y^2)^(1/2))
2*x/(x^2+1)-2*x*(x^2-1)/(x^2+1)^2
(y/(x*y-x^2)+x/(x*y-y^2))/(x^2+2*x*y+y^2)/(1/x+1/y)
Factorizar el polinomio:
z^2+6927*31421
z^2+9*z+27+27/z
z^2+5*i/z
y^2/y-8-64/y-8
Descomponer al cuadrado:
-y^4+7*y^2+7
-y^4-7*y^2+9
-y^4+7*y^2-4
y^4-7*y^2+5
Expresiones idénticas
dos * ocho mil quinientos tres billones quinientos noventa y dos mil cinco millones cuatrocientos cincuenta y cinco mil cincuenta y tres * nueve mil quinientos dieciséis *sin(cien *t+pi/ seis)*sin(cien *t+ cero . ciento treinta y cuatro mil ochocientos setenta y dos *pi)/(treinta y cuatro mil trescientos cincuenta y nueve millones setecientos treinta y ocho mil trescientos sesenta y ocho * cinco)
2 multiplicar por 8503592005455053 multiplicar por 9516 multiplicar por seno de (100 multiplicar por t más número pi dividir por 6) multiplicar por seno de (100 multiplicar por t más 0.134872 multiplicar por número pi ) dividir por (34359738368 multiplicar por 5)
dos multiplicar por ocho mil quinientos tres billones quinientos noventa y dos mil cinco millones cuatrocientos cincuenta y cinco mil cincuenta y tres multiplicar por nueve mil quinientos dieciséis multiplicar por seno de (cien multiplicar por t más número pi dividir por seis) multiplicar por seno de (cien multiplicar por t más cero . ciento treinta y cuatro mil ochocientos setenta y dos multiplicar por número pi ) dividir por (treinta y cuatro mil trescientos cincuenta y nueve millones setecientos treinta y ocho mil trescientos sesenta y ocho multiplicar por cinco)
285035920054550539516sin(100t+pi/6)sin(100t+0.134872pi)/(343597383685)
285035920054550539516sin100t+pi/6sin100t+0.134872pi/343597383685
2*8503592005455053*9516*sin(100*t+pi dividir por 6)*sin(100*t+0.134872*pi) dividir por (34359738368*5)
Expresiones semejantes
2*8503592005455053*9516*sin(100*t+pi/6)*sin(100*t-0.134872*pi)/(34359738368*5)
2*8503592005455053*9516*sin(100*t-pi/6)*sin(100*t+0.134872*pi)/(34359738368*5)
Expresiones con funciones
Seno sin
sin(x+y)/((sin(x)*sin(y)))
sin(x)*(sin(x)/(1-cos(x))-1/tan(x))
sin(x+y)/(cosx*cosy)+tgy
sin*(x)/(cos(x)-1)
sin(x)/(9*cos(x))
Seno sin
sin(x+y)/((sin(x)*sin(y)))
sin(x)*(sin(x)/(1-cos(x))-1/tan(x))
sin(x+y)/(cosx*cosy)+tgy
sin*(x)/(cos(x)-1)
sin(x)/(9*cos(x))

Simplificación de expresiones/ Descomposición en fracciones simples/ 2*8503592005455053*9516*sin(100*t+pi/6)*sin(100*t+0.134872*pi)/(34359738368*5)

¿Cómo vas a descomponer esta 285035920054550539516sin(100t+pi/6)sin(100t+0.134872pi)/(343597383685) expresión en fracciones?

Solución

Ha introducido [src]

                         /        pi\                         
161840363047820568696*sin|100*t + --|*sin(100*t + 0.134872*pi)
                         \        6 /                         
--------------------------------------------------------------
                         171798691840

$$\frac{\sin{\left(100 t + 0.134872 \pi \right)} 161840363047820568696 \sin{\left(100 t + \frac{\pi}{6} \right)}}{171798691840}$$

((161840363047820568696*sin(100*t + pi/6))*sin(100*t + 0.134872*pi))/171798691840

Simplificación general [src]

                        /        pi\                         
20230045380977571087*sin|100*t + --|*sin(100*t + 0.134872*pi)
                        \        6 /                         
-------------------------------------------------------------
                         21474836480

$$\frac{20230045380977571087 \sin{\left(100 t + 0.134872 \pi \right)} \sin{\left(100 t + \frac{\pi}{6} \right)}}{21474836480}$$

20230045380977571087*sin(100*t + pi/6)*sin(100*t + 0.134872*pi)/21474836480

Denominador común [src]

                        /        pi\                         
20230045380977571087*sin|100*t + --|*sin(100*t + 0.134872*pi)
                        \        6 /                         
-------------------------------------------------------------
                         21474836480

$$\frac{20230045380977571087 \sin{\left(100 t + 0.134872 \pi \right)} \sin{\left(100 t + \frac{\pi}{6} \right)}}{21474836480}$$

20230045380977571087*sin(100*t + pi/6)*sin(100*t + 0.134872*pi)/21474836480

Denominador racional [src]

                                                 /        pi\
20230045380977571087*sin(100*t + 0.134872*pi)*sin|100*t + --|
                                                 \        6 /
-------------------------------------------------------------
                         21474836480

$$\frac{20230045380977571087 \sin{\left(100 t + 0.134872 \pi \right)} \sin{\left(100 t + \frac{\pi}{6} \right)}}{21474836480}$$

20230045380977571087*sin(100*t + 0.134872*pi)*sin(100*t + pi/6)/21474836480

Potencias [src]

                        /        pi\                         
20230045380977571087*sin|100*t + --|*sin(100*t + 0.134872*pi)
                        \        6 /                         
-------------------------------------------------------------
                         21474836480

$$\frac{20230045380977571087 \sin{\left(100 t + 0.134872 \pi \right)} \sin{\left(100 t + \frac{\pi}{6} \right)}}{21474836480}$$

                      /     /         pi\      /        pi\\                                                         
                      |   I*|-100*t - --|    I*|100*t + --||                                                         
                      |     \         6 /      \        6 /| /   I*(-100*t - 0.134872*pi)    I*(100*t + 0.134872*pi)\
-20230045380977571087*\- e                + e              /*\- e                         + e                       /
---------------------------------------------------------------------------------------------------------------------
                                                     85899345920

$$- \frac{20230045380977571087 \left(- e^{i \left(- 100 t - \frac{\pi}{6}\right)} + e^{i \left(100 t + \frac{\pi}{6}\right)}\right) \left(- e^{i \left(- 100 t - 0.134872 \pi\right)} + e^{i \left(100 t + 0.134872 \pi\right)}\right)}{85899345920}$$

-20230045380977571087*(-exp(i*(-100*t - pi/6)) + exp(i*(100*t + pi/6)))*(-exp(i*(-100*t - 0.134872*pi)) + exp(i*(100*t + 0.134872*pi)))/85899345920

Respuesta numérica [src]

942034897.44*sin(100*t + 0.134872*pi)*sin(100*t + pi/6)

942034897.44*sin(100*t + 0.134872*pi)*sin(100*t + pi/6)

Combinatoria [src]

                        /        pi\                         
20230045380977571087*sin|100*t + --|*sin(100*t + 0.134872*pi)
                        \        6 /                         
-------------------------------------------------------------
                         21474836480

$$\frac{20230045380977571087 \sin{\left(100 t + 0.134872 \pi \right)} \sin{\left(100 t + \frac{\pi}{6} \right)}}{21474836480}$$

20230045380977571087*sin(100*t + pi/6)*sin(100*t + 0.134872*pi)/21474836480

Compilar la expresión [src]

                                                 /        pi\
20230045380977571087*sin(100*t + 0.134872*pi)*sin|100*t + --|
                                                 \        6 /
-------------------------------------------------------------
                         21474836480

$$\frac{20230045380977571087 \sin{\left(100 t + 0.134872 \pi \right)} \sin{\left(100 t + \frac{\pi}{6} \right)}}{21474836480}$$

20230045380977571087*sin(100*t + 0.134872*pi)*sin(100*t + pi/6)/21474836480

Unión de expresiones racionales [src]

                        /pi + 600*t\                         
20230045380977571087*sin|----------|*sin(100*t + 0.134872*pi)
                        \    6     /                         
-------------------------------------------------------------
                         21474836480

$$\frac{20230045380977571087 \sin{\left(100 t + 0.134872 \pi \right)} \sin{\left(\frac{600 t + \pi}{6} \right)}}{21474836480}$$

20230045380977571087*sin((pi + 600*t)/6)*sin(100*t + 0.134872*pi)/21474836480

Abrimos la expresión [src]

                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                           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                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                              
20230045380977571087*sin(0.134872*pi)                                                                                           142                                                                                                               138                                                                                                               146                                                                                                               134                                                                                                               130                                                                                                               154                                                                                                              126                                                                                                              158                                                                                                              122                                                                                                              162                                                                                                             118                                                                                                             166                                                                                                             114                                                                                                            170                                                                                                            110                                                                                                            174                                                                                                           106                                                                      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                                     42                                                                               38                                                                            34                                                                        30                                                                             36                                                                                40                                                                                   44                                                                                     48                                                                                       52                                                                                          56                                                                                            60                                                                                              64                                                                                               68                                                                                                 72                                                                                                   76                                                                                                   196                                                                                                    80                                                                                                     192                                                                                                      84                                                                                                       88                                                                                                       188                                                                                                        92                                                                                                         184                                                                                                         96                                                                                                          180                                                                                                          100                                                                                                           104                                                                                                           176                                                                                                            108                                                                                                            172                                                                                                             112                                                                                                             168                                                                                                             116                                                                                                             164                                                                                                              120                                                                                                              160                                                                                                              124                                                                                                              156                                                                                                               128                                                                                                               152                                                                                                               132                                                                                                               148                                                                                                               136                                                                                                               144                                                                                                               140                       1218538254301330902178971679378641396698593193813998061838496434644022971782322454528*cos   (t)*sin(0.134872*pi)   264640333939407232075405103741717805888349713521947357741056*cos  (t)*sin(0.134872*pi)   1468472765427061613768437783518448963703565*cos  (t)*sin(0.134872*pi)   43290702913962658149001906570018283583375*cos  (t)*sin(0.134872*pi)   38697876046355704767397611142335798075*cos  (t)*sin(0.134872*pi)   14371810846802527625490105635433375*cos  (t)*sin(0.134872*pi)   1736921507822063809034701857945*cos  (t)*sin(0.134872*pi)   1404161886631173440316621075*cos (t)*sin(0.134872*pi)   2528755672622196385875*cos (t)*sin(0.134872*pi)   8428342656849780554121375*cos (t)*sin(0.134872*pi)   2004140201333150548886194451475*cos (t)*sin(0.134872*pi)   525024001228032924094580334333375*cos  (t)*sin(0.134872*pi)   9534259315768796826750136078546500975*cos  (t)*sin(0.134872*pi)   4040465605303181427240177946535039801115*cos  (t)*sin(0.134872*pi)   6198099334594740577594055579785661210437125*cos  (t)*sin(0.134872*pi)   76383892893721919179669374866507258000898135*cos  (t)*sin(0.134872*pi)   135709707637490466719620927658404583129104040775*cos  (t)*sin(0.134872*pi)   946119822322470075388570329392254797500378153111935122973303121117184*cos   (t)*sin(0.134872*pi)                                                                                          73       71                    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                                                         67       69                                                                                                              77       71                                                                                                              69       75                                                                                                              71       65                                                                                                              67       73                                                                                                              77       67                                                                                                              75       65                                                                                                              71       77                                                                                      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                               85       59                                                                                                            73       87                                                                                                            63       85                                                                                                            81       55                                                                                                            67       53                                                                                                            55       77                                                                                                            69       87                                                                                                            89       71                                                                                                            59       57       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                                            49       75                                                                                                           57       87                                                                                                           93       71                                                                                                           73       47                                                                                                           83       89                                                                                                           77       91                                                                                                           69       47                                                                                                           51       81                                                                                                           93       67  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381199960557286940360044656114366438406809279732992899606009577433294962688000*cos  (t)*sin  (t)*cos(0.134872*pi) - 380803355009414632339091829302095498662655130864138593002342360563464997437440*cos  (t)*sin  (t)*cos(0.134872*pi) - 379959857231395572636022408831581193298806538943524027198305034793954312192000*cos  (t)*sin  (t)*cos(0.134872*pi) - 357348231323675286187876193203671397997670198805450250450471552586847617024000*cos  (t)*sin  (t)*cos(0.134872*pi) - 350941789974688235350295762339217730419287912291088432194611989921098757046272*cos  (t)*sin  (t)*cos(0.134872*pi) - 343580495916902022332967644591403556612922196837503872028492782095619325952000*cos  (t)*sin  (t)*cos(0.134872*pi) - 333788783028963110240551523361551412228103957223748934684919274871946578231296*cos  (t)*sin  (t)*cos(0.134872*pi) - 317151227000217251384277825776680206104235874003849728026301029626725531648000*cos  (t)*sin  (t)*cos(0.134872*pi) - 307022910866765174292635115452179435135107287633961305922827396498875880570880*cos  (t)*sin  (t)*cos(0.134872*pi) - 278157319190802591867126269467959510190086631019790778904099395726622148526080*cos  (t)*sin  (t)*cos(0.134872*pi) - 266939578615632034342142876804767021647507787308299975050331418761248112640000*cos  (t)*sin  (t)*cos(0.134872*pi) - 262652046818441678203149347809409638137786799928037182996777065603627430707200*cos  (t)*sin  (t)*cos(0.134872*pi) - 260271487400080646034207034530726101192804466716464484882099256845389529088000*cos  (t)*sin  (t)*cos(0.134872*pi) - 260106189239030560138885154738291019577423998892600165020939990273533096755200*cos  (t)*sin  (t)*cos(0.134872*pi) - 240298681131765790696498339485204562551592178657565933380030081296935734476800*cos  (t)*sin  (t)*cos(0.134872*pi) - 234250513248611494605815585721492400366996091085504911740030768124170076160000*cos  (t)*sin  (t)*cos(0.134872*pi) - 221712748525994624399509696081729641756833434610321598232899366942368858112000*cos  (t)*sin  (t)*cos(0.134872*pi) - 221313327977930141646750487411660901104865545430948553161611788442303746539520*cos  (t)*sin  (t)*cos(0.134872*pi) - 189670884956744135505750811712881112475730800886832344952230956489800417280000*cos  (t)*sin  (t)*cos(0.134872*pi) - 187182406883829911812697053582875494189255818421902512140723194212158275584000*cos  (t)*sin  (t)*cos(0.134872*pi) - 183683240630594962042763795216753007501971263453922202107746446536893425254400*cos  (t)*sin  (t)*cos(0.134872*pi) - 180830037126718474876935497190326046922505275273364499227643864322135818240000*cos  (t)*sin  (t)*cos(0.134872*pi) - 170547156429583362384280065962619320987407470977064872785145168091747975168000*cos  (t)*sin  (t)*cos(0.134872*pi) - 159356038003058636287147594058743180012724031126168648729896419989827616768000*cos  (t)*sin  (t)*cos(0.134872*pi) - 156226422890500819279079832077582115234749517302216122938515597497264043458560*cos  (t)*sin  (t)*cos(0.134872*pi) - 138320829986206338529219054632288063190540965894342845726007367776439841587200*cos  (t)*sin  (t)*cos(0.134872*pi) - 137192467626232420964921352189305893503154835249237597456617670911461962022912*cos  (t)*sin  (t)*cos(0.134872*pi) - 125208315573831785654187395331869641438568881599132509716347187134864556032000*cos  (t)*sin  (t)*cos(0.134872*pi) - 108959870081533865077771742898889149720100672849882410930005017557970452480000*cos  (t)*sin  (t)*cos(0.134872*pi) - 102046244794774978912646552898196115278872924141067890059859136964940791808000*cos  (t)*sin  (t)*cos(0.134872*pi) - 91897895817941658399458724751518891314558539589538895846185645586625907916800*cos  (t)*sin  (t)*cos(0.134872*pi) - 91352760848254121545107871539125459052274214857847247223904958464926647582720*cos  (t)*sin  (t)*cos(0.134872*pi) - 87353421585884161221216619151585505871598948549228349475318256827480670208000*co
             42949672960                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                          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                                  32768                                                         262144                                                   67108864                                            536870912                                          536870912                                               134217728                                                      262144                                                          131072                                                              4096                                                                   1024                                                                     4                                                                          4                                                                                       5                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                              

                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                              
 83       41                                                                                                        41       63                                                                                                        85       95                                                                                                        75       97                                                                                                        43       57                                                                                                        97       83                                                                                                        77       39                                                                                                        67       97                                                                                                        99       69                                                                     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                                                                                                       81       39                                                                                                        41       59                                                                                                        39       73                                                                                                        91       45                                                                                                        51       93                                                                                                        89       43                                                                                                        45       51                                                                                                        91       93                                                                                  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                                                                              43       49                                                                                                       65       99                                                                                                       59       37                                                                                                       77       35                                                                                                       37       79                                                                                                       51       41                                                                                                       93       43                                                                                                       91       41                                                                                                       65       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s  (t)*sin  (t)*cos(0.134872*pi) - 86244856482681852201509848353835096256713230268133231570408920596088042291200*cos  (t)*sin  (t)*cos(0.134872*pi) - 85008407863189743033150549587622065999908932195293097284826145035464894054400*cos  (t)*sin  (t)*cos(0.134872*pi) - 81251784204514123606856959370934599769253807480033366888062962676843675648000*cos  (t)*sin  (t)*cos(0.134872*pi) - 78720475699853444440336217775176138156566555349103121315489773133844447232000*cos  (t)*sin  (t)*cos(0.134872*pi) - 74382356880291025154006730889169307749920315670881460124222876906031782297600*cos  (t)*sin  (t)*cos(0.134872*pi) - 72206561908543379455221764310160996580607808025914524977167195216558927380480*cos  (t)*sin  (t)*cos(0.134872*pi) - 66253108277089420793021098475994132341657833723617567757924294519226263142400*cos  (t)*sin  (t)*cos(0.134872*pi) - 65251972034467229675077051099375327894481582041319462302789256046376176844800*cos  (t)*sin  (t)*cos(0.134872*pi) - 62931900722516260719799344340206529444353356790536938057718567025855002836992*cos  (t)*sin  (t)*cos(0.134872*pi) - 61353388072796379050075663198460820233926344423698664793027135082514612224000*cos  (t)*sin  (t)*cos(0.134872*pi) - 57544139087496582890363336988239286956086069404948071892475109844522715054080*cos  (t)*sin  (t)*cos(0.134872*pi) - 57004482403342149422312433561334444871996471114867777504320180545197703168000*cos  (t)*sin  (t)*cos(0.134872*pi) - 56863033953661298944680411323373495444571836521190095622185074660077679411200*cos  (t)*sin  (t)*cos(0.134872*pi) - 53903035301676157625943655221146935160445768917583269731505575372555026432000*cos  (t)*sin  (t)*cos(0.134872*pi) - 51280766362444614240687977257637728928816411188862071571161903510049311948800*cos  (t)*sin  (t)*cos(0.134872*pi) - 46652864691581576145039717326799094580366716310885536424399682811756491571200*cos  (t)*sin  (t)*cos(0.134872*pi) - 45354379393557357417842561381189358547890245618929903441878153000968981053440*cos  (t)*sin  (t)*cos(0.134872*pi) - 44619440268243895636116249994036864638259357405701627265540851410907483340800*cos  (t)*sin  (t)*cos(0.134872*pi) - 36098383598953815087670610078905815987096317941597270086392815653832454307840*cos  (t)*sin  (t)*cos(0.134872*pi) - 35700942174483914919338301198915488065517362573676597762960642929603022684160*cos  (t)*sin  (t)*cos(0.134872*pi) - 33848234797357078244997493653634509271214285297925153296743751395174042828800*cos  (t)*sin  (t)*cos(0.134872*pi) - 33427192235933603146915208283535030956922354371161716134035401265680345989120*cos  (t)*sin  (t)*cos(0.134872*pi) - 33170103139635757717730239938634539009333571304027555779607960218378646323200*cos  (t)*sin  (t)*cos(0.134872*pi) - 32636950133769877341206635340743095494602654708791665919152704426886352076800*cos  (t)*sin  (t)*cos(0.134872*pi) - 31807560756196572302818641806411162003422856931718194914249917577293725696000*cos  (t)*sin  (t)*cos(0.134872*pi) - 31531099408247282942905966611738756465553887489821321411915665294416150528000*cos  (t)*sin  (t)*cos(0.134872*pi) - 31465950361258130359899672170103264722176678395268469028859283512927501418496*cos  (t)*sin  (t)*cos(0.134872*pi) - 31294494661766986776079656322908858803457045752721479887541197421338196705280*cos  (t)*sin  (t)*cos(0.134872*pi) - 30687003084167188033213776363860316170241868405848231766545278713813008384000*cos  (t)*sin  (t)*cos(0.134872*pi) - 29411448866942697921741261127322302221999546584751236745042833920533832138752*cos  (t)*sin  (t)*cos(0.134872*pi) - 26308599578269863858697017524127352939281728733009480668196487816164856037376*cos  (t)*sin  (t)*cos(0.134872*pi) - 25640383181222307120343988628818864464408205594431035785580951755024655974400*cos  (t)*sin  (t)*cos(0.134872*pi) - 25237179012161005527148430623729835609546157777597146503506244390449315840000*cos  (t)*sin  (t)*cos(0.134872*pi) - 25160914613798144256925741240141067233675343805816878394647405089325454458880*cos  (t)*sin  (t)*cos(0.134872*pi) - 24340625056477344075672895996590831954973938944809845090991138858307734732800*cos  (t)*sin  (t)*cos(0.134872*pi) - 24090237396189712586418262889496766500327456835356585697002834659992456396800*cos  (t)*sin  (t)*cos(0.134872*pi) - 22317217420834224026898410969540778764885821857602498211417175105158827212800*cos  (t)*sin  (t)*cos(0.134872*pi) - 21354536087213158522971748989309860900385210427197585502966822176534036480000*cos  (t)*sin  (t)*cos(0.134872*pi) - 20862996441177991184053104215272572535638030501814319925027464947558797803520*cos  (t)*sin  (t)*cos(0.134872*pi) - 19948246564401342270001733978855131641472867595601244158558890288304095232000*cos  (t)*sin  (t)*cos(0.134872*pi) - 18055257315540400232441747517347410084672118696922726341716020763427277373440*cos  (t)*sin  (t)*cos(0.134872*pi) - 17717201501189361985226459184974823268498583984772618641825753831738305413120*cos  (t)*sin  (t)*cos(0.134872*pi) - 16828689291063707685870526990769304082974303461471822989281191887607420682240*cos  (t)*sin  (t)*cos(0.134872*pi) - 16530533273127875421975520156426155690593023052475074865851599518573369753600*cos  (t)*sin  (t)*cos(0.134872*pi) - 15758190772950718179217885159820162357691770262462605501739467447633707008000*cos  (t)*sin  (t)*cos(0.134872*pi) - 15347979641997878153653268363737214531133567533478983442857347832799559680000*cos  (t)*sin  (t)*cos(0.134872*pi) - 15231703003770935100705933790327735589991612795764253531473607007632202137600*cos  (t)*sin  (t)*cos(0.134872*pi) - 13993935945888225456753732725599655818766876985643340780955578625619604275200*cos  (t)*sin  (t)*cos(0.134872*pi) - 12849306999874250197305145709735599894934261069528711091422009909030839910400*cos  (t)*sin  (t)*cos(0.134872*pi) - 12744894350094047737325373171498717534482778053598661118171793618631026278400*cos  (t)*sin  (t)*cos(0.134872*pi) - 11937317499331683008396986505128944635326108081594764900000159425510768640000*cos  (t)*sin  (t)*cos(0.134872*pi) - 11644513966478487612460742638579260089435998592364692291278021927195681751040*cos  (t)*sin  (t)*cos(0.134872*pi) - 10674137802605280311422347418697655081982998709667634600338186766596041605120*cos  (t)*sin  (t)*cos(0.134872*pi) - 9977475133389331998903376811847182506179638894482741002933144894792794112000*cos  (t)*sin  (t)*cos(0.134872*pi) - 9939797778816515344306837106987684561780576608702178482724962876448676249600*cos  (t)*sin  (t)*cos(0.134872*pi) - 9698107550020180061717876216121695268542894029107435501924442438807584768000*cos  (t)*sin  (t)*cos(0.134872*pi) - 8796150999878656523497261611015404913045391160039276935707804987310724874240*cos  (t)*sin  (t)*cos(0.134872*pi) - 8013661567173194136128822376556811468083001648319915709181519946479724134400*cos  (t)*sin  (t)*cos(0.134872*pi) - 7504593601246518051278905516224396527408346613962575533800100225504436551680*cos  (t)*sin  (t)*cos(0.134872*pi) - 6374588665986531006368953377144186401562986117165187741548553618015544934400*cos  (t)*sin  (t)*cos(0.134872*pi) - 6115226694657977676747230949196660245723004483715228356636443645195583488000*cos  (t)*sin  (t)*cos(0.134872*pi) - 5882737460932223367038740328625364332482382074538023999980080069734930841600*cos  (t)*sin  (t)*cos(0.134872*pi) - 5409906928455158396677313406503645969419406971582748319879672852450902016000*cos  (t)*sin  (t)*cos(0.134872*pi) - 5360424000890370036627789654445997519577390438544696809857214446788883251200*cos  (t)*sin  (t)*cos(0.134872*pi) - 5253141589594264200097182950399251603794067599099860896875739654354108416000*cos  (t)*sin  (t)*cos(0.134872*pi) - 4601238549045455032173985829593986389615568533643035419980992587527251558400*cos  (t)*sin  (t)*cos(0.134872*pi) - 4040643439189146468417468384086975086901516606453876546760364548291223879680*cos  (t)*sin  (t)*cos(0.134872*pi) - 3719931336639647566989637386617641093917461082167776187617093738391666688000*cos  (t)*sin  (t)*cos(0.134872*pi) - 3426814710507697584582785281465387940406638694014137915496307425493909504000*cos  (t)*sin  (t)*cos(0.134872*pi) - 3393327037293130145443039395289057636743198138488420144347966679378873548800*cos  (t)*sin  (t)*cos(0.134872*pi) - 3349989635698094380640116462691144066011331220871311680723555555952348364800*cos  (t)*sin  (t)*cos(0.134872*pi) - 2954077674481563149292929613798525405602359420149721148522500457129154969600*cos  (t)*sin  (t)*cos(0.134872*pi) - 2942357191305882600750294815860370381307852314240670663475178757387032985600*cos  (t)*sin  (t)*cos(0.134872*pi) - 2882407680650311810068156336542233430851411690139713766370005871126034513920*cos  (t)*sin  (t)*cos(0.134872*pi) - 2801439393363595985483299423085731234011493351126782644452230686390007889920*cos  (t)*sin  (t)*cos(0.134872*pi) - 2704953464227579198338656703251822984709703485791374159939836426225451008000*cos  (t)*sin  (t)*cos(0.134872*pi) - 2678350562380546248232538918364701587620571979160798855084307491642000015360*cos   (t)*sin  (t)*cos(0.134872*pi) - 2632173804090382350142648651586882415725773183241467610466142808091949793280*cos  (t)*sin  (t)*cos(0.134872*pi) - 2622358018768829638766899298490680215727893899634730524418382733128184627200*cos  (t)*sin  (t)*cos(0.134872*pi) - 2540115500072283663391526405958985646972784228496996442518302189019987968000*cos  (t)*sin  (t)*cos(0.134872*pi) - 2529459801387008323121035152475837500543075564816483509263474539967744573440*cos  (t)*sin  (t)*cos(0.134872*pi) - 2435949820082887958209757203902698676855300988399254045872290193396780236800*cos  (t)*sin  (t)*cos(0.134872*pi) - 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                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                        
                                                                         87       17                                                                                           49       19                                                                                           73       15                                                                                           69       15                                                                                           55       17                                                                                           17       59                                                                                           23       41                                                                                           77       15                                                                                           93       19                                                                                           19       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     33       27                                                                                          21       43                                                                                          23       97                                                                                          27       33                                                                                          51       17                                                                                          91       17                                                                                          15       69                                                                                          15       73                                                                                          35       25                                                                                          25       99                                                                                          85       15                                                                                          45       19                                                                                          21       95                                                                                          15       65                                                                                          25       35                                                                                          15       77                                                                                          17       87                                                                                          57       15                                                                                          37       23                                                                                          15       61                                                                   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    9                                                                                 79       5                                                                                 27       17                                                                                 7       85                                                                                 11       97                                                                                 63       5                                                                                 37       11                                                                                 17       27                                                                                 49       7                                                                                 7       53                                                                                83       5                                                                                29       15                                                                                93       7                                                                                101       11                                                                                59       5                                                                                9       43                                                                                15       29                                                                                11       37                                                                                7       89                                                                                9       95                                                                                99       9                                                                                31       13                                                                                5       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                                             7       93                                                                              69       3                                                                              11       33                                                                              5       55                                                                              77       3                                                                              17       23                                                                              65       3                                                                              25       15                                                                              41       7                                                                              81       3                                                                              15       25                                                                              35       9                                                                              5       87                                                                              61       3                                                                              47       5                                                                              27       13                                                                              5       51                                                                             85       3                                                                             9       99                                                                             13       27                                                                             95       5                                                                             7       41                                                                             9       35                                                                             57       3                                                                             29       11                                                                             3       69                                                                             3       73                                                                             5       91                                                                             3       65                                                                             37       7                                                                             5       47                                                                             3       77                                                                             89       3                                                                             7       97                                                                            11       29                                                                            53       3                                                                            43       5                                                                            3       61                                                                            101       7                                                                            3       81                                                                            31       9                                                                            7       37                                                                            3       57                                                                            19       17                                                                            17       19                                                                            21       15                                                                           49       3                                                                           15       21                                                                           9       31                                                                           3       85                                                                           5       43                                                                           93       3                                                                           99       5                                                                           71                                                                                  23       13                                                                           75                                                                                  67                                                                                  3       53                                                                           5       95                                                                           39       5                                                                           13       23                                                                           79                                                                                  33       7                                                                           63                                                                                  25       11                                                                          83                                                                                 3       89                                                                          45       3                                                                          59                                                                                 11       25                                                                          3       49                                                                          7       33                                                                          5       39                                                                          27       9                                                                          87                                                                                 97       3                                                                          55                                                                                9       27                                                                         35       5                                                                         71                                                                                3       45                                                                     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  3       95                                                                        9       25                                                                        49                                                                               39       3                                                                        81                                                                               33       5                                                                        3       43                                                                         99       3                                                                         61                                                                                25       9                                                                         65                                                                                73                                                                                11       23                                                                         69                                                                                7       31                                                                         53                                                                                5       37                                                                         89                                                                                23       11                                                                          3       47                                                                          13       21                                                                          43       3                                                                          3       91                                                                          31       7                                                                          101       5                                                                          21       13                                                                          5       97                                                                          57                                                                                 15       19                                                                          85                                                                                 19       15                                                                          37       5                                                                          17       17                                                                          9       29                                                                           95       3                                                                           61                                                                                  3       51                                                                           5       41                                                                           81                                                                                  3       87                                                                           47       3                                                                           29       9                                                                           7       35                                                                           65                                                                                  7       99                                                                           77                                                                                  69                                                                                  73                                                                                  11       27                                                                           3       55                                                                            35       7                                                                            41       5                                                                            3       83                                                                            27       11                                                                            5       93                                                                            91       3                                                                            51       3                                                                            5       45                                                                            3       59                                                                            13       25                                                                            9       33                                                                            3       79                                                                            97       5                                                                            25       13                                                                            3       63                                                                             7       39                                                                             3       75                                                                             15       23                                                                             3       67                                                                             3       71                                                                             55       3                                                                             23       15                                                                             33       9                                                                             87       3                                                                             17       21                                                                             45       5                                                                             5       49                                                                             21       17                                                                             19       19                                                                             5       89                                                                             39       7                                                                             11       31                                                                              59       3                                                                              7       95                                                                              99       7                                                                              83       3                                                                              7       43                                                                              31       11                                                                              5       53                                                                              93       5                                                                              63       3                                                                              9       37                                                                              79       3                                                                              49       5                                                                              5       85                                                                              67       3                                                                              13       29                                                                              101       9                                                                              75       3                                                                              71       3                                                                               5       57                                                                               37       9                                                                               29       13                                                                               9       97                                                                               43       7                                                                               5       81                                                                               15       27                                                                               7       47                                                                               53       5                                                                               7       91                                                                               5       61                                                                               89       5                                                                               11       35                                                                               27       15                                                                               11       99                                                                               5       77                                                                                9       41                                                                                17       25                                                                                5       65                                                                                95       7                                                                                25       17                                                                                5       73                                                                                5       69                                                                                35       11                                                                                19       23                                                                                57       5                                                                                23       19                                                            
i) - 4806221976067480646048228819806959842998965479830949397843148800*cos  (t)*sin  (t)*cos(0.134872*pi) - 4336022680940210398265660234680279450281789801957239602701926400*cos  (t)*sin  (t)*cos(0.134872*pi) - 4242101496935907514607781086281323406246116016796079142993920000*cos  (t)*sin  (t)*cos(0.134872*pi) - 3820230741450185829791088151046360913088184258508086713516032000*cos  (t)*sin  (t)*cos(0.134872*pi) - 3470752984953567388910780286558422095130208469816320322437120000*cos  (t)*sin  (t)*cos(0.134872*pi) - 3252310335317009562312676955203904979903965553868764944007168000*cos  (t)*sin  (t)*cos(0.134872*pi) - 3192693276303131336318694479721082433626296202096508644884480000*cos  (t)*sin  (t)*cos(0.134872*pi) - 3001654445754880505295253137920509666489778879482257552388915200*cos  (t)*sin  (t)*cos(0.134872*pi) - 2956266582470747879480547243820394133766519541142801572954112000*cos  (t)*sin  (t)*cos(0.134872*pi) - 2302074973708204952698431931866257308712688242931250650257817600*cos  (t)*sin  (t)*cos(0.134872*pi) - 2240769831388617300618842172052550684953098576058256122183680000*cos  (t)*sin  (t)*cos(0.134872*pi) - 1748937655096004204590322208341369060653700806370033972281344000*cos  (t)*sin  (t)*cos(0.134872*pi) - 1672363144730211652357411394139614608089964677288647385415680000*cos  (t)*sin  (t)*cos(0.134872*pi) - 1337267424761879435076051628172986776324346441018373682128486400*cos  (t)*sin  (t)*cos(0.134872*pi) - 1308051613250923584224366258238610750198800844852137496191959040*cos  (t)*sin  (t)*cos(0.134872*pi) - 872863527857589971973832097116421543535737331624925789666934784*cos  (t)*sin  (t)*cos(0.134872*pi) - 867282756084535883283380521387707994641057481031670651735244800*cos  (t)*sin  (t)*cos(0.134872*pi) - 806271998913593447594276050168793561474718168318135066270105600*cos  (t)*sin  (t)*cos(0.134872*pi) - 779922078802784396013859248301346574250523857297805313835008000*cos  (t)*sin  (t)*cos(0.134872*pi) - 705487999049394266644991543897694366290378397278368182986342400*cos  (t)*sin  (t)*cos(0.134872*pi) - 700690988517341294925214256503903062395368049237246359476633600*cos  (t)*sin  (t)*cos(0.134872*pi) - 556705792216432685635531163364574521306831880961708739526656000*cos  (t)*sin  (t)*cos(0.134872*pi) - 555673945197206294963622683224438805881224683570606599726694400*cos  (t)*sin  (t)*cos(0.134872*pi) - 481416272914276596627378586142275239476764718766614525566255104*cos  (t)*sin  (t)*cos(0.134872*pi) - 460414994741640990539686386373251461742537648586250130051563520*cos  (t)*sin  (t)*cos(0.134872*pi) - 455394436743569594951414903855241788373026062426593275412480000*cos  (t)*sin  (t)*cos(0.134872*pi) - 428186164074280498951037744830126371214460160311067829862400000*cos  (t)*sin  (t)*cos(0.134872*pi) - 424927134562569519678064404818688498615054169789287399791001600*cos  (t)*sin  (t)*cos(0.134872*pi) - 391719337380329298765728671293795559357868395388318571823104000*cos  (t)*sin  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      57                                                                                                        67       39                                                                                                        53       93                                                                                                        87       43                                                                                                        93       49                                                                                                        69       97                                                                                                        43       83                                                                                                        95       87                                                                                                        53       45                                                                         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                     51       45                                                                                                        101       75                                                                                                       101       79                                                                                                       51       97                                                                                                      51       37                                                                                                      101       87                                                                                                    101       47                                                                                                   101       95                                                                                                  51       29                                                                 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                                      47                                                                             13       15                                                                      9       19                                                                      11       17                                                                      19       9                                                                      5       27                                                                     21       7                                                                     95                                                                            29       3                                                                     13       11                                                                    39                                                                           5       23                                                                   25       3                                                                   9       15                                                                   17       7                                                                   11       13                                                                   5       19                                                                   15       9                                                                   99                                                                          35                                                                         21       3                                                                  7       17                                                                  3       25                                                                  19       5                                                                  9       11                                                                 13       7                                                                 11       9                                                                 27                                                                       27                                                                       5       15                                                                17       3                                                                3       21                                                               7       13                                                               15       5                                                               3       17                                                               23                                                                      5       11                                                              13       3                                                              23                                                                     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                                77                                                                                                  101       25                                                                                              101       29                                                                                                 101       37                                                                                                 51       27                                                                                                  101       97                                                                                                    101       45                                                                                                     101       49                                                                                                     51       35                                                                                                     101       89                                                                                                     51       99                                                                                                      101       85                                                                                                       51       39                                                                                                       101       77                                                                                                        51       95                                                                                                         51       47                                                                                                           51       87                                                                                                            51       79                                                    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                                                                                    73       53                                                                                                            61       57                                                                                                            59       59                                                                                                             55       67                                                                                                             65       85                                                                                                             79       55                                                                                                             55       71                                                                                                             85       61                                                                    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63       83                                                                                                             69       85                                                                                                             57       65                                                                                                             75       55                                                                                                             59       79                                                                                                             73       85                                                                                                             61       81                                                                                                             71       55                                                                                                             85       77                              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      75                                                                                                             75       83                                                                                                             79       59                                                                                                             73       57                                                                                                             71       83                                                                                                             81       61                                                                                                             59       67                                                                                                             65       81                                                                                                             59       71                                 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                                                  65       65                                                                                                              79       75                                                                                                              77       77                                                                                                              75       63                                                                                                              79       67                                                                                                              71       63                                                                                                              77       65                                                                                                              65       73                                                                                                              69       77                                                                                                              79       71                                                                                                              65       69                                                                                                              73       77                                                                                                              67       75                                                                                                              69       65                                                                                                              67       67                                                                                                              77       73                                                                                                              75       75                                                                                                              73       65                                                                                                              77       69                                                                                                              67       71                                                                                                              71       75                                                                                                              75       67                                                                                                              69       73                                                                                                              71       67                                                                                                              69       69                                                                                                              75       71                                                                                                              73       73                                                                                                              73       69                                                                                                              71       71                       449622335834206117112602133201357107580545814327363344095768515348119284747337728*cos  (t)*sin  (t)*cos(0.134872*pi)   31505610803341190459557355170258903945952701299231827299696110936234900741685248*cos  (t)*sin  (t)*cos(0.134872*pi)   3158476109772194118152661861052959573773591210619795889751507909289888813416448*cos  (t)*sin  (t)*cos(0.134872*pi)   1834747895583678587178237668456428984440074973740583942254357863964655822569472*cos  (t)*sin  (t)*cos(0.134872*pi)   153765084285294574475809958104261142401842830107343894216562845822129591549952*cos  (t)*sin  (t)*cos(0.134872*pi)   10002260455543452930542064876030153179757938096317576919771342670749409214464*cos   (t)*sin  (t)*cos(0.134872*pi)   4588161966033857185437134341739538312413800099295518002541845702707169460224*cos   (t)*sin  (t)*cos(0.134872*pi)   1443584971260048520801964007482911863409635731150576206877522847695496019968*cos  (t)*sin  (t)*cos(0.134872*pi)   279972773481774109548047599168986613771295771928961443794641962901048393728*cos  (t)*sin  (t)*cos(0.134872*pi)   176068252414107716477069648143466475579101009644002220211763905428388315136*cos   (t)*sin  (t)*cos(0.134872*pi)   9003648469397392021633871148542069834155732210918354720649830650907459584*cos   (t)*sin  (t)*cos(0.134872*pi)   275320868295838791938073965853146146072610042555573120785231208245100544*cos   (t)*sin  (t)*cos(0.134872*pi)   69314165670556667494501587236396387639356650590405954922370700528320512*cos  (t)*sin  (t)*cos(0.134872*pi)   25954235779288111586176187508822626649231834367928434364308024505401344*cos   (t)*sin  (t)*cos(0.134872*pi)   946119822322470075388570329392254797500378153111935122973303121117184*cos   (t)*sin  (t)*cos(0.134872*pi)   687972400393115017993879939383408013637864942750598668793667538386944*cos   (t)*sin  (t)*cos(0.134872*pi)   459801528325588816959232446299997151957303231851475313304718364639232*cos  (t)*sin  (t)*cos(0.134872*pi)   98063059096133932071402132569501220718936913370065044431075016704*cos   (t)*sin  (t)*cos(0.134872*pi)   15780784474432676374180625147462309048041340928*sin  (t)*cos(t)*cos(0.134872*pi)   7238843203652171599158518857314160052375912448*sin  (t)*cos(t)*cos(0.134872*pi)   2818546254629195439026167819344925065011480625*cos  (t)*sin  (t)*cos(0.134872*pi)   1691127752777517263415700691606955039006888375*cos  (t)*sin  (t)*cos(0.134872*pi)   277786721960149220658628914447639941870518272*sin  (t)*cos(t)*cos(0.134872*pi)   16685464135949739319975216422606127524886875*cos  (t)*sin  (t)*cos(0.134872*pi)   14205252563721208156679878625003459974791168*sin  (t)*cos(t)*cos(0.134872*pi)   5561821378649913106658405474202042508295625*cos  (t)*sin  (t)*cos(0.134872*pi)   2723233096260092211619485815792198130445875*cos (t)*sin  (t)*cos(0.134872*pi)   2656587623213958495650956026501210892197675*cos  (t)*sin  (t)*cos(0.134872*pi)   1475882012896643608694975570278450495665375*cos  (t)*sin (t)*cos(0.134872*pi)   1031028937625211496991098227126517432427625*cos (t)*sin  (t)*cos(0.134872*pi)   544646619252018442323897163158439626089175*cos  (t)*sin (t)*cos(0.134872*pi)   434379738780180718623927608301923585753088*sin  (t)*cos(t)*cos(0.134872*pi)   147289848232173070998728318160931061775375*cos  (t)*sin (t)*cos(0.134872*pi)   120680446070627913185533444694491853690625*cos  (t)*sin  (t)*cos(0.134872*pi)   40948563862337584938548160369558352754688*sin  (t)*cos(t)*cos(0.134872*pi)   19768861839999368268310022971629576271875*cos (t)*sin  (t)*cos(0.134872*pi)   6589620613333122756103340990543192090625*cos  (t)*sin (t)*cos(0.134872*pi)   5373740462463684161022613984736272954875*cos (t)*sin  (t)*cos(0.134872*pi)   5373740462463684161022613984736272954875*cos  (t)*sin (t)*cos(0.134872*pi)   3176886956389179253089256492812264182625*cos  (t)*sin  (t)*cos(0.134872*pi)   2943308475715752938476422924149304714375*cos (t)*sin  (t)*cos(0.134872*pi)   2269204968849413752206611780580188701875*cos  (t)*sin (t)*cos(0.134872*pi)   1492713878969693191147517554302142906368*sin  (t)*cos(t)*cos(0.134872*pi)   1085429061082370182296132725021574150888*sin  (t)*cos(t)*cos(0.134872*pi)   588661695143150587695284584829860942875*cos  (t)*sin (t)*cos(0.134872*pi)   540965253535851077489300385314915616375*cos (t)*sin  (t)*cos(0.134872*pi)   186376304501954828491950436659300847125*cos (t)*sin  (t)*cos(0.134872*pi)   180321751178617025829766795104971872125*cos  (t)*sin (t)*cos(0.134872*pi)   116599464802539046556070961057480051875*cos (t)*sin  (t)*cos(0.134872*pi)   38866488267513015518690320352493350625*cos  (t)*sin (t)*cos(0.134872*pi)   35757169206111974277195094724293882575*cos  (t)*sin (t)*cos(0.134872*pi)   14336638807842679114765418204561603625*cos  (t)*cos(0.134872*pi)*sin(t)   9901838536616677041931315506617214237*sin  (t)*cos(t)*cos(0.134872*pi)   5808013963691719285915186655522019375*cos (t)*sin  (t)*cos(0.134872*pi)   5808013963691719285915186655522019375*cos  (t)*sin (t)*cos(0.134872*pi)   2523845374477579264685665343979853125*cos (t)*sin  (t)*cos(0.134872*pi)   646914652014622343963625441435133125*cos (t)*sin  (t)*cos(0.134872*pi)   277249136577695290270125189186485625*cos  (t)*sin (t)*cos(0.134872*pi)   249776181335234591139209707874649375*cos (t)*sin  (t)*cos(0.134872*pi)   229440488588870842244151394907259375*cos  (t)*cos(0.134872*pi)*sin(t)   126022334808043313759147813266584375*cos (t)*sin  (t)*cos(0.134872*pi)   42007444936014437919715937755528125*cos  (t)*sin (t)*cos(0.134872*pi)   37971403294116433648614689981521395*sin  (t)*cos(t)*cos(0.134872*pi)   37552162577307261370715285364727875*cos (t)*sin (t)*cos(0.134872*pi)   27752909037248287904356634208294375*cos  (t)*cos(0.134872*pi)*sin(t)   7281290455575835906084095877624875*cos (t)*sin (t)*cos(0.134872*pi)   5653413638829777552895890370514871*sin  (t)*cos(t)*cos(0.134872*pi)   4368774273345501543650457526574925*cos  (t)*sin (t)*cos(0.134872*pi)   298695471426088440282401625928125*cos (t)*sin  (t)*cos(0.134872*pi)   42670781632298348611771660846875*cos  (t)*cos(0.134872*pi)*sin(t)   40586903319820712965909118604375*cos (t)*sin (t)*cos(0.134872*pi)   40586903319820712965909118604375*cos (t)*sin (t)*cos(0.134872*pi)   11155849149948080261061583011807*sin  (t)*cos(t)*cos(0.134872*pi)   3361940371029566860321403581875*cos (t)*sin (t)*cos(0.134872*pi)   889620602674512616595197862625*cos (t)*sin (t)*cos(0.134872*pi)   672388074205913372064280716375*cos  (t)*cos(0.134872*pi)*sin(t)   242059706714128813943141057895*sin  (t)*cos(t)*cos(0.134872*pi)   43866893623003580699960446875*cos (t)*sin (t)*cos(0.134872*pi)   410758427682386469939605625*cos (t)*sin (t)*cos(0.134872*pi)   136919475894128823313201875*cos (t)*cos(0.134872*pi)*sin(t)   77958037589091405456728199*sin (t)*cos(t)*cos(0.134872*pi)   84258139011771583577355*sin (t)*cos(t)*cos(0.134872*pi)   63218891815554909646875*cos (t)*cos(0.134872*pi)*sin(t)   101150226904887855435*cos(t)*cos(0.134872*pi)*sin(t)   657213484291818351903369*sin (t)*cos(t)*cos(0.134872*pi)   52661336882357239735846875*cos (t)*sin (t)*cos(0.134872*pi)   52661336882357239735846875*cos (t)*cos(0.134872*pi)*sin(t)   5379104593647306976514245731*sin (t)*cos(t)*cos(0.134872*pi)   48723773493182128410455124375*cos (t)*sin (t)*cos(0.134872*pi)   48723773493182128410455124375*cos (t)*cos(0.134872*pi)*sin(t)   114053923419809309819897161875*cos (t)*sin (t)*cos(0.134872*pi)   342161770259427929459691485625*cos (t)*sin (t)*cos(0.134872*pi)   477912754281741504451842601485*sin  (t)*cos(t)*cos(0.134872*pi)   50429105565443502904821053728125*cos  (t)*cos(0.134872*pi)*sin(t)   105525948631533853711363708371375*cos (t)*sin (t)*cos(0.134872*pi)   151287316696330508714463161184375*cos (t)*sin  (t)*cos(0.134872*pi)   316577845894601561134091125114125*cos (t)*sin (t)*cos(0.134872*pi)   399641890136375345822735532599439*sin  (t)*cos(t)*cos(0.134872*pi)   560099265813525838929545836740375*cos  (t)*sin (t)*cos(0.134872*pi)   2800496329067629194647729183701875*cos (t)*sin (t)*cos(0.134872*pi)   4038152599164126823497064550367765*sin  (t)*cos(t)*cos(0.134872*pi)   6972405718717550163163489382379375*cos (t)*sin  (t)*cos(0.134872*pi)   6972405718717550163163489382379375*cos  (t)*cos(0.134872*pi)*sin(t)   35544761099704524393605793485446875*cos  (t)*sin (t)*cos(0.134872*pi)   248813327697931670755240554398128125*cos (t)*sin  (t)*cos(0.134872*pi)   327658070500912615773784314493119375*cos (t)*sin  (t)*cos(0.134872*pi)   327658070500912615773784314493119375*cos  (t)*sin (t)*cos(0.134872*pi)   518219843566840206915870938033244675*cos  (t)*sin (t)*cos(0.134872*pi)   706676704853722194111986296314358875*cos  (t)*cos(0.134872*pi)*sin(t)   1491010436015638627935603493274406777*sin  (t)*cos(t)*cos(0.134872*pi)   1755991070533006766056785015951821244*sin  (t)*cos(t)*cos(0.134872*pi)   2591099217834201034579354690166223375*cos (t)*sin (t)*cos(0.134872*pi)   3533383524268610970559931481571794375*cos (t)*sin  (t)*cos(0.134872*pi)   7910709019607590343461393746150290625*cos  (t)*cos(0.134872*pi)*sin(t)   15100836305598470143379485304357250375*cos (t)*sin  (t)*cos(0.134872*pi)   23118173228027823824329076295509214375*cos  (t)*sin (t)*cos(0.134872*pi)   23732127058822771030384181238450871875*cos (t)*sin  (t)*cos(0.134872*pi)   32887028534049474669661040298263604375*cos  (t)*sin (t)*cos(0.134872*pi)   45302508916795410430138455913071751125*cos  (t)*sin (t)*cos(0.134872*pi)   176818545296726375748773491189593111375*cos  (t)*cos(0.134872*pi)*sin(t)   191123926994529411589378111957747059375*cos  (t)*sin (t)*cos(0.134872*pi)   208063559052250414418961686659582929375*cos (t)*sin  (t)*cos(0.134872*pi)   230209199738346322687627282087845230625*cos (t)*sin  (t)*cos(0.134872*pi)   1237729817077084630241414438327151779625*cos (t)*sin  (t)*cos(0.134872*pi)   1609072614275038842473779262593224715875*cos  (t)*sin  (t)*cos(0.134872*pi)   2102363196939823527483159231535217653125*cos (t)*sin  (t)*cos(0.134872*pi)   2681787690458398070789632104322041193125*cos  (t)*sin (t)*cos(0.134872*pi)   4591561222116574584023219761672915354425*cos  (t)*sin (t)*cos(0.134872*pi)   7092773684430142692721876305246082139136*sin  (t)*cos(t)*cos(0.134872*pi)   7652602036860957640038699602788192257375*cos (t)*sin  (t)*cos(0.134872*pi)   11942420126932951702599593364399815819625*cos  (t)*sin (t)*cos(0.134872*pi)   21389594389806429111521385076499282545875*cos  (t)*sin (t)*cos(0.134872*pi)   36571490034757483183114180080402501206016*sin  (t)*cos(t)*cos(0.134872*pi)   74157618381998841422112072989360566777275*cos  (t)*sin  (t)*cos(0.134872*pi)   102114223598223618849297530126108491584375*cos  (t)*sin  (t)*cos(0.134872*pi)   155251461650128372133794713737197605655125*cos (t)*sin  (t)*cos(0.134872*pi)   192506349508257862003692465688493542912875*cos (t)*sin  (t)*cos(0.134872*pi)   238266521729188443981694236960919813696875*cos  (t)*sin  (t)*cos(0.134872*pi)   370788091909994207110560364946802833886375*cos  (t)*sin (t)*cos(0.134872*pi)   3895453582288844753265080871037224818049024*sin  (t)*cos(t)*cos(0.134872*pi)   37580616728389272520348904257932334200153075*cos  (t)*sin  (t)*cos(0.134872*pi)   37580616728389272520348904257932334200153075*cos  (t)*sin (t)*cos(0.134872*pi)   46481132538434701519476337541677988080779264*sin  (t)*cos(t)*cos(0.134872*pi)   66414690580348962391273900662530272304941875*cos  (t)*sin  (t)*cos(0.134872*pi)   80016195702514892978277174539565335656267776*sin  (t)*cos(t)*cos(0.134872*pi)   199244071741046887173821701987590816914825625*cos  (t)*sin  (t)*cos(0.134872*pi)   798156779456926447376290913170983888277733376*sin  (t)*cos(t)*cos(0.134872*pi)   11390641425154413021964962512453997508360667136*sin  (t)*cos(t)*cos(0.134872*pi)   7383126070944446623136453996545458702777103516279028441721864192*cos   (t)*sin  (t)*cos(0.134872*pi)   1112991567278288568928623218916900554366653440416895873739885903872*cos   (t)*sin  (t)*cos(0.134872*pi)   4495579409175430267731780024319206719747730076352260370255317007597568*cos   (t)*sin  (t)*cos(0.134872*pi)   6107107478786025825253395055984577556766232669206774674149849048285184*cos  (t)*sin  (t)*cos(0.134872*pi)   23179935646900516847019973070110242538759264751242410512845926467371008*cos   (t)*sin  (t)*cos(0.134872*pi)   2469037035874830232213651626477416917991462841198057192547556299754176512*cos   (t)*sin  (t)*cos(0.134872*pi)   29460917780817316751060489948630854355298688390828085854643323422357061632*cos   (t)*sin  (t)*cos(0.134872*pi)   42845098147716350404181916600768631611140391568172868007176366565279924224*cos  (t)*sin  (t)*cos(0.134872*pi)   50716289255136237024038448188414245263847277548119127783163862442089381888*cos   (t)*sin  (t)*cos(0.134872*pi)   58921835561634633502120979897261708710597376781656171709286646844714123264*cos  (t)*sin  (t)*cos(0.134872*pi)   505891960277401664624207030495167500108615112963296701852694907993548914688*cos   (t)*sin  (t)*cos(0.134872*pi)   1616361032327975223544598689939169681124970731865178213972305421444919066624*cos  (t)*sin  (t)*cos(0.134872*pi)   7219676719790763017534122015781163197419263588319454017278563130766490861568*cos   (t)*sin  (t)*cos(0.134872*pi)   17146254148435678349117205150103157234783836643461945967402414231811809869824*cos  (t)*sin  (t)*cos(0.134872*pi)   560723369336384100447403195973170604392289025238806319150500220380050739953664*cos  (t)*sin  (t)*cos(0.134872*pi)   10965064225060205821529985680747685896185623387222624737825270365939011164307456*cos  (t)*sin  (t)*cos(0.134872*pi)   285738569803107944598012001560615779501041449027256549087800958471800571092271104*cos  (t)*sin  (t)*cos(0.134872*pi)   622914277770306391416417538706046826127214513599367966299345963971873592410374144*cos  (t)*sin  (t)*cos(0.134872*pi)                                                                                         ___    73       71                                                                                                             ___    71       69                                                                                                             ___    71       73                                                                                                             ___    69       71                                                                                                             ___    75       69          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01906982469276017558766363125684994411235494812451434434152352576247011737600000*cos  (t)*sin  (t)*cos(0.134872*pi) + 945753377256094129641199764688517022393111050893022673724693927639502370216345600*cos  (t)*sin  (t)*cos(0.134872*pi) + 978365562678718065146068722091569333510114880234161386611752338937416245051392000*cos  (t)*sin  (t)*cos(0.134872*pi) + 1022787571091894261578795465961280274912185807658842494743729716497924562616320000*cos  (t)*sin  (t)*cos(0.134872*pi) + 1050661341969780318603578989555206958736073049203524715814775539421916759588864000*cos  (t)*sin  (t)*cos(0.134872*pi) + 1070537963884547604760833778204275536418965867006731095209588596749872254471372800*cos  (t)*sin  (t)*cos(0.134872*pi) + 1202542643292368023411688484167579992548313993083268579245536470101662682316800000*cos  (t)*sin  (t)*cos(0.134872*pi) + 1231848999023175564241228989470238517282409572372172221154559803244168232304640000*cos  (t)*sin  (t)*cos(0.134872*pi) + 1243773615254984142673167618233148216782604177645602718346277764743291454472847360*cos  (t)*sin  (t)*cos(0.134872*pi) + 1407428038314850477235426515369088771622420516809497812865524839051619277429800960*cos  (t)*sin  (t)*cos(0.134872*pi) + 1416333608972263679886651201621619014839130243012313226546157403141717357284556800*cos  (t)*sin  (t)*cos(0.134872*pi) + 1426402430093699543387288916410621131360483149170470478119889357373102369936506880*cos  (t)*sin  (t)*cos(0.134872*pi) + 1491106449696334163774018476784526640012131029045089739756212688330179211585126400*cos  (t)*sin  (t)*cos(0.134872*pi) + 1499243144724600452344553455213417695432894150221227873967676991304140326961152000*cos  (t)*sin  (t)*cos(0.134872*pi) + 1563828423723354131771859205006992250244896996061790785372163352496543197298688000*cos  (t)*sin  (t)*cos(0.134872*pi) + 1665254457579146518911433133566141156455070463309027186141226095549355374149632000*cos  (t)*sin  (t)*cos(0.134872*pi) + 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*cos  (t)*sin  (t)*sin(0.134872*pi) - 31280579784407891055717942560556903584692823286751212058354957223984490306600960000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 28452943564273560749665300265493300897818828385403759496204967065292623230135173120*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 27827012320852984341392029506044145636942605985362535085665779227460900251112570880*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 27812651881176421041635202706649444827437988819476118958274694438400641361510400000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 25534692942296785288161166904929885421119461371516194419671124289365174693711052800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 25506340072608173998127415573412088820382611129007475816066516447935306817077248000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 25306869863602562493118935511370196865730297220488853431450500244754134370091008000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 24722357227712374259231291294799506513278212283978772407355283945245014543564800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 24009081665469097749882067023607622667487717875848399409324833565535973633163264000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 23655239855188070604682440635395074689169914449064844926490925009327212157992960000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 22263755157824066451465826480371835001571684187355148166109105891131493795758080000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 20773187198290389439576373508033791933411860017393995975338434329911651354017792000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 20635347342124226804985988191418098966273914976424695681312054898162618786539110400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 18039625713718827630375769418143803031848950055019739692440997102781439796051968000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 17752132259073550061478980890527860301278617241684654118718066634779650278031360000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 17493210272244538475432735585712666891294197909384417663442892067294022192857088000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 17460678520258961142680451546584545279154851133897819422648661836906831280917708800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 16691502580722573921076770250145817583426161429894504033420678770369701399756800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 16245611465350833926693179113876193208277207044033401609056699412964388522216652800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 16235663142346944867338192476329422728664055049517765723196897392503295816446771200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 15723317143750858625881383074467533409703918128349265076578859019376261674827776000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 14126180591532738642775562198226491844449753877060845704893873219327420568688394240*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 13984772432497291663604861560932982299627324441262962838811920050850290361958400000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 13808769745548208837689202246794764227035625987428391367698194501019730243884154880*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 13058884205548558910734038808186560335859187126496821100223537047147788841779200000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 12764598575128409535725333299636886683809884403942243620205394669310497515456430080*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 12138946613740684720261276560160462563211616859286113864823174518320373757378560000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 12126368646371989058939066634655042349619390183745131439195124935844972639683608576*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 11403252879574582616003017374696192104835155231450591812409648789937320802385920000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 10764797454711470331231730357541482490666568947467993761715851762605534786617344000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 10045595495482641268679840225005568747147258462010992299320084661156723337409331200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 9820749626523249670418377872680795447744111107022830968950395546551030003007488000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 9528920771471638985922185638287773479803599807087130278208702926070856990851072000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 9155684501845745339011153996804812972530472443341267610876034337674394951326105600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 8970664545592891942693108631284568742222140789556661468096543135504612322181120000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 8934842798682573724535121304638256962584283955014096256406664408963286648750080000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 8575508349802254741555961167687680637808635272448408060395194222938666263642112000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 8078545148687422357951018232474834975762181567654059656655324415595054368817152000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 8063150818323298239214621665161353844283378203305403938708453247113209902530560000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 8040195290753505409698025032919394848613239504393108910103943135235103186348933120*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 7806236882621044609819736257771914330258139597889942565063134921617485387005952000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 7623136617177311188737748510630218783842879845669704222566962340856685592680857600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 7285515181917709993898547527641934035840514537819530842080313659093802081583104000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 6347522597963293744498440815462680143642031187678770192187323527817186726064947200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 5863951243982547068259806546638629833725292188976695555820740262197450455908352000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 5596145015858320826201255704609241766369106145562599387916071361821120032407552000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 5562516958709456307347381299360472750457588796866081626565511256087901880153276416*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 5427022361267606712603537484938376977578086999801284840118888622035495708262400000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 5261794336089050773622892687721854435932621509301254296181938601184949184757760000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 5054399129498429073139955312981447344028305847761357336364297072897522833293312000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4987388942663114836913439140273264638362836397144710571997223802416800006039142400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4823996297233068805066691204969397813394811798433136385577815857634766445608960000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4744101677167353137551807962698959046247576085088871031899798251079395127695769600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4738499183904777256068708105920106885026536732276272502841528505841427656212480000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4636805870282608684566754726676228892134402234894725207130459128366070883994828800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4344256959585441925739286803886963214673011580978664550173845567381014856073216000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4134853969056916118628592461402340982909838684371259759066699306544085524807680000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4124109074231958714461186160646858882217460101884766880791249173901716928593920000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3826656122141824292367852521870882255071645799541400423215576282308108554862592000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3688138136022517112767601499825007530764919609544220569960485398608185204324433920*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3516779443473929177979422650765636888068628422697014159664541649784631073964032000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3467313601055307233344005170527065073872654900564517840023959479272046728314880000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3413395446184793616664723274366607958350571497968686951039350322971658166049177600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3362819016427663772080840094977441981729628126869715523431870066270762063364096000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3095872556175329007908306964503626998500685838888534777279686597912386602637721600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3088310165595765653172844867284073867079088498162145336654650292212452626425446400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2766103602016887834575701124868755648073689707158165427470364048956138903243325440*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2765848079572446453846883513585433982861122184091517732264733881233824169328640000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2621627356895476200821077080154610177806153705304879342457140094083742648238080000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2548139260076165582482864804831582094217242381560178828436649915581686706339840000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2352411413511356801631229571710944632298027357615337737910578347945226494017536000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2302059080232936954598484665912953409141535623788910475413100290755364396833177600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2151215173000791686325353843899781986669761698737847125094793018737418798366720000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2065803727183462956061921431378562949183473196489551410287252995290769116050227200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1993734062348680126367296218344089784571502009600964705603593439102816453834833920*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1941439436248507110463135089395491119403613243093469583570780888062237490544640000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1937279987597587954284542000232542638363081353330278137102829227719598289190912000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1834020868343495220426359333276738445529130605998275412868810316719970113604812800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1773284663659294367869569216976968611460609404468200162098472940449652935753728000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1710803169711419567468535470324055665154299244125309528501424854972531138887680000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1674952411535518309951033212695113745997467267951244091106748345705480843165696000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1622806794934972195880357387024259126976803961303110806886645822525548276377190400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1600428771665521530857662214174116589983054131601096010533590993361400097669120000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1525849594311485851422652582049949735442849952681939674363802297596212991229952000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1522171167398341125519310528384204278345717092150195776001133786003724611826483200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1487478822340759694295068169972973906234618220731159059704559283878927625900523520*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1445945119577991375532757658352900206148665567015759888617816966141491036972646400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1416646497467390185042922066640927529747255448315389580671008841789454881810022400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1298649620165154708730405727735191009204531187205784450105803480876920309022720000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1171889595522170407128645444375073051561788342279185262519669854197110496296960000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1136318417644510370139105011768292133053964788805061393842578045767305270394880000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1109678812699388730060023319201062948904789853756280844753208369364400098141798400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1101873167826492465896250331002866294541986337650118241561359140032269307084800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1093028682064137581139684993418100483801136512774306879785355829404676145545216000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 989839499474180555418321944874963531690493550283602857399929557135204766544035840*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 986249104842929936120633959694609712899229163880470384561869442472362190988902400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 947610006006303892460087042370692359994726567630732135813912510142970105901875200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 904029116545674314070669342803627782633379578329657202515173887523485240000512000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 897761406499838178170105950002873900835563917699081661362726807634255485935288320*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 804069608954467475113479971272361890611719759906843041139370183266791115980800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 801340651907929912243344002565694786616173926553402110516791780005992632156160000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 773117848289268045196362556320119854395925826108656085701837050066722151727104000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 704463646316378525800452828353292652070877974200335988972763887480258707849216000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 692260952671790794260116839049526112932471820954135822591275982249444667031552000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 688152457898335647272519572106334382330059540998799813866987487808506883473408000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 663327004204412724722060929659484651996308597341512495069738757100079074131312640*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 655642351561033564562736002099204825413233212634601726786466001823084880855040000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 648307152041884419032181946428055060874839577845691191198353342752251831123968000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 623416618959393952404469190166108166775032987289395476999018572985299526431539200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 566395324913283377121913777404157728762931489871565673029225803658636545753088000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 504515816076939906408958283152102209052382929499894554699429852899915369283584000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 496109911508102443382514110123171298889112692347971958834339816792179381108736000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 489834617986082684138071457634470350348139939290554972561056760343546725264261120*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 481731023741349872312544374219265401598889126541805595862877988215913270424371200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 471721086225706864446854775450604980629560669984144006825757315985602877849600000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 471223273632844103055492889748649215702861275357537520999191904505696111034368000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 448828028336689213176125962911730426759504323123940055445013852674635883085824000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 439808388723987829518460030432072601322670523667035019599245777538649703632076800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 423038988260707772664698077047951666209757220296388385393639929387608535455498240*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 401208611357593390438392629328561423629204465668805814138782133856504947671040000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 378827009313936252832518095986848090528945770780782991011054377322481323081728000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 365667219258127231975904796685613328060509786170272435175310813239063250731008000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 358259557050392285525677654358678424863187474731318618958758397343366014566400000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 352327080186824882022860598815637345094578344796022605372933237540652484395008000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 340687451163010513211617337825436930454682706099659560485269172656268745113600000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 332425258133588132055345334305028746020717363290332131794631757550466696321433600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 316963618220397986378352528058283222949986323137293427990230280455096152306483200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 312032517430986829328816021538203789396969736056309764899563765428092980428800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 306806585155806710335241422427723441598803414923204446106127514125562607042560000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 265939795824092532346112579407718784044007117214743589218407864173864182349824000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 253401441512117702656091451236359108902498141799578678692524356223950278098944000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 241065896969932814015641462347541341380500972755173361570954320422551699849216000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 228891305798624128613547594775529555554281779620949791259399157039364759879680000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 221487367283602258318222086716850011223741910861398449192101065638690999500800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 216931740436424643508554860251841152526509982283270503032679495443341163207065600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 213458602201530092205835340447526598076318375547287608574110254389242339811917824*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 199874284122736457840669004647473823226109967661749070815442327223674305689681920*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 194053274728663720187123036770478725523925795952079644158282049444765763465379840*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 179958485917926834883555445457440634119290302574886239968582115831436437094400000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 177773961627156426983347029665786024902619044680924991328653861185744355196928000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 168934294341411801770727634157572739268332094533052452461682904149300185399296000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 162548796698895576063526864223272468258538212734269569498731627657758943668600832*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 161616838123929832917427602692655983880679552617226554913914569271380413513728000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 155457776539906133876075892503590751398085530403582610634232921173968904425308160*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 152837057543112310891296080451748889699648123363240150882465521664186491506524160*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 150733298940557352989409391681446292682088001213796204000092127806410939432960000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 146302801689681736319723045286125428448111383400345222975528031810625435651276800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 146169701782328617741863113280757398253264547848760548425782063641612025384140800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 144957771005806137769423445106248664152595754973058790533978080878991954568806400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 141530321091223104376171105079750398349034153202803983170046468855131001459834880*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 116106283356353982902519188730908905898955866238763978213379734041256388334714880*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 113001957765558178765977828574244175100205933733131120873998477645803272798208000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 111151220397602957314416571997984009632522640546684197742563998780120691189481472*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 106302365404257834364243859744582353711903553646909779724917259311260766683791360*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 105650735276069431602058381733356763905390313983901603693898543990518914744320000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 105050944780554391396327941750226389522441709201197260694044470026397268783923200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 103268282123724534386010865170100601148410894164351453298963190313639521288192000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 99232623392481903302584086333744018712559683286555423731122275597215495712931840*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 98364477670823263905364700234504573291225464743632527577077954749793472348160000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 96497946198561207529207571645284362510705104456457261252304410583043864631705600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 86001606940150982862239541489244816217551725515014700566972638850920096284540928*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 84205469998184058571527706059078795176153515565669846774669696045545978173849600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 80368099800796137427585136016199111802869289311193291446157944239565591019520000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 69652353160689985770573784547372563562486717403034185920003551674290178883584000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 68988127597970781109301035777756341376288855953992226180056130347487731908608000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 62907287323630041319971865415532741916692243310109561162514528496883925642117120*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 57643889209513604758025914512994500971864847990687608217406219916425549326581760*\/ 3 *cos  (t)*sin  (t)*sin(0
                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                  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           5                                                                                                            5                                                                                                           5                                                                                                          5                                                                                                         5                                                                                            5                                                                                  5                                                                                  4                                                                                   4                                                                                 5                                                                                 32                                                                               5                                                                               8                                                                                32                                                                              8                                                                                8                                                                               8                                                                              16                                                                             5                                                                             8                                                                              512                                                                            5                                                                             32                                                                           64                                                                           64                                                                          128                                                                            16                                                                          2048                                                                          16                                                                           5                                                                           5                                                                          2048                                                                         32                                                                          16                                                                          32                                                                         4096                                                                       2048                                                                       1024                                                                        16                                                                      320                                                                       4096                                                                     16384                                                                       64                                                                       64                                                                       64                                                                      4096                                                                      64                                                                    262144                                                                   262144                                                                  256                                                                   16384   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           2097152                                                        2097152                                                      8388608                                                    1073741824                                                268435456                                               2147483648                                                16777216                                                    134217728                                                    268435456                                                      4194304                                                         1048576                                                          4194304                                                          1048576                                                           2097152                                                            65536                                                              524288                                                   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     4096                                                                    640                                                                       5                                                                       8192                                                                      2048                                                                     128                                                                        32                                                                        2048                                                                        32                                                                         32                                                                        256                                                                         16                                                                          32                                                                         4096                                                                        128                                                                          8                                                                            512                                                                           64                                                                          1024                                                                          32                                                                           5                                                                           16                                                                            8                                                                             16                                                                           5                                                                             8                                                                               8                                                                              16                                                                             64                                                                              16                                                                             64                                                                             5                                                                                4                                                                                8                                                                                5                                                                                4                                                                                5                                                                                8                                                                                 5                                                                                 5                                                                                            5                                                                                                        5                                                                                                          5                                                                                                            5                                                                                                            5                                                                                                              5                                                                                                               5                                                                                                                5                                                                                                               5         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                                                                                                 ___    85       87                                                                                                          ___    49       71                                                                                                          ___    89       83                                                                                                          ___    51       61                                                                                                          ___    91       61                                                                                                          ___    73       91                                                                                                          ___    55       85                                                                                                          ___    49       67                  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.134872*pi) - 54363048851403491011379359894560598981137014048677420148171873975122938927513600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 53100495246758624065436490263561344441138383526593507795385924894055026655232000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 51892001176339695965407570808444208118358058864646628323254970612617350794444800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 49692957533659478372711001696748425676056097399672914282599255227296862049402880*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 47525154567490982541962935758009924059221211879416866924038667572713770870374400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 46260034402744010990828223257733039907560404846991457200029143302297259868160000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 45427709402732585350111632714641408878879218697963684695578596073761394393088000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 45163077467685850572321764896039414308530718905691249078054799662495759649996800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 43218137729290669396079670423249175824689507164759378481240745823378247516160000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 41659542010853476074277107672726868107929857232612343533629186220212183105536000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 40074965752951192236057259432861633609722659193284608292418754215561985523712000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 39660602404814206314194983623435933576186994758795517604818025252886962094735360*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 36364025281321304487956240397558183113790887012275340868585849719990877211852800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 36203505184756182514561218201704118188525534228080270852196720845276116418560000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 35400330164505749376957660175707562960758922351062338530257283262703351103488000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 33326039690315866808421604926326847902163195066219944369925116740308727077273600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 32732983410714516714394056255922506172545728861884601577974361742137055877529600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 31879819388954718051050657573674880688374625109899705231568093879408771517644800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 31748729978123104955334666840068419944560161003028505454200106496866730121363456*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 30791835399326482315770036105928554688469894476278688698769398510591613599744000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 30363725051176678647673017821764461421970911060333727092598439696725729114849280*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 28524375671483251266349164727798093947203230345233011320479583581199015084032000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 27040290643633731198847263863588157272972558625035105651370124917417567898828800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 26754085260989462007096938833439965986712552054374853345529985509710343700480000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 25048801518830025040544200183222694890223365110818221645148226475507555007201280*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 24932294182059551510686351112856224236402298884803365969867592929328324673536000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 24435551474555977217874483826304983552629785124991359547684716498668633456640000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 23140743360840830128699425707537025617866928098720671461827358912721467316633600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 21747672942975819613425653426448059592594855814678341666711919096798312503705600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 20598520521672095778297335751448776179486633883300973964339447045886364876800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 19358981693977503021545528561017329234487903050627137472073235668821176903270400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 19272716624060086982040698022709693765302570934891141539222423425718020997120000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 18699220636544663633014763334642168177301724163602524477400694696996243505152000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 18192814345572101462191512573376004671973792882452664897742004892305389791477760*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 17896094008055795054752076735373287067780958725256060000706536038166733783040000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 16998644504038940673303988748733901601829415739124424033171976694726005882880000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 14807347341976717695341641759232750706426137831470412135881097318175084222873600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 14654452053417646409466037404191144711334908854264414942894345805063858467897344*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 14264277427887945188879357273411326657024796129991943222072343923461812303953920*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 14015167007695528195318754430377638404116684858348264629658792306825579169054720*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 13922658572236131758048414851114722189719604803916485010391770711410362810368000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 12633148321911764146091411555337193716668024874365874950770987762986084886118400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 12403719502511256685982049802966371006108518373906037584410733846488532438220800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 10915688607343260877314907544025602803184275729471598938645202935383233874886656*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 10125296288478136092959451758582496122981502624028679920744963450962208987545600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 9730542539013271628367364584638664749937176289251985117864721094800769632174080*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 9457701604347879252427033403766054599010539932734228840137502698622125762150400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 9046841504603132767186272743445116234025691621111352942520211831291640178278400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 8654625598957595417165230853395638117933808391623760952405695307092928233472000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 8324287289539890871406258090248881115681721823271182833770115092773417988915200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 8191649811767853372685035241480089827113707572661579768276349775856351974522880*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 7446690245384948995372354894510514976671588100418431509809490444501957486837760*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 7403861560676644120502373950841285468769760212211203737861247517389939015680000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 7237473203682506213749018194756092987220553296889082354016169465033312142622720*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 7057024685909003943577799710527194267532562434929079944761641193094872930713600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 6306532680242128398918357409755811264870320249078023392245846099014861319045120*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 6201959403314596052901575611282627769335759834401937068905695908336544776192000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 6198937343274386819132319854440656149975750293925348918764979324405736800256000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 6168066263705138642887195698108296477615569521348410113133153933883995062272000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 6037145478718454364098759279496200018479637297468417143655754592415209488384000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 6026242338898033803410874858211108541987194904674555685923808494614200815976448*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 5828571866915656009757188003853777922223002720251373155337577832838888161280000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4864960638986368595531671008454941008373832360573589496604532604172172997427200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4830972965914375065942456680872873487785007030031188068470667816530669113180160*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4554183563233382717770422255234448478078354193481212472772220820285751820288000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4526769176975359659937338691732233722076549375169956109672346930246817153024000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4238846825483170085431043749433502140634638953541654590226380884036210917376000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4132802122290481650421776256469601753394488707929020793224203125496459191910400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3900415536104728787150524976551275640143957422282533018510286530392033853440000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3664794192867715849441840133939734590971130811237508267989729400380685549568000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3663443116667580285995041298867314412320081546422305499964664062352895435079680*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3632786885347111126563456647161274297998282881573028933038308766872437260288000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3429346441900612433328707957496052518774150204451740658207317487114083159244800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3358570679691395876727702900317463729282601149319644855563354174054090145792000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3317384672114074015321253795160538083518272120097591885014217658401141293056000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3316892373577797115557938677842902619911475674479722069295847134970486194176000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3052215690018097197195630936346202063548168375267141240109059528820627865600000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2913208795363404885956510742616210330768790860394783820586559938191101735731200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2892143663933329168689332288004979602850560681465500592571872923857105767628800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2873190997098451394695411039212521379973430768205146940902111133460573716480000*\/ 3 *cos  (t)*sin  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483054351443913897400786715942540464929501712229114592181745696222275751116800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 475986077302709366722140534136287347993774731442862642785376972067780637491200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 465976874579621019645362682922854331947701937671279929253569756282056867840000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 414443215747543413533366036276486554495454622689739459232362128219685519360000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 381199960557286940360044656114366438406809279732992899606009577433294962688000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 380803355009414632339091829302095498662655130864138593002342360563464997437440*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 379959857231395572636022408831581193298806538943524027198305034793954312192000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 357348231323675286187876193203671397997670198805450250450471552586847617024000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 350941789974688235350295762339217730419287912291088432194611989921098757046272*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 343580495916902022332967644591403556612922196837503872028492782095619325952000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 333788783028963110240551523361551412228103957223748934684919274871946578231296*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 317151227000217251384277825776680206104235874003849728026301029626725531648000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 307022910866765174292635115452179435135107287633961305922827396498875880570880*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 278157319190802591867126269467959510190086631019790778904099395726622148526080*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 266939578615632034342142876804767021647507787308299975050331418761248112640000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 262652046818441678203149347809409638137786799928037182996777065603627430707200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 260271487400080646034207034530726101192804466716464484882099256845389529088000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 260106189239030560138885154738291019577423998892600165020939990273533096755200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 240298681131765790696498339485204562551592178657565933380030081296935734476800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 234250513248611494605815585721492400366996091085504911740030768124170076160000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 221712748525994624399509696081729641756833434610321598232899366942368858112000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 221313327977930141646750487411660901104865545430948553161611788442303746539520*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 189670884956744135505750811712881112475730800886832344952230956489800417280000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 187182406883829911812697053582875494189255818421902512140723194212158275584000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 183683240630594962042763795216753007501971263453922202107746446536893425254400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 180830037126718474876935497190326046922505275273364499227643864322135818240000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 170547156429583362384280065962619320987407470977064872785145168091747975168000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 159356038003058636287147594058743180012724031126168648729896419989827616768000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 156226422890500819279079832077582115234749517302216122938515597497264043458560*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 138320829986206338529219054632288063190540965894342845726007367776439841587200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 137192467626232420964921352189305893503154835249237597456617670911461962022912*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 125208315573831785654187395331869641438568881599132509716347187134864556032000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 108959870081533865077771742898889149720100672849882410930005017557970452480000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 102046244794774978912646552898196115278872924141067890059859136964940791808000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 91897895817941658399458724751518891314558539589538895846185645586625907916800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 91352760848254121545107871539125459052274214857847247223904958464926647582720*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 87353421585884161221216619151585505871598948549228349475318256827480670208000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 86244856482681852201509848353835096256713230268133231570408920596088042291200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 85008407863189743033150549587622065999908932195293097284826145035464894054400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 81251784204514123606856959370934599769253807480033366888062962676843675648000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 78720475699853444440336217775176138156566555349103121315489773133844447232000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 74382356880291025154006730889169307749920315670881460124222876906031782297600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 72206561908543379455221764310160996580607808025914524977167195216558927380480*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 66253108277089420793021098475994132341657833723617567757924294519226263142400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 65251972034467229675077051099375327894481582041319462302789256046376176844800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 62931900722516260719799344340206529444353356790536938057718567025855002836992*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 61353388072796379050075663198460820233926344423698664793027135082514612224000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 57544139087496582890363336988239286956086069404948071892475109844522715054080*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 57004482403342149422312433561334444871996471114867777504320180545197703168000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 56863033953661298944680411323373495444571836521190095622185074660077679411200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 53903035301676157625943655221146935160445768917583269731505575372555026432000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 51280766362444614240687977257637728928816411188862071571161903510049311948800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 46652864691581576145039717326799094580366716310885536424399682811756491571200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 45354379393557357417842561381189358547890245618929903441878153000968981053440*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 44619440268243895636116249994036864638259357405701627265540851410907483340800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 36098383598953815087670610078905815987096317941597270086392815653832454307840*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 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212419199362664226500859745384487118192759134642343797372551124184622694400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 195405614961035391562475640286506857197841362615773524474862799519167283200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 181124102328530892733351325892526967897628395611180201064412432028611379200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 176569516930651552616608227549199318948528135422083269154180874236854272000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 165198405738323045634110776858075555134747255986935993054207885444330291200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 161379838953073771874244669653856892492243672153997514801408183347749847040*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 150833326978468867752883752783460289470856190248941558875581112796997222400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 147304588904086583755302449743154271776493441954140429273216617111785308160*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 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3181162879036545905489193416504493174762588703360724383774580672141721600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3128882083690171191088136449311428951522461213457792939758443488398540800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2918916358971872976000310873475031042028648818878845378009463314081382400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2727923348802106509621769638042701336987888756289592687567102341084610560*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2557757328257122958689628166852127886640914884042744141530268584168652800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2353136741996553121994457913503957655709641693319324610207847097435160576*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi) - 2249268053801713437910409969076033132322556714825574834360674232041472000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2177704139179492310821160091532644862893269656346445856365915472354344960*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2135400219358329377172595511551623191880171786267323675871275578608844800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1999036429682815726482808935405962794910933889885766988637816453291048960*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1859876949226816703430134605659266019681349141617658491036630709488844800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1695588461295875468279474311427976149242326667668532768262294018300313600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1573475544119341764911931367722371740609679958555661333336173985639956480*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1550923845347704228930040473088181348551658395156699126647674635078860800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1513975201785566705365227314182949492672158651673125616012150075031552000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1266675139819797714319283840927329516908708862447867741609603095959961600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1153000153681195318430042531771023781484782134014602282418359932444213248*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1102701735611596457600117441090567282544156220465341587248019474208522240*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 991445130801110963147461600524226359157293501512778126054297301942272000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 922707255755048760694676450472092990221945070382581676411416436843479040*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 843244738853236563968648330029198773179093899984565979086805986495692800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 740507427589239664421141141422107924196583617071310368408497231033794560*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 731354791347371607249808147099742485943024593860646459257737726813798400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 664681648006158955255731631323506292236425026495728197134717700748083200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 623378110770542451573336143907344172515561274878137047155255153786880000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 477262373666404531393798164037289477701006070887542246419698156988006400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 465513580459736191214419782430136813874084496133868423226950162579456000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 460609141752653714297921396700847097057712313617406451494401125803622400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 396745720403211993659314775418870934401296063164204979287202527010881536*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 385561995311543152335123955759421361894503028366080382354448950755328000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 383617298935718431737437627019904106163422323001930490557080094638080000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 355992094760955961478121753473304885535883119160926329109653596198141952*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 347218421880744467516502253541434788956097488228938932565155406204108800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 339680018325009703523446049570935084291506344570433062522441467649064960*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 332452508705028486585459031567790626180330761574018704364709170328371200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 300790365018835297386843885704191518925061165233635970615689249344716800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 275562169182458731273845047597925995311547192097997454525396908454707200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 272818525953930402681473052102881866809267648394693293624183190380871680*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 244903304315897843929782914507122333343321806076800713378666361179340800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 203662191451134583656308654813184856069911967058567435161790696128512000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 200375430803916417760731475505827363644536023153746038218908840964915200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 179898457814814538703393515921322477950690871505877318333481541540249600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 168914563172848902497403362391110773170264706012171499952169388762726400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 142102521709878309836647197464105520666952729219843413806987364374937600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 138399669908097207090458642587978232930684673196815690449024137329377280*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 121565905553408016097912242794145281921367417377148130897478962642944000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 121247354440281841760491820943087437937080764523118879991174639720071168*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi) - 118888006413753396233206117349827279502027220599651571882854513677172736*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 115899678234502584235099865350551212693796323756212052564229632336855040*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 111222204730220261242343923533650962204788165744680118121642918705889280*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 105032298655127446401000102473469297884269408553797305857338486711910400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 99943587674896965946329731067401376639272706392154065740823078633472000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 90834210013446614812323216311945614665081038365881306757396924937011200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 84645010409746011208800223742407798837827117763580680986232910512128000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 78826796147329487832121569115851694146123529472346699977679048089272320*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 783383513526474004267549150175740064389785167
                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                              

                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                              
                             ___    27       69                                                                                                 ___    27       73                                                                                                 ___    33       47                                                                                                 ___    39       97                                                                                                 ___    97       99                                                                                                 ___    27       65                                                                                                 ___    95       33                                                                                                 ___    27       77                                                                                                 ___    49       31                                                                                                 ___    97       35                                                                                                 ___    29       55                                                                                                 ___    31       89                                                                                                 ___    85       27                                                                                                 ___    93       31                                                                                                 ___    71       25                                                                                                 ___    75       25                                                                                                 ___    27       61                                                                                                 ___    31       49                                                                                                 ___    99       37                                                                                                 ___    67       25                                                                                                 ___    57       27                                                                                                 ___    27       81                                                                                                 ___    79       25                                                                                                 ___    91       29                                                                                                 ___    29       87                                                                                                 ___    41       99                                                                                                 ___    39       37                                                                                                 ___    37       39                                                                                                 ___    63       25                                                                                                ___    41       35                                                                                                ___    35       41                                                                                                ___    27       57                                                                                                ___    29       51                                                                                                ___    43       33                                                                                                ___    25       71                                                                                                ___    83       25                                                                                                ___    25       67                                                                                                ___    33       43                                                                                                ___    89       27                                                                                                ___    25       75                                                                                                ___    53       27                                                                                                ___    45       31                                                                                                ___    59       25                                                                                                ___    27       85                                                                                                ___    25       63                                                                                                ___    33       95                                                                                                ___    31       45                                                                                                ___    25       79                                                                                                ___    73       23                                                                                                ___    69       23                                                                                                ___    31       93                                                                                                ___    27       53                                                                                                ___    35       97                                                                                                ___    77       23                                                                                                ___    47       29                                                                                               ___    65       23                                                                                               ___    25       59                                                                                               ___    87       25                                                                                               ___    29       91                                                                                               ___    29       47                                                                                               ___    55       25                                                                                               ___    97       31                                                                                               ___    81       23                                                                                               ___    95       29                                                                                               ___    25       83                                                                                               ___    99       33                                                                                               ___    49       27                                                                                               ___    37       99                                                                                               ___    61       23                                                                                               ___    23       69                                                                                               ___    27       89                                                                                               ___    23       73                                                                                               ___    37       35                                                                                               ___    93       27                                                                                               ___    35       37                                                                                               ___    39       33                                                                                               ___    25       55                                                                                               ___    23       65                                                                                               ___    33       39                                                                                               ___    27       49                                                                                               ___    23       77                                                                                               ___    41       31                                                                                               ___    85       23                                                                                               ___    31       41                                                                                              ___    71       21                                                                                              ___    57       23                                                                                              ___    23       61                                                                                              ___    91       25                                                                                              ___    75       21                                                                                              ___    43       29                                                                                              ___    25       87                                                                                              ___    67       21                                                                                              ___    23       81                                                                                              ___    79       21                                                                                              ___    29       43                                                                                              ___    25       51                                                                                              ___    63       21                                                                                              ___    45       27                                                                                              ___    23       57                                                                                              ___    29       95                                                                                              ___    89       23                                                                                              ___    31       97                                                                                              ___    53       23                                                                                              ___    83       21                                                                                              ___    21       71                                                                                              ___    27       45                                                                                              ___    21       67                                                                                              ___    27       93                                                                                              ___    23       85                                                                                              ___    21       75                                                                                              ___    59       21                                                                                             ___    47       25                                                                                             ___    21       63                                                                                             ___    33       99                                                                                             ___    97       27                                                                                             ___    99       29                                                                                             ___    23       53                                                                                             ___    35       33                                                                                             ___    21       79                                                                                             ___    33       35                                                                                             ___    25       91                                                                                             ___    37       31                                                                                             ___    73       19                                                                                             ___    69       19                                                                                             ___    25       47                                                                                             ___    31       37                                                                                             ___    95       25                                                                                             ___    87       21                                                                                             ___    77       19                                                                                             ___    39       29                                                                                             ___    21       59                                                                                             ___    65       19                                                                                             ___    55       21                                                                                             ___    101       31                                                                                             ___    29       39                                                                                             ___    49       23                                                                                             ___    21       83                                                                                             ___    41       27                                                                                             ___    81       19                                                                                             ___    93       23                                                                                             ___    23       89                                                                                            ___    61       19                                                                                            ___    27       41                                                                                            ___    23       49                                                                                            ___    21       55                                                                                            ___    19       69                                                                                            ___    19       73                                                                                            ___    43       25                                                                                            ___    19       65                                                                                            ___    85       19                                                                                            ___    19       77                                                                                            ___    51       21                                                                                            ___    91       21                                                                                            ___    25       43                                                                                            ___    57       19                                                                                            ___    21       87                                                                                            ___    19       61                                                                                            ___    71       17                                                                                            ___    27       97                                                                                            ___    45       23                                                                                            ___    75       17                                                                                            ___    19       81                                                                                            ___    25       95                                                                                            ___    67       17                                                                                            ___    21       51                                                                                           ___    33       31                                                                                           ___    79       17                                                                                           ___    31       33                                                                                           ___    29       99                                                                                           ___    35       29                                                                                           ___    23       45                                                                                           ___    19       57                                                                                           ___    63       17                                                                                           ___    29       35                                                                                           ___    23       93                                                                                           ___    89       19                                                                                           ___    37       27                                                                                           ___    53       19                                                                                           ___    99       25                                                                                           ___    97       23                                                                                           ___    47       21                                                                                           ___    27       37                                                                                           ___    83       17                                                                                           ___    19       85                                                                                           ___    17       71                                                                                           ___    39       25                                                                                           ___    59       17                                                                                           ___    17       67                                                                                           ___    17       75                                                                                           ___    21       91                                                                                           ___    95       21                                                                                           ___    25       39                                                                                           ___    19       53                                                                                           ___    21       47                                                                                          ___    17       63                                                                                          ___    17       79                                                                                          ___    41       23                                                                                          ___    87       17                                                                                          ___    49       19                                                                                          ___    73       15                                                                                          ___    69       15                                                                                          ___    55       17                                                                                          ___    17       59                                                                                          ___    23       41                                                                                          ___    77       15                                                                                          ___    93       19                                                                                          ___    19       89                                                                                          ___    65       15                                                                                          ___    17       83                                                                                          ___    43       21                                                                                          ___    19       49                                                                                          ___    81       15                                                                                         ___    31       29                                                                                         ___    61       15                                                                                         ___    29       31                                                                                         ___    17       55                                                                                         ___    33       27                                                                                         ___    21       43                                                                                         ___    23       97                                                                                         ___    27       33                                                                                         ___    51       17                                                                                         ___    91       17                                                                                         ___    15       69                                                                                         ___    15       73                                                                                         ___    35       25                                                                                         ___    25       99                                                                                         ___    85       15                                                                                         ___    45       19                                                                                         ___    21       95                                                                                         ___    15       65                                                                                         ___    25       35                                                                                         ___    15       77                                                                                         ___    17       87                                                                                         ___    57       15                                                                                         ___    37       23                                                                                         ___    15       61                                                                                         ___    99       21                                                                                         ___    17       51                                                                                         ___    19       45                                                                                         ___    23       37                                                                                        ___    19       93                                                                                        ___    101       23                                                                                        ___    71       13                                                                                        ___    15       81                                                                                        ___    75       13                                                                                        ___    97       19                                                                                        ___    67       13                                                                                        ___    39       21                                                                                        ___    89       15                                                                                        ___    79       13                                                                                        ___    47       17                                                                                        ___    15       57                                                                                        ___    53       15                                                                                        ___    63       13                                                                                        ___    21       39                                                                                        ___    95       17                                                                                        ___    15       85                                                                                        ___    17       91                                                                                        ___    83       13                                                                                        ___    41       19                                                                                        ___    17       47                                                                                       ___    59       13                                                                                       ___    13       71                                                                                       ___    15       53                                                                                       ___    13       67                                                                                       ___    29       27                                                                                       ___    27       29                                                                                       ___    13       75                                                                                       ___    19       41                                                                                       ___    31       25                                                                                       ___    25       31                                                                                       ___    49       15                                                                                       ___    13       63                                                                                       ___    33       23                                                                                       ___    13       79                                                                                       ___    93       15                                                                                       ___    87       13                                                                                       ___    43       17                                                                                       ___    23       33                                                                                       ___    55       13                                                                                       ___    15       89                                                                                       ___    13       59                                                                                       ___    35       21                                                                                       ___    73       11                                                                                       ___    69       11                                                                                       ___    21       99                                                                                       ___    19       97                                                                                       ___    15       49                                                                                       ___    77       11                                                                                      ___    17       43                                                                                      ___    21       35                                                                                      ___    13       83                                                                                      ___    65       11                                                                                      ___    81       11                                                                                      ___    37       19                                                                                      ___    17       95                                                                                      ___    13       55                                                                                      ___    45       15                                                                                      ___    61       11                                                                                      ___    51       13                                                                                      ___    91       13                                                                                      ___    101       19                                                                                      ___    19       37                                                                                      ___    99       17                                                                                      ___    13       87                                                                                      ___    85       11                                                                                      ___    11       69                                                                                      ___    11       73                                                                                     ___    39       17                                                                                     ___    15       45                                                                                     ___    11       65                                                                                     ___    57       11                                                                                     ___    15       93                                                                                     ___    97       15                                                                                     ___    11       77                                                                                     ___    13       51                                                                                     ___    27       25                                                                                     ___    25       27                                                                                     ___    17       39                                                                                     ___    29       23                                                                                     ___    11       61                                                                                     ___    23       29                                                                                     ___    47       13                                                                                     ___    11       81                                                                                     ___    31       21                                                                                     ___    71       9                                                                                     ___    89       11                                                                                     ___    41       15                                                                                     ___    75       9                                                                                     ___    53       11                                                                                     ___    21       31                                                                                     ___    67       9                                                                                     ___    95       13                                                                                     ___    11       57                                                                                    ___    79       9                                                                                    ___    33       19                                                                                    ___    13       91                                                                                    ___    13       47                                                                                    ___    63       9                                                                                    ___    15       41                                                                                    ___    11       85                                                                                    ___    19       33                                                                                    ___    2       48                                                                                    ___    83       9                                                                                    ___    35       17                                                                                    ___    11       53                                                                                    ___    59       9                                                                                    ___    43       13                                                                                    ___    49       11                                                                                    ___    17       99                                                                                    ___    9       71                                                                                   ___    93       11                                                                                   ___    17       35                                                                                   ___    9       67                                                                                   ___    15       97                                                                                   ___    9       75                                                                                   ___    87       9                                                                                   ___    9       63                                                                                   ___    37       15                                                                                   ___    11       89                                                                                   ___    13       43                                                                                   ___    55       9                                                                                   ___    9       79                                                                                   ___    11       49                                                                                   ___    101       15                                                                                   ___    25       23                                                                                   ___    9       59                                                                                   ___    13       95                                                                                   ___    23       25                                                                                   ___    15       37                                                                                   ___    27       21                                                                                   ___    73       7                                                                                   ___    99       13                                                                                   ___    21       27                                                                                   ___    45       11                                                                                   ___    69       7                                                                                  ___    9       83                                                                                  ___    77       7                                                                                  ___    29       19                                                                                  ___    65       7                                                                                  ___    39       13                                                                                  ___    51       9                                                                                  ___    19       29                                                                                  ___    91       9                                                                                  ___    9       55                                                                                  ___    81       7                                                                                  ___    31       17                                                                                  ___    61       7                                                                                  ___    97       11                                                                                  ___    11       45                                                                                  ___    11       93                                                                                  ___    13       39                                                                                  ___    17       31                                                                                  ___    9       87                                                                                  ___    2       44                                                                                 ___    85       7                                                                                 ___    33       15                                                                                 ___    9       51                                                                                 ___    57       7                                                                                 ___    7       69                                                                                 ___    7       73                                                                                 ___    41       11                                                                                 ___    47       9                                                                                 ___    7       65                                                                                 ___    15       33                                                                                 ___    7       77                                                                                 ___    95       9                                                                                 ___    7       61                                                                                 ___    35       13                                                                                 ___    89       7                                                                                 ___    11       41                                                                                 ___    7       81                                                                                 ___    53       7                                                                                ___    9       91                                                                                ___    9       47                                                                                ___    13       99                                                                                ___    23       21                                                                                ___    21       23                                                                                ___    7       57                                                                                ___    71       5                                                                                ___    25       19                                                                                ___    13       35                                                                                ___    75       5                                                                                ___    67       5                                                                                ___    19       25                                                                                ___    43       9                                                                                ___    79       5                                                                                ___    27       17                                                                                ___    7       85                                                                                ___    11       97                                                                                ___    63       5                                                                                ___    37       11                                                                                ___    17       27                                                                                ___    49       7                                                                                ___    7       53                                                                               ___    83       5                                                                               ___    29       15                                                                               ___    93       7                                                                               ___    101       11                                                                               ___    59       5                                                                               ___    9       43                                                                               ___    15       29                                                                               ___    11       37                                                                               ___    2       40                                                                               ___    7       89                                                                               ___    9       95                                                                               ___    99       9                                                                               ___    31       13                                                                               ___    5       71                                                                               ___    87       5                                                                               ___    5       67                                                                               ___    5       75                                                                               ___    7       49                                                                               ___    55       5                                                                               ___    39       9                                                                              ___    45       7                                                                              ___    5       63                                                                              ___    13       31                                                                              ___    5       79                                                                              ___    5       59                                                                              ___    33       11                                                                              ___    9       39                                                                              ___    97       7                                                                              ___    5       83                                                                              ___    51       5                                                                              ___    91       5                                                                              ___    21       19                                                                              ___    19       21                                                                              ___    7       45                                                                             ___    73       3                                                                             ___    23       17                                                                             _
33203613457708387768729600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 73657900622271849909264702396098268321941341220621057865566700699648000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 64774299327051375737287610129914889277188674674447587560955618682470400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 57969313434104232399699268734642402438852308879279146879608035097968640*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 57358514228299748320432076219405447098460425532411066830256501717729280*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 53567934882424944248894251470910753945801615095654089866136572762521600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 43970646689530559014138470797882336014111619051308898409726433296384000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 43337967719102016531861135689812453194191441112891157508971185234247680*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 43182866218034250491525073419943259518125783116298391707303745788313600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 41708326773832597965878971325119110826795562154255044295616094514708480*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 40506650247751209548907423120980644750760786991750636540269353657958400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 39774244891484862530114126188011412001269500389118332623425653950119936*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 30278070004482204937441072103981871555027012788627102252465641645670400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 29441742751216003898713121301707060465331171396028062951733186265088000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 29097101930983320158508968435098916677334877643761342141434544028385280*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 25879802921338758076228138679710202383384795564001993304118029975552000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 23948896861015351705436010618145966953692824955203757193041295704064000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 23104721890185555831500529078798795879785550196801984974123566842773504*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 22477897045877151338658900121596033598738650381761301851276585037987840*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 21102519802167402279867432397631509130164272613439489947265922603417600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 20253325123875604774453711560490322375380393495875318270134676828979200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 15300901726351788447002074304997075868986772277947435248758624668876800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 14445989239700672177287045229937484398063813704297052502990395078082560*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 13258081630494954176704708729337137333756500129706110874475217983373312*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 13035038355059502577530175972912880445294520001609811123020068489789440*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 12977117889644055793088093754411313324615917183964217182154012252700672*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 11242725424617055645665342993010805020130266554665355703938455112253440*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 10484811207113353541724314674017889113265574164968422964705895938785280*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 10043085780425792650666714130190244206387313690891898177726994972672000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 9436330086402018187551883206616100201939016748471580668235306344906752*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 7650994046955337908959232834566451168134027545340494634535692009472000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 7062529142973082258273230855070390814093223986775461522363565421363200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 6415028864271035530728356151244304156267051123116359951838076731392000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 6193661847535273545347950389887127136108498489085162323195560198144000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 5544549869975927987592203118611025903835871403518094530944224460800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4851505425428615849049438194267365519434830234471138005703954163302400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4715755175870151251946910256610315260918738542679712692204124241920000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4361405521229524018423881618596988636541517916903676205013563080704000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4147512203882569001941419627745007414411892727784939902779112701296640*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4141207852862780897596777708934951739616327643305921678969650806784000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3454246311530557593469114850670009930297642912447270743297425932288000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3171931288166926558853732086252355372030194848657219058191682240512000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3165961339953450667501793141928106227007307304416586199680218981990400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3036746698609889098426976479926957637678839165900006439856649409658880*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2603334447691017680184344100567747634144176936003084205055960678400000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1980721081525292983454225232536185724474687483580633039818946143846400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1936342054068671474697170602807591710187048178380283880446860789284864*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1899623834871773395903271109597472279999418884252811888905729081344000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1848183289991975995864067706203675301278623801172698176981408153600000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1664384179718876912451850678803640680324260662122251538424985026560000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1656502449299186153422100890821320325082369203820480025416196853596160*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1376967714482058071790121400369075132118358127552376011315182829568000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1334093924326314174422777132567327841914222497531972769087675065958400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1307749848272457125556877171242616338826208729465027898621994991616000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1262831774392611831324241697483211984904596638074098182900126601707520*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 976250417884131630069129037712905362804066351001156576895985254400000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 944636460638322396726978148553050313409168588318882281313754152960000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 918086211207640890222109168350010448600579282713955435305498658734080*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 871060718387839561317667137642223113040368347864686723976916054835200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 666576180116977870739715676588753267630410010672257111003881652879360*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 662984455120990923454502896473999137686616876228921783225828769792000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 660240360508430994484741744178728574824895827860211013272982047948800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 569887150461532018770981332879241683999825665275843566671718724403200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 528670994457187070241096028985527763324160384198025540026445804339200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 507980514173762500814568530629944100734490503870131889187250503680000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 462848912521374305411983903135603536990648621592725246418172982067200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 388836105068237091264834144676772739451072506225483314752264297512960*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 382206889107286121107711077435226674243258301528110371552037521326080*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 377854584255328958690791259421220125363667435327552912525501661184000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 313427537836930162580256033671303499279221848100365148892136734720000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 304437579669832404289830463326734308497892607496946697128205227130880*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 294701305754448451792613236367255589392386868559221716946622873600000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 277922293500265694017732204906723544576305695127135291175318354657280*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 265105436031081605618420433195459208316633845002295959471235321036800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 258737783722422717571729616361632441660633463406342046229689951846400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 231502227541115063090494919902513237275303625153042883468669956915200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 226529068918674742521593731605080350525350842684330235779623157760000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 214322431443919556229746128446197246784184980656302023943252869120000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 186720688050695746587695563224538391603270910332714452390454388326400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 176846741663688006522781710115383519983578166096721274347968601784320*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 173392882062426309567620536486140447734838700213702131757483032576000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 149376550440556597270156450579630713282616728266171561912363510661120*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 145137289763932143089876723037126885924140143962894825482071572480000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 104255303496973835242960974888597796137210924793650696118947891118080*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 98505797605892336810937610582409671202041152260114761080385830912000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 97083886679432032509254456402177293082293218293284386762695639040000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 95818250543320348678127042955787323599135617114602134668365004800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 87948634126840472350395467183278800232724531054673490281481510060032*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 87613901710781972154560691892967877927466366328417267200347340800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 74468073926409882316400696348998425812293517709750497227819922227200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 72897044900788183207290882241947290610300079162859437921262370816000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 71440810481306518743248709482065748928061660218767341314417623040000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 61218086313648294949944284041953008883265565836926822817474805760000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 48905684684274087313944253880706280130339120573095473059802906624000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 44882137861553824319632206674893461358182516109162144096922999193600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 35875356437068437356376745098559150600883166871463606163918028800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 34000024386339478563206370081085824502919089943891080043613388800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 28561360457352433657947767884023111773388873887648637152587363123200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 28256799919351514782676304250504291227863312313144607248733962240000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 20383107283553553023412871841232039449436172707634948521030592757760*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 19881012245669504511079331520531079257354567044416210342162464768000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 18178862265545379959167512575642709054655339526809299271084803096576*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 16557856817108509549096959276258069508099923171444741306423705600000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 16424364620734908401204564011255685310144420102590123194932264960000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 15478243725925864542915812930422646399264388801435285962014851072000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 14821030291382884492772895766844425568893685909266319819721010053120*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 13164568752310904582594542976760511234374347350387407279151172812800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 12679099194910366989347795036375181964576833538533023843187739852800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 12149860500575344649137962898758667383348635645248293181813948416000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 11560654330737681225794283295277111492529187037034658407085831618560*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 10718096521133333193428942991570593224361946049813471715037020160000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 8377104077738152104610767172564240538939909426976615550277092638720*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 7267505212580063542885361604832094987498955475506718359322361856000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 6806601654726092726646822104935346132215420905775371270855485030400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 5945072957703119631828754287026011506085550373060193318633922887680*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 5564957836391442844643116094584502771833267202084479368699429519360*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 5509173897319598313892119215760376026107433572758887016798617600000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 5327744921141516800405834249729382398297367947197458285290586112000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 5303016726919783550038923605134179394512879640623786026563755048960*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4949430260774745229284579632836833816233395181198983306209027686400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4871313038751798583746647198648462437562285706236346280213217280000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4399493565133106870475181895854963392207462383287985161074691276800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 4299512146090517928587725814006290666462330222620912767226347520000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3871931985973795465468983228458973892463043338349237435044462592000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3727755332067942825512910020844046459526280000490126894121877504000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3525657712261584283394996970202464040210829611251254256316654288896*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3506984883698612145989815648359092883819124170232538509817885491200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3108103848984390491639943997356868400391511444133284302324498432000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3042277455457284533103758761915029340139259746588068001864692531200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2783413983364408644785523923844050558061181272040463886565779701760*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2637060485167826236764625316972654642256679649925505233617053286400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2271095378931269857151675501510029683593423586095849487288238080000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2244478254463540053807900421235708751377102566679546562399436800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2178112529512349672526983073579310762308934689848118806673755209728*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi) - 1921496091547338326263030120637133860477799317640914522653599989760*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1863877666033971412756455010422023229763140000245063447060938752000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1418085577871584787110026588501940419925571693496222534285341491200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1345047264083136828384121084445993702334459522348640165857519992832*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1325754181729945887509730901283544848628219910155946506640938762240*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1270777314456990934890429703995251070668422358148612073099100160000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1218038411242684408602052077798381720798576702042530761005858816000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 879020161722608745588208438990884880752226549975168411205684428800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 797984533734227518487613036256687100923542234748698845927335526400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 707554318632724287835727986559224609581100542080316267848269824000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 632381748195102410160375943683160940700498648161962243956041318400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 592373511594962830527742064465064359556507807682454284866158592000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 556981203904968588482576949159382657194426918021575769807912960000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 493990425644997987635189022444615824381240431034908809383588659200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 405066294443021794600194535341032673683937870375374458749714432000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 337639423302758282645244425833795338077517069880052984353652736000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 327710038313003424578117048469439173000295858842298236307872153600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 311323900198398686647720314086058828215684238515339157853238722560*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 297742722748211744324946063461826642861874304943729741579209932800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 250998511075890071993538071330364823706166849483968995173335040000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 225850624355393717914419979886843193107320945772129372841443328000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 203500420112383153310391160861425995698047667398209433415125565440*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 181095107152849408479872705462377085605538714136346273020641280000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 152324617267276156421419388005302263885959150546916816108440780800*\/ 3 *cos  (t)*sin  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3192693276303131336318694479721082433626296202096508644884480000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 3001654445754880505295253137920509666489778879482257552388915200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2956266582470747879480547243820394133766519541142801572954112000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2302074973708204952698431931866257308712688242931250650257817600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2240769831388617300618842172052550684953098576058256122183680000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1748937655096004204590322208341369060653700806370033972281344000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1672363144730211652357411394139614608089964677288647385415680000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1337267424761879435076051628172986776324346441018373682128486400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1308051613250923584224366258238610750198800844852137496191959040*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 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460414994741640990539686386373251461742537648586250130051563520*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 455394436743569594951414903855241788373026062426593275412480000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 428186164074280498951037744830126371214460160311067829862400000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 424927134562569519678064404818688498615054169789287399791001600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 391719337380329298765728671293795559357868395388318571823104000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 333130981923048419921966134922165535362609677403815994720256000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 318495903871518770420551934774501391997894567835111981580288000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 318217007300857326199881295344643400482708723385433870575861760*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 311399705407174384305942100174142247527612606935503816622080000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 284839284052219624062636550768287736611049226717230912241664000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 251931130260944683081259224724924749067161018036629415133184000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 250978892329326426919086066987541402820100555674882117782732800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 222834879657938398861102642371813306928721102085087232524288000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 189892856034813082708424367178858491074032817811487274827776000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 139219095223955837355118569960103215625508354199758517043200000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 124974769681239990652874342796128974170921442664873390505984000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 123516079873326302500866837577554197320598501325588702167040000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 112072638848878370145503847408042821359490639165459825845862400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 107969026945574738004739928525129906516174118876081423384576000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 95875932851069608114479335595503320931338936698172977709056000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 94012640971279031703774881110510934245888414893196457237544960*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi) - 91078887348713918990282980771048357674605212485318655082496000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 88946798126677790304934466084496855038678148024761151651840000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 81008193203242256558304438211104989148681651950742562406400000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 66295209854345276291641936530134041767230984038632056369971200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 66054482965158202731563475794515022202826916622682627768320000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 62508384021122216739586274409285735351469226717731350380544000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 45632525878059350348924739452280255058200101031796748687769600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 45218407995554173886379860848063416499234028878369382203392000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 43854510853908927448240635942277625749365902282136453591859200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 41055708034639169022917835288500035934815586675471847260160000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 38004947653331170000266719254632060714030308100181139128320000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 31436569889280350370510644829700726108985757399945471590400000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 29998013908598171514161066882379337032613741398865112475893760*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 18359221184247371766602425965096380603873413410288442540032000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 17653135768980030028264603304968956298285025744777058975744000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 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(t)*sin(0.134872*pi) - 1142134360345591138008348174859727709733600831419187200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1114871936744524319961423654483271668724320083902464000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 1037429130333037939705739389074226020050621473751040000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 915633364606201817401898192985777665588386968109056000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 700685242351962651709362900890943465974730557541580800*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 609650477781364443822988386125559149374170017562624000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 600296560113737562956484670230197463594283056537600000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 543301011715982154125779305073015128328021507636992000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 514598138381639589429819965409386735548950418292736000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 489255363913712944859762086042538319839543140181606400*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 452750843096651795104816087560845940273351256364160000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 443308228729934687168671816409459593673165291433984000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 435157852707390435962233183376643424121989638389760000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 354829873772134623507574065602198583806822279282688000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 335129206124489804978453697289354405463353379741798400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 271936752463235985240082898776125645174666864623616000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 242903150263132826810798432585579006066289554541772800*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 232012527316954480369698713508014588397706185975091200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 221266937977319846365129070047451763869685113054822400*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 199152489408579051648842872801015988795562205737123840*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 168870205698619672957296457789093701512208958095360000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 147769409576644895722890605469819864557721763811328000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 139785325366249394782126906893238674427353631205299200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 116780873725327108618227150148490577662455092923596800*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 100330208646161868872566753669434248759733796208640000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 81575995371550559997177340571946707467633176870912000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 79877328780713939875501089653279242529916360688742400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 79620292574452331947991147216154579616381475487744000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 73158057333763733258758606335067097924900402107514880*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi) - 53234290177410992009981375732005524367132801892352000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 47178781034867112707223684578702620779797697527808000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 38837919535467209191143905491317134763205861441536000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 38624172401054569740902096997276639672985292258672640*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 23754901491726644173345834782580609312535388914712576*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi) - 22182281811520864667181146191077197307436127905382400*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 21426121864055199656097780237021462858440033225932800*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 20321682592712148127432946204185304979139000585420800*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 18124362449884697622533822562614662889496068672716800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 17600007589325568929899011931886408614217043148800000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 15437228230975803234776446747496634688582682306150400*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 14969173121546173990898482544151304826571058053120000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 13145393467202419419692460747836103437018436993024000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 12885611117022960198512877036514071882925021436313600*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 11147800960684652096951861518826027639970421800960000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 10164255895014360458132130788757010440259287436492800*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 8577960188157656855858851741582294687235945005056000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 8263737744523799243274294380132504280731379302400000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 7017543195634425170015157654604742550231019991040000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 6029956388642258942099046208142695323629135069184000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 2998549795072958623443580995334812477084464578560000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 2631578698362909438755684120476778456336632496640000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 2019820081701571629500615733663252074666909682892800*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 1785510155337933304674815019751788571536669435494400*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 1612477318150001656570711739468073095651634708480000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 1546273334042755223821545244381688625951002572357632*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 1478818787434724311145409746071813153829075193692160*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 1263905648051970884506036083023736065927025654194400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1134551813050844944457080757217314604741675423360000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1079906991170711035727553555263029953399113750937600*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 977778199406976051661056218438133811900946841600000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 928269665223418590919429710450530131152279891840000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 923839138922175178065552996020182377025392082944000*\/ 
                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                              

                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                              
__    7       93                                                                             ___    69       3                                                                             ___    11       33                                                                             ___    5       55                                                                             ___    77       3                                                                             ___    17       23                                                                             ___    65       3                                                                             ___    25       15                                                                             ___    41       7                                                                             ___    81       3                                                                             ___    15       25                                                                             ___    35       9                                                                             ___    5       87                                                                             ___    61       3                                                                             ___    47       5                                                                             ___    27       13                                                                             ___    5       51                                                                            ___    85       3                                                                            ___    9       99                                                                            ___    13       27                                                                            ___    95       5                                                                            ___    7       41                                                                            ___    9       35                                                                            ___    57       3                                                                            ___    2       36                                                                            ___    29       11                                                                            ___    3       69                                                                            ___    3       73                                                                            ___    5       91                                                                            ___    3       65                                                                            ___    37       7                                                                            ___    5       47                                                                            ___    3       77                                                                            ___    89       3                                                                            ___    7       97                                                                           ___    11       29                                                                           ___    53       3                                                                           ___    43       5                                                                           ___    3       61                                                                           ___    101       7                                                                           ___    3       81                                                                           ___    31       9                                                                           ___    7       37                                                                           ___    3       57                                                                           ___    19       17                                                                           ___    17       19                                                                           ___    21       15                                                                          ___    49       3                                                                          ___    15       21                                                                          ___    9       31                                                                          ___    3       85                                                                          ___    5       43                                                                          ___    93       3                                                                          ___    99       5                                                                          ___    71                                                                                 ___    23       13                                                                          ___    75                                                                                 ___    67                                                                                 ___    3       53                                                                          ___    5       95                                                                          ___    39       5                                                                          ___    13       23                                                                          ___    79                                                                                 ___    33       7                                                                          ___    63                                                                                 ___    25       11                                                                         ___    83                                                                                ___    3       89                                                                         ___    45       3                                                                         ___    59                                                                                ___    11       25                                                                         ___    3       49                                                                         ___    7       33                                                                         ___    5       39                                                                         ___    2       32                                                                         ___    27       9                                                                         ___    87                                                                                ___    97       3                                                                         ___    55                                                                               ___    9       27                                                                        ___    35       5                                                                        ___    71                                                                               ___    3       45                                                                        ___    67                                                                               ___    41       3                                                                        ___    3       93                                                                        ___    29       7                                                                        ___    63                                                                               ___    51                                                                               ___    91                                                                               ___    17       15                                                                        ___    15       17                                                                        ___    5       99                                                                        ___    19       13                                                                       ___    5       35                                                                       ___    59                                                                              ___    7       29                                                                       ___    83                                                                              ___    11       21                                                                       ___    3       41                                                                       ___    55                                                                              ___    47                                                                              ___    37       3                                                                      ___    23       9                                                                      ___    31       5                                                                      ___    95                                                                             ___    101       3                                                                      ___    9       23                                                                      ___    3       97                                                                      ___    51                                                                             ___  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13                                                                                 ___    7       67                                                                                 ___    11       43                                                                                 ___    7       71                                                                                 ___    27       19                                                                                 ___    21       25                                                                                 ___    37       13                                                                                  ___    25       21                                                                                  ___    93       9                                                                                  ___    23       23                                                                                  ___    59       7         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                                       ___    19       43                                                                                        ___    81       13                                                                                        ___    25       33                                                                                        ___    17       49                                                                                        ___    15       83                                                                                        ___    65       13                                                                                        ___    33       25                                                                                        ___    77       13                                                                                        ___    27       31                                                                                        ___    17       89                                                                                        ___    43       19                                                                                        ___    31       27                                                                                        ___    15       59                                                                                        ___    69       13                                                                                        ___    29       29                                                                                        ___    73       13                                                                                        ___    55       15                                                                                         ___    93       17                                                                                         ___    87       15                                  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                 ___    59       15                                                                                         ___    15       71                                                                                         ___    95       19                                                                                         ___    19       91                                                                                         ___    23       39                                                                                         ___    83       15                                                                                         ___    17       85                                                                                          ___    39       23                                                                                          ___    47       19                                                                                          ___    53       17                                                                                          ___    63       15                                                                                          ___    97       21                                                                                          ___    89       17                                                                                          ___    17       57                                                                                          ___    25       37                                                                                          ___    79       15                                                                                          ___    99       23                                                                                          ___    21       93                                                                                         
3 *cos (t)*sin  (t)*sin(0.134872*pi) - 880539595385069058288146032008900283915944591360000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 795321562171901519268384534188537489026182265651200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 719068892095444305933192990597351943123092111360000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 691862814063285232615392670938742286158865104896000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 670058007971562755632085667518933213646599123040000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 516483609032737452704643398758281517545711206400000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 446705338647708503754723778345955475764399415360000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 403964016340314325900123146732650414933381936578560*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 301497819432112947104952310407134766181456753459200*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 257634706941003974258538365185574320905979197696000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 233918106521147505667171921820158085007700666368000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 231396339392804300808637885734884071578141720576000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 199903319671530574896238733022320831805630971904000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 140857433630962309007941768077786515660753967513600*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 138726380660540601523828350484540018949373414144000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 113878774719165018722717026977111070797909196800000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 76784634197619126503367225688955861697696890880000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 73629284756203435244322268855743858620068842700800*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 63188815433446997474395299794567944237356640344000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 58968455675883522004184233788522279384599494656000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 58143668819483022693715035170222176415786729472000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 53539641150958295551771958503557921941203537612800*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 51362063721103164709513785042667995937363722240000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 35188140867499201019170741563190550930573214934368*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi) - 27080920900048713203312271340529118958867131576000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 20589891890626386456134945578578596335630417920000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 19359715701392872209704347826793946776443289600000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 15462958844733860942212366806321130249471918080000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 14079412816184698128951032534254751498706616320000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 11897698033546287900393768556346204875823008358400*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 11832975385579766394514338894627882159001042944000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 11390641425154413021964962512453997508360667136000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 10518015426945650036756267533403821435370078208000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 10138436239011552905982552475921374350334649958400*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 9562366552293062869031643397483385453062049218560*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 8759905747628078363285925152085466984454553600000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 8306238402783288956245005024317453773683818496000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 6294556736946232653729989822205209904729292800000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 5890342780496274819545781508459508689605507416064*\/ 3 *cos   (t)*sin (t)*sin(0.134872*pi) - 4021579557584539777310288254063422251319951360000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 3187455517431020956343881132494461817687349739520*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 1966275743454566789618821081843451481208415846400*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 1856264639443420118395266635774694741654896640000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 1754416236334566709532768791842090716561318574000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1558786165560158732955579704150944095954349315500*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1247028932448126986364463763320755276763479452400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 986081282131647199542861574552323513250086912000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 872200687146792786406339404315968020117838400000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 847529371453432991547724354420862626839495168000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 798156779456926447376290913170983888277733376000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 796741990502515278441248571904332388566589440000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 672302558466689606183146382883527402150952960000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 620720586061931810570360355668655572469468364800*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 588282625446468184460998445102245609589440512000*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi) - 555036800911595409531306893655616012802260800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 523235559497104654316333725048485048011980800000*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi) - 426648873217718125119728258613780348445655040000*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi) - 361912344190663773463352000666014899083673600000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 361838322403890538613731697715502346932322304000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 310464591071773703624024381343702865453960396800*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 302894253631297840742778237932087034654424050000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 292067728850113154409358013139846089957965824000*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi) - 211882342863358247886931088605215656709873792000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 203050217320846214636451284587264835636428800000*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi) - 151447126815648920371389118966043517327212025000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 98087306282549750666104591562522493934632960000*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi) - 80016195702514892978277174539565335656267776000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 72431090045683207131022597445848398960599040000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 64009125498048969599836780543954991091548160000*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi) - 63432787693807796692443158094933071435184272160*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 46481132538434701519476337541677988080779264000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 40488155440770183056675711833031976151706112000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 34110153697327208253810617587842107844655104000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 33085394278568972939783652723323903264090326848*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi) - 24397226036079921804785830036512719782763181600*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 18561785568765731334332346817929857866924032000*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi) - 15076596766828772442238820738145931122180096000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 13404160895950510128272296320963514780876800000*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi) - 7631499448483936893042910603208688917555149800*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 7144968607194738186472184441123289909124608000*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 4225692098277447522184636718340074097050910720*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi) - 3895453582288844753265080871037224818049024000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 3594039164837016564441412375546531771085488128*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi) - 3411015369732720825381061758784210784465510400*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 3332483734799840049236832939979534038466560000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 2180428413852553398012260172345339690730042800*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi) - 1984090694963697297304752552252702108218818560*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi) - 1859245301537388060779053501667119523231170560*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi) - 1778137682278108732850603878657007459028172800*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi) - 1537971960920823664293510461435500185293931750*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1348729101016317390099716136531383991423435000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 1243430661181754428225882122733685041004544000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 1049011523012691303410890328413298659996005000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - 904162407881614361852678559942971267689704000*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 719939926788225359770367585914720882853412864*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi) - 486800058951729414902500478406202169632665600*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi) - 387149416122449377327901978263643000156454912*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi) - 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3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 814059466258623592416973790643893589345814432990416076800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 977440884780953036849673121682869600389843045356723503104000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1045505209269955319208999819799547835190848112128499384320000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1178094800048295284764490018117419188961680625420498422988800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1224181747974469239113449607584104495466700063704958474649600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1282191369694175327018617325581613058765659263830746726400000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1441589531899286867135160815775521895012014320993274167296000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1642483488134675105062710311219402152702863528866328084480000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2343216387989467186000572787650459103389106711576288061030400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 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28018241409903503946054356816616509337183616627799762770329600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 38326407510418515675546980485556581475254249185154317680640000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 41995467156930942850294724776368427089003490450700158736793600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 42813651287539882609310213178491286674509199666341100912640000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 47996905813097677797833216659632358612826468887416746803200000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 53115891820321189959758050602336062326881771223660924973875200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 64294923868678590994696364643340170334848384811431465320448000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 65373405317318387642779139202875153633085256890659599967846400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 72294226391082791002229081604174336665238362308801590617702400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 73165887581946759790636748493608139103935954631378323111936000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 76905944511758144232069407862254155094511579131883652474994688*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 79615920081199744487458432195934026435837590057986901934080000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 81828687852360161592832365536488758848278120592278479175680000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 82399226262598011677217222709558023315548120498446770508922880*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 90865087143669989602981847013369840403068580531127766220800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 96884730286060173417870714074701437795096131341342275010560000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 104489786193157893218514588402911822421263919292149456175104000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 134163831844248228214810985117764067866966195660305648215654400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 153257519313926411348372860713172341049645732975338563882188800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 153648363922088195560337171836577092118265504725894478535065600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 160104236628020022548882038952094339069620666444570072973312000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 219414426574160812790094704729747925087206714913905128243200000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 326985964715453085285313660002117352558449443277030178160640000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 342834444669693388733269335798620994658442758844172714010214400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 349029586715683779685494550920989496103462660404913668882432000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 397453626711463642022328632605802542977350871448209755996160000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 408686718170470430262327628568459576132388621267569503685836800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 462655358128278635747915468009717646327508059501524127055872000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 467306162453159946529620927497330607787209842731514226278400000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 519426386487653711151008987246411048897892246075880029290496000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 534058907209473676450185674059327092375348920826541664894976000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 623335353944897070424126065088401808469895925171223116382208000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 708971064092641509064697158936916395771707774987608399020032000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 721130596162834226654609045007981864784943301674142859159142400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1175552929535571174889136338495579165226444983094726344310784000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1240749260299481818681802319817188031435276229479392763025817600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1361471360051687207656613648592407351461438684294724337008640000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1467638719973831214440411247192313898916649359757454302248960000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1515319082385034886666101406403063811822422492311589859885056000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1634718132925773197793833313319922078261403619315542350050099200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1677125673215010054586193571535226467937216715693024960577536000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1861292138431321026907799202618000344941871223233316711825408000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2111053676135300575152705503592446358849954376778730586295500800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2350316024281975792594372027762773356147210372329911430938624000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2441304016491972442409742240058131929820093556556636137665331200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2853723298688808182968145335579532472301135327802603354959380480*\
                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                              

                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                                              
 ___    21       45                                                                                          ___    37       25                                                                                          ___    67       15                                                                                          ___    17       81                                                                                          ___    75       15                                                                                          ___    19       51                                                                                          ___    27       35                                                                                          ___    71       15                                                                                          ___    35       27                                                                                          ___    27       99                                                                                          ___    17       61                                                                                          ___    23       95                                                                                          ___    29       33                                                                                          ___    45       21                                                                                          ___    57       17                                                                                          ___    19       87                                                                                          ___    33       29                                                                                          ___    31       31                                                                                          ___    25       97                                                                                           ___    17       77                                                                                           ___    85       17                                                                                           ___    17       65                                                                                           ___    91       19                                                                                           ___    51       19                                                                                           ___    23       43                                                                                           ___    17       73                                                                                           ___    17       69                                                                                           ___    19       55                                                                                           ___    61       17                                                                                           ___    43       23                                                                                           ___    21       49                                                                                           ___    81       17                                                                                           ___    25       41                                                                                           ___    19       83                                                                                           ___    21       89                                                                                           ___    93       21                                                                                           ___    65       17                                                                                           ___    55       19                                                                                           ___    49       21                                                                                            ___    41       25                                                                                            ___    19       59                                                                                            ___    77       17                                                                                            ___    87       19                                                                                            ___    69       17                                                                                            ___    73       17                                                                                            ___    27       39                                                                                            ___    19       79                                                                                            ___    23       47                                                                                            ___    95       23                                                                                            ___    39       27                                                                                            ___    21       53                                                                                            ___    23       91                                                                                            ___    19       63                                                                                            ___    29       37                                                                                            ___    97       25                                                                                            ___    37       29                                                                                            ___    19       75                                                                                            ___    59       19                                                                                            ___    99       27                                                                                            ___    19       67                                                                                            ___    47       23                                                                                            ___    31       35                                                                                            ___    21       85                                                                                            ___    19       71                                                                                            ___    35       31                                                                                            ___    33       33                                                                                            ___    83       19                                                                                            ___    31       99                                                                                            ___    25       93                                                                                            ___    53       21                                                                                             ___    25       45                                                                                             ___    89       21                                                                                             ___    21       57                                                                                             ___    63       19                                                                                             ___    27       95                                                                                             ___    29       97                                                                                             ___    23       51                                                                                             ___    79       19                                                                                             ___    45       25                                                                                             ___    21       81                                                                                             ___    67       19                                                                                             ___    27       43                                                                                             ___    75       19                                                                                             ___    23       87                                                                                             ___    71       19                                                                                             ___    21       61                                                                                             ___    57       21                                                                                             ___    91       23                                                                                             ___    51       23                                                                                             ___    43       27                                                                                             ___    85       21                                                                                             ___    21       77                                                                                             ___    29       41                                                                                              ___    21       65                                                                                              ___    25       49                                                                                              ___    23       55                                                                                              ___    21       73                                                                                              ___    21       69                                                                                              ___    41       29                                                                                              ___    101       33                                                                                              ___    93       25                                                                                              ___    61       21                                                                                              ___    31       39                                                                                              ___    25       89                                                                                              ___    39       31                                                                                              ___    49       25                                                                                              ___    23       83                                                                                              ___    81       21                                                                                              ___    33       37                                                                                              ___    37       33                                                                                              ___    35       35                                                                                              ___    55       23                                                                                              ___    95       27                                                                                              ___    65       21                                                                                              ___    27       47                                                                                              ___    35       99                                                                                              ___    99       31                                                                                              ___    23       59                                                                                              ___    87       23                                                                                              ___    97       29                                                                                              ___    77       21                                                                                              ___    27       91                                                                                              ___    69       21                                                                                              ___    25       53                                                                                              ___    73       21                                                                                               ___    23       79                                                                                               ___    47       27                                                                                               ___    23       63                                                                                               ___    29       93                                                                                               ___    33       97                                                                                               ___    29       45                                                                                               ___    59       23                                                                                               ___    25       85                                                                                               ___    31       95                                                                                               ___    23       75                                                                                               ___    53       25                                                                                               ___    23       67                                                                                               ___    83       23                                                                                               ___    89       25                                                                                               ___    23       71                                                                                               ___    45       29                                                                                               ___    31       43                                                                                               ___    25       57                                                                                               ___    27       51                                                                                               ___    63       23                                                                                               ___    43       31                                                                                               ___    79       23                                                                                               ___    33       41                                                                                                ___    25       81                                                                                                ___    27       87                                                                                                ___    91       27                                                                                                ___    41       33                                                                                                ___    67       23                                                                                                ___    35       39                                                                                                ___    57       25                                                                                                ___    75       23                                                                                                ___    25       61                                                                                                ___    39       35                                                                                                ___    37       37                                                                                                ___    71       23                                                                                                ___    29       49                                                                                                ___    85       25                                                                                                ___    39       99                                                                                                ___    25       77                                                                                                ___    93       29                                                                                                ___    27       55                                                                                                ___    99       35                                                                                                ___    25       65                                                                                                ___    29       89                                                                                                ___    49       29                                                                                                ___    99       99                                                                                                ___    25       73                                                                                                ___    95       31                                                                                                ___    25       69                                                                                                ___    97       33                                                                                                ___    61       25                                                                                                ___    31       47                                                                                                ___    27       83                                                                                                ___    55       27                                                                                                ___    81       25                                                                                                ___    31       91                                                                                                ___    37       97                                                                                                 ___    87       27                                                                                                 ___    47       31                                                                                                 ___    27       59                                                                                                 ___    33       93                                                                                                 ___    65       25                                                                                                 ___    35       95                                                                                                 ___    29       53                                                                                                 ___    33       45                                                                                                 ___    77       25                                                                                                 ___    69       25                                                                                                 ___    101       41                                                                                                 ___    45       33                                                                                                 ___    27       79                                                                                                 ___    73       25                                                                                                 ___    35       43                                                                                                 ___    29       85                                                                                                 ___    27       63                                                                                                 ___    53       29                                                                                                 ___    59       27                                                                                                 ___    43       35                                                                                                 ___    89       29                                                                                                 ___    37       41                                                                                                 ___    27       75                                                                                                 ___    41       37                                                                                                 ___    43       99                                                                                                 ___    83       27                                                                                                 ___    39       39                                                                                                 ___    31       51                                                                                                 ___    27       67                                                                                                 ___    27       71                                                                                                 ___    29       57                                                                                                  ___    91       31                                                                                                  ___    99       39                                                                                                  ___    63       27                                                                                                  ___    51       31                                                                                                  ___    31       87                                                                                                  ___    29       81                                                                                                  ___    79       27                                                                                                  ___    33       49                                                                                                  ___    57       29                                                                                                  ___    93       33                                                                                                  ___    97       37                                                                                                  ___    67       27                                                                                                  ___    29       61                                                                                                  ___    41       97                                                                                                  ___    95       35                                                                                                  ___    85       29                                                                                                  ___    75       27                                                                                                  ___    33       89                                                                                                  ___    49       33                                                                                                  ___    71       27                                                                                                  ___    101       93                                                                                                  ___    31       55                                                                                                  ___    95       99                                                                                                  ___    35       47                                                                                                  ___    29       77                                                                                                  ___    29       65                                                                                                  ___    35       91                                                                                                  ___    39       95                                                                                                  ___    47       35                                                                                                  ___    37       93                                                                                                  ___    61       29                                                                                                  ___    29       73                                                                                                  ___    31       83                                                                                                  ___    29       69                                                                                                  ___    55       31                                                                                                  ___    37       45                                                                                                   ___    47       99                                                                                                   ___    45       37                                                                                                   ___    81       29                                                                                                   ___    87       31                                                                                                   ___    99       95                                                                                                   ___    97       97                                                                                                   ___    39       43                                                                                                   ___    33       53                                                                                                   ___    43       39                                                                                                   ___    31       59                                                                                                   ___    41       41                                                                                                   ___    65       29                                                                                                   ___    99       43                                                                                                   ___    77       29                                                                                                   ___    53       33                                                                                                   ___    31       79                                                                                                   ___    33       85                                                                                                   ___    89       33                                                                                                   ___    69       29                                                                                                   ___    73       29                                                                                                   ___    59       31                                                                                                   ___    31       63                                                                                                   ___    35       51                                                                                                   ___    45       97                                                                                                   ___    83       31                                                                                                   ___    31       75                                                                                                   ___    97       41                                                                                                   ___    91       35                                                                                                   ___    33       57                                                                                                   ___    31       67                                                                                                    ___    35       87                                                                                                    ___    31       71                                                                                                    ___    91       99                                                                                                    ___    37       49                                                                                                    ___    93       37                                                                                                    ___    95       39                                                                                                    ___    63       31                                                                                                    ___    49       37                                                                                                    ___    33       81                                                                                                    ___    43       95                                                                                                    ___    57       33                                                                                                    ___    37       89                                                                                                    ___    79       31                                                                                                    ___    39       47                                                                                                    ___    85       33                                                                                                    ___    33       61                                                                                                    ___    41       93                                                                                                    ___    39       91                                                                                                    ___    47       39                                                                                                    ___    67       31                                                                                                    ___    35       55                                                                                                    ___    41       45                                                                                                    ___    75       31                                                                                                    ___    45       41                                                                                                    ___    43       43                                                                                                    ___    71       31                                                                                                    ___    99       47                                                                                                    ___    101       53                                                                                                    ___    33       77                                                                                                    ___    99       91                                                                                                    ___    55       35                                                                                                    ___    93       97                                                                                                    ___    33       65                                                                                                    ___    35       83                                                                                                    ___    61       33                                                                                                    ___    55       99                                                                                                    ___    87       35                                                                                                    ___    33       73                                                                                                    ___    49       97                                                                                                    ___    37       53                                                                                                    ___    33       69                                                                                                     ___    81       33                                                                                                     ___    87       99                                                                                                     ___    97       93                                                                                                     ___    95       95                                                                                                     ___    35       59                                                                                                     ___    97       45                                                                                                     ___    53       37                                                                                                     ___    89       37                                                                                                     ___    65       33                                                                                                     ___    37       85                                                                                                     ___    39       51                                                                                                     ___    101       57                                                                                                     ___    77       33                                                                                                     ___    35       79                                                                                                     ___    95       43                                                                                                     ___    59       35                                                                                                     ___    91       39                                                                                                     ___    47       95                                                                                                     ___    69       33                                                                                                     ___    93       41                                                                                                     ___    35       63                                                                                                     ___    73       33                                                                                                     ___    41       49                                                                                                     ___    59       99                                                                                                     ___    99       51                                                                                                     ___    39       87                                                                                                     ___    83       35                                                                                                     ___    37       57                                                                                                     ___    101       81                                                                                                     ___    49       41                                                                                                     ___    35       75                                                                                                     ___    43       47                                                                                                     ___    45       93                                                                                                     ___    83       99                                                                                                     ___    35       67                                                                                                     ___    47       43                                                                                                     ___    41       89                                                                                                     ___    45       45                                                                                                     ___    35       71                                                                                                     ___    43       91                                                                                                     ___    101       61                                                                                                     ___    53       97                                                                                                     ___    99       87                                                                                                     ___    57       37                                                                                                     ___    63       35                                                                                                     ___    89       97                                                                                                      ___    37       81                                                                                                      ___    63       99                                                                                                      ___    79       35                                                                                                      ___    39       55                                                                                                      ___    85       37                                                                                                      ___    37       61                                                                                                      ___    101       65                                                                                                      ___    97       49                                                                                                      ___    79       99                                                                                                      ___    67       35                                                                                                      ___    55       39                                                                                                      ___    75       35                                                                                                      ___    101       73                                                                                                      ___    101       69                                                                                                      ___    67       99                                                                                                      ___    71       35                                                                                                      ___    99       55                                                                                                      ___    37       77                                                                                                      ___    39       83                                                                                                      ___    97       89                                                                                                      ___    41       53                                                                                                      ___    87       39                                                                                                      ___    91       95                                                                                                      ___    75       99                                                                                                      ___    37       65                                                                                                      ___    61       37                                                                                                      ___    71       99                                                                                                      ___    95       47                                                                                                      ___    53       41                                                                                                      ___    57       97                                                                                                      ___    37       73                                                                                                      ___    37       69                                                                                                      ___    81       37                                                                                                      ___    95       91                                                                                                      ___    89       41                                                                                                      ___    39       59                                                                                                      ___    93       93                                                                                                      ___    43       51                                                                                                      ___    99       83                                                                                                      ___    93       45                                                                                                      ___    41       85                                                                                                      ___    85       97                                                                                                      ___    91       43                                                                                                      ___    51       43                                                                                                      ___    49       93                                                                                                      ___    45       49                                                                                                      ___    65       37                                                                                                      ___    49       45                                                                                                       ___    47       47                                                                                                       ___    59       39                                                                                                       ___    99       59                                                                                                       ___    39       79                                                                                                       ___    43       87                                                                                                       ___    77       37                                                                                                       ___    47       91                                                                                                       ___    97       53                                                                                                       ___    45       89                                                                                                       ___    39       63                                                                                                       ___    69       37                                                                                                       ___    41       57                                                                                                       ___    83       39                                                                                                       ___    73       37                                                                                                       ___    61       97                                                                                                       ___    99       79                                                                                                       ___    55       95                                                                                                       ___    39       75                                                                                                       ___    57       41                                                                                                       ___    81       97                                                                                
/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2982583792120130819073652060489270699802808791759093463294935040*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3083800719001957236096420555663929893697690907470383250669568000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3633476703474787733956572939551696528330002346811493044977664000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3781925362688509920464841486769872921969880551071809913487360000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3933139484593763044341328318155843459777489532406981418024960000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4129731404474027287948133622215913276650042942435667872254525440*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4252082912222815532289211159425514755437283348600305211565670400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5643903992395154133159932351181554930323027178226945463890739200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5679327746880343556258810766573429771367002704830021878247587840*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5687100039898595955956593582870216358302016269060135421214720000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 6612301450407424959997533409758823906134207239177846661316608000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 6853311990765544304551346426434745272535104430704148063295897600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 7279906374206143323898329937702888959951875836231131007549440000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 7982731865393204994494794659084370818799479480577536741605376000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 7991955316526002300325407309564063493722417694431540378022707200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 8007115023693617686453500084434915369128235602607686175372083200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 8540922691939858865550400090063909727070117976114865253730222080*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 9597123765818067819760352446697991204267775687013805009666048000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 10291386671159590303869439330013175999393527586796311608190566400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 11933927528890381631322198598094047707989958443466114163802112000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 12720677965883073598897734792113710811502974993315330909011968000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 13026244120234263814216390276454915625207000841288176194090434560*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 13620420633679942540837763741265073734436185435046088156079194112*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 14559812748412286647796659875405777919903751672462262015098880000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 17491404802434358382149891876310662264110697548707120849879040000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 18602862740974817953765298822486627055038114650126335300599808000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 24835165803445526649539361161595820325153936161796780973883392000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 31069129320910726642328161030889068749200235644016907465103769600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 31451003330538921114294717048680973538703762587112190750228480000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 34051051584199856352094409353162684336090463587615220390197985280*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 46859025439400733105449355956900820404180571442055984422406062080*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 55039255828443111950015754835191703692731584527446333812899840000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 55691661801488447612836926791105555970619806069508532764409856000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 58618098541054187163973756244047120313431503785796792873406955520*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 67571807599331380102412508430180437343234732368978321667522560000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 80272283959745172710404404869411962772731590165851645788815360000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 98195923632779877354095643429062257872748237292230162104975360000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 99109089850061951960357948221263530292155195473308333776044032000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 101268037257224587465213749601146243998154288362156305923635675136*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 103563764403035755474427203436296895830667452146723024883679232000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 107529856321454248689694656529034728640722078682629108788520550400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 135979543393067084009247549884362992517128625680831188226696806400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 136854148326068421784868981411013752710041424319495576972427264000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 151967047743174569199772863620313291435522626719341894004899840000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 155796980395730134561867307078686529227929674403317393728670269440*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 208262335286225480468663804252892535129691428631359930766249164800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 216238014218316986095326432482756793364702244669036364602277888000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 223280022306787700296465342637463468833984985371341585939169280000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 245240034124555101949418991553967996218064148534815177505578680320*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 265128993808505668856058237258468096256420240689021437683433472000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 282573013597203953155543217071663647071708880815727526973276160000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 285412565190205058525882328424575867636378987256361407249121280000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 332825760597610495502782917108956566295944201582963455186142494720*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 447602018051007076527647523540568433855861900674416099279388016640*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 449618573139976855993617490455507247775048353456903977999940976640*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 454014948912806827800932994233702187594159887771100681551531212800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 468916722799583327212516255881213453565835139679339387532869632000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 490315295480669660357010662847506103594684566850325222155375083520*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 517004560342925148965060596441607510237934269651427735229169664000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 533347033811851789342790779237960985076819360800718307530375168000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 539542287767972227192340988546608697330058024148284773599929171968*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 584712036590188461239764464502760867823653090427574109374796267520*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 607868190972698276799091454481253165742090506877367576019599360000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 626793520134296094165392264674044988034984464376171562975363072000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 665968115142689600050729281216172799787170993399682285661323264000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 718565952157152242552699675492436232318818379488317889778286592000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 741994378185525712619082145944600369577768960277930582493257269248*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 874513420701585159494489258663398586266441192704421211595079680000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 880440894226240629659842517211704830926708819330710288046489600000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1022248481472715929573682326872758554730570441534710089433219072000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1057145039544847549664369666812602575054793077393295758000652288000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1359858496118791648916297142055519015340921905070084223845321932800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1487501066902352187140278691047504822002710185045234751908085760000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1652684374342179974871313933072868063467797787105536366570048061440*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1716103534182343811249537319966271362581395983976138277543812792320*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2081042113625659670105082313409484145826766300236224317200793600000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2139623704936991319985061107280899755702336525072926946366377164800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2150372698526534580424638894743052816915378535942658009557735833600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2946120403844324194466068669518988552507155355902103348090975027200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3125535458557160195017131039840376515602697634571071182505771008000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3639092259044904674564773514180550920933717522364498170020783718400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3833108199846711281762030270317344659326653526868255440015196160000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4228580158179390198657478667250410300219172309573183032002609152000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4309628645257789735478520462980423115089300411380020797266880102400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4611253307397291780134863942247264948208401573640227730915065856000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5162299985266142123758170968842130128167335903362957093518704640000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5599446145596804266790882885183285244018964201273779092624035020800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5854858170529568976560684800084853378064132833422860525951422300160*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 6561206166259204040898151631443871718704680596822634955402536550400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 7717472532634475031891301161915322013200390168686925356654919680000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 8344532449254266147941738318395509047239112447784415090828870942720*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 9841809249388806061347227447165807578057020895233952433103804825600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 10314267013238628643556532431473242501488902194084534902269044326400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 12197621188603268701168093333510111204300276736297626095732129792000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 13140399962495634496838980647961785780789582299469345328956702720000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 14182500339432831742519512000174175239508618049412545128056225792000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 15083700258402264074174821620431480902812551439830072790434080358400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 15265955154914025874862142751544677291520171130498851931703084056576*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 18513956500854972216479356125424141479625944863709009856726919282688*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi) + 19959675685737804284012349217418743483298687171987533628143199846400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 20091889410802485613444764319791654417193749713718135113272786944000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 20354606873218701166482857002059569722026894840665135908937445408768*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 20997923045988016000465810819437319665071115754776671597340131328000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 27235556181307654481234696459119204385329838253299162761019994931200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 29275305207840244323028053363695244862146385603849129875170477998080*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 29466713306422541030857695345494865868583307916804624089046056960000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 30302952725255906000222420600766739397216455089278777294650028851200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 32342222965302839696466202045204055207579182925792755778711243980800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 37395695303631408399039046114767188833763430257947873869134875852800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 39595442086197961834276637062694670529867161449591866449672221491200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 42210385512796535873588894087903170905344877518819298592476364800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 46579953070663617733916012970513079841495033850780896104760632934400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 51910751518429025306324011463086392767849681967905131138016870400000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 54046717306781989519436406209898913591654865730183009000314728611840*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 54452813237808741813174576839482769057723367246202970166843880243200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 54452813237808741813174576839482769057723367246202970166843880243200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 54796062029461324400303902690340875683255681037413095763471237120000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 58452008353627391143173334147920868968627713245795125337786417152000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 67475113766246244491297782646837096108478364825274312345480582922240*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 69537770410452217899514485986629242060325937064870125756907257856000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 70626544734149153620351389538558630787056893070109734376506707148800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 88501302536543896353576759507633688970583847733696855658159144960000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 94973367403792205715575011697782134537025974417343421833071820800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 98274563339211838367719447177286643804853262231335148965173657600000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 110192555364566930909899711275515415989878018506468281071454650368000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 111265125955599045902266087061237861517201873927535560385731640688640*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 151013095326338982709306215165342233506471802088451290583321804800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 156375556737227859535289472115293910896447613641907294065982124851200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 166761740540789271802847141570915980239277812191496596135959383244800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 182792706927055575410865714457747915349688792880951277776559123988480*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 201567997025898811598161702584556848069225847055385369249589493760000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 209453029933831484929704447363383113804249305797432532460401328128000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 215920364051987982372152904469878707547130767440877799505537865351168*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 240221388690653116380140951590173745299307782587733161705679618048000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 260068737740717656651149573699093411740556126612825403452895002624000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 273549480567499316001964529387231402272713711176881190216128266240000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 308881924369394048114353025950808500812913639715904372179793346560000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 312264432338649017520686033749141484868849066377630610440898446622720*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 321625843655602380112536372580210834270428858211642305704204697600000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 324164406373103483487249542880735219339349583434199310342666426777600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 475441129347218442447965996225078321697712722370158988502577425940480*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 487122659479255461362224114579345716167295797050514642353174609920000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 520137475481435313302299147398186823481112253225650806905790005248000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 639415478380249956536505568560499418912604861474441734575148236800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 728666099710032181805641222339662016012764528127666155670065905664000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 919736157026783033358682845709092809723927018524854785844040433664000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 956374255869417238619904104320806396016753443167561829316961501184000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1055346574928762997724039505331929044444121602362673271614293934080000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1056895001761581290070014268074017333402258378508903604569194742415360*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1168138268659060632756534666690728680014136079136432511943780056694784*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1269700678744731076796329829926861062902242190262458276255089840619520*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1343539036640539194388843319034264163635246558580612687644265021440000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1493765504405565972701564505796307132826167282661715619123635106611200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1524864246778279123945356661890198016679218815326520101419406170521600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1647695432173520251033200679947593530351323996010313665372540108800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1651823319148979054385972718781290165524229225475641147652466278400000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1720508991910606401657426110603216025598979210801269967560434536939520*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1816092824794528979527283116747839138132255833623562743536014233436160*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1852531956556662998207277277277095713752220563057810407986070290432000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2181109813852152080447641091423063413130797381859562383624946088673280*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2279623031225494194131663729836472954915161194510534725571737498419200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2366094425881805404069357907536424589340910566501189668555430003998720*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2989142510337044858415719248554551631602762810205778053993131409408000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3008881402047349848989362946218413871731647186627043796166138816102400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3284322993060908882343845117917349574386009756087889449211028674969600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3439862001965575089969399696917040068189324713752993343968337691934720*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3694732350761482784569319127344226449996928036096684891021728808960000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3754730149261266319574575714363056471474008825795675931247864467947520*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4413194020084819006276738272587607840863404208588736734922250943201280*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4730599111612350376942851646961273987501890765559675614866515605585920*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5080394249201687440685702096505080051916582321031800468231998668800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5173017257591830472251584799750863060483719888389282165850168623104000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5403218206623600411437892058724862498443976642251947023292705013760000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5612043064321663453120304825519192886011614536811793612820347407564800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5934836003370366844503361381309297435712003184211431079400546091663360*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 7061110432135710410042781236140172545381446733741978775875601509122048*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 7364935947036212011809990511779374162033597705341727574924074994892800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 8805793532119828162805961548039270597991475432989268813102033403904000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 8951027509915796241496213468423289383357261782599249620523795431292928*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 9227236299611872870234046368403135873310384705656267641576159036047360*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 9364068783128509967138921397163053518959828387438704103024919272488960*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 12194068138604050798334680748853984932694873549893049115083289877544960*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 12356741018250287811882364996878740927561106888682035983216292554342400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 13695775392393154256546218572252224851643084271257148644770490980761600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 15195738194176002012239030349268160240170927172143516362184870330368000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 15333639896900094136285786752344033565109202153058165967779608395776000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 15845768652202343867633801860289485795797499868645064318551569150771200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 16982601811945382885411497271218593296126416906479304139553921564672000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 17762815213734788729580899683013190083369091152480426725873420546867200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 20540390950199393252080017436317360628496985110797371527689468001648640*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 26141927516117826704910401328409182952293054133066830830195098150502400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 26587265920246358210229265252940251689457001059829127885388708029923328*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi) + 26961415949418875750256722733145020662256656213586361994629299044352000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 27541623107433219204603733748994736564176190100305383447765524403978240*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 29028798874807302975038290105439060065416251170419179366454650732544000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 34891244169836192147391052948775909092332143335229409640108504645632000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 37453209282855298880599376585765810864705683046100079424898676052459520*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 37744344361600231720088090467308390314114959145989331612995959128064000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 39204844836287707858880988255880309750767336306790698485503789891584000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 42050460874253524250408431987660487835635517530456196190624446991564800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 46030878470253747256350649788371220497263496334007710576757591926374400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 47073241959337137834842516366130527501502467215844835152724510659051520*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 53702691548629371799075758086433090580140745723008995672883857247436800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 60041142777505918736849281736927669529452725708484624465553829543280640*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 61662024828861235964302996569359261379637538872895373976216296115666944*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 63303014095824662405307774411762504022516669190069352108068352452198400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 64437943855692897687374589349499880488903642601437166332170468117708800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 64907394556696037857161049020378169873302672497784604185490838016491520*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 67955064382898693622060379643525870234663382931770544041539902478745600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 68371195042154315997457972705070170798304910809559403709741025932083200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 80387443037927915930875264907369704796537310933468496707105186643968000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 87104526096668014518703180545868153373816429170230692109150640196812800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 129729615954305465600013816598890268534606614172393127911531702848061440*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 129771178896440557930880937544113133246159171839642171821540122527006720*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 133392780365655399821675844088167858946375089535435980924681625534464000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 135647076903670037462357944914238091939386133413482621460983521464025088*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 138081509747388937648871381340649547337740570499811516447991897933217792*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 188711121291672057513025583094963935717503524761351701401356370916147200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 191872369901665338149607421259169664569155269200663415296128837190942720*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 211948557661984433534934288928497018655290833458566596032786752287539200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 229870251652263021676558381455023166270327224701954351203893080856985600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 250254813385336033139061531064510013955314956866238535089732083253248000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 272544501681260459981239163974351907384706135878855784946728593585602560*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 280284750192890112332598204665977480241669056763119379299583279706931200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 295369727952522671033710797623800259095544841114179672047509313683456000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 317939388296279366930658296983077176453089971007123320962773300191166464*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 326786890186729633547092971207118806477985847806534367676992080733798400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 343648636898162562442680936589035625925035652536930263988575558382387200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 343736869570601966243235277848458585502392925696231603372644603265024000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 364864544871484122000038859184378880253581102359855672251182914260172800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 367054362853291129177963124069517705904069156488536329512081839200665600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 386469200006393842105324247420031765098960682550471159724694712992399360*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 422442500666982888660996652073641767083918845364479032407579843578822656*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi) + 429091136417557640462908978716043243704610819443648122247267084266373120*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 449406915603173285809570906461321028812679622728169183412318982530662400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 518194394616411005898300881039319114217509397395580700487644949459763200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 534501601868924870559620673507686922728361107058990942610644617889054720*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 660671196883240979069695768141232631998219919513067108349017730737766400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 677160083277968089670401789939262390702616942108645447889863284097024000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 688533477931605372584183151093099555498204974851846193549630131163627520*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 780592982610039610059197400231397034023931638025028044539749223932887040*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 853276879932016265372964980374143550248074158161506404489923766360473600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 894664720805158324951764015974986715825953753223087668712179934963957760*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 908447441008019482214264662885211975970609875054326380341989308628992000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 962216183314855174839506622449299752590099827103404739168011563470684160*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 966173000015984605263310618550079412747401706376177899311736782480998400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 977942632087701494743656508293927448835894223837206449722032274800640000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 997424366668383946186752233629007321252801537476424723578568452803133440*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1073494363423839231397239837598876920865853409216546605455459260762685440*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1309360172460426801943999071173214244115646805953607745238275189007974400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1349349590035900615375896031399024886564880375672892717330526105971458048*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1354233329208262994110939405968389160934656479667766433425935107201433600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1376604341479193959690369829265730730363050212777865603926156041225502720*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1405283598593343833850585867375433453912280425544071137341284292084367360*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1516101252322599454882525240305827019502327880577861599749581797798707200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1650278191647996272379920357746002569910571502725285883905929463726080000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1736546803711980299893276846211243344077478630053299166388554127795814400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1789329441610316649903528031949973431651907506446175337424359869927915520*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1823374143897579314887940688521805511281352561555964124707981834185605120*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2311515709869034880512980988618610386133385084250932860161407703842816000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3031183861007046044012295523577185948427019113077971999779365993001779200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3096423072895840629448837005147979414426367792617602702020286062253834240*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3260747040953606669768219829669184902389089745516409169735180804423680000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3598265573429068307669056083730733030839681001794380579548069615923888128*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3639502072247206796673149653540045870011889289107122289832200600603852800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3915177704897556571532331871957200324990554665747954837702409569330790400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3940843566567661345606015724923476619482012871327464535123734265488998400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4376033680777317354581899478175895654211502351504675866722415677538304000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4669986667058366920089853002945520695784037897931864991848659385581568000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4931233514387274411761026109053035490417888179735323435011003101531340800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4987024886164339612586689151258753380124490199025096377242041230295040000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 6751273144970238916209203666149186885132906206400937635872224257140326400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 7156267313183958737605649611406082389334971832399873956177863778500608000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 7844271784669462927937053746374881183213465074631260178451391357709713408*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 8059264982074677332475746029797513793366653446260704390258452121570508800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 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935832026342420297038983412721731554147867873656788163033058701217890304000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 980380041851281603110955995344301966292721530972285089815503564317162209280*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1029718711440379434162999591942179007421594494569652339684888141880727961600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1286983649316215630322692514764847202675668877135564139261863889568006144000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1346102152095401021288873215288662608476155908222922435473666847782385745920*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1368298973579309041607654582200801610887917334944088105741953757805857996800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1388060594033505576173786204074005913475807438383603913161174913590807756800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1611710712034168289344915877465204343254661337964468503001378874319699968000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1784777610729755825444649999761474585530374296228065090621634056436299333632*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi) + 1786068140462049828033042203135745545289982983693952704937751482480396861440*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1851199158920708466034390260456708512158785535466526671097067469427305349120*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1966369131874138472289804007969648329509700797864458085222210156115473203200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2330619130821900015925125936715651095468430625454216004285745411647340544000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2411524598985564868418913491829096537275440945496345419154063722454974464000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2454135522911855162003026527938432809357053776947946591721085403300584488960*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi) + 2610078881378689187003082043975013115779263281652778492111570241855047073792*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi) + 2704208501105690644613106060244658462924809539739492561547930388539847475200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2711318060613997031746512366083003744673726317522647981492636041345981480960*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2735678609454495481874658964011096000769779076620829342648079193268341964800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2916554662873368879459225299792102318365004467816331943526278170195169116160*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3068344471021433378910474766900434124525469074321650755408912966884943462400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3074675036092634369582330921422613619120741201354722121854309160551668776960*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3146335826609565021498920014566128978882381344363191605785756305723909734400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3227389829515442344290458697207011349115780691197514616666264667911943618560*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3279653371832143327554486316184121193728790614778370263311263104588446695424*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3316399355286290759463549362078963255887910509389117015839304599054843904000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3605010075102587199197974014611021937434451462751506489574051952878367539200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3613716774874448683352816789040901413956937962095467756999848416582765117440*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3728684116255270267147260062821447308256090402361112131587957488364352962560*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4276733022963761210276088795557483171223972800186218492308669559181043302400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4682648394063497364313620528738903446587626278717683270805983590434734080000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4787437566545367093280653187019418001347113384086451349634138588219598438400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4957022786803661118416655510982031771066184165742487806038908762824114176000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5272007340082772006173774045161396170198912284071815519569014524839408435200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5450273309418484010445455137458279373336353130176235519024013343403290918912*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5588699762241813664736837544571899432310399021633395949243636856408506368000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5622454107004308725029291338470965180029288404995440824278678833119782502400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5705868591907024236872868614275107495721480992782317511052392236709629132800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5710193235334027005274594882497375506925842478625426295966324614156517376000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5797564678364330070102577797486261410060870630793322144807408254823956480000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 6134627371570393827134575743436643938137757993474759597874051703590250086400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 6674839088293254425622120896071712162183365803992755591923242289657701990400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 6938888133458201040224486198995074400598928486074656425832469036010678779904*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 7157065266832126131657005034009417927827384325720552864186393654188625100800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 7221561105722537436141827508940743849151674384648741165077481542988217712640*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 7550963960438572853722810442619966814376210407057066233849068321622435299328*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 8375268836637365703457340557966737876980280067031344547437811220062876467200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 8580640864134741879230466412068144107245693644383029811192123092752767385600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 9336640757022448060033718681362758053737801488529500437364570208289685504000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 9790136603403630651396424047698539472050803891969660624495295537011889274880*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 10215794716595092853631051180207171623009534495968341521212482299490667069440*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 11129446564462038696737189409593867808342168170045613703224416201681456332800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 11407903504017017610657241619157778407467296156234461503175865383623904460800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 11474259598775755811464116078859535522813375010897337934787396512427980881920*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 11780380033723313519108991375843927043870889991419018869917231840822401433600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 12507027202952464744347668853162528860736415555680846892959535216332436930560*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 13349678176586508851244241792143424324366731607985511183846484579315403980800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 13906720260406295937557709291042430951118112192682360342382219346214649856000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 14771374988977917483017374450106066964173879423145152383113030428839536230400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 15724868643406228311635736726505697774716297243839158631350855087645786112000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 15917798223724817408601896924000817780291696548819149561015325708202383769600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 16137697518469956110268924643911108322096143846566139869675403492438111682560*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 17054715642958336238428006596261932098740747097706487278514516809174797516800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 17675611826303940947702453412240140584769714069315405922009261451851595776000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 18632909056561128764073494644624371398863250388516287121853913459919043952640*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 22940809830169285927185671708697691562069000496477590012709228513535847301120*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 24723058240722303888991483184075432801987755009213085053123945504381599744000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 25014054405904929488695337706325057721472831111361693785919070432664873861120*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 27455830248462870919313068961796572661250048587667959270000366678674767872000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 28102492041957375260802447843154672163534525608185047765568804929081412943872*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 284844810319286206259191839692646212910482990873605834249
                                                                                                                                                                                                                         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                                                            ___    2       144                                                                                                              ___    2       136                                                                                                              ___    2       148                                                                                                              ___    2       132                                                                                                              ___    2       152                                                                                                              ___    2       128                                                                                                              ___    2       156                                                                                                              ___    2       124                                                                                                             ___    2       160                                                                                                             ___    2       120                                                                                                             ___    2       116                                                                                                             ___    2       164                                                                                                            ___    2       112                                                                                                            ___    2       168                                                                                                           ___    2       108                                                                                                           ___    51       77                                                                                                           ___    2       172                                                                                                           ___    2       104                                                                                                          ___    2       176                                                                                                          ___    51       85                                                                                                          ___    2       100                                                                                                         ___    51       89                                                                                                         ___    2       180                                                                                                         ___    51       49                                                                                                         ___    2       96                                                                                                        ___    51       45                                                                                                        ___    2       92                                                                                                       ___    2       184                                                                                                       ___    101       75                                                                                                      ___    2       88                                                                                                      ___    101       79                                                                                                      ___    2       188         
                       ___    39       67                                                                                                       ___    97       85                                                                                                       ___    99       63                                                                                                       ___    39       71                                                                                                       ___    87       95                                                                                                       ___    41       81                                                                                                       ___    63       39                                                                                                       ___    43       55                                                                                                       ___    85       41                                                                                                       ___    95       51                                                                                                       ___    65       97                                                                                                       ___    99       75                                                                                                       ___    79       39                                                                                                       ___    55       43                                                                                                       ___    41       61                                                                                                       ___    99       67                                                                                                       ___    77       97                                                                                                       ___    45       53                                                                                                       ___    99       71                                                                                                       ___    97       57                                                                                                       ___    67       39                                                                                                       ___    53       93                                                                                                       ___    87       43                                                                                                       ___    93       49                                                                                                       ___    69       97                                                                                                       ___    43       83                                                                                                       ___    95       87                                                                                                       ___    53       45                                                                                                       ___    89       93                                                                                                       ___    75       39                                                                                                       ___    73       97                                                                                                       ___    47       51                                                                                                       ___    41       77                                                                                                        ___    71       39                                                                                                        ___    89       45                                                                                                        ___    61       41                                                                                                        ___    91       47                                                                                                        ___    49       49                                                                                                        ___    59       95                                                                                                        ___    41       65                                                                                                        ___    93       89                                                                                                        ___    91       91                                                                                                        ___    51       91                                                                                                        ___    45       85                                                                                                        ___    43       59                                                                                                        ___    97       81                                                                                                        ___    81       41                                                                                                        ___    41       73                                                                                                        ___    41       69                                                                                                        ___    83       95                                                                                                        ___    47       87                                                                                                        ___    49       89                                                                                                        ___    97       61                                                                                                        ___    95       55                                                                                                        ___    59       43                                                                                                        ___    65       41                                                                                                        ___    43       79                                                                                                        ___    45       57                                                                                                        ___    77       41                                                                                                        ___    63       95                                                                                                        ___    83       43                                                                                                        ___    43       63                                                                                                        ___    57       93                                                                                                        ___    97       77                                                                                                        ___    69       41                                                                                                        ___    57       45                                                                                                        ___    73       41                                                                                                        ___    79       95                                                                                                        ___    97       65                                                                                                        ___    95       83                                                                                                        ___    93       53                                                                                                        ___    47       55                                                                                                        ___    85       93                                                                                                        ___    43       75                                                                                                        ___    45       81                                                                                                        ___    97       73                                                                                                        ___    43       67                                                                                                        ___    85       45                                                                                                        ___    67       95                                                                                                        ___    97       69                                                                                                        ___    55       47                                                                                                        ___    63       43                                                                                                        ___    43      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                              ___    67       67                                                                                                             ___    77       73                                                                                                             ___    75       75                                                                                                             ___    73       65                                                                                                             ___    77       69                                                                                                             ___    67       71                                                                                                             ___    71       75                                                                                                             ___    75       67                                                                                                             ___    69       73                                                                                                             ___    71       67                                                                                                             ___    69       69                                                                                                             ___    75       71                                                                                                             ___    73       73                                                                                                             ___    73       69                                                                                                             ___    71       71                       1004252843200468068449691693923308505241290858352554799766446170587945993050808909824*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   930854647590004264343693711507435403625268478830726616617831584824272192120316493824*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   864177204637281286313297756331749987688590074535065879491375148038500565574446219264*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   683405785834982205089204403902124138019827305823006592952739436573508484050058215424*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   596455565872081555546081951375318400205442192819696425456560184154210956851873316864*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   393955168788500152166594017183217162819377232074578681086955079581559493018460880896*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   331629578127002269259045286791948801871478234663086667726128682616238612607301320704*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   176395056854469278732009497681793048393927749845630302855618112359066345810895568896*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   149021084517668384042477322941667316935924742003934851867033917348987283083418927104*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   60527353367926744750411797622347391905650230433670008930287097503592668448944029696*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   54245852113087254452441401569453305658499003423781900900000001107017014979124527104*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   16019080815667652540433843803988622921182567156701315808854541751376373818383663104*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   15650194045428777437831271630454061480067096723342983605458806573510241347432349696*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   3840061584880494144531849537085403753125678328600389959456115007926274638535983104*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   2984723451924687042256013673732228632028769910803134971499702474158204550377373696*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   747158717192527791841712372855603558010586936054803514260484430262127007423791104*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   449622335834206117112602133201357107580545814327363344095768515348119284747337728*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   408424931464364755205328866107072702066396161528929189524124726612503346383159296*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   117891834902793675982178575060165214167853860493865918280730339519680357915951104*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   38659356170908496342506265776046214418392127875072036141158111397203560781316096*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   31505610803341190459557355170258903945952701299231827299696110936234900741685248*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   15061006984888194755779858337140389234543282336593154741553958885459738549551104*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   3158476109772194118152661861052959573773591210619795889751507909289888813416448*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   2407178588553918480362663474278553493307182840252654676124388061287334916653056*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   1834747895583678587178237668456428984440074973740583942254357863964655822569472*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   1554194454135740766259718124015253055649077127973839674240473592513302232039424*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   153765084285294574475809958104261142401842830107343894216562845822129591549952*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   129148332417115599089864058539940716779756281270406619730520974602577509351424*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   91689786400408419833141476584653137710870046034841956486773375573514105389056*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   10002260455543452930542064876030153179757938096317576919771342670749409214464*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi)   8608140059312166274230903267284494526277257422192612975390531666037465677824*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   4588161966033857185437134341739538312413800099295518002541845702707169460224*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi)   1907258757240348194940219342719595658390760609970106769373307608570167033856*\/ 3 *cos (t)*sin   (t)*cos(0
74793372572686745600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 30669700091817475917842551223769529694084791223399862549819628797108902952960*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 31439172004724696112168631432112695951077053998597352544825532159447007232000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 33490632934049572321962543307402371634300510868176558589070179592981970944000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 34235944288540438233870754854440405239908604156353334939333539122354124226560*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 34962167068064589288777413522336960802418531550298298920954759458808334909440*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 35304912010454559380735025641920799637251029934323545087301897320036040704000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 36607773664617161225750758615728763548333398116890612360000488904899690496000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 41045583636740750453342748757973912397498301125541031681173638750262001664000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 41158635134965368990452155075293105349314344075421590532222290075351777280000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 48141232132234690921758216880422565675086738935352196084264096119153229824000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 50011302277717264652710324380150765898789690481587884598856713353747046072320*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 50782636946667871265210911163190151441306590259983841742183521910546937937920*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 54438398075579037240951041448638974538508209390927178137542255276028067840000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 54722613616204567040139289744977239437739096398201494885317940846055863091200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 56949823806867604470881979865749449122192630754812298572300444451189922201600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 64488258200214367578494891963878619185281442989415956456420498798252769935360*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 66810761274574272977530823596056923297260075161592445896074586020579901440000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 66958764059513656205813472959117539690514299479019971377107687291050000384000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 71328191713803208325344726484582542531348882653773540999758470845536036454400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 74182638792796278467032946486165852025005086174688024357764316316914889523200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 74402148128591243944278895713029844285299006597877490577478755136212828160000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 75385089721750377616495229240490486305495092945838713507837083961777559961600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 79645174504527908165977299145307416124778670969071669991610461162217825894400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 82074746074603312325682853335933029617277614911347136177727111120832534937600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 82091167273481500906685497515947824794996602251082063362347277500524003328000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 83632419896701165326608082868146575900072979580901054600587855078484449689600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 86971201518831772893557668611007433485205220648950166412083057591702257664000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 89334630344203517507967724881883842438714319097780671959718845197472025804800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 90976437417926008597427952380176321951694187831059414759030285750306340864000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 91138317747671365391246115972132206800977796513110516596618796590595833856000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 98315271282157656314456494951573620461536336385769753335398239016706899968000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 99026142046002348967161276768220795310547851006968491397257867725566528978944*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 102286353606056802392441015375603635550117331021399814507058805522505358376960*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 104426287865341759908310062779189557091407964602773673017638785329554962513920*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 106859250064570198747589070370908298353267961106853833762335796072862135091200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 107252480512014907685017623833399181645811482550498959527251481327238081675264*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 116817368611746687593208999161077209248393546924751316489687545912510570823680*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 118060455250432896538501616250343518672577460944176895447876089675369991372800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 122401354008113859470604361702173655841258392188235240190311121922909567713280*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 137107327680657856400044566523424956214754314879353692814582539451597691289600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 140154157184672475431156668001723288575082188543339330432684373661633195540480*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 146547121088331351025398230427365645669592754583091872784563248538480799645696*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 147343584456148465341331584424595041415285863485048394583499755016201594470400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 152656071520814569639412957672726140504668515866934048231908280104088764416000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 154531843994890328815070149704421950105603683899883766057832997625901193625600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 161167062825956277453144662334675258333100060073326304781962183846701836533760*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 168306409223163115905241711903326195610634247487459917304206028638066730598400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 179001118810599404186771776907306362212705329287449675387352909664384377159680*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 180915329554993555685935785019811063538267727492546848067706924049835543756800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 199772028959784236346332294012362630957476106196610504903308980630452971765760*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 201098400960027951909408044687623465585896529782185549113596527488571403141120*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 241872489593366275023771024493618471152858519596665085422526544745687154688000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 259889467898177070778092601581054120073129012278978787551567523360492486656000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 259960640683236956058784719164535153912382578129596354111617390348974686208000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 276088717398829100035321160888801375212039304212011869356491971420403793920000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 306984881573250052291704118732714777777333447758716771013261302565146355302400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 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1083750832881616673012437953819988948709393134842273842801707211444270923776000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1085047077830283647739852678281041166702522307087083630292095629114026712104960*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1119596960811090025033827590298326857819234900881660932421633299721155153756160*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1162005480696799912707129351672336781336614236929787840652499770041035653120000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1186176397880761734941228202892893043875782976123729213240565758523155362611200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1246030025575023388810225645539509760930184475820752811116507996129433086853120*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1367637415660088894706242502460715029834647673062787363026186829881388145049600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1392104414200056767062335083089085098286576078824710540885315265729632455884800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1463053979543350910615980351469602124939390533974144620911734748245205922611200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1697876304847866121052819460984649352978049244586229020389341297929357780582400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1732751596986585789717763321781230735331655955004908022151295828661687549952000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1786468387880200293072772545844434148061985978857350616375287279010118107136000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1984705361030134250903776932656351222522937116676077631834469607230088895528960*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2005944554786536294852274432617835620259462530746309170588759662000402983813120*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2097344967988569904314610816731051409159937921915603181789040005342873419513856*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2102767250788623075577631814219219486870706184946610878017366571927411779174400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2125019678315481017607534361324821859314104739014762733849612687009424343040000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2145011899079219220321761062565848032095391056504594163193336369100665997230080*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2179376933866082163082638812326280698396555047165371051207376708785905493606400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2389195712704151515893772554263957862707788821021692774475712768812688972185600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2560767897292646541622100604483379820615952180419310985168667632823438954987520*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2588746123082783805526665564334371159812526673925318650218873400734898559385600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2599127395479878684576644982671846102997483932507362033226943742992531324928000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2986721340448846130656019986050706115352320129866748491758425555147465687040000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2993368692170995689593458918085153888950330305316793113311888476192104469495808*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3180699631464584755268231416354217984689644198621799187332979620517033017344000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3573896731712399893249035062228109490664630697433919143292530428152213667840000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3800993179302059229831001790874478417944209487989056686665906677656550637568000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3860858218962638938618373178034443817775882861812439953769927653137119497420800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4386746968784242754401029354511974606923720190741786847270187534122840227840000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4665203681246522050830534256791619613145858458023364944138662580874019392716800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4751073716383140142007480816114322760385020595750849036891387768605969376870400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 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6517542699382885489431448738602188488627689112448668516589578240586720382812160*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 6814832598267646756849590820830147715410989082577507648269048923333892224581632*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 6869039685909502046886930593116116990444306870825595534856730801629545145303040*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 6890955279172920381101138779425761670060287985503354213561518803604740243456000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 7134355108412778818887418583283059598848755236442972301879920046748439937024000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 7478851861695995704779060002957979127370296950595203327215337778663617724416000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 7731315679072057012942741069599635044457884081296446190825118657702879297536000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 7780910438285128284674815971901429159904764663154808695959363494855101644800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 8080176224373017834085385816974561050670332534814609030419339013887990169600000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 8304746709048013193304365465623883742170731865939560338855161770959395880960000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 8742284312394736228611304119011300361271681822374830379331585358610066466406400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 9096388988736417082412959203369588435482267698487450137480195073301516858163200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 9701864452526434991846032517135088380161600289836306358219544885768317042688000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 9707700889860658314685751052749841593247182917680971068292268697864617590784000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 10107119080873389701217506985208891484429884934695924943190002717947438773043200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 10474622195436780250871971187039231499580214645006788687376107886657229186662400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 10774832696081118488220709702550924742117886901242074999896070771626163044352000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 10785689641451608555868320346418879086540886594707602383620815622092231802880000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 11348848176720046860074059240800541114647115699624896970632859585300987631370240*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 12247442756099428812266979494034636467004638048675337669408642140722685804544000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 12923376809627001381425406088973226621010312259162792734664082704032272167731200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 14615275237680693395500559268895147754683618077233806928497280112617321272442880*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 15194662262390595622986392952130186841604286305935432976457464048831575359488000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 15281933501077180698453771461660908571610209733458916230966727723146548321714176*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 15659223468943600066607742073816229737161019368464793137675657263518558506188800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 15810445774487523690415756694590514397300385657511017768950369443474294439936000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 15819613559961762215844848513128072103214324146205644489652829431766802497536000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 16004571726024967534514281804363497999383251076017732569243790923104602030080000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 17616739529726611017525591337651126076640608429586441596587763675082236488581120*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 17819915612749542115134250661911144765810351413592662499828117045381731188736000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 19517803772848407481874716773717767655679440812055414605500240541895387355545600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 21396365751140625339238079616254866764768364887607797448692245585930739599278080*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 21893955652329942207592453560818933433716466396621932273080437343743082380656640*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 23020999321821198568365050553615828516955237880885873637256693972491995342438400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 23681800074634595161995086746106671611245483917031623212801207569258660820418560*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 24124999315347573494035276339549268042596363106680432570155613078284216041472000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 25734312036867061559281856113689361519531323883894942777289907107474550502195200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 27178447768283905641185053886611925321367130543541520772184613018145687716495360*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 28418160089561514194394104095328005933494580700437947855361449083110392984502272*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 28627201735805742903479085923683079874540988698077967594455115972008634293944320*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 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141867364976045022859015633730579319395286699060489735879473362531660149496479744*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 152567266131358184451290461639573293914803878136610824286804936639861151183667200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 156199820086866712652511663107182181865156351425577748674586006559857845259468800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 159524076529883557901003430939298356565439880293414751355047866798237708766412800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 166800576089409947268407848599333921150612652906393320813587786932509177607618560*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 168739578052128887482767338396125661220905100688887014211679843642481074765824000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 169540850616216484582429160332336767564308376443198847698253587989486909784064000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 179574552141521036341226058862964763054708174071102680810748965865019884018073600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 184391715769373779456497217727732301796771803400775551695335962632663695622144000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 199405095662354447376254288674122945706799850366768439193809833497797135958016000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 204879684188193088284996908586369224218635337111972835217039958480737439580160000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 234617494888926599833536544263040537776108145536664250961622973551359245156352000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 239501336590118420943282673852565454636123368719710600816577842589327977086976000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 242996691134959692684734277986720556982397722162973688495966651178193503911936000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 247663147053482525210375606056114103459275045781381902278440282486899935805440000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 254311275924324726873643740498505151346462564664798271547380381984230364676096000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 278102936545328316265460327652268409998452362239453996380169975802828183253811200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 283712855643696084809375256726688586552211320936496463958388082728027583571558400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 303730241540366277605914309323825297495326159306916039114597618569528003788800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 305351450173142452449706882681228270346892429687618684193905512941431724840058880*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 314341686644804743536245961532760208236772173491753952891866512387219149291520000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 341489068695158773242703496267379134996929018349305818274646276591930553925632000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 344499071990211997635566739435231894750340177083467233449534424856999894691348480*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 359526831547107167871035734232783009212091380672906501392812334471587574054912000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 363272241967246430875399273451622582186037436364308281233393312681953782136832000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 377429940996500555521982853082493197354763947124001478544586545692907243411865600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 406655093089297721560104534641586974058169560008978265007022918576839536452567040*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 412004350437523431504385670595953199997707203317709624266918482670856567783424000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 432231497576675087362262670960828307974117995936765132586158149502789851545600000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 459696823243482963980562398821471912495865986239450139985100756950675745669120000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 476406790006238819778817318598507571311444864871687230337726820430391961190400000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 503239921328667407362643804109990929806351929498668638059448727590542991215820800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 518980191168640172035604404866518953904543008984296096139412380216893760339968000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 526118419400839658509198947757522360407364563010377510751811004573864098267136000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 526450003336835495811159467983717977774848093128184519896618061190538947723264000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 551957797023336938097237543862483119990543040129741449991225930232043849488793600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 564630269637023786404524229450083047480230950959036717437305861250834916966400000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 570534512796716375481034550504909801309975381647128170382414504819173074151669760*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 613324601256470103642112141792778036408223535270662783161095592680611054713044992*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 617165632741085609988286319300725242481078172846189952165787695393062850134016000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 638177352791229974984804103515116700548670209441852266335879071771747896262656000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 693889801972195007893670055141407350845254107591674965703255455148855125071626240*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 744255337872427844769472288409641631006105592667642550353033573835895849615360000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 781887510303092330123593666645735411152426455221227695490065517709333402484736000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 787025831926327880579401148133848627637364137952994211483893800994141601005568000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 806221583924530999617923127356625423433397409610384314203013161993998713225216000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 812213659396504266547866987675134335959676964905551392884726539571881270312960000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 823996981215902256709058605024960377185331191882032823605144313889741833502720000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 898175533558027372200835404947201282253683998473718004472718693604682224369664000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 901906982469276017558766363125684994411235494812451434434152352576247011737600000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 945753377256094129641199764688517022393111050893022673724693927639502370216345600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 978365562678718065146068722091569333510114880234161386611752338937416245051392000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1022787571091894261578795465961280274912185807658842494743729716497924562616320000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1050661341969780318603578989555206958736073049203524715814775539421916759588864000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1070537963884547604760833778204275536418965867006731095209588596749872254471372800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1202542643292368023411688484167579992548313993083268579245536470101662682316800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1231848999023175564241228989470238517282409572372172221154559803244168232304640000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1243773615254984142673167618233148216782604177645602718346277764743291454472847360*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1407428038314850477235426515369088771622420516809497812865524839051619277429800960*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1416333608972263679886651201621619014839130243012313226546157403141717357284556800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1426402430093699543387288916410621131360483149170470478119889357373102369936506880*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1491106449696334163774018476784526640012131029045089739756212688330179211585126400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1499243144724600452344553455213417695432894150221227873967676991304140326961152000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1563828423723354131771859205006992250244896996061790785372163352496543197298688000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1665254457579146518911433133566141156455070463309027186141226095549355374149632000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1668956708353979796713923147024194120189071033536491396402951991492098895380480000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1791245446641392301033117696168518165825958836750866727690728480443936657742233600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1843083499388238798159691205901098009217200031072824854188621094013783053959168000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1917854919135840940641041116664448361310916760666692290717608881569679550709760000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1967451627715447646051432988152580870842045722993752383613640492928417061981388800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 1989053935441758342033100687315113047988000831174671361224242280795063363567616000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2048965631123620618204223055458337517091622005302344761089158554782325113513574400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2156276855760793549116707617650134414873690549793700883036192531722683313186406400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2229156209753334606801451934280233768718740570101999641495085925205980843134156800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2400629764349744961170794390763328674004797537032922690840861765606440907990630400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2443511785310751623005894987712267293634841575926673373225393391649994791976960000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2534308286000932671561375761306592477446568576595271955591126022074219406295040000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2695346069700991936395884522062668018592113187242126103795240664653354141483008000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2696288866549794894351332400234225979183273463091501653214227190786201149767680000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 2755350584521919706772680184565139319461281871928808755144685183442175515426816000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3014914340763932957911859782851204742795441082312239363992147022269865517698252800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3090287199283031281859656277422484861365327109370045348091950697826612155640709120*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3103578412849912588770147999199134334052468503011359767942989430726549108162560000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3207031026611576341729152932505772145187550786445071760207755745084100745101312000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3273240254706207232319720384344980628623120965074857082228001975917783751747174400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3506809834846079626801592962173813679314358746091211142911417506199132474179584000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 3788709420657935317221328252304732529241587348541093416983490079968857665044480000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4029455730629975119526295006503849938247431031632384510306175598730216678096896000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4131781364323745901754877241533993920782048696839948088112174710491428505518080000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4165880274082031240040443699748174395277002007913229678281271873141391809839104000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4289073437201237063039633607072733237506158505960157556022899140857785605737676800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4300697180206304954683669908021588276436396449695295230089367117802487079239680000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4464191717248909886240661672413313507616373582543310904395480283299999455694028800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4625921349460349039767302250792012392387607863451310359226397017736103581450240000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4835346876755970143431554007804619925896917237958861412367410718476260013716275200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4836902473472153590514887212885255778052353586287502386833423473584505185999257600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 4884135493751346971081899510049583773773036836863786519364249782303700742569984000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5293844873039799436623436465715429711001999892826183487893723847817142772695040000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5742523054502502256262857966500429176757030451180936997660354918568956170076160000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 5803449232423582852112860174137307559901285657306304175714124368289999292402237440*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 6241164481899553020019209306948717132970778821016132112043127062689684110966784000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 6521235240506714433526725561154384859952604397985807192721767901745405333864448000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 6572557531908937159316567281655849511988829367883540075444512160349578666495180800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 7091443652849116408736296277576048157672158002190135344558552594061387508586905600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 7173358764557385876879398117269823345947864837784387911993944691919945867250892800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 7484428046367592865956207179834560556658875873944927570568127100823702029205504000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 7997541734834388670124030205158549252599376164847256873445566779080009800744960000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 8285900212292506677278615267182700563980829258625175961252946021143480054579200000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 8553187315914845602352118985478916711206017299225988089035299118599721346662400000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 8752867594373766538783085691179579440326777876988967053855127773241484010598694912*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 8799817421326257380671107033240879527731195148790116923141949806234848681000960000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 8977300096793606706444190452491876349053105514860479029595002844350240010870456320*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 8991771991582522276675915945711120668674428179649735965668535001705799645292134400*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 9025339702972685514829543952153440671265115024463000893920388562757993623453696000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 9863634806295746026486303919695544078205897269978283477249532360865345420918784000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 10022014285399348683542094121191001684360527808344299829133887279323022108917760000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 10490400656846275989455235269996307446786832876258025293279957501990099586174156800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 10818990045147799340939343078548272043223164088662003300489265783754296091150909440*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 11099493067476797804587437491519440688335792240749762084699144966674862034649088000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 12302917114545609477227418433907809681789326002204425609454341673701290333437952000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 13113927327451877989017385549755481264512926168075155515744564586368843746849587200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 13605830211745752147558794344443185359895487262854547071566693830117572816666624000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 14126417746338662046690305105966924547780863943438792842238818650220860098478080000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 14876513259806485251350976972222697842702832785098470266917096240923872270168883200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 14994180233352461550370916216325143049680741065186643711522478914823447593877504000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 15493490431468209986692592696866949504017721744416740536649026906693846559621120000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 15686407948577734544599971377109628401699918320536238632737124608532655426764800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 15821812905385159998170748354383770776756932077667312871429133341321839256419696640*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 16082717037628632704163218348348862532651711119025373261531995936133915967750144000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 17971946934629065689737474387770035483196419765696324423244699936214579329105920000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 18082071891868754283623712405010023744865065231619786138776152390082102007336796160*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 18216473746735433664696740954062794272941840630300148089630209222812115979468800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 18533570276336223992541770462387849092046307883374334561471096809221284933140480000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 19570646027852648328011976795459618909498096517178046653655053522609863912870379520*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 20085663028585612757696502500603293091326993793945889986645975983731176121103810560*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 22040516921263012667985542183590230168076244050285406870385606716086632736358400000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 22285859242049203231408518437115145534950244188086678611811182136477194877770137600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 24780527480012873963370659039022564175662396312882251871843178730998532224843776000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 24826902270993210374748767042799900318798303956010961991578566049351900727554867200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 25484347690210358397358283149776203631838157183142501693883357765475169101414400000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 25563191483527027236027418207279137525384103627511190172371650097723841183324569600*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 26202602415636540235336408695199681216842908047229897694229926333151386506625024000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 27103701931264080897436658323930929567130745967214962984828476737029644620922880000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 28386152616939585254947776086466321318246483717832389168749086860914002048843776000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 28588554130234605886074337806860491276191986373588380475151076056829461443851059200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 31597406358604155848426499889450796598384428712054037204977923360875081579364352000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 32554903520986099965045484734585669222577896248782947423310587705144023445405696000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 34137912993088873363113564049192088480334098854721942910133747725996462509654016000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 35060559290199383454008525239710793574397182607552265691488713880753123658563584000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 35086730065484100390985948029926991936152539741492950070438845291520809102213120000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 36307141527328241581604159192947180833154234137624588940469879848941107767620403200*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 38276432798709927699257397850829445748530043354355945531387831227113609929687040000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 39419182229670662288598801409485510618853168492278125135367298121707488433416437760*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 39924828652916810745923127049249923978291789830489335336353545583936785004625920000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 43447607651703588164681050024183740799905771286120747277796505488401795446210560000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 44888162882148776901835591151231427621111949350690465077904176999279702152367308800*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 46208402966917858575418990890973528433497594919828419933136652793376163980378112000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 46941623400857487221171098551475722007544541625560026849846177294034676796620800000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 48245557384214639643981406844572269841087445559603360929008571107757862263193600000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 51311229259039222423000471616022860722234520588664340566700018615220725056798720000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) + 52777264380726057349371913662194942457155506891197607440034304861369888629850112000*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi) - ------------------------------------------------------------------------------------------------------------------------------ - ----------------------------------------------------------------------------------------------------------------------------- - 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                                                                                             ___    51       97                                                                                                     ___    2       84                                                                                                     ___    51       37                                                                                                     ___    101       87                                                                                                    ___    2       80                                                                                                    ___    2       192                                                                                                   ___    101       47                                                                                                  ___    2       76                                                                                                  ___    101       95                                                                                                 ___    51       29                                                                                                 ___    2       196                                                                                                 ___    101       39                                                                                                 ___    2       72                                                                                               ___    101       99                                                                                               ___    101       35                                                                                               ___    51       25                                                                                               ___    2       68                                    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                                                                                               ___    101       37                                                                                                ___    51       27                                                                                                 ___    101       97                                                                                                  ___    2       74                                                                                                   ___    2       194                                                                                                   ___    101       45                                                                                                   ___    2       78                                                                                                    ___    101       49                                                                        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.134872*pi)   1443584971260048520801964007482911863409635731150576206877522847695496019968*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   458039919675199307588519093138569074825249165605874712063407720873615949824*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   279972773481774109548047599168986613771295771928961443794641962901048393728*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   176068252414107716477069648143466475579101009644002220211763905428388315136*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi)   19346760501528800455305715081662236680507133053739055174916198628352589824*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   17715147553165929691575590847540578828397080538867873242552127639798153216*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   9003648469397392021633871148542069834155732210918354720649830650907459584*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi)   644351584470343972511083124141064794794345755111790130888581500553396224*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   275320868295838791938073965853146146072610042555573120785231208245100544*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi)   69314165670556667494501587236396387639356650590405954922370700528320512*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   46359871293801033694039946140220485077518529502484821025691852934742016*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   25954235779288111586176187508822626649231834367928434364308024505401344*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi)   16790229278248010332578543174765115122079803689951138646855618316468224*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   946119822322470075388570329392254797500378153111935122973303121117184*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi)   687972400393115017993879939383408013637864942750598668793667538386944*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi)   459801528325588816959232446299997151957303231851475313304718364639232*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   339206995550987962430611720284458042088726775278061318260972243124224*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   5257349603192481294604254430227835829059116406397424659431082164224*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   98063059096133932071402132569501220718936913370065044431075016704*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi)   61750705675636839767832669498706681781597814015072556069341364224*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   541869687219637448618408090381802809404633189246521260296372224*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   3493674576993995246851912736602232535214246282004005046452224*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   15780784474432676374180625147462309048041340928*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   7238843203652171599158518857314160052375912448*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   2818546254629195439026167819344925065011480625*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   1691127752777517263415700691606955039006888375*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   277786721960149220658628914447639941870518272*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   74939297153469617157262780597867432732233585*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   16685464135949739319975216422606127524886875*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   14205252563721208156679878625003459974791168*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   5561821378649913106658405474202042508295625*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   2723233096260092211619485815792198130445875*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   2656587623213958495650956026501210892197675*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   1475882012896643608694975570278450495665375*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   1031028937625211496991098227126517432427625*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   544646619252018442323897163158439626089175*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   434379738780180718623927608301923585753088*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   147289848232173070998728318160931061775375*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   120680446070627913185533444694491853690625*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   40948563862337584938548160369558352754688*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   23877025174759591361843514878623695039015*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   19768861839999368268310022971629576271875*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   6589620613333122756103340990543192090625*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   5373740462463684161022613984736272954875*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   5373740462463684161022613984736272954875*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   3176886956389179253089256492812264182625*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   2943308475715752938476422924149304714375*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   2269204968849413752206611780580188701875*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   1492713878969693191147517554302142906368*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   1085429061082370182296132725021574150888*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   1000515971640127335888042282041286717465*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   588661695143150587695284584829860942875*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   540965253535851077489300385314915616375*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   186376304501954828491950436659300847125*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   180321751178617025829766795104971872125*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   116599464802539046556070961057480051875*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   38866488267513015518690320352493350625*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   35757169206111974277195094724293882575*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   14336638807842679114765418204561603625*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi)   9901838536616677041931315506617214237*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   5808013963691719285915186655522019375*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   5808013963691719285915186655522019375*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   2523845374477579264685665343979853125*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   646914652014622343963625441435133125*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   277249136577695290270125189186485625*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   249776181335234591139209707874649375*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   229440488588870842244151394907259375*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi)   126022334808043313759147813266584375*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   74039325920905269847198193110716705*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   42007444936014437919715937755528125*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   37971403294116433648614689981521395*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   37552162577307261370715285364727875*\/ 3 *cos (t)*sin (t)*sin(0.134872*pi)   27752909037248287904356634208294375*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi)   7281290455575835906084095877624875*\/ 3 *cos (t)*sin (t)*sin(0.134872*pi)   5653413638829777552895890370514871*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   4368774273345501543650457526574925*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   298695471426088440282401625928125*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   261645494287824193193062166970765*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   42670781632298348611771660846875*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi)   40586903319820712965909118604375*\/ 3 *cos (t)*sin (t)*sin(0.134872*pi)   40586903319820712965909118604375*\/ 3 *cos (t)*sin (t)*sin(0.134872*pi)   11155849149948080261061583011807*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   3361940371029566860321403581875*\/ 3 *cos (t)*sin (t)*sin(0.134872*pi)   889620602674512616595197862625*\/ 3 *cos (t)*sin (t)*sin(0.134872*pi)   672388074205913372064280716375*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi)   242059706714128813943141057895*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   43866893623003580699960446875*\/ 3 *cos (t)*sin (t)*sin(0.134872*pi)   977213859381525144675366525*\/ 3 *cos (t)*sin (t)*cos(0.134872*pi)   410758427682386469939605625*\/ 3 *cos (t)*sin (t)*sin(0.134872*pi)   136919475894128823313201875*\/ 3 *cos (t)*sin(t)*sin(0.134872*pi)   77958037589091405456728199*\/ 3 *sin (t)*cos(t)*sin(0.134872*pi)   2106453475294289589433875*\/ 3 *cos (t)*sin (t)*cos(0.134872*pi)   84258139011771583577355*\/ 3 *sin (t)*cos(t)*sin(0.134872*pi)   63218891815554909646875*\/ 3 *cos (t)*sin(t)*sin(0.134872*pi)   101150226904887855435*\/ 3 *cos(t)*sin(t)*sin(0.134872*pi)   2528755672622196385875*\/ 3 *cos (t)*sin (t)*cos(0.134872*pi)   657213484291818351903369*\/ 3 *sin (t)*cos(t)*sin(0.134872*pi)   52661336882357239735846875*\/ 3 *cos (t)*sin (t)*sin(0.134872*pi)   52661336882357239735846875*\/ 3 *cos (t)*sin(t)*sin(0.134872*pi)   2806217319787052591043808275*\/ 3 *cos (t)*sin (t)*cos(0.134872*pi)   5379104593647306976514245731*\/ 3 *sin (t)*cos(t)*sin(0.134872*pi)   48723773493182128410455124375*\/ 3 *cos (t)*sin (t)*sin(0.134872*pi)   48723773493182128410455124375*\/ 3 *cos (t)*sin(t)*sin(0.134872*pi)   114053923419809309819897161875*\/ 3 *cos (t)*sin (t)*sin(0.134872*pi)   342161770259427929459691485625*\/ 3 *cos (t)*sin (t)*sin(0.134872*pi)   477912754281741504451842601485*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   1733012652384537708456000391845*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   50429105565443502904821053728125*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi)   105525948631533853711363708371375*\/ 3 *cos (t)*sin (t)*sin(0.134872*pi)   151287316696330508714463161184375*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   316577845894601561134091125114125*\/ 3 *cos (t)*sin (t)*sin(0.134872*pi)   399641890136375345822735532599439*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   560099265813525838929545836740375*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   2800496329067629194647729183701875*\/ 3 *cos (t)*sin (t)*sin(0.134872*pi)   4038152599164126823497064550367765*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   6972405718717550163163489382379375*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   6972405718717550163163489382379375*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi)   35544761099704524393605793485446875*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   57225597892922286308767360374762735*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   248813327697931670755240554398128125*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   327658070500912615773784314493119375*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   327658070500912615773784314493119375*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   518219843566840206915870938033244675*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   706676704853722194111986296314358875*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi)   1491010436015638627935603493274406777*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   1755991070533006766056785015951821244*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   2591099217834201034579354690166223375*\/ 3 *cos (t)*sin (t)*sin(0.134872*pi)   3533383524268610970559931481571794375*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   7910709019607590343461393746150290625*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi)   15100836305598470143379485304357250375*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   23118173228027823824329076295509214375*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   23732127058822771030384181238450871875*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   32887028534049474669661040298263604375*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   38401718742672083688008818369892931255*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   45302508916795410430138455913071751125*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   176818545296726375748773491189593111375*\/ 3 *cos  (t)*sin(t)*sin(0.134872*pi)   191123926994529411589378111957747059375*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   208063559052250414418961686659582929375*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   230209199738346322687627282087845230625*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   1237729817077084630241414438327151779625*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   1609072614275038842473779262593224715875*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   2102363196939823527483159231535217653125*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   2681787690458398070789632104322041193125*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   4591561222116574584023219761672915354425*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   7092773684430142692721876305246082139136*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   7652602036860957640038699602788192257375*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   11942420126932951702599593364399815819625*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   21389594389806429111521385076499282545875*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   36571490034757483183114180080402501206016*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   74157618381998841422112072989360566777275*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   85580889856285188962115770857995280449285*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   102114223598223618849297530126108491584375*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   155251461650128372133794713737197605655125*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   192506349508257862003692465688493542912875*\/ 3 *cos (t)*sin  (t)*sin(0.134872*pi)   238266521729188443981694236960919813696875*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   370788091909994207110560364946802833886375*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   722297870126151011203297134319912634332275*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   3895453582288844753265080871037224818049024*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   37580616728389272520348904257932334200153075*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   37580616728389272520348904257932334200153075*\/ 3 *cos  (t)*sin (t)*sin(0.134872*pi)   46481132538434701519476337541677988080779264*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   66414690580348962391273900662530272304941875*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   80016195702514892978277174539565335656267776*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   199244071741046887173821701987590816914825625*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   798156779456926447376290913170983888277733376*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   3368130523214574960486316765108970072742733383*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   11390641425154413021964962512453997508360667136*\/ 3 *sin  (t)*cos(t)*sin(0.134872*pi)   248411592963686202178136807256899335378934056258825238347776*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   45271121298177803258747223457587209199811349069446210991947776*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   6005123284710411385380216679544172280079408994806662303397707776*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   7383126070944446623136453996545458702777103516279028441721864192*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi)   590367796216652938650186647499794399087003697766948477449353035776*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   1112991567278288568928623218916900554366653440416895873739885903872*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi)   43683546785708580596017529358754177157271488773070559747691329355776*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   946119822322470075388570329392254797500378153111935122973303121117184*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   2465168951799524854569395802568186982351528833225632536073289152331776*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   4495579409175430267731780024319206719747730076352260370255317007597568*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi)   6107107478786025825253395055984577556766232669206774674149849048285184*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   23179935646900516847019973070110242538759264751242410512845926467371008*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi)   107311204408781790681072445983849517619105178377231842749822064473931776*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   1118550159940740246628137271923993234344822071516585299135187614940790784*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   2469037035874830232213651626477416917991462841198057192547556299754176512*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi)   3638849761949769267496964200526778599817366657097382034579404448413515776*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   29460917780817316751060489948630854355298688390828085854643323422357061632*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi)   42845098147716350404181916600768631611140391568172868007176366565279924224*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   50716289255136237024038448188414245263847277548119127783163862442089381888*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi)   58921835561634633502120979897261708710597376781656171709286646844714123264*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   96930942728353756408014071711705862298550860063410040013137439339027890176*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   207148152757465427395868282956347337999786056431162387190437814250487414784*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   505891960277401664624207030495167500108615112963296701852694907993548914688*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi)   1616361032327975223544598689939169681124970731865178213972305421444919066624*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   2043049012065245581645651711625789000223515272923388881973487458065554866176*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   7219676719790763017534122015781163197419263588319454017278563130766490861568*\/ 3 *cos   (t)*sin  (t)*sin(0.134872*pi)   14400377011235057126814270914587773972276020058086073516753002128004081516544*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   17146254148435678349117205150103157234783836643461945967402414231811809869824*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   34283839302279568659995583299473321382687651947802612481679855458440315928576*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   460418925343447888688627552652894001533081956886702319533259095953846436888576*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   502477290909919060992391933481896304186437267483656336550554530791922224594944*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   560723369336384100447403195973170604392289025238806319150500220380050739953664*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   4969880685132862595188827353635939770807432999140290847149236809524642710552576*\/ 3 *cos (t)*sin  (t)*cos(0.134872*pi)   10204648251090520504810788531306280352618453158306497610656922316117255707951104*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   10965064225060205821529985680747685896185623387222624737825270365939011164307456*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   43270057866658273942439960214916480320933465874628294264570664571105145725648896*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   131942297565738337078545497633467050237576330240799427110690786228227029235400704*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   285738569803107944598012001560615779501041449027256549087800958471800571092271104*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   304691155086755803496713368647650075316491991504169580274711215142088207966928896*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   622914277770306391416417538706046826127214513599367966299345963971873592410374144*\/ 3 *cos  (t)*sin  (t)*sin(0.134872*pi)   1153223909574821427967596066431111593618528948614347578711399137397833228777160704*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   1738680980964751604114053416238324294696344547790989780714436654656458675921616896*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   7110659334749979937153319532355811847153201576209795876629114551997108407767138304*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   8050169426441277884254201657329770698124240945906807847260440375389322775044816896*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   30257478537261468797601755118598327696728479799377927587343928882613822500315856896*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   31924575039056583100998700282653572099951521288313810504308299625180716359749730304*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   92298333271611791422176184883203638786279723748206421094039059164934579620094672896*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   106926201959221807820455466708085604149495942372773184020623815545898124785802543104*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   228264588094600507426832389863388074410333211309127161173820747646492840549045764096*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   272281344200971291557855537217040573605061531894009437660984113356622409144524079104*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   456829612659483787640995691853992502259187186212274201880383287871815412302674395136*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   535132468466348697089767275476517258678765887990991468885756998070514487732264239104*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   737792340677610913749814405573672898977672657423024306378185401327753542644988379136*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   821585924135991803735951267744241645369516078446603082229090543217269224799129829376*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   957929698062995973295142100307106129674750335283339460450390960793189286491073806336*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)   994974199141688881485110493785235024490366336242003331710103498784502298960698802176*\/ 3 *cos (t)*sin   (t)*cos(0.134872*pi)
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          8192                                                                       131072                                                                      8192                                                                    1048576                                                                   2097152                                                                    32768                                                                    524288                                                                   16384                                                                   524288                                                                 2097152                                                               134217728                                                               65536                                                               2097152                                                              2097152                                            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$$\frac{946119822322470075388570329392254797500378153111935122973303121117184 \sqrt{3} \sin^{198}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{46359871293801033694039946140220485077518529502484821025691852934742016 \sqrt{3} \sin^{196}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{1118550159940740246628137271923993234344822071516585299135187614940790784 \sqrt{3} \sin^{194}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{17715147553165929691575590847540578828397080538867873242552127639798153216 \sqrt{3} \sin^{192}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{207148152757465427395868282956347337999786056431162387190437814250487414784 \sqrt{3} \sin^{190}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{1907258757240348194940219342719595658390760609970106769373307608570167033856 \sqrt{3} \sin^{188}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{14400377011235057126814270914587773972276020058086073516753002128004081516544 \sqrt{3} \sin^{186}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{91689786400408419833141476584653137710870046034841956486773375573514105389056 \sqrt{3} \sin^{184}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{502477290909919060992391933481896304186437267483656336550554530791922224594944 \sqrt{3} \sin^{182}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{2407178588553918480362663474278553493307182840252654676124388061287334916653056 \sqrt{3} \sin^{180}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{10204648251090520504810788531306280352618453158306497610656922316117255707951104 \sqrt{3} \sin^{178}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{38659356170908496342506265776046214418392127875072036141158111397203560781316096 \sqrt{3} \sin^{176}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{131942297565738337078545497633467050237576330240799427110690786228227029235400704 \sqrt{3} \sin^{174}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{408424931464364755205328866107072702066396161528929189524124726612503346383159296 \sqrt{3} \sin^{172}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{1153223909574821427967596066431111593618528948614347578711399137397833228777160704 \sqrt{3} \sin^{170}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{2984723451924687042256013673732228632028769910803134971499702474158204550377373696 \sqrt{3} \sin^{168}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{7110659334749979937153319532355811847153201576209795876629114551997108407767138304 \sqrt{3} \sin^{166}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{15650194045428777437831271630454061480067096723342983605458806573510241347432349696 \sqrt{3} \sin^{164}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{31924575039056583100998700282653572099951521288313810504308299625180716359749730304 \sqrt{3} \sin^{162}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{60527353367926744750411797622347391905650230433670008930287097503592668448944029696 \sqrt{3} \sin^{160}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{106926201959221807820455466708085604149495942372773184020623815545898124785802543104 \sqrt{3} \sin^{158}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{176395056854469278732009497681793048393927749845630302855618112359066345810895568896 \sqrt{3} \sin^{156}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{272281344200971291557855537217040573605061531894009437660984113356622409144524079104 \sqrt{3} \sin^{154}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{393955168788500152166594017183217162819377232074578681086955079581559493018460880896 \sqrt{3} \sin^{152}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{535132468466348697089767275476517258678765887990991468885756998070514487732264239104 \sqrt{3} \sin^{150}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{683405785834982205089204403902124138019827305823006592952739436573508484050058215424 \sqrt{3} \sin^{148}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{821585924135991803735951267744241645369516078446603082229090543217269224799129829376 \sqrt{3} \sin^{146}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{930854647590004264343693711507435403625268478830726616617831584824272192120316493824 \sqrt{3} \sin^{144}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{994974199141688881485110493785235024490366336242003331710103498784502298960698802176 \sqrt{3} \sin^{142}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{1004252843200468068449691693923308505241290858352554799766446170587945993050808909824 \sqrt{3} \sin^{140}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{957929698062995973295142100307106129674750335283339460450390960793189286491073806336 \sqrt{3} \sin^{138}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{864177204637281286313297756331749987688590074535065879491375148038500565574446219264 \sqrt{3} \sin^{136}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{737792340677610913749814405573672898977672657423024306378185401327753542644988379136 \sqrt{3} \sin^{134}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{596455565872081555546081951375318400205442192819696425456560184154210956851873316864 \sqrt{3} \sin^{132}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{456829612659483787640995691853992502259187186212274201880383287871815412302674395136 \sqrt{3} \sin^{130}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{331629578127002269259045286791948801871478234663086667726128682616238612607301320704 \sqrt{3} \sin^{128}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{228264588094600507426832389863388074410333211309127161173820747646492840549045764096 \sqrt{3} \sin^{126}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{149021084517668384042477322941667316935924742003934851867033917348987283083418927104 \sqrt{3} \sin^{124}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{92298333271611791422176184883203638786279723748206421094039059164934579620094672896 \sqrt{3} \sin^{122}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{54245852113087254452441401569453305658499003423781900900000001107017014979124527104 \sqrt{3} \sin^{120}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{30257478537261468797601755118598327696728479799377927587343928882613822500315856896 \sqrt{3} \sin^{118}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{16019080815667652540433843803988622921182567156701315808854541751376373818383663104 \sqrt{3} \sin^{116}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{8050169426441277884254201657329770698124240945906807847260440375389322775044816896 \sqrt{3} \sin^{114}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{3840061584880494144531849537085403753125678328600389959456115007926274638535983104 \sqrt{3} \sin^{112}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{1738680980964751604114053416238324294696344547790989780714436654656458675921616896 \sqrt{3} \sin^{110}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{747158717192527791841712372855603558010586936054803514260484430262127007423791104 \sqrt{3} \sin^{108}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{304691155086755803496713368647650075316491991504169580274711215142088207966928896 \sqrt{3} \sin^{106}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{117891834902793675982178575060165214167853860493865918280730339519680357915951104 \sqrt{3} \sin^{104}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{43270057866658273942439960214916480320933465874628294264570664571105145725648896 \sqrt{3} \sin^{102}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{15061006984888194755779858337140389234543282336593154741553958885459738549551104 \sqrt{3} \sin^{100}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{946119822322470075388570329392254797500378153111935122973303121117184 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)}}{5} - \frac{946119822322470075388570329392254797500378153111935122973303121117184 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{101}{\left(t \right)}}{5} + 4730599111612350376942851646961273987501890765559675614866515605585920 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{99}{\left(t \right)} + 4730599111612350376942851646961273987501890765559675614866515605585920 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 57358514228299748320432076219405447098460425532411066830256501717729280 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 57358514228299748320432076219405447098460425532411066830256501717729280 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{97}{\left(t \right)} + 449406915603173285809570906461321028812679622728169183412318982530662400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{95}{\left(t \right)} + 449406915603173285809570906461321028812679622728169183412318982530662400 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 2557757328257122958689628166852127886640914884042744141530268584168652800 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 2557757328257122958689628166852127886640914884042744141530268584168652800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{93}{\left(t \right)} + 11270286501141386005341877375203165614188283899582028396258636098242084864 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{91}{\left(t \right)} + 11270286501141386005341877375203165614188283899582028396258636098242084864 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 40015511912297208290243101850787835358886593100909595502673614870088253440 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 40015511912297208290243101850787835358886593100909595502673614870088253440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{89}{\left(t \right)} + 117649293087767828982373728022131976769445375107743419035510443719429980160 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{87}{\left(t \right)} + 117649293087767828982373728022131976769445375107743419035510443719429980160 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 292125112931923515577836940163649711339893237784512361803526271599535718400 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 292125112931923515577836940163649711339893237784512361803526271599535718400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{85}{\left(t \right)} + 621702163419221840845140154707254513877208685541398103325453347250293964800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{83}{\left(t \right)} + 621702163419221840845140154707254513877208685541398103325453347250293964800 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 1147040491508464296359283585434884578103450024823879500635461425676792365056 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 1147040491508464296359283585434884578103450024823879500635461425676792365056 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{81}{\left(t \right)} + 1851199158920708466034390260456708512158785535466526671097067469427305349120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{79}{\left(t \right)} + 1851199158920708466034390260456708512158785535466526671097067469427305349120 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 2632173804090382350142648651586882415725773183241467610466142808091949793280 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 2632173804090382350142648651586882415725773183241467610466142808091949793280 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{77}{\left(t \right)} + 3316399355286290759463549362078963255887910509389117015839304599054843904000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{75}{\left(t \right)} + 3316399355286290759463549362078963255887910509389117015839304599054843904000 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 3719931336639647566989637386617641093917461082167776187617093738391666688000 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 3719931336639647566989637386617641093917461082167776187617093738391666688000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{73}{\left(t \right)} + 3728684116255270267147260062821447308256090402361112131587957488364352962560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{71}{\left(t \right)} + 3728684116255270267147260062821447308256090402361112131587957488364352962560 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 3349989635698094380640116462691144066011331220871311680723555555952348364800 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 3349989635698094380640116462691144066011331220871311680723555555952348364800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{69}{\left(t \right)} + 2704208501105690644613106060244658462924809539739492561547930388539847475200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{67}{\left(t \right)} + 2704208501105690644613106060244658462924809539739492561547930388539847475200 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 1964948250295293507010539464507043496942315874912334534051595759965437952000 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 1964948250295293507010539464507043496942315874912334534051595759965437952000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{65}{\left(t \right)} + 1286983649316215630322692514764847202675668877135564139261863889568006144000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{63}{\left(t \right)} + 1286983649316215630322692514764847202675668877135564139261863889568006144000 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 760526900267801174043816107943851893831153077082297433545057692241593630720 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 760526900267801174043816107943851893831153077082297433545057692241593630720 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{61}{\left(t \right)} + 405706031788429197726809677836232022929819453416415448274488280671374540800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{59}{\left(t \right)} + 405706031788429197726809677836232022929819453416415448274488280671374540800 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 195405614961035391562475640286506857197841362615773524474862799519167283200 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 195405614961035391562475640286506857197841362615773524474862799519167283200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{57}{\left(t \right)} + 84958963026537126766293756646307329216452766354684141076027304138768384000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{55}{\left(t \right)} + 84958963026537126766293756646307329216452766354684141076027304138768384000 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 33326830068797869627896481842342595424546027591434486260908736903118848000 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 33326830068797869627896481842342595424546027591434486260908736903118848000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{53}{\left(t \right)} + \frac{58921835561634633502120979897261708710597376781656171709286646844714123264 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{51}{\left(t \right)}}{5} + \frac{58921835561634633502120979897261708710597376781656171709286646844714123264 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)}}{5} - 3751520195582246675680779645225862430898221754549314466937429437878108160 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 3751520195582246675680779645225862430898221754549314466937429437878108160 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{49}{\left(t \right)} + 1073494363423839231397239837598876920865853409216546605455459260762685440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{47}{\left(t \right)} + 1073494363423839231397239837598876920865853409216546605455459260762685440 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 275562169182458731273845047597925995311547192097997454525396908454707200 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 275562169182458731273845047597925995311547192097997454525396908454707200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{45}{\left(t \right)} + 63303014095824662405307774411762504022516669190069352108068352452198400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{43}{\left(t \right)} + 63303014095824662405307774411762504022516669190069352108068352452198400 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 12977117889644055793088093754411313324615917183964217182154012252700672 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 12977117889644055793088093754411313324615917183964217182154012252700672 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{41}{\left(t \right)} + 2366094425881805404069357907536424589340910566501189668555430003998720 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{39}{\left(t \right)} + 2366094425881805404069357907536424589340910566501189668555430003998720 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 382206889107286121107711077435226674243258301528110371552037521326080 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 382206889107286121107711077435226674243258301528110371552037521326080 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{37}{\left(t \right)} + 54452813237808741813174576839482769057723367246202970166843880243200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{35}{\left(t \right)} + 54452813237808741813174576839482769057723367246202970166843880243200 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 6806601654726092726646822104935346132215420905775371270855485030400 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 6806601654726092726646822104935346132215420905775371270855485030400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{33}{\left(t \right)} + 741994378185525712619082145944600369577768960277930582493257269248 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{31}{\left(t \right)} + 741994378185525712619082145944600369577768960277930582493257269248 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 70045042211524237193858666121072300513526366692903603165053583360 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 70045042211524237193858666121072300513526366692903603165053583360 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{29}{\left(t \right)} + 5679327746880343556258810766573429771367002704830021878247587840 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{27}{\left(t \right)} + 5679327746880343556258810766573429771367002704830021878247587840 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 391719337380329298765728671293795559357868395388318571823104000 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 391719337380329298765728671293795559357868395388318571823104000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{25}{\left(t \right)} + 22722685396589089209613516872023449849258444120886071001088000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{23}{\left(t \right)} + 22722685396589089209613516872023449849258444120886071001088000 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 1093529234710849918212650499466128523995562623317642166927360 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 1093529234710849918212650499466128523995562623317642166927360 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{21}{\left(t \right)} + 42945546629818413489128481789699135915493364702429105356800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{19}{\left(t \right)} + 42945546629818413489128481789699135915493364702429105356800 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 1348659407709814709326079169504098480104779310236382003200 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 1348659407709814709326079169504098480104779310236382003200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{17}{\left(t \right)} + 33014918181390812957798755679414895473801207104929792000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{15}{\left(t \right)} + 33014918181390812957798755679414895473801207104929792000 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 609650477781364443822988386125559149374170017562624000 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 609650477781364443822988386125559149374170017562624000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{13}{\left(t \right)} + 8128673037084859250973178481674121991655600234168320 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{11}{\left(t \right)} + 8128673037084859250973178481674121991655600234168320 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 73629284756203435244322268855743858620068842700800 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 73629284756203435244322268855743858620068842700800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{9}{\left(t \right)} + 413813724041287873713573570445770381646312243200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{7}{\left(t \right)} + 413813724041287873713573570445770381646312243200 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 1243430661181754428225882122733685041004544000 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 1243430661181754428225882122733685041004544000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{5}{\left(t \right)} + 1492713878969693191147517554302142906368000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos^{3}{\left(t \right)} + 1492713878969693191147517554302142906368000 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - \frac{1492713878969693191147517554302142906368 \sin^{99}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{5} - \frac{1492713878969693191147517554302142906368 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{99}{\left(t \right)} \cos{\left(t \right)}}{5} + \frac{4969880685132862595188827353635939770807432999140290847149236809524642710552576 \sqrt{3} \sin^{98}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{23179935646900516847019973070110242538759264751242410512845926467371008 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{101}{\left(t \right)}}{5} + \frac{23179935646900516847019973070110242538759264751242410512845926467371008 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)}}{5} - 115899678234502584235099865350551212693796323756212052564229632336855040 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 115899678234502584235099865350551212693796323756212052564229632336855040 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{99}{\left(t \right)} + 1405283598593343833850585867375433453912280425544071137341284292084367360 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{97}{\left(t \right)} + 1405283598593343833850585867375433453912280425544071137341284292084367360 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 11010469432277745502334487208302365205910650756840144993601815072001228800 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 11010469432277745502334487208302365205910650756840144993601815072001228800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{95}{\left(t \right)} + 62665054542299512487895890087877133222702414659047231467491580312131993600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{93}{\left(t \right)} + 62665054542299512487895890087877133222702414659047231467491580312131993600 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 276122019277963957130875995692477557547612955539759695708336584406931079168 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 276122019277963957130875995692477557547612955539759695708336584406931079168 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{91}{\left(t \right)} + 980380041851281603110955995344301966292721530972285089815503564317162209280 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{89}{\left(t \right)} + 980380041851281603110955995344301966292721530972285089815503564317162209280 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 2882407680650311810068156336542233430851411690139713766370005871126034513920 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 2882407680650311810068156336542233430851411690139713766370005871126034513920 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{87}{\left(t \right)} + 7157065266832126131657005034009417927827384325720552864186393654188625100800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{85}{\left(t \right)} + 7157065266832126131657005034009417927827384325720552864186393654188625100800 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 15231703003770935100705933790327735589991612795764253531473607007632202137600 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 15231703003770935100705933790327735589991612795764253531473607007632202137600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{83}{\left(t \right)} + 28102492041957375260802447843154672163534525608185047765568804929081412943872 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{81}{\left(t \right)} + 28102492041957375260802447843154672163534525608185047765568804929081412943872 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 45354379393557357417842561381189358547890245618929903441878153000968981053440 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 45354379393557357417842561381189358547890245618929903441878153000968981053440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{79}{\left(t \right)} + 64488258200214367578494891963878619185281442989415956456420498798252769935360 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{77}{\left(t \right)} + 64488258200214367578494891963878619185281442989415956456420498798252769935360 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 81251784204514123606856959370934599769253807480033366888062962676843675648000 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 81251784204514123606856959370934599769253807480033366888062962676843675648000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{75}{\left(t \right)} + 91138317747671365391246115972132206800977796513110516596618796590595833856000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{73}{\left(t \right)} + 91138317747671365391246115972132206800977796513110516596618796590595833856000 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 91352760848254121545107871539125459052274214857847247223904958464926647582720 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 91352760848254121545107871539125459052274214857847247223904958464926647582720 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{71}{\left(t \right)} + 82074746074603312325682853335933029617277614911347136177727111120832534937600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{69}{\left(t \right)} + 82074746074603312325682853335933029617277614911347136177727111120832534937600 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 66253108277089420793021098475994132341657833723617567757924294519226263142400 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 66253108277089420793021098475994132341657833723617567757924294519226263142400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{67}{\left(t \right)} + 48141232132234690921758216880422565675086738935352196084264096119153229824000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{65}{\left(t \right)} + 48141232132234690921758216880422565675086738935352196084264096119153229824000 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 31531099408247282942905966611738756465553887489821321411915665294416150528000 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 31531099408247282942905966611738756465553887489821321411915665294416150528000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{63}{\left(t \right)} + 18632909056561128764073494644624371398863250388516287121853913459919043952640 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{61}{\left(t \right)} + 18632909056561128764073494644624371398863250388516287121853913459919043952640 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 9939797778816515344306837106987684561780576608702178482724962876448676249600 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 9939797778816515344306837106987684561780576608702178482724962876448676249600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{59}{\left(t \right)} + 4787437566545367093280653187019418001347113384086451349634138588219598438400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{57}{\left(t \right)} + 4787437566545367093280653187019418001347113384086451349634138588219598438400 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 2081494594150159605774197037834529565803092775689761456362668951399825408000 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 2081494594150159605774197037834529565803092775689761456362668951399825408000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{55}{\left(t \right)} + 816507336685547805883463805137393587901377675990144913392264054126411776000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{53}{\left(t \right)} + 816507336685547805883463805137393587901377675990144913392264054126411776000 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - \frac{1443584971260048520801964007482911863409635731150576206877522847695496019968 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)}}{5} - \frac{1443584971260048520801964007482911863409635731150576206877522847695496019968 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{51}{\left(t \right)}}{5} + 91912244791765043554179101308033629557006432986458204439967021228013649920 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{49}{\left(t \right)} + 91912244791765043554179101308033629557006432986458204439967021228013649920 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 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57969313434104232399699268734642402438852308879279146879608035097968640 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 57969313434104232399699268734642402438852308879279146879608035097968640 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{39}{\left(t \right)} + 9364068783128509967138921397163053518959828387438704103024919272488960 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{37}{\left(t \right)} + 9364068783128509967138921397163053518959828387438704103024919272488960 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 1334093924326314174422777132567327841914222497531972769087675065958400 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 1334093924326314174422777132567327841914222497531972769087675065958400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{35}{\left(t \right)} + 166761740540789271802847141570915980239277812191496596135959383244800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{33}{\left(t \right)} + 166761740540789271802847141570915980239277812191496596135959383244800 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 18178862265545379959167512575642709054655339526809299271084803096576 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 18178862265545379959167512575642709054655339526809299271084803096576 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{31}{\left(t \right)} + 1716103534182343811249537319966271362581395983976138277543812792320 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{29}{\left(t \right)} + 1716103534182343811249537319966271362581395983976138277543812792320 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 139143529798568417128340863781049029398491566268335536017065902080 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 139143529798568417128340863781049029398491566268335536017065902080 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{27}{\left(t \right)} + 9597123765818067819760352446697991204267775687013805009666048000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{25}{\left(t \right)} + 9597123765818067819760352446697991204267775687013805009666048000 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 556705792216432685635531163364574521306831880961708739526656000 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 556705792216432685635531163364574521306831880961708739526656000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{23}{\left(t \right)} + 26791466250415822996209937236920148837891284271282233089720320 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{21}{\left(t \right)} + 26791466250415822996209937236920148837891284271282233089720320 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 1052165892430551130483647803847628829929587435209513081241600 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 1052165892430551130483647803847628829929587435209513081241600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{19}{\left(t \right)} + 33042155488890460378488939652850412762567093100791359078400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{17}{\left(t \right)} + 33042155488890460378488939652850412762567093100791359078400 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 808865495444074917466069514145664939108129574070779904000 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 808865495444074917466069514145664939108129574070779904000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{15}{\left(t \right)} + 14936436705643428873663215460076199159667165430284288000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{13}{\left(t \right)} + 14936436705643428873663215460076199159667165430284288000 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 199152489408579051648842872801015988795562205737123840 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 199152489408579051648842872801015988795562205737123840 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{11}{\left(t \right)} + 1803917476526984163485895586965724536191686646169600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{9}{\left(t \right)} + 1803917476526984163485895586965724536191686646169600 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 10138436239011552905982552475921374350334649958400 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 10138436239011552905982552475921374350334649958400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{7}{\left(t \right)} + 30464051198952983491534112006975283504611328000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{5}{\left(t \right)} + 30464051198952983491534112006975283504611328000 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 36571490034757483183114180080402501206016000 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 36571490034757483183114180080402501206016000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos^{3}{\left(t \right)} + \frac{36571490034757483183114180080402501206016 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{97}{\left(t \right)} \cos{\left(t \right)}}{5} + \frac{36571490034757483183114180080402501206016 \sin^{97}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{5} - \frac{1554194454135740766259718124015253055649077127973839674240473592513302232039424 \sqrt{3} \sin^{96}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{275320868295838791938073965853146146072610042555573120785231208245100544 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)}}{5} - \frac{275320868295838791938073965853146146072610042555573120785231208245100544 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{101}{\left(t \right)}}{5} + 1376604341479193959690369829265730730363050212777865603926156041225502720 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{99}{\left(t \right)} + 1376604341479193959690369829265730730363050212777865603926156041225502720 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 16691327640435226761245734179846985105651983829931620447604641999859220480 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 16691327640435226761245734179846985105651983829931620447604641999859220480 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{97}{\left(t \right)} + 130777412440523426170585133780244419384489770213897232372984823916422758400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{95}{\left(t \right)} + 130777412440523426170585133780244419384489770213897232372984823916422758400 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 744307382522822780978681796553969215012506231256438545185308157993077964800 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 744307382522822780978681796553969215012506231256438545185308157993077964800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{93}{\left(t \right)} + 3279653371832143327554486316184121193728790614778370263311263104588446695424 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{91}{\left(t \right)} + 3279653371832143327554486316184121193728790614778370263311263104588446695424 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 11644513966478487612460742638579260089435998592364692291278021927195681751040 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 11644513966478487612460742638579260089435998592364692291278021927195681751040 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{89}{\left(t \right)} + 34235944288540438233870754854440405239908604156353334939333539122354124226560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{87}{\left(t \right)} + 34235944288540438233870754854440405239908604156353334939333539122354124226560 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 85008407863189743033150549587622065999908932195293097284826145035464894054400 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 85008407863189743033150549587622065999908932195293097284826145035464894054400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{85}{\left(t \right)} + 180915329554993555685935785019811063538267727492546848067706924049835543756800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{83}{\left(t \right)} + 180915329554993555685935785019811063538267727492546848067706924049835543756800 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 333788783028963110240551523361551412228103957223748934684919274871946578231296 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 333788783028963110240551523361551412228103957223748934684919274871946578231296 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{81}{\left(t \right)} + 538698955245926163616007565792902177038206590820759261289246633603345856593920 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{79}{\left(t \right)} + 538698955245926163616007565792902177038206590820759261289246633603345856593920 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 765962576990301263891510757611782782976199996323267074645647557154757389844480 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 765962576990301263891510757611782782976199996323267074645647557154757389844480 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{77}{\left(t \right)} + 965072212388310611003892864364978307463381958232233051609237638324959576064000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{75}{\left(t \right)} + 965072212388310611003892864364978307463381958232233051609237638324959576064000 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 1082500018962137441993984479505733558329981174910822870596574277871975006208000 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 1082500018962137441993984479505733558329981174910822870596574277871975006208000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{73}{\left(t \right)} + 1085047077830283647739852678281041166702522307087083630292095629114026712104960 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{71}{\left(t \right)} + 1085047077830283647739852678281041166702522307087083630292095629114026712104960 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 974846983988145464766273890643122923209297385273551699090554666782133374156800 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 974846983988145464766273890643122923209297385273551699090554666782133374156800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{69}{\left(t \right)} + 786924673821755977582413863531195612711119576064192335410447743065095615283200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{67}{\left(t \right)} + 786924673821755977582413863531195612711119576064192335410447743065095615283200 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 571799940835930410540066984171549657610213919599489349409014366149942444032000 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 571799940835930410540066984171549657610213919599489349409014366149942444032000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{65}{\left(t \right)} + 374512241951018748423903521796570535978619643246449164525202391864289787904000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{63}{\left(t \right)} + 374512241951018748423903521796570535978619643246449164525202391864289787904000 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 221313327977930141646750487411660901104865545430948553161611788442303746539520 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 221313327977930141646750487411660901104865545430948553161611788442303746539520 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{61}{\left(t \right)} + 118060455250432896538501616250343518672577460944176895447876089675369991372800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{59}{\left(t \right)} + 118060455250432896538501616250343518672577460944176895447876089675369991372800 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 56863033953661298944680411323373495444571836521190095622185074660077679411200 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 56863033953661298944680411323373495444571836521190095622185074660077679411200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{57}{\left(t \right)} + 24723058240722303888991483184075432801987755009213085053123945504381599744000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{55}{\left(t \right)} + 24723058240722303888991483184075432801987755009213085053123945504381599744000 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 9698107550020180061717876216121695268542894029107435501924442438807584768000 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 9698107550020180061717876216121695268542894029107435501924442438807584768000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{53}{\left(t \right)} + \frac{17146254148435678349117205150103157234783836643461945967402414231811809869824 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{51}{\left(t \right)}}{5} + \frac{17146254148435678349117205150103157234783836643461945967402414231811809869824 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)}}{5} - 1091692376914433782623106876760725967391382530573850509878791966422529474560 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 1091692376914433782623106876760725967391382530573850509878791966422529474560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{49}{\left(t \right)} + 312386859756337216336596792741273183971963342082015062187538644881941463040 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{47}{\left(t \right)} + 312386859756337216336596792741273183971963342082015062187538644881941463040 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 80188591232095490800688908850996464635660232900517259266890500360319795200 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 80188591232095490800688908850996464635660232900517259266890500360319795200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{45}{\left(t \right)} + 18421177101884976759944562353822888670552350734310181463447890563589734400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{43}{\left(t \right)} + 18421177101884976759944562353822888670552350734310181463447890563589734400 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 3776341305886420235788635282533692177463231900533587200006817565535895552 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 3776341305886420235788635282533692177463231900533587200006817565535895552 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{41}{\left(t \right)} + 688533477931605372584183151093099555498204974851846193549630131163627520 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{39}{\left(t \right)} + 688533477931605372584183151093099555498204974851846193549630131163627520 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 111222204730220261242343923533650962204788165744680118121642918705889280 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 111222204730220261242343923533650962204788165744680118121642918705889280 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{37}{\left(t \right)} + 15845768652202343867633801860289485795797499868645064318551569150771200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{35}{\left(t \right)} + 15845768652202343867633801860289485795797499868645064318551569150771200 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 1980721081525292983454225232536185724474687483580633039818946143846400 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 1980721081525292983454225232536185724474687483580633039818946143846400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{33}{\left(t \right)} + 215920364051987982372152904469878707547130767440877799505537865351168 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{31}{\left(t \right)} + 215920364051987982372152904469878707547130767440877799505537865351168 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 20383107283553553023412871841232039449436172707634948521030592757760 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 20383107283553553023412871841232039449436172707634948521030592757760 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{29}{\left(t \right)} + 1652684374342179974871313933072868063467797787105536366570048061440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{27}{\left(t \right)} + 1652684374342179974871313933072868063467797787105536366570048061440 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 113990327177675825940827043346494507773139703058000704400523264000 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 113990327177675825940827043346494507773139703058000704400523264000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{25}{\left(t \right)} + 6612301450407424959997533409758823906134207239177846661316608000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{23}{\left(t \right)} + 6612301450407424959997533409758823906134207239177846661316608000 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 318217007300857326199881295344643400482708723385433870575861760 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 318217007300857326199881295344643400482708723385433870575861760 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{21}{\left(t \right)} + 12497154069277158325336388200802448551408569128406869658828800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{19}{\left(t \right)} + 12497154069277158325336388200802448551408569128406869658828800 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 392459887643556080413889038325692657710490779278787162931200 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 392459887643556080413889038325692657710490779278787162931200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{17}{\left(t \right)} + 9607341190784726570719437902709734582876151267534569472000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{15}{\left(t \right)} + 9607341190784726570719437902709734582876151267534569472000 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 177408289034377053152489620362537712467883475110723584000 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 177408289034377053152489620362537712467883475110723584000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{13}{\left(t \right)} + 2365443853791694042033194938167169499571779668142981120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{11}{\left(t \right)} + 2365443853791694042033194938167169499571779668142981120 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 21426121864055199656097780237021462858440033225932800 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 21426121864055199656097780237021462858440033225932800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{9}{\left(t \right)} + 120419793696014771250649908999719181059076862771200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{7}{\left(t \right)} + 120419793696014771250649908999719181059076862771200 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 361838322403890538613731697715502346932322304000 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 361838322403890538613731697715502346932322304000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{5}{\left(t \right)} + 434379738780180718623927608301923585753088000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos^{3}{\left(t \right)} + 434379738780180718623927608301923585753088000 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - \frac{434379738780180718623927608301923585753088 \sin^{95}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{5} - \frac{434379738780180718623927608301923585753088 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{95}{\left(t \right)} \cos{\left(t \right)}}{5} + \frac{460418925343447888688627552652894001533081956886702319533259095953846436888576 \sqrt{3} \sin^{94}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + 422442500666982888660996652073641767083918845364479032407579843578822656 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{101}{\left(t \right)} + 422442500666982888660996652073641767083918845364479032407579843578822656 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 10561062516674572216524916301841044177097971134111975810189496089470566400 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 10561062516674572216524916301841044177097971134111975810189496089470566400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{99}{\left(t \right)} + 128052883014679188125364610159822660647312900001107706698547640084830617600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{97}{\left(t \right)} + 128052883014679188125364610159822660647312900001107706698547640084830617600 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 1003300939084084360569867048674899196824307257740637701968002128499703808000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 1003300939084084360569867048674899196824307257740637701968002128499703808000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{95}{\left(t \right)} + 5710193235334027005274594882497375506925842478625426295966324614156517376000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{93}{\left(t \right)} + 5710193235334027005274594882497375506925842478625426295966324614156517376000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 25160914613798144256925741240141067233675343805816878394647405089325454458880 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 25160914613798144256925741240141067233675343805816878394647405089325454458880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{91}{\left(t \right)} + 89334630344203517507967724881883842438714319097780671959718845197472025804800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{89}{\left(t \right)} + 89334630344203517507967724881883842438714319097780671959718845197472025804800 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 262652046818441678203149347809409638137786799928037182996777065603627430707200 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 262652046818441678203149347809409638137786799928037182996777065603627430707200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{87}{\left(t \right)} + 652169314620519248527520968915347980566311653353923847726372401345963491328000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{85}{\left(t \right)} + 652169314620519248527520968915347980566311653353923847726372401345963491328000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 1387950079833412759686775395383945702230868390471171265674074597736281276416000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 1387950079833412759686775395383945702230868390471171265674074597736281276416000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{83}{\left(t \right)} + 2560767897292646541622100604483379820615952180419310985168667632823438954987520 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{81}{\left(t \right)} + 2560767897292646541622100604483379820615952180419310985168667632823438954987520 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 4132802122290481650421776256469601753394488707929020793224203125496459191910400 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 4132802122290481650421776256469601753394488707929020793224203125496459191910400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{79}{\left(t \right)} + 5876328017631778596693463114667714993107788631586576440365663819065277913497600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{77}{\left(t \right)} + 5876328017631778596693463114667714993107788631586576440365663819065277913497600 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 7403861560676644120502373950841285468769760212211203737861247517389939015680000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 7403861560676644120502373950841285468769760212211203737861247517389939015680000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{75}{\left(t \right)} + 8304746709048013193304365465623883742170731865939560338855161770959395880960000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{73}{\left(t \right)} + 8304746709048013193304365465623883742170731865939560338855161770959395880960000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 8324287289539890871406258090248881115681721823271182833770115092773417988915200 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 8324287289539890871406258090248881115681721823271182833770115092773417988915200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{71}{\left(t \right)} + 7478851861695995704779060002957979127370296950595203327215337778663617724416000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{69}{\left(t \right)} + 7478851861695995704779060002957979127370296950595203327215337778663617724416000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 6037145478718454364098759279496200018479637297468417143655754592415209488384000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 6037145478718454364098759279496200018479637297468417143655754592415209488384000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{67}{\left(t \right)} + 4386746968784242754401029354511974606923720190741786847270187534122840227840000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{65}{\left(t \right)} + 4386746968784242754401029354511974606923720190741786847270187534122840227840000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 2873190997098451394695411039212521379973430768205146940902111133460573716480000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 2873190997098451394695411039212521379973430768205146940902111133460573716480000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{63}{\left(t \right)} + 1697876304847866121052819460984649352978049244586229020389341297929357780582400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{61}{\left(t \right)} + 1697876304847866121052819460984649352978049244586229020389341297929357780582400 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 905738715967668183925102605769387991190821929752147488272795086598843662336000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 905738715967668183925102605769387991190821929752147488272795086598843662336000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{59}{\left(t \right)} + 436243035400511511663226866939626558694180842039714393390131199926540959744000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{57}{\left(t \right)} + 436243035400511511663226866939626558694180842039714393390131199926540959744000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 189670884956744135505750811712881112475730800886832344952230956489800417280000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 189670884956744135505750811712881112475730800886832344952230956489800417280000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{55}{\left(t \right)} + 74402148128591243944278895713029844285299006597877490577478755136212828160000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{53}{\left(t \right)} + 74402148128591243944278895713029844285299006597877490577478755136212828160000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 26308599578269863858697017524127352939281728733009480668196487816164856037376 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 26308599578269863858697017524127352939281728733009480668196487816164856037376 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{51}{\left(t \right)} + 8375268836637365703457340557966737876980280067031344547437811220062876467200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{49}{\left(t \right)} + 8375268836637365703457340557966737876980280067031344547437811220062876467200 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 2396576166343721084094337937439492725833017736075940296679312799652695244800 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 2396576166343721084094337937439492725833017736075940296679312799652695244800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{47}{\left(t \right)} + 615192542699839117568859068762369784533029106358779317227948598125133824000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{45}{\left(t \right)} + 615192542699839117568859068762369784533029106358779317227948598125133824000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 141323978968928558819849606374259790230268463966829828581262596849532928000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 141323978968928558819849606374259790230268463966829828581262596849532928000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{43}{\left(t \right)} + 28971415688630354558069169306723256997205035113200114859158832354154250240 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{41}{\left(t \right)} + 28971415688630354558069169306723256997205035113200114859158832354154250240 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 5282305805781130564584841528575067895703582839713905935049997483927142400 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 5282305805781130564584841528575067895703582839713905935049997483927142400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{39}{\left(t \right)} + 853276879932016265372964980374143550248074158161506404489923766360473600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{37}{\left(t \right)} + 853276879932016265372964980374143550248074158161506404489923766360473600 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 121565905553408016097912242794145281921367417377148130897478962642944000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 121565905553408016097912242794145281921367417377148130897478962642944000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{35}{\left(t \right)} + 15195738194176002012239030349268160240170927172143516362184870330368000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{33}{\left(t \right)} + 15195738194176002012239030349268160240170927172143516362184870330368000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 1656502449299186153422100890821320325082369203820480025416196853596160 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 1656502449299186153422100890821320325082369203820480025416196853596160 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{31}{\left(t \right)} + 156375556737227859535289472115293910896447613641907294065982124851200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{29}{\left(t \right)} + 156375556737227859535289472115293910896447613641907294065982124851200 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 12679099194910366989347795036375181964576833538533023843187739852800 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 12679099194910366989347795036375181964576833538533023843187739852800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{27}{\left(t \right)} + 874513420701585159494489258663398586266441192704421211595079680000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{25}{\left(t \right)} + 874513420701585159494489258663398586266441192704421211595079680000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 50728395147885141660462176416792351788469476499878153509928960000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 50728395147885141660462176416792351788469476499878153509928960000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{23}{\left(t \right)} + 2441304016491972442409742240058131929820093556556636137665331200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{21}{\left(t \right)} + 2441304016491972442409742240058131929820093556556636137665331200 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 95875932851069608114479335595503320931338936698172977709056000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 95875932851069608114479335595503320931338936698172977709056000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{19}{\left(t \right)} + 3010882127712161338570471745917899856833919810102722822144000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{17}{\left(t \right)} + 3010882127712161338570471745917899856833919810102722822144000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 73705804839954989928285722054293754145261194861755760640000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 73705804839954989928285722054293754145261194861755760640000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{15}{\left(t \right)} + 1361044691646896120834821572025310800977834564208558080000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{13}{\left(t \right)} + 1361044691646896120834821572025310800977834564208558080000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 18147262555291948277797620960337477346371127522780774400 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 18147262555291948277797620960337477346371127522780774400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{11}{\left(t \right)} + 164377378218224169182949465220448164369303691329536000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{9}{\left(t \right)} + 164377378218224169182949465220448164369303691329536000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 923839138922175178065552996020182377025392082944000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 923839138922175178065552996020182377025392082944000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{7}{\left(t \right)} + 2775958951088266761014281839002951854042644480000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{5}{\left(t \right)} + 2775958951088266761014281839002951854042644480000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 3332483734799840049236832939979534038466560000 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 3332483734799840049236832939979534038466560000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos^{3}{\left(t \right)} + 666496746959968009847366587995906807693312 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{93}{\left(t \right)} \cos{\left(t \right)} + 666496746959968009847366587995906807693312 \sin^{93}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)} - \frac{129148332417115599089864058539940716779756281270406619730520974602577509351424 \sqrt{3} \sin^{92}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - 2353136741996553121994457913503957655709641693319324610207847097435160576 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 2353136741996553121994457913503957655709641693319324610207847097435160576 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{101}{\left(t \right)} + 58828418549913828049861447837598941392741042332983115255196177435879014400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{99}{\left(t \right)} + 58828418549913828049861447837598941392741042332983115255196177435879014400 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 713294574917705165104570055030887164386985138287420272469253651410033049600 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 713294574917705165104570055030887164386985138287420272469253651410033049600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{97}{\left(t \right)} + 5588699762241813664736837544571899432310399021633395949243636856408506368000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{95}{\left(t \right)} + 5588699762241813664736837544571899432310399021633395949243636856408506368000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 31807560756196572302818641806411162003422856931718194914249917577293725696000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 31807560756196572302818641806411162003422856931718194914249917577293725696000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{93}{\left(t \right)} + 140154157184672475431156668001723288575082188543339330432684373661633195540480 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{91}{\left(t \right)} + 140154157184672475431156668001723288575082188543339330432684373661633195540480 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 497621808089196156118601467506118591084400855599356399275621379889043393740800 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 497621808089196156118601467506118591084400855599356399275621379889043393740800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{89}{\left(t \right)} + 1463053979543350910615980351469602124939390533974144620911734748245205922611200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{87}{\left(t \right)} + 1463053979543350910615980351469602124939390533974144620911734748245205922611200 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 3632786885347111126563456647161274297998282881573028933038308766872437260288000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 3632786885347111126563456647161274297998282881573028933038308766872437260288000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{85}{\left(t \right)} + 7731315679072057012942741069599635044457884081296446190825118657702879297536000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{83}{\left(t \right)} + 7731315679072057012942741069599635044457884081296446190825118657702879297536000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 14264277427887945188879357273411326657024796129991943222072343923461812303953920 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 14264277427887945188879357273411326657024796129991943222072343923461812303953920 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{81}{\left(t \right)} + 23020999321821198568365050553615828516955237880885873637256693972491995342438400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{79}{\left(t \right)} + 23020999321821198568365050553615828516955237880885873637256693972491995342438400 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 32732983410714516714394056255922506172545728861884601577974361742137055877529600 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 32732983410714516714394056255922506172545728861884601577974361742137055877529600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{77}{\left(t \right)} + 41241822599706619202485879898045597962756554932082720821055230311711144673280000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{75}{\left(t \right)} + 41241822599706619202485879898045597962756554932082720821055230311711144673280000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 46260034402744010990828223257733039907560404846991457200029143302297259868160000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 46260034402744010990828223257733039907560404846991457200029143302297259868160000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{73}{\left(t \right)} + 46368881542515173369630172018339470589695841093690260628735094227714429891379200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{71}{\left(t \right)} + 46368881542515173369630172018339470589695841093690260628735094227714429891379200 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 41659542010853476074277107672726868107929857232612343533629186220212183105536000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 41659542010853476074277107672726868107929857232612343533629186220212183105536000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{69}{\left(t \right)} + 33628786924423890325018870049068676665437354633554542370519945503062846603264000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{67}{\left(t \right)} + 33628786924423890325018870049068676665437354633554542370519945503062846603264000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 24435551474555977217874483826304983552629785124991359547684716498668633456640000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 24435551474555977217874483826304983552629785124991359547684716498668633456640000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{65}{\left(t \right)} + 16004571726024967534514281804363497999383251076017732569243790923104602030080000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{63}{\left(t \right)} + 16004571726024967534514281804363497999383251076017732569243790923104602030080000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 9457701604347879252427033403766054599010539932734228840137502698622125762150400 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 9457701604347879252427033403766054599010539932734228840137502698622125762150400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{61}{\left(t \right)} + 5045247691288651680770298108699794044680125280572509055769553880820121337856000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{59}{\left(t \right)} + 5045247691288651680770298108699794044680125280572509055769553880820121337856000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 2430010033129411779811568407249638565226179221674346581930965199590810189824000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 2430010033129411779811568407249638565226179221674346581930965199590810189824000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{57}{\left(t \right)} + 1056526101360613817309377568369408071837469226814933296491723999822091386880000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{55}{\left(t \right)} + 1056526101360613817309377568369408071837469226814933296491723999822091386880000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 414443215747543413533366036276486554495454622689739459232362128219685519360000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 414443215747543413533366036276486554495454622689739459232362128219685519360000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{53}{\left(t \right)} + 146547121088331351025398230427365645669592754583091872784563248538480799645696 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{51}{\left(t \right)} + 146547121088331351025398230427365645669592754583091872784563248538480799645696 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 46652864691581576145039717326799094580366716310885536424399682811756491571200 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 46652864691581576145039717326799094580366716310885536424399682811756491571200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{49}{\left(t \right)} + 13349678176586508851244241792143424324366731607985511183846484579315403980800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{47}{\left(t \right)} + 13349678176586508851244241792143424324366731607985511183846484579315403980800 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 3426814710507697584582785281465387940406638694014137915496307425493909504000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 3426814710507697584582785281465387940406638694014137915496307425493909504000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{45}{\left(t \right)} + 787218726600359862801193510506618987767042303190231779519064309013413888000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{43}{\left(t \right)} + 787218726600359862801193510506618987767042303190231779519064309013413888000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 161379838953073771874244669653856892492243672153997514801408183347749847040 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 161379838953073771874244669653856892492243672153997514801408183347749847040 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{41}{\left(t \right)} + 29424094058765203848039000077140807887786363786843866653833189109687910400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{39}{\left(t \right)} + 29424094058765203848039000077140807887786363786843866653833189109687910400 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 4753018870246309353210343992240346494741225584134016143760278479804825600 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 4753018870246309353210343992240346494741225584134016143760278479804825600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{37}{\left(t \right)} + 677160083277968089670401789939262390702616942108645447889863284097024000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{35}{\left(t \right)} + 677160083277968089670401789939262390702616942108645447889863284097024000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 84645010409746011208800223742407798837827117763580680986232910512128000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 84645010409746011208800223742407798837827117763580680986232910512128000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{33}{\left(t \right)} + 9227236299611872870234046368403135873310384705656267641576159036047360 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{31}{\left(t \right)} + 9227236299611872870234046368403135873310384705656267641576159036047360 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 871060718387839561317667137642223113040368347864686723976916054835200 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 871060718387839561317667137642223113040368347864686723976916054835200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{29}{\left(t \right)} + 70626544734149153620351389538558630787056893070109734376506707148800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{27}{\left(t \right)} + 70626544734149153620351389538558630787056893070109734376506707148800 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 4871313038751798583746647198648462437562285706236346280213217280000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 4871313038751798583746647198648462437562285706236346280213217280000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{25}{\left(t \right)} + 282573013597203953155543217071663647071708880815727526973276160000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{23}{\left(t \right)} + 282573013597203953155543217071663647071708880815727526973276160000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 13598826279365440245610517321573813015325989889256887235588915200 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 13598826279365440245610517321573813015325989889256887235588915200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{21}{\left(t \right)} + 534058907209473676450185674059327092375348920826541664894976000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{19}{\left(t \right)} + 534058907209473676450185674059327092375348920826541664894976000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 16771554352021648706255830897183301546270193942212823220224000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 16771554352021648706255830897183301546270193942212823220224000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{17}{\left(t \right)} + 410564366022561779834904061130558177387275249503373885440000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{15}{\left(t \right)} + 410564366022561779834904061130558177387275249503373885440000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 7581444258939351048087717037922239071071844095942983680000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 7581444258939351048087717037922239071071844095942983680000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{13}{\left(t \right)} + 101085923452524680641169560505629854280957921279239782400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{11}{\left(t \right)} + 101085923452524680641169560505629854280957921279239782400 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 915633364606201817401898192985777665588386968109056000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 915633364606201817401898192985777665588386968109056000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{9}{\left(t \right)} + 5146072703527428921568275673143672147024254337024000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{7}{\left(t \right)} + 5146072703527428921568275673143672147024254337024000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 15462958844733860942212366806321130249471918080000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 15462958844733860942212366806321130249471918080000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{5}{\left(t \right)} + 18562975804002234024264545985979748198645760000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos^{3}{\left(t \right)} + 18562975804002234024264545985979748198645760000 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 3712595160800446804852909197195949639729152 \sin^{91}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)} - 3712595160800446804852909197195949639729152 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{91}{\left(t \right)} \cos{\left(t \right)} + \frac{34283839302279568659995583299473321382687651947802612481679855458440315928576 \sqrt{3} \sin^{90}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{50716289255136237024038448188414245263847277548119127783163862442089381888 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{101}{\left(t \right)}}{5} + \frac{50716289255136237024038448188414245263847277548119127783163862442089381888 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)}}{5} - 253581446275681185120192240942071226319236387740595638915819312210446909440 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 253581446275681185120192240942071226319236387740595638915819312210446909440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{99}{\left(t \right)} + 3074675036092634369582330921422613619120741201354722121854309160551668776960 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{97}{\left(t \right)} + 3074675036092634369582330921422613619120741201354722121854309160551668776960 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 24090237396189712586418262889496766500327456835356585697002834659992456396800 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 24090237396189712586418262889496766500327456835356585697002834659992456396800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{95}{\left(t \right)} + 137107327680657856400044566523424956214754314879353692814582539451597691289600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{93}{\left(t \right)} + 137107327680657856400044566523424956214754314879353692814582539451597691289600 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 604138182811825038832196374175849333384170065352604798022992115941460984987648 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 604138182811825038832196374175849333384170065352604798022992115941460984987648 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{91}{\left(t \right)} + 2145011899079219220321761062565848032095391056504594163193336369100665997230080 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{89}{\left(t \right)} + 2145011899079219220321761062565848032095391056504594163193336369100665997230080 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 6306532680242128398918357409755811264870320249078023392245846099014861319045120 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 6306532680242128398918357409755811264870320249078023392245846099014861319045120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{87}{\left(t \right)} + 15659223468943600066607742073816229737161019368464793137675657263518558506188800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{85}{\left(t \right)} + 15659223468943600066607742073816229737161019368464793137675657263518558506188800 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 33326039690315866808421604926326847902163195066219944369925116740308727077273600 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 33326039690315866808421604926326847902163195066219944369925116740308727077273600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{83}{\left(t \right)} + 61486543228632774261537861089073034379491094897175797362511840385869601457569792 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{81}{\left(t \right)} + 61486543228632774261537861089073034379491094897175797362511840385869601457569792 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 99232623392481903302584086333744018712559683286555423731122275597215495712931840 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 99232623392481903302584086333744018712559683286555423731122275597215495712931840 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{79}{\left(t \right)} + 141096386386185206258361747755792276606920799673070993117689485614790782966824960 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{77}{\left(t \right)} + 141096386386185206258361747755792276606920799673070993117689485614790782966824960 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 177773961627156426983347029665786024902619044680924991328653861185744355196928000 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 177773961627156426983347029665786024902619044680924991328653861185744355196928000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{75}{\left(t \right)} + 199405095662354447376254288674122945706799850366768439193809833497797135958016000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{73}{\left(t \right)} + 199405095662354447376254288674122945706799850366768439193809833497797135958016000 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 199874284122736457840669004647473823226109967661749070815442327223674305689681920 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 199874284122736457840669004647473823226109967661749070815442327223674305689681920 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{71}{\left(t \right)} + 179574552141521036341226058862964763054708174071102680810748965865019884018073600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{69}{\left(t \right)} + 179574552141521036341226058862964763054708174071102680810748965865019884018073600 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 144957771005806137769423445106248664152595754973058790533978080878991954568806400 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 144957771005806137769423445106248664152595754973058790533978080878991954568806400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{67}{\left(t \right)} + 105330087671901817586522117124967271208441021144041702471335699012682162110464000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{65}{\left(t \right)} + 105330087671901817586522117124967271208441021144041702471335699012682162110464000 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 68988127597970781109301035777756341376288855953992226180056130347487731908608000 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 68988127597970781109301035777756341376288855953992226180056130347487731908608000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{63}{\left(t \right)} + 40767671652425858461777580829917887982050695815312281158276919527218531574743040 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{61}{\left(t \right)} + 40767671652425858461777580829917887982050695815312281158276919527218531574743040 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 21747672942975819613425653426448059592594855814678341666711919096798312503705600 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 21747672942975819613425653426448059592594855814678341666711919096798312503705600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{59}{\left(t \right)} + 10474622195436780250871971187039231499580214645006788687376107886657229186662400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{57}{\left(t \right)} + 10474622195436780250871971187039231499580214645006788687376107886657229186662400 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 4554183563233382717770422255234448478078354193481212472772220820285751820288000 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 4554183563233382717770422255234448478078354193481212472772220820285751820288000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{55}{\left(t \right)} + 1786468387880200293072772545844434148061985978857350616375287279010118107136000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{53}{\left(t \right)} + 1786468387880200293072772545844434148061985978857350616375287279010118107136000 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - \frac{3158476109772194118152661861052959573773591210619795889751507909289888813416448 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)}}{5} - \frac{3158476109772194118152661861052959573773591210619795889751507909289888813416448 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{51}{\left(t \right)}}{5} + 201098400960027951909408044687623465585896529782185549113596527488571403141120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{49}{\left(t \right)} + 201098400960027951909408044687623465585896529782185549113596527488571403141120 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 57544139087496582890363336988239286956086069404948071892475109844522715054080 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 57544139087496582890363336988239286956086069404948071892475109844522715054080 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{47}{\left(t \right)} + 14771374988977917483017374450106066964173879423145152383113030428839536230400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{45}{\left(t \right)} + 14771374988977917483017374450106066964173879423145152383113030428839536230400 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 3393327037293130145443039395289057636743198138488420144347966679378873548800 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 3393327037293130145443039395289057636743198138488420144347966679378873548800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{43}{\left(t \right)} + 695632042645091679815823076034256815532355618390126129591333169272669077504 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{41}{\left(t \right)} + 695632042645091679815823076034256815532355618390126129591333169272669077504 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 126833331758572115534441795069359587684721220744342772576259904635970519040 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 126833331758572115534441795069359587684721220744342772576259904635970519040 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{39}{\left(t \right)} + 20488012919640670317259324892867598837858230281082943272314042499790274560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{37}{\left(t \right)} + 20488012919640670317259324892867598837858230281082943272314042499790274560 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 2918916358971872976000310873475031042028648818878845378009463314081382400 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 2918916358971872976000310873475031042028648818878845378009463314081382400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{35}{\left(t \right)} + 364864544871484122000038859184378880253581102359855672251182914260172800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{33}{\left(t \right)} + 364864544871484122000038859184378880253581102359855672251182914260172800 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 39774244891484862530114126188011412001269500389118332623425653950119936 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 39774244891484862530114126188011412001269500389118332623425653950119936 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{31}{\left(t \right)} + 3754730149261266319574575714363056471474008825795675931247864467947520 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{29}{\left(t \right)} + 3754730149261266319574575714363056471474008825795675931247864467947520 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 304437579669832404289830463326734308497892607496946697128205227130880 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 304437579669832404289830463326734308497892607496946697128205227130880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{27}{\left(t \right)} + 20997923045988016000465810819437319665071115754776671597340131328000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{25}{\left(t \right)} + 20997923045988016000465810819437319665071115754776671597340131328000 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 1218038411242684408602052077798381720798576702042530761005858816000 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 1218038411242684408602052077798381720798576702042530761005858816000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{23}{\left(t \right)} + 58618098541054187163973756244047120313431503785796792873406955520 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{21}{\left(t \right)} + 58618098541054187163973756244047120313431503785796792873406955520 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 2302074973708204952698431931866257308712688242931250650257817600 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 2302074973708204952698431931866257308712688242931250650257817600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{19}{\left(t \right)} + 72294226391082791002229081604174336665238362308801590617702400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{17}{\left(t \right)} + 72294226391082791002229081604174336665238362308801590617702400 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 1769748504065674198340981189820669196211465417596122169344000 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 1769748504065674198340981189820669196211465417596122169344000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{15}{\left(t \right)} + 32680014989849097412546527652938493680041264813564755968000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{13}{\left(t \right)} + 32680014989849097412546527652938493680041264813564755968000 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 435733533197987965500620368705846582400550197514196746240 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 435733533197987965500620368705846582400550197514196746240 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{11}{\left(t \right)} + 3946861713749890991853445368712378463773099615164825600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{9}{\left(t \right)} + 3946861713749890991853445368712378463773099615164825600 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 22182281811520864667181146191077197307436127905382400 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 22182281811520864667181146191077197307436127905382400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{7}{\left(t \right)} + 66653491020194905850904886391457924601671057408000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{5}{\left(t \right)} + 66653491020194905850904886391457924601671057408000 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 80016195702514892978277174539565335656267776000 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 80016195702514892978277174539565335656267776000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos^{3}{\left(t \right)} + \frac{80016195702514892978277174539565335656267776 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{89}{\left(t \right)} \cos{\left(t \right)}}{5} + \frac{80016195702514892978277174539565335656267776 \sin^{89}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{5} - \frac{8608140059312166274230903267284494526277257422192612975390531666037465677824 \sqrt{3} \sin^{88}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{176068252414107716477069648143466475579101009644002220211763905428388315136 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)}}{5} - \frac{176068252414107716477069648143466475579101009644002220211763905428388315136 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{101}{\left(t \right)}}{5} + 880341262070538582385348240717332377895505048220011101058819527141941575680 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{99}{\left(t \right)} + 880341262070538582385348240717332377895505048220011101058819527141941575680 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 10674137802605280311422347418697655081982998709667634600338186766596041605120 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 10674137802605280311422347418697655081982998709667634600338186766596041605120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{97}{\left(t \right)} + 83632419896701165326608082868146575900072979580901054600587855078484449689600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{95}{\left(t \right)} + 83632419896701165326608082868146575900072979580901054600587855078484449689600 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 475986077302709366722140534136287347993774731442862642785376972067780637491200 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 475986077302709366722140534136287347993774731442862642785376972067780637491200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{93}{\left(t \right)} + 2097344967988569904314610816731051409159937921915603181789040005342873419513856 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{91}{\left(t \right)} + 2097344967988569904314610816731051409159937921915603181789040005342873419513856 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 7446690245384948995372354894510514976671588100418431509809490444501957486837760 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 7446690245384948995372354894510514976671588100418431509809490444501957486837760 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{89}{\left(t \right)} + 21893955652329942207592453560818933433716466396621932273080437343743082380656640 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{87}{\left(t \right)} + 21893955652329942207592453560818933433716466396621932273080437343743082380656640 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 54363048851403491011379359894560598981137014048677420148171873975122938927513600 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 54363048851403491011379359894560598981137014048677420148171873975122938927513600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{85}{\left(t \right)} + 115695719350422814203704791570475120908573645283082714674314501023979587973939200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{83}{\left(t \right)} + 115695719350422814203704791570475120908573645283082714674314501023979587973939200 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 213458602201530092205835340447526598076318375547287608574110254389242339811917824 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 213458602201530092205835340447526598076318375547287608574110254389242339811917824 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{81}{\left(t \right)} + 344499071990211997635566739435231894750340177083467233449534424856999894691348480 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{79}{\left(t \right)} + 344499071990211997635566739435231894750340177083467233449534424856999894691348480 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 489834617986082684138071457634470350348139939290554972561056760343546725264261120 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 489834617986082684138071457634470350348139939290554972561056760343546725264261120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{77}{\left(t \right)} + 617165632741085609988286319300725242481078172846189952165787695393062850134016000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{75}{\left(t \right)} + 617165632741085609988286319300725242481078172846189952165787695393062850134016000 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 692260952671790794260116839049526112932471820954135822591275982249444667031552000 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 692260952671790794260116839049526112932471820954135822591275982249444667031552000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{73}{\left(t \right)} + 693889801972195007893670055141407350845254107591674965703255455148855125071626240 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{71}{\left(t \right)} + 693889801972195007893670055141407350845254107591674965703255455148855125071626240 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 623416618959393952404469190166108166775032987289395476999018572985299526431539200 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 623416618959393952404469190166108166775032987289395476999018572985299526431539200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{69}{\left(t \right)} + 503239921328667407362643804109990929806351929498668638059448727590542991215820800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{67}{\left(t \right)} + 503239921328667407362643804109990929806351929498668638059448727590542991215820800 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 365667219258127231975904796685613328060509786170272435175310813239063250731008000 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 365667219258127231975904796685613328060509786170272435175310813239063250731008000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{65}{\left(t \right)} + 239501336590118420943282673852565454636123368719710600816577842589327977086976000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{63}{\left(t \right)} + 239501336590118420943282673852565454636123368719710600816577842589327977086976000 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 141530321091223104376171105079750398349034153202803983170046468855131001459834880 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 141530321091223104376171105079750398349034153202803983170046468855131001459834880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{61}{\left(t \right)} + 75499900039621728374268491859903015394150226392092540750748116297040950145843200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{59}{\left(t \right)} + 75499900039621728374268491859903015394150226392092540750748116297040950145843200 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 36364025281321304487956240397558183113790887012275340868585849719990877211852800 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 36364025281321304487956240397558183113790887012275340868585849719990877211852800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{57}{\left(t \right)} + 15810445774487523690415756694590514397300385657511017768950369443474294439936000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{55}{\left(t \right)} + 15810445774487523690415756694590514397300385657511017768950369443474294439936000 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 6201959403314596052901575611282627769335759834401937068905695908336544776192000 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 6201959403314596052901575611282627769335759834401937068905695908336544776192000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{53}{\left(t \right)} + \frac{10965064225060205821529985680747685896185623387222624737825270365939011164307456 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{51}{\left(t \right)}}{5} + \frac{10965064225060205821529985680747685896185623387222624737825270365939011164307456 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)}}{5} - 698139484183926825955001687053841747548201073250920753837627661033019161968640 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 698139484183926825955001687053841747548201073250920753837627661033019161968640 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{49}{\left(t \right)} + 199772028959784236346332294012362630957476106196610504903308980630452971765760 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{47}{\left(t \right)} + 199772028959784236346332294012362630957476106196610504903308980630452971765760 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 51280766362444614240687977257637728928816411188862071571161903510049311948800 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 51280766362444614240687977257637728928816411188862071571161903510049311948800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{45}{\left(t \right)} + 11780380033723313519108991375843927043870889991419018869917231840822401433600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{43}{\left(t \right)} + 11780380033723313519108991375843927043870889991419018869917231840822401433600 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 2414977906913279271417343232048005043993532448240898868333032527368592293888 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 2414977906913279271417343232048005043993532448240898868333032527368592293888 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{41}{\left(t \right)} + 440318552452631564213540841747883107600503812442239625362263995172394106880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{39}{\left(t \right)} + 440318552452631564213540841747883107600503812442239625362263995172394106880 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 71126824994071688796442833581976522206607118599929792424097331940761272320 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 71126824994071688796442833581976522206607118599929792424097331940761272320 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{37}{\left(t \right)} + 10133401118558381714554270727418636135269670899582941932876824767679692800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{35}{\left(t \right)} + 10133401118558381714554270727418636135269670899582941932876824767679692800 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 1266675139819797714319283840927329516908708862447867741609603095959961600 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 1266675139819797714319283840927329516908708862447867741609603095959961600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{33}{\left(t \right)} + 138081509747388937648871381340649547337740570499811516447991897933217792 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{31}{\left(t \right)} + 138081509747388937648871381340649547337740570499811516447991897933217792 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 13035038355059502577530175972912880445294520001609811123020068489789440 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 13035038355059502577530175972912880445294520001609811123020068489789440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{29}{\left(t \right)} + 1056895001761581290070014268074017333402258378508903604569194742415360 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{27}{\left(t \right)} + 1056895001761581290070014268074017333402258378508903604569194742415360 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 72897044900788183207290882241947290610300079162859437921262370816000 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 72897044900788183207290882241947290610300079162859437921262370816000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{25}{\left(t \right)} + 4228580158179390198657478667250410300219172309573183032002609152000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{23}{\left(t \right)} + 4228580158179390198657478667250410300219172309573183032002609152000 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 203500420112383153310391160861425995698047667398209433415125565440 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 203500420112383153310391160861425995698047667398209433415125565440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{21}{\left(t \right)} + 7991955316526002300325407309564063493722417694431540378022707200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{19}{\left(t \right)} + 7991955316526002300325407309564063493722417694431540378022707200 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 250978892329326426919086066987541402820100555674882117782732800 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 250978892329326426919086066987541402820100555674882117782732800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{17}{\left(t \right)} + 6143914132908847660197945336292323202450441999385119162368000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{15}{\left(t \right)} + 6143914132908847660197945336292323202450441999385119162368000 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 113452959840646334634337058766761650045249639193191120896000 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 113452959840646334634337058766761650045249639193191120896000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{13}{\left(t \right)} + 1512706131208617795124494116890155333936661855909214945280 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{11}{\left(t \right)} + 1512706131208617795124494116890155333936661855909214945280 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 13702048289933132202214620624005030198701647245554483200 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 13702048289933132202214620624005030198701647245554483200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{9}{\left(t \right)} + 77008701749925271309114688372569419021205564607692800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{7}{\left(t \right)} + 77008701749925271309114688372569419021205564607692800 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 231396339392804300808637885734884071578141720576000 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 231396339392804300808637885734884071578141720576000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{5}{\left(t \right)} + 277786721960149220658628914447639941870518272000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos^{3}{\left(t \right)} + 277786721960149220658628914447639941870518272000 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - \frac{277786721960149220658628914447639941870518272 \sin^{87}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{5} - \frac{277786721960149220658628914447639941870518272 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{87}{\left(t \right)} \cos{\left(t \right)}}{5} + \frac{2043049012065245581645651711625789000223515272923388881973487458065554866176 \sqrt{3} \sin^{86}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{505891960277401664624207030495167500108615112963296701852694907993548914688 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{101}{\left(t \right)}}{5} + \frac{505891960277401664624207030495167500108615112963296701852694907993548914688 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)}}{5} - 2529459801387008323121035152475837500543075564816483509263474539967744573440 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 2529459801387008323121035152475837500543075564816483509263474539967744573440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{99}{\left(t \right)} + 30669700091817475917842551223769529694084791223399862549819628797108902952960 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{97}{\left(t \right)} + 30669700091817475917842551223769529694084791223399862549819628797108902952960 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 240298681131765790696498339485204562551592178657565933380030081296935734476800 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 240298681131765790696498339485204562551592178657565933380030081296935734476800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{95}{\left(t \right)} + 1367637415660088894706242502460715029834647673062787363026186829881388145049600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{93}{\left(t \right)} + 1367637415660088894706242502460715029834647673062787363026186829881388145049600 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 6026242338898033803410874858211108541987194904674555685923808494614200815976448 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 6026242338898033803410874858211108541987194904674555685923808494614200815976448 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{91}{\left(t \right)} + 21396365751140625339238079616254866764768364887607797448692245585930739599278080 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{89}{\left(t \right)} + 21396365751140625339238079616254866764768364887607797448692245585930739599278080 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 62907287323630041319971865415532741916692243310109561162514528496883925642117120 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 62907287323630041319971865415532741916692243310109561162514528496883925642117120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{87}{\left(t \right)} + 156199820086866712652511663107182181865156351425577748674586006559857845259468800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{85}{\left(t \right)} + 156199820086866712652511663107182181865156351425577748674586006559857845259468800 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 332425258133588132055345334305028746020717363290332131794631757550466696321433600 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 332425258133588132055345334305028746020717363290332131794631757550466696321433600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{83}{\left(t \right)} + 613324601256470103642112141792778036408223535270662783161095592680611054713044992 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{81}{\left(t \right)} + 613324601256470103642112141792778036408223535270662783161095592680611054713044992 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 989839499474180555418321944874963531690493550283602857399929557135204766544035840 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 989839499474180555418321944874963531690493550283602857399929557135204766544035840 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{79}{\left(t \right)} + 1407428038314850477235426515369088771622420516809497812865524839051619277429800960 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{77}{\left(t \right)} + 1407428038314850477235426515369088771622420516809497812865524839051619277429800960 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 1773284663659294367869569216976968611460609404468200162098472940449652935753728000 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 1773284663659294367869569216976968611460609404468200162098472940449652935753728000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{75}{\left(t \right)} + 1989053935441758342033100687315113047988000831174671361224242280795063363567616000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{73}{\left(t \right)} + 1989053935441758342033100687315113047988000831174671361224242280795063363567616000 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 1993734062348680126367296218344089784571502009600964705603593439102816453834833920 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 1993734062348680126367296218344089784571502009600964705603593439102816453834833920 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{71}{\left(t \right)} + 1791245446641392301033117696168518165825958836750866727690728480443936657742233600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{69}{\left(t \right)} + 1791245446641392301033117696168518165825958836750866727690728480443936657742233600 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 1445945119577991375532757658352900206148665567015759888617816966141491036972646400 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 1445945119577991375532757658352900206148665567015759888617816966141491036972646400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{67}{\left(t \right)} + 1050661341969780318603578989555206958736073049203524715814775539421916759588864000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{65}{\left(t \right)} + 1050661341969780318603578989555206958736073049203524715814775539421916759588864000 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 688152457898335647272519572106334382330059540998799813866987487808506883473408000 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 688152457898335647272519572106334382330059540998799813866987487808506883473408000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{63}{\left(t \right)} + 406655093089297721560104534641586974058169560008978265007022918576839536452567040 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{61}{\left(t \right)} + 406655093089297721560104534641586974058169560008978265007022918576839536452567040 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 216931740436424643508554860251841152526509982283270503032679495443341163207065600 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 216931740436424643508554860251841152526509982283270503032679495443341163207065600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{59}{\left(t \right)} + 104483731626284946305256755243675240421422203005316474799830770969651207104102400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{57}{\left(t \right)} + 104483731626284946305256755243675240421422203005316474799830770969651207104102400 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 45427709402732585350111632714641408878879218697963684695578596073761394393088000 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 45427709402732585350111632714641408878879218697963684695578596073761394393088000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{55}{\left(t \right)} + 17819915612749542115134250661911144765810351413592662499828117045381731188736000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{53}{\left(t \right)} + 17819915612749542115134250661911144765810351413592662499828117045381731188736000 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - \frac{31505610803341190459557355170258903945952701299231827299696110936234900741685248 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)}}{5} - \frac{31505610803341190459557355170258903945952701299231827299696110936234900741685248 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{51}{\left(t \right)}}{5} + 2005944554786536294852274432617835620259462530746309170588759662000402983813120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{49}{\left(t \right)} + 2005944554786536294852274432617835620259462530746309170588759662000402983813120 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 573999355098734891068839563671465900469983189924362441507894697802246211502080 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 573999355098734891068839563671465900469983189924362441507894697802246211502080 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{47}{\left(t \right)} + 147343584456148465341331584424595041415285863485048394583499755016201594470400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{45}{\left(t \right)} + 147343584456148465341331584424595041415285863485048394583499755016201594470400 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 33848234797357078244997493653634509271214285297925153296743751395174042828800 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 33848234797357078244997493653634509271214285297925153296743751395174042828800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{43}{\left(t \right)} + 6938888133458201040224486198995074400598928486074656425832469036010678779904 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{41}{\left(t \right)} + 6938888133458201040224486198995074400598928486074656425832469036010678779904 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 1265154919143851522060565506128134182437392290588647034163002769539113943040 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 1265154919143851522060565506128134182437392290588647034163002769539113943040 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{39}{\left(t \right)} + 204366706837805059744618003402591528091334278557862790674768140392003010560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{37}{\left(t \right)} + 204366706837805059744618003402591528091334278557862790674768140392003010560 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 29116016577977654373385197228320366960095114312856978318657604804830822400 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 29116016577977654373385197228320366960095114312856978318657604804830822400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{35}{\left(t \right)} + 3639502072247206796673149653540045870011889289107122289832200600603852800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{33}{\left(t \right)} + 3639502072247206796673149653540045870011889289107122289832200600603852800 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 396745720403211993659314775418870934401296063164204979287202527010881536 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 396745720403211993659314775418870934401296063164204979287202527010881536 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{31}{\left(t \right)} + 37453209282855298880599376585765810864705683046100079424898676052459520 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{29}{\left(t \right)} + 37453209282855298880599376585765810864705683046100079424898676052459520 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 3036746698609889098426976479926957637678839165900006439856649409658880 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 3036746698609889098426976479926957637678839165900006439856649409658880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{27}{\left(t \right)} + 209453029933831484929704447363383113804249305797432532460401328128000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{25}{\left(t \right)} + 209453029933831484929704447363383113804249305797432532460401328128000 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 12149860500575344649137962898758667383348635645248293181813948416000 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 12149860500575344649137962898758667383348635645248293181813948416000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{23}{\left(t \right)} + 584712036590188461239764464502760867823653090427574109374796267520 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{21}{\left(t \right)} + 584712036590188461239764464502760867823653090427574109374796267520 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 22963060552322407531119315472411030360995057292525647123028377600 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 22963060552322407531119315472411030360995057292525647123028377600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{19}{\left(t \right)} + 721130596162834226654609045007981864784943301674142859159142400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{17}{\left(t \right)} + 721130596162834226654609045007981864784943301674142859159142400 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 17653135768980030028264603304968956298285025744777058975744000 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 17653135768980030028264603304968956298285025744777058975744000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{15}{\left(t \right)} + 325981200279460781771931595120165386189922350400712736768000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{13}{\left(t \right)} + 325981200279460781771931595120165386189922350400712736768000 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 4346416003726143756959087934935538482532298005342836490240 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 4346416003726143756959087934935538482532298005342836490240 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{11}{\left(t \right)} + 39369710178678838378252608106300167414241829758540185600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{9}{\left(t \right)} + 39369710178678838378252608106300167414241829758540185600 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 221266937977319846365129070047451763869685113054822400 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 221266937977319846365129070047451763869685113054822400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{7}{\left(t \right)} + 664864597287619730664450330671429578935351902208000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{5}{\left(t \right)} + 664864597287619730664450330671429578935351902208000 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 798156779456926447376290913170983888277733376000 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 798156779456926447376290913170983888277733376000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos^{3}{\left(t \right)} + \frac{798156779456926447376290913170983888277733376 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{85}{\left(t \right)} \cos{\left(t \right)}}{5} + \frac{798156779456926447376290913170983888277733376 \sin^{85}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{5} - \frac{458039919675199307588519093138569074825249165605874712063407720873615949824 \sqrt{3} \sin^{84}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - 245385094862815753085383029737465757525510319738990383914962068143610003456 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 245385094862815753085383029737465757525510319738990383914962068143610003456 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{101}{\left(t \right)} + 6134627371570393827134575743436643938137757993474759597874051703590250086400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{99}{\left(t \right)} + 6134627371570393827134575743436643938137757993474759597874051703590250086400 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 74382356880291025154006730889169307749920315670881460124222876906031782297600 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 74382356880291025154006730889169307749920315670881460124222876906031782297600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{97}{\left(t \right)} + 582789600299187413577784695626481174123087009380102161798034911841073758208000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{95}{\left(t \right)} + 582789600299187413577784695626481174123087009380102161798034911841073758208000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 3316892373577797115557938677842902619911475674479722069295847134970486194176000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 3316892373577797115557938677842902619911475674479722069295847134970486194176000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{93}{\left(t \right)} + 14615275237680693395500559268895147754683618077233806928497280112617321272442880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{91}{\left(t \right)} + 14615275237680693395500559268895147754683618077233806928497280112617321272442880 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 51892001176339695965407570808444208118358058864646628323254970612617350794444800 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 51892001176339695965407570808444208118358058864646628323254970612617350794444800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{89}{\left(t \right)} + 152567266131358184451290461639573293914803878136610824286804936639861151183667200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{87}{\left(t \right)} + 152567266131358184451290461639573293914803878136610824286804936639861151183667200 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 378827009313936252832518095986848090528945770780782991011054377322481323081728000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 378827009313936252832518095986848090528945770780782991011054377322481323081728000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{85}{\left(t \right)} + 806221583924530999617923127356625423433397409610384314203013161993998713225216000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{83}{\left(t \right)} + 806221583924530999617923127356625423433397409610384314203013161993998713225216000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 1487478822340759694295068169972973906234618220731159059704559283878927625900523520 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 1487478822340759694295068169972973906234618220731159059704559283878927625900523520 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{81}{\left(t \right)} + 2400629764349744961170794390763328674004797537032922690840861765606440907990630400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{79}{\left(t \right)} + 2400629764349744961170794390763328674004797537032922690840861765606440907990630400 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 3413395446184793616664723274366607958350571497968686951039350322971658166049177600 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 3413395446184793616664723274366607958350571497968686951039350322971658166049177600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{77}{\left(t \right)} + 4300697180206304954683669908021588276436396449695295230089367117802487079239680000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{75}{\left(t \right)} + 4300697180206304954683669908021588276436396449695295230089367117802487079239680000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 4823996297233068805066691204969397813394811798433136385577815857634766445608960000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 4823996297233068805066691204969397813394811798433136385577815857634766445608960000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{73}{\left(t \right)} + 4835346876755970143431554007804619925896917237958861412367410718476260013716275200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{71}{\left(t \right)} + 4835346876755970143431554007804619925896917237958861412367410718476260013716275200 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 4344256959585441925739286803886963214673011580978664550173845567381014856073216000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 4344256959585441925739286803886963214673011580978664550173845567381014856073216000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{69}{\left(t \right)} + 3506809834846079626801592962173813679314358746091211142911417506199132474179584000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{67}{\left(t \right)} + 3506809834846079626801592962173813679314358746091211142911417506199132474179584000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 2548139260076165582482864804831582094217242381560178828436649915581686706339840000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 2548139260076165582482864804831582094217242381560178828436649915581686706339840000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{65}{\left(t \right)} + 1668956708353979796713923147024194120189071033536491396402951991492098895380480000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{63}{\left(t \right)} + 1668956708353979796713923147024194120189071033536491396402951991492098895380480000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 986249104842929936120633959694609712899229163880470384561869442472362190988902400 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 986249104842929936120633959694609712899229163880470384561869442472362190988902400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{61}{\left(t \right)} + 526118419400839658509198947757522360407364563010377510751811004573864098267136000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{59}{\left(t \right)} + 526118419400839658509198947757522360407364563010377510751811004573864098267136000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 253401441512117702656091451236359108902498141799578678692524356223950278098944000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 253401441512117702656091451236359108902498141799578678692524356223950278098944000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{57}{\left(t \right)} + 110174539787877262024387587494069177783694844260686382040227980966934903521280000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{55}{\left(t \right)} + 110174539787877262024387587494069177783694844260686382040227980966934903521280000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 43218137729290669396079670423249175824689507164759378481240745823378247516160000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 43218137729290669396079670423249175824689507164759378481240745823378247516160000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{53}{\left(t \right)} + 15281933501077180698453771461660908571610209733458916230966727723146548321714176 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{51}{\left(t \right)} + 15281933501077180698453771461660908571610209733458916230966727723146548321714176 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 4864960638986368595531671008454941008373832360573589496604532604172172997427200 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 4864960638986368595531671008454941008373832360573589496604532604172172997427200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{49}{\left(t \right)} + 1392104414200056767062335083089085098286576078824710540885315265729632455884800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{47}{\left(t \right)} + 1392104414200056767062335083089085098286576078824710540885315265729632455884800 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 357348231323675286187876193203671397997670198805450250450471552586847617024000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 357348231323675286187876193203671397997670198805450250450471552586847617024000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{45}{\left(t \right)} + 82091167273481500906685497515947824794996602251082063362347277500524003328000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{43}{\left(t \right)} + 82091167273481500906685497515947824794996602251082063362347277500524003328000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 16828689291063707685870526990769304082974303461471822989281191887607420682240 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 16828689291063707685870526990769304082974303461471822989281191887607420682240 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{41}{\left(t \right)} + 3068344471021433378910474766900434124525469074321650755408912966884943462400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{39}{\left(t \right)} + 3068344471021433378910474766900434124525469074321650755408912966884943462400 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 495644798512883195168672739230469942449771314165468860535952623097452953600 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 495644798512883195168672739230469942449771314165468860535952623097452953600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{37}{\left(t \right)} + 70614252162622436218060566647488933456208938924524057471200848609542144000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{35}{\left(t \right)} + 70614252162622436218060566647488933456208938924524057471200848609542144000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 8826781520327804527257570830936116682026117365565507183900106076192768000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 8826781520327804527257570830936116682026117365565507183900106076192768000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{33}{\left(t \right)} + 962216183314855174839506622449299752590099827103404739168011563470684160 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{31}{\left(t \right)} + 962216183314855174839506622449299752590099827103404739168011563470684160 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 90834210013446614812323216311945614665081038365881306757396924937011200 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 90834210013446614812323216311945614665081038365881306757396924937011200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{29}{\left(t \right)} + 7364935947036212011809990511779374162033597705341727574924074994892800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{27}{\left(t \right)} + 7364935947036212011809990511779374162033597705341727574924074994892800 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 507980514173762500814568530629944100734490503870131889187250503680000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 507980514173762500814568530629944100734490503870131889187250503680000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{25}{\left(t \right)} + 29466713306422541030857695345494865868583307916804624089046056960000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{23}{\left(t \right)} + 29466713306422541030857695345494865868583307916804624089046056960000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 1418085577871584787110026588501940419925571693496222534285341491200 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 1418085577871584787110026588501940419925571693496222534285341491200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{21}{\left(t \right)} + 55691661801488447612836926791105555970619806069508532764409856000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{19}{\left(t \right)} + 55691661801488447612836926791105555970619806069508532764409856000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 1748937655096004204590322208341369060653700806370033972281344000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 1748937655096004204590322208341369060653700806370033972281344000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{17}{\left(t \right)} + 42813651287539882609310213178491286674509199666341100912640000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{15}{\left(t \right)} + 42813651287539882609310213178491286674509199666341100912640000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 790592992525594423183285186534640236887243743838685102080000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 790592992525594423183285186534640236887243743838685102080000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{13}{\left(t \right)} + 10541239900341258975777135820461869825163249917849134694400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{11}{\left(t \right)} + 10541239900341258975777135820461869825163249917849134694400 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 95482245474105606664647969388241574503290307226894336000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 95482245474105606664647969388241574503290307226894336000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{9}{\left(t \right)} + 536632451480320551306732866894974726232864030982144000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{7}{\left(t \right)} + 536632451480320551306732866894974726232864030982144000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 1612477318150001656570711739468073095651634708480000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 1612477318150001656570711739468073095651634708480000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{5}{\left(t \right)} + 1935747080612246886639509891318215000782274560000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos^{3}{\left(t \right)} + 1935747080612246886639509891318215000782274560000 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 387149416122449377327901978263643000156454912 \sin^{83}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)} - 387149416122449377327901978263643000156454912 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{83}{\left(t \right)} \cos{\left(t \right)} + \frac{96930942728353756408014071711705862298550860063410040013137439339027890176 \sqrt{3} \sin^{82}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + 509795774003761909493014926859948701379311122143946444726871744745241051136 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{101}{\left(t \right)} + 509795774003761909493014926859948701379311122143946444726871744745241051136 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 12744894350094047737325373171498717534482778053598661118171793618631026278400 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 12744894350094047737325373171498717534482778053598661118171793618631026278400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{99}{\left(t \right)} + 154531843994890328815070149704421950105603683899883766057832997625901193625600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{97}{\left(t \right)} + 154531843994890328815070149704421950105603683899883766057832997625901193625600 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 1210764963258934535045910451292378165775863915091872806226320393769947496448000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 1210764963258934535045910451292378165775863915091872806226320393769947496448000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{95}{\left(t \right)} + 6890955279172920381101138779425761670060287985503354213561518803604740243456000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{93}{\left(t \right)} + 6890955279172920381101138779425761670060287985503354213561518803604740243456000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 30363725051176678647673017821764461421970911060333727092598439696725729114849280 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 30363725051176678647673017821764461421970911060333727092598439696725729114849280 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{91}{\left(t \right)} + 107807374849257622326179464872488180846625442195599802310156694135980979702988800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{89}{\left(t \right)} + 107807374849257622326179464872488180846625442195599802310156694135980979702988800 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 316963618220397986378352528058283222949986323137293427990230280455096152306483200 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 316963618220397986378352528058283222949986323137293427990230280455096152306483200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{87}{\left(t \right)} + 787025831926327880579401148133848627637364137952994211483893800994141601005568000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{85}{\left(t \right)} + 787025831926327880579401148133848627637364137952994211483893800994141601005568000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 1674952411535518309951033212695113745997467267951244091106748345705480843165696000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 1674952411535518309951033212695113745997467267951244091106748345705480843165696000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{83}{\left(t \right)} + 3090287199283031281859656277422484861365327109370045348091950697826612155640709120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{81}{\left(t \right)} + 3090287199283031281859656277422484861365327109370045348091950697826612155640709120 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 4987388942663114836913439140273264638362836397144710571997223802416800006039142400 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 4987388942663114836913439140273264638362836397144710571997223802416800006039142400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{79}{\left(t \right)} + 7091443652849116408736296277576048157672158002190135344558552594061387508586905600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{77}{\left(t \right)} + 7091443652849116408736296277576048157672158002190135344558552594061387508586905600 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 8934842798682573724535121304638256962584283955014096256406664408963286648750080000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 8934842798682573724535121304638256962584283955014096256406664408963286648750080000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{75}{\left(t \right)} + 10022014285399348683542094121191001684360527808344299829133887279323022108917760000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{73}{\left(t \right)} + 10022014285399348683542094121191001684360527808344299829133887279323022108917760000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 10045595495482641268679840225005568747147258462010992299320084661156723337409331200 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 10045595495482641268679840225005568747147258462010992299320084661156723337409331200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{71}{\left(t \right)} + 9025339702972685514829543952153440671265115024463000893920388562757993623453696000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{69}{\left(t \right)} + 9025339702972685514829543952153440671265115024463000893920388562757993623453696000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 7285515181917709993898547527641934035840514537819530842080313659093802081583104000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 7285515181917709993898547527641934035840514537819530842080313659093802081583104000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{67}{\left(t \right)} + 5293844873039799436623436465715429711001999892826183487893723847817142772695040000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{65}{\left(t \right)} + 5293844873039799436623436465715429711001999892826183487893723847817142772695040000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 3467313601055307233344005170527065073872654900564517840023959479272046728314880000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 3467313601055307233344005170527065073872654900564517840023959479272046728314880000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{63}{\left(t \right)} + 2048965631123620618204223055458337517091622005302344761089158554782325113513574400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{61}{\left(t \right)} + 2048965631123620618204223055458337517091622005302344761089158554782325113513574400 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 1093028682064137581139684993418100483801136512774306879785355829404676145545216000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 1093028682064137581139684993418100483801136512774306879785355829404676145545216000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{59}{\left(t \right)} + 526450003336835495811159467983717977774848093128184519896618061190538947723264000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{57}{\left(t \right)} + 526450003336835495811159467983717977774848093128184519896618061190538947723264000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 228891305798624128613547594775529555554281779620949791259399157039364759879680000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 228891305798624128613547594775529555554281779620949791259399157039364759879680000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{55}{\left(t \right)} + 89787132291072129398570890384808879933710862565125863841063649595211340840960000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{53}{\left(t \right)} + 89787132291072129398570890384808879933710862565125863841063649595211340840960000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 31748729978123104955334666840068419944560161003028505454200106496866730121363456 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 31748729978123104955334666840068419944560161003028505454200106496866730121363456 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{51}{\left(t \right)} + 10107119080873389701217506985208891484429884934695924943190002717947438773043200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{49}{\left(t \right)} + 10107119080873389701217506985208891484429884934695924943190002717947438773043200 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 2892143663933329168689332288004979602850560681465500592571872923857105767628800 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 2892143663933329168689332288004979602850560681465500592571872923857105767628800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{47}{\left(t \right)} + 742402949447171549998377707858421103410300174929760196753940594293676703744000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{45}{\left(t \right)} + 742402949447171549998377707858421103410300174929760196753940594293676703744000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 170547156429583362384280065962619320987407470977064872785145168091747975168000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 170547156429583362384280065962619320987407470977064872785145168091747975168000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{43}{\left(t \right)} + 34962167068064589288777413522336960802418531550298298920954759458808334909440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{41}{\left(t \right)} + 34962167068064589288777413522336960802418531550298298920954759458808334909440 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 6374588665986531006368953377144186401562986117165187741548553618015544934400 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 6374588665986531006368953377144186401562986117165187741548553618015544934400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{39}{\left(t \right)} + 1029718711440379434162999591942179007421594494569652339684888141880727961600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{37}{\left(t \right)} + 1029718711440379434162999591942179007421594494569652339684888141880727961600 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 146703479920271154120915817033824688981366922564197416101646207459262464000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 146703479920271154120915817033824688981366922564197416101646207459262464000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{35}{\left(t \right)} + 18337934990033894265114477129228086122670865320524677012705775932407808000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{33}{\left(t \right)} + 18337934990033894265114477129228086122670865320524677012705775932407808000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 1999036429682815726482808935405962794910933889885766988637816453291048960 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 1999036429682815726482808935405962794910933889885766988637816453291048960 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{31}{\left(t \right)} + 188711121291672057513025583094963935717503524761351701401356370916147200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{29}{\left(t \right)} + 188711121291672057513025583094963935717503524761351701401356370916147200 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 15300901726351788447002074304997075868986772277947435248758624668876800 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 15300901726351788447002074304997075868986772277947435248758624668876800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{27}{\left(t \right)} + 1055346574928762997724039505331929044444121602362673271614293934080000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{25}{\left(t \right)} + 1055346574928762997724039505331929044444121602362673271614293934080000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 61218086313648294949944284041953008883265565836926822817474805760000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 61218086313648294949944284041953008883265565836926822817474805760000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{23}{\left(t \right)} + 2946120403844324194466068669518988552507155355902103348090975027200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{21}{\left(t \right)} + 2946120403844324194466068669518988552507155355902103348090975027200 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 115701297381236378038146557918273630627606349239644405981249536000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 115701297381236378038146557918273630627606349239644405981249536000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{19}{\left(t \right)} + 3633476703474787733956572939551696528330002346811493044977664000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{17}{\left(t \right)} + 3633476703474787733956572939551696528330002346811493044977664000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 88946798126677790304934466084496855038678148024761151651840000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 88946798126677790304934466084496855038678148024761151651840000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{15}{\left(t \right)} + 1642483488134675105062710311219402152702863528866328084480000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{13}{\left(t \right)} + 1642483488134675105062710311219402152702863528866328084480000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 21899779841795668067502804149592028702704847051551041126400 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 21899779841795668067502804149592028702704847051551041126400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{11}{\left(t \right)} + 198367571030757862930279023094130694770877237785788416000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{9}{\left(t \right)} + 198367571030757862930279023094130694770877237785788416000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 1114871936744524319961423654483271668724320083902464000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 1114871936744524319961423654483271668724320083902464000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{7}{\left(t \right)} + 3349975771467921634499470115634830735349519482880000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{5}{\left(t \right)} + 3349975771467921634499470115634830735349519482880000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 4021579557584539777310288254063422251319951360000 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 4021579557584539777310288254063422251319951360000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos^{3}{\left(t \right)} + 804315911516907955462057650812684450263990272 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{81}{\left(t \right)} \cos{\left(t \right)} + 804315911516907955462057650812684450263990272 \sin^{81}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)} - \frac{19346760501528800455305715081662236680507133053739055174916198628352589824 \sqrt{3} \sin^{80}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{4588161966033857185437134341739538312413800099295518002541845702707169460224 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)}}{5} - \frac{4588161966033857185437134341739538312413800099295518002541845702707169460224 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{101}{\left(t \right)}}{5} + 22940809830169285927185671708697691562069000496477590012709228513535847301120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{99}{\left(t \right)} + 22940809830169285927185671708697691562069000496477590012709228513535847301120 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 278157319190802591867126269467959510190086631019790778904099395726622148526080 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 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194053274728663720187123036770478725523925795952079644158282049444765763465379840 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 194053274728663720187123036770478725523925795952079644158282049444765763465379840 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{89}{\left(t \right)} + 570534512796716375481034550504909801309975381647128170382414504819173074151669760 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{87}{\left(t \right)} + 570534512796716375481034550504909801309975381647128170382414504819173074151669760 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 1416646497467390185042922066640927529747255448315389580671008841789454881810022400 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 1416646497467390185042922066640927529747255448315389580671008841789454881810022400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{85}{\left(t \right)} + 3014914340763932957911859782851204742795441082312239363992147022269865517698252800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{83}{\left(t \right)} + 3014914340763932957911859782851204742795441082312239363992147022269865517698252800 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 5562516958709456307347381299360472750457588796866081626565511256087901880153276416 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 5562516958709456307347381299360472750457588796866081626565511256087901880153276416 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{81}{\left(t \right)} + 8977300096793606706444190452491876349053105514860479029595002844350240010870456320 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{79}{\left(t \right)} + 8977300096793606706444190452491876349053105514860479029595002844350240010870456320 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 12764598575128409535725333299636886683809884403942243620205394669310497515456430080 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 12764598575128409535725333299636886683809884403942243620205394669310497515456430080 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{77}{\left(t \right)} + 16082717037628632704163218348348862532651711119025373261531995936133915967750144000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{75}{\left(t \right)} + 16082717037628632704163218348348862532651711119025373261531995936133915967750144000 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 18039625713718827630375769418143803031848950055019739692440997102781439796051968000 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 18039625713718827630375769418143803031848950055019739692440997102781439796051968000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{73}{\left(t \right)} + 18082071891868754283623712405010023744865065231619786138776152390082102007336796160 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{71}{\left(t \right)} + 18082071891868754283623712405010023744865065231619786138776152390082102007336796160 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 16245611465350833926693179113876193208277207044033401609056699412964388522216652800 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 16245611465350833926693179113876193208277207044033401609056699412964388522216652800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{69}{\left(t \right)} + 13113927327451877989017385549755481264512926168075155515744564586368843746849587200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{67}{\left(t \right)} + 13113927327451877989017385549755481264512926168075155515744564586368843746849587200 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 9528920771471638985922185638287773479803599807087130278208702926070856990851072000 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 9528920771471638985922185638287773479803599807087130278208702926070856990851072000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{65}{\left(t \right)} + 6241164481899553020019209306948717132970778821016132112043127062689684110966784000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{63}{\left(t \right)} + 6241164481899553020019209306948717132970778821016132112043127062689684110966784000 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 3688138136022517112767601499825007530764919609544220569960485398608185204324433920 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 3688138136022517112767601499825007530764919609544220569960485398608185204324433920 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{61}{\left(t \right)} + 1967451627715447646051432988152580870842045722993752383613640492928417061981388800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{59}{\left(t \right)} + 1967451627715447646051432988152580870842045722993752383613640492928417061981388800 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 947610006006303892460087042370692359994726567630732135813912510142970105901875200 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 947610006006303892460087042370692359994726567630732135813912510142970105901875200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{57}{\left(t \right)} + 412004350437523431504385670595953199997707203317709624266918482670856567783424000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{55}{\left(t \right)} + 412004350437523431504385670595953199997707203317709624266918482670856567783424000 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 161616838123929832917427602692655983880679552617226554913914569271380413513728000 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 161616838123929832917427602692655983880679552617226554913914569271380413513728000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{53}{\left(t \right)} + \frac{285738569803107944598012001560615779501041449027256549087800958471800571092271104 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{51}{\left(t \right)}}{5} + \frac{285738569803107944598012001560615779501041449027256549087800958471800571092271104 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)}}{5} - 18192814345572101462191512573376004671973792882452664897742004892305389791477760 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 18192814345572101462191512573376004671973792882452664897742004892305389791477760 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{49}{\left(t \right)} + 5205858595079992503640798118408963285131009226637901066629371262942790381731840 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{47}{\left(t \right)} + 5205858595079992503640798118408963285131009226637901066629371262942790381731840 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 1336325309004908789997079874145157986138540314873568354157093069728618066739200 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 1336325309004908789997079874145157986138540314873568354157093069728618066739200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{45}{\left(t \right)} + 306984881573250052291704118732714777777333447758716771013261302565146355302400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{43}{\left(t \right)} + 306984881573250052291704118732714777777333447758716771013261302565146355302400 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 62931900722516260719799344340206529444353356790536938057718567025855002836992 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 62931900722516260719799344340206529444353356790536938057718567025855002836992 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{41}{\left(t \right)} + 11474259598775755811464116078859535522813375010897337934787396512427980881920 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{39}{\left(t \right)} + 11474259598775755811464116078859535522813375010897337934787396512427980881920 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 1853493680592682981493399265495922213358870090225374211432798655385310330880 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 1853493680592682981493399265495922213358870090225374211432798655385310330880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{37}{\left(t \right)} + 264066263856488077417648470660884440166460460615555348982963173426672435200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{35}{\left(t \right)} + 264066263856488077417648470660884440166460460615555348982963173426672435200 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 33008282982061009677206058832610555020807557576944418622870396678334054400 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 33008282982061009677206058832610555020807557576944418622870396678334054400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{33}{\left(t \right)} + 3598265573429068307669056083730733030839681001794380579548069615923888128 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{31}{\left(t \right)} + 3598265573429068307669056083730733030839681001794380579548069615923888128 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 339680018325009703523446049570935084291506344570433062522441467649064960 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 339680018325009703523446049570935084291506344570433062522441467649064960 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{29}{\left(t \right)} + 27541623107433219204603733748994736564176190100305383447765524403978240 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{27}{\left(t \right)} + 27541623107433219204603733748994736564176190100305383447765524403978240 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 1899623834871773395903271109597472279999418884252811888905729081344000 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 1899623834871773395903271109597472279999418884252811888905729081344000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{25}{\left(t \right)} + 110192555364566930909899711275515415989878018506468281071454650368000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{23}{\left(t \right)} + 110192555364566930909899711275515415989878018506468281071454650368000 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 5303016726919783550038923605134179394512879640623786026563755048960 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 5303016726919783550038923605134179394512879640623786026563755048960 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{21}{\left(t \right)} + 208262335286225480468663804252892535129691428631359930766249164800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{19}{\left(t \right)} + 208262335286225480468663804252892535129691428631359930766249164800 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 6540258066254617921121831291193053750994004224260687480959795200 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 6540258066254617921121831291193053750994004224260687480959795200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{17}{\left(t \right)} + 160104236628020022548882038952094339069620666444570072973312000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{15}{\left(t \right)} + 160104236628020022548882038952094339069620666444570072973312000 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 2956470278642415189112878560194923874865154351959390552064000 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 2956470278642415189112878560194923874865154351959390552064000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{13}{\left(t \right)} + 39419603715232202521505047469265651664868724692791874027520 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{11}{\left(t \right)} + 39419603715232202521505047469265651664868724692791874027520 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 357061627855364153274502241569435250587579028014419148800 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 357061627855364153274502241569435250587579028014419148800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{9}{\left(t \right)} + 2006769486140143775930562578069889003703776151024435200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{7}{\left(t \right)} + 2006769486140143775930562578069889003703776151024435200 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 6029956388642258942099046208142695323629135069184000 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 6029956388642258942099046208142695323629135069184000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{5}{\left(t \right)} + 7238843203652171599158518857314160052375912448000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos^{3}{\left(t \right)} + 7238843203652171599158518857314160052375912448000 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - \frac{7238843203652171599158518857314160052375912448 \sin^{79}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{5} - \frac{7238843203652171599158518857314160052375912448 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{79}{\left(t \right)} \cos{\left(t \right)}}{5} + \frac{3638849761949769267496964200526778599817366657097382034579404448413515776 \sqrt{3} \sin^{78}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{7219676719790763017534122015781163197419263588319454017278563130766490861568 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{101}{\left(t \right)}}{5} + \frac{7219676719790763017534122015781163197419263588319454017278563130766490861568 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)}}{5} - 36098383598953815087670610078905815987096317941597270086392815653832454307840 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 36098383598953815087670610078905815987096317941597270086392815653832454307840 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{99}{\left(t \right)} + 437692901137315007938006147206733018843542855041866899797512889802718508482560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{97}{\left(t \right)} + 437692901137315007938006147206733018843542855041866899797512889802718508482560 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 3429346441900612433328707957496052518774150204451740658207317487114083159244800 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 3429346441900612433328707957496052518774150204451740658207317487114083159244800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{95}{\left(t \right)} + 19517803772848407481874716773717767655679440812055414605500240541895387355545600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{93}{\left(t \right)} + 19517803772848407481874716773717767655679440812055414605500240541895387355545600 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 86001606940150982862239541489244816217551725515014700566972638850920096284540928 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 86001606940150982862239541489244816217551725515014700566972638850920096284540928 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{91}{\left(t \right)} + 305351450173142452449706882681228270346892429687618684193905512941431724840058880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{89}{\left(t \right)} + 305351450173142452449706882681228270346892429687618684193905512941431724840058880 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 897761406499838178170105950002873900835563917699081661362726807634255485935288320 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 897761406499838178170105950002873900835563917699081661362726807634255485935288320 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{87}{\left(t \right)} + 2229156209753334606801451934280233768718740570101999641495085925205980843134156800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{85}{\left(t \right)} + 2229156209753334606801451934280233768718740570101999641495085925205980843134156800 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 4744101677167353137551807962698959046247576085088871031899798251079395127695769600 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 4744101677167353137551807962698959046247576085088871031899798251079395127695769600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{83}{\left(t \right)} + 8752867594373766538783085691179579440326777876988967053855127773241484010598694912 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{81}{\left(t \right)} + 8752867594373766538783085691179579440326777876988967053855127773241484010598694912 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 14126180591532738642775562198226491844449753877060845704893873219327420568688394240 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 14126180591532738642775562198226491844449753877060845704893873219327420568688394240 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{79}{\left(t \right)} + 20085663028585612757696502500603293091326993793945889986645975983731176121103810560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{77}{\left(t \right)} + 20085663028585612757696502500603293091326993793945889986645975983731176121103810560 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 25306869863602562493118935511370196865730297220488853431450500244754134370091008000 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 25306869863602562493118935511370196865730297220488853431450500244754134370091008000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{75}{\left(t \right)} + 28386152616939585254947776086466321318246483717832389168749086860914002048843776000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{73}{\left(t \right)} + 28386152616939585254947776086466321318246483717832389168749086860914002048843776000 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 28452943564273560749665300265493300897818828385403759496204967065292623230135173120 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 28452943564273560749665300265493300897818828385403759496204967065292623230135173120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{71}{\left(t \right)} + 25563191483527027236027418207279137525384103627511190172371650097723841183324569600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{69}{\left(t \right)} + 25563191483527027236027418207279137525384103627511190172371650097723841183324569600 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 20635347342124226804985988191418098966273914976424695681312054898162618786539110400 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 20635347342124226804985988191418098966273914976424695681312054898162618786539110400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{67}{\left(t \right)} + 14994180233352461550370916216325143049680741065186643711522478914823447593877504000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{65}{\left(t \right)} + 14994180233352461550370916216325143049680741065186643711522478914823447593877504000 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 9820749626523249670418377872680795447744111107022830968950395546551030003007488000 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 9820749626523249670418377872680795447744111107022830968950395546551030003007488000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{63}{\left(t \right)} + 5803449232423582852112860174137307559901285657306304175714124368289999292402237440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{61}{\left(t \right)} + 5803449232423582852112860174137307559901285657306304175714124368289999292402237440 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 3095872556175329007908306964503626998500685838888534777279686597912386602637721600 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 3095872556175329007908306964503626998500685838888534777279686597912386602637721600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{59}{\left(t \right)} + 1491106449696334163774018476784526640012131029045089739756212688330179211585126400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{57}{\left(t \right)} + 1491106449696334163774018476784526640012131029045089739756212688330179211585126400 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 648307152041884419032181946428055060874839577845691191198353342752251831123968000 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 648307152041884419032181946428055060874839577845691191198353342752251831123968000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{55}{\left(t \right)} + 254311275924324726873643740498505151346462564664798271547380381984230364676096000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{53}{\left(t \right)} + 254311275924324726873643740498505151346462564664798271547380381984230364676096000 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - \frac{449622335834206117112602133201357107580545814327363344095768515348119284747337728 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)}}{5} - \frac{449622335834206117112602133201357107580545814327363344095768515348119284747337728 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{51}{\left(t \right)}}{5} + 28627201735805742903479085923683079874540988698077967594455115972008634293944320 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{49}{\left(t \right)} + 28627201735805742903479085923683079874540988698077967594455115972008634293944320 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 8191649811767853372685035241480089827113707572661579768276349775856351974522880 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 8191649811767853372685035241480089827113707572661579768276349775856351974522880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{47}{\left(t \right)} + 2102767250788623075577631814219219486870706184946610878017366571927411779174400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{45}{\left(t \right)} + 2102767250788623075577631814219219486870706184946610878017366571927411779174400 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 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415519999459570871564747159400503044000441613460942814206593226418579046400 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 415519999459570871564747159400503044000441613460942814206593226418579046400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{35}{\left(t \right)} + 51939999932446358945593394925062880500055201682617851775824153302322380800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{33}{\left(t \right)} + 51939999932446358945593394925062880500055201682617851775824153302322380800 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 5662030761866680008135016237984876643522501106500759226551380228121296896 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 5662030761866680008135016237984876643522501106500759226551380228121296896 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{31}{\left(t \right)} + 534501601868924870559620673507686922728361107058990942610644617889054720 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{29}{\left(t \right)} + 534501601868924870559620673507686922728361107058990942610644617889054720 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 43337967719102016531861135689812453194191441112891157508971185234247680 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 43337967719102016531861135689812453194191441112891157508971185234247680 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{27}{\left(t \right)} + 2989142510337044858415719248554551631602762810205778053993131409408000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{25}{\left(t \right)} + 2989142510337044858415719248554551631602762810205778053993131409408000 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 173392882062426309567620536486140447734838700213702131757483032576000 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 173392882062426309567620536486140447734838700213702131757483032576000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{23}{\left(t \right)} + 8344532449254266147941738318395509047239112447784415090828870942720 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{21}{\left(t \right)} + 8344532449254266147941738318395509047239112447784415090828870942720 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 327710038313003424578117048469439173000295858842298236307872153600 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 327710038313003424578117048469439173000295858842298236307872153600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{19}{\left(t \right)} + 10291386671159590303869439330013175999393527586796311608190566400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{17}{\left(t \right)} + 10291386671159590303869439330013175999393527586796311608190566400 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 251931130260944683081259224724924749067161018036629415133184000 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 251931130260944683081259224724924749067161018036629415133184000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{15}{\left(t \right)} + 4652137348568580795534616365659121786751552889880940904448000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{13}{\left(t \right)} + 4652137348568580795534616365659121786751552889880940904448000 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 62028497980914410607128218208788290490020705198412545392640 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 62028497980914410607128218208788290490020705198412545392640 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{11}{\left(t \right)} + 561852336783645023615291831601343210960332474623302041600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{9}{\left(t \right)} + 561852336783645023615291831601343210960332474623302041600 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 3157740953420726748540379623612527078861764209043046400 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 3157740953420726748540379623612527078861764209043046400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{7}{\left(t \right)} + 9488404307153626047296813772874179924464435724288000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{5}{\left(t \right)} + 9488404307153626047296813772874179924464435724288000 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 11390641425154413021964962512453997508360667136000 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 11390641425154413021964962512453997508360667136000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos^{3}{\left(t \right)} + \frac{11390641425154413021964962512453997508360667136 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{77}{\left(t \right)} \cos{\left(t \right)}}{5} + \frac{11390641425154413021964962512453997508360667136 \sin^{77}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{5} - \frac{644351584470343972511083124141064794794345755111790130888581500553396224 \sqrt{3} \sin^{76}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - \frac{10002260455543452930542064876030153179757938096317576919771342670749409214464 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)}}{5} - \frac{10002260455543452930542064876030153179757938096317576919771342670749409214464 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{101}{\left(t \right)}}{5} + 50011302277717264652710324380150765898789690481587884598856713353747046072320 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{99}{\left(t \right)} + 50011302277717264652710324380150765898789690481587884598856713353747046072320 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 606387040117321833914112683109328036522824997089253100761137649414182933626880 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 606387040117321833914112683109328036522824997089253100761137649414182933626880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{97}{\left(t \right)} + 4751073716383140142007480816114322760385020595750849036891387768605969376870400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{95}{\left(t \right)} + 4751073716383140142007480816114322760385020595750849036891387768605969376870400 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 27040290643633731198847263863588157272972558625035105651370124917417567898828800 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 27040290643633731198847263863588157272972558625035105651370124917417567898828800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{93}{\left(t \right)} + 119148059615000840840394364771557922468066453057259949743826676741378883394207744 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{91}{\left(t \right)} + 119148059615000840840394364771557922468066453057259949743826676741378883394207744 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 423038988260707772664698077047951666209757220296388385393639929387608535455498240 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 423038988260707772664698077047951666209757220296388385393639929387608535455498240 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{89}{\left(t \right)} + 1243773615254984142673167618233148216782604177645602718346277764743291454472847360 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{87}{\left(t \right)} + 1243773615254984142673167618233148216782604177645602718346277764743291454472847360 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 3088310165595765653172844867284073867079088498162145336654650292212452626425446400 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 3088310165595765653172844867284073867079088498162145336654650292212452626425446400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{85}{\left(t \right)} + 6572557531908937159316567281655849511988829367883540075444512160349578666495180800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{83}{\left(t \right)} + 6572557531908937159316567281655849511988829367883540075444512160349578666495180800 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 12126368646371989058939066634655042349619390183745131439195124935844972639683608576 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 12126368646371989058939066634655042349619390183745131439195124935844972639683608576 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{81}{\left(t \right)} + 19570646027852648328011976795459618909498096517178046653655053522609863912870379520 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{79}{\left(t \right)} + 19570646027852648328011976795459618909498096517178046653655053522609863912870379520 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 27827012320852984341392029506044145636942605985362535085665779227460900251112570880 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 27827012320852984341392029506044145636942605985362535085665779227460900251112570880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{77}{\left(t \right)} + 35060559290199383454008525239710793574397182607552265691488713880753123658563584000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{75}{\left(t \right)} + 35060559290199383454008525239710793574397182607552265691488713880753123658563584000 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 39326648938051717071958898119791882659653982650746955827537797421891273671835648000 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 39326648938051717071958898119791882659653982650746955827537797421891273671835648000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{73}{\left(t \right)} + 39419182229670662288598801409485510618853168492278125135367298121707488433416437760 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{71}{\left(t \right)} + 39419182229670662288598801409485510618853168492278125135367298121707488433416437760 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 35415671534469735649912985641334638446625893567281128051306556906221571639397580800 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 35415671534469735649912985641334638446625893567281128051306556906221571639397580800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{69}{\left(t \right)} + 28588554130234605886074337806860491276191986373588380475151076056829461443851059200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{67}{\left(t \right)} + 28588554130234605886074337806860491276191986373588380475151076056829461443851059200 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 20773187198290389439576373508033791933411860017393995975338434329911651354017792000 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 20773187198290389439576373508033791933411860017393995975338434329911651354017792000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{65}{\left(t \right)} + 13605830211745752147558794344443185359895487262854547071566693830117572816666624000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{63}{\left(t \right)} + 13605830211745752147558794344443185359895487262854547071566693830117572816666624000 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 8040195290753505409698025032919394848613239504393108910103943135235103186348933120 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 8040195290753505409698025032919394848613239504393108910103943135235103186348933120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{61}{\left(t \right)} + 4289073437201237063039633607072733237506158505960157556022899140857785605737676800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{59}{\left(t \right)} + 4289073437201237063039633607072733237506158505960157556022899140857785605737676800 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 2065803727183462956061921431378562949183473196489551410287252995290769116050227200 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 2065803727183462956061921431378562949183473196489551410287252995290769116050227200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{57}{\left(t \right)} + 898175533558027372200835404947201282253683998473718004472718693604682224369664000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{55}{\left(t \right)} + 898175533558027372200835404947201282253683998473718004472718693604682224369664000 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 352327080186824882022860598815637345094578344796022605372933237540652484395008000 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 352327080186824882022860598815637345094578344796022605372933237540652484395008000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{53}{\left(t \right)} + \frac{622914277770306391416417538706046826127214513599367966299345963971873592410374144 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{51}{\left(t \right)}}{5} + \frac{622914277770306391416417538706046826127214513599367966299345963971873592410374144 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)}}{5} - 39660602404814206314194983623435933576186994758795517604818025252886962094735360 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 39660602404814206314194983623435933576186994758795517604818025252886962094735360 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{49}{\left(t \right)} + 11348848176720046860074059240800541114647115699624896970632859585300987631370240 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{47}{\left(t \right)} + 11348848176720046860074059240800541114647115699624896970632859585300987631370240 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 2913208795363404885956510742616210330768790860394783820586559938191101735731200 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 2913208795363404885956510742616210330768790860394783820586559938191101735731200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{45}{\left(t \right)} + 669231549396255712024006596045394602454413830484085841251793516641277863526400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{43}{\left(t \right)} + 669231549396255712024006596045394602454413830484085841251793516641277863526400 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 137192467626232420964921352189305893503154835249237597456617670911461962022912 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 137192467626232420964921352189305893503154835249237597456617670911461962022912 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{41}{\left(t \right)} + 25014054405904929488695337706325057721472831111361693785919070432664873861120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{39}{\left(t \right)} + 25014054405904929488695337706325057721472831111361693785919070432664873861120 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 4040643439189146468417468384086975086901516606453876546760364548291223879680 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 4040643439189146468417468384086975086901516606453876546760364548291223879680 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{37}{\left(t \right)} + 575668332584613811646993460419446925542278485315681190515384365767406387200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{35}{\left(t \right)} + 575668332584613811646993460419446925542278485315681190515384365767406387200 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 71958541573076726455874182552430865692784810664460148814423045720925798400 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 71958541573076726455874182552430865692784810664460148814423045720925798400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{33}{\left(t \right)} + 7844271784669462927937053746374881183213465074631260178451391357709713408 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{31}{\left(t \right)} + 7844271784669462927937053746374881183213465074631260178451391357709713408 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 740507427589239664421141141422107924196583617071310368408497231033794560 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 740507427589239664421141141422107924196583617071310368408497231033794560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{29}{\left(t \right)} + 60041142777505918736849281736927669529452725708484624465553829543280640 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{27}{\left(t \right)} + 60041142777505918736849281736927669529452725708484624465553829543280640 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 4141207852862780897596777708934951739616327643305921678969650806784000 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 4141207852862780897596777708934951739616327643305921678969650806784000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{25}{\left(t \right)} + 240221388690653116380140951590173745299307782587733161705679618048000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{23}{\left(t \right)} + 240221388690653116380140951590173745299307782587733161705679618048000 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 11560654330737681225794283295277111492529187037034658407085831618560 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 11560654330737681225794283295277111492529187037034658407085831618560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{21}{\left(t \right)} + 454014948912806827800932994233702187594159887771100681551531212800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{19}{\left(t \right)} + 454014948912806827800932994233702187594159887771100681551531212800 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 14257858617335682400152452405122420915826449677540723373847347200 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 14257858617335682400152452405122420915826449677540723373847347200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{17}{\left(t \right)} + 349029586715683779685494550920989496103462660404913668882432000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{15}{\left(t \right)} + 349029586715683779685494550920989496103462660404913668882432000 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 6445148618329387977146916423256908308728713899522553544704000 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 6445148618329387977146916423256908308728713899522553544704000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{13}{\left(t \right)} + 85935314911058506361958885643425444116382851993634047262720 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{11}{\left(t \right)} + 85935314911058506361958885643425444116382851993634047262720 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 778399591585674876467018891697694240184627282551033036800 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 778399591585674876467018891697694240184627282551033036800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{9}{\left(t \right)} + 4374786945884965182873650936879855223839735831278387200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{7}{\left(t \right)} + 4374786945884965182873650936879855223839735831278387200 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 13145393467202419419692460747836103437018436993024000 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 13145393467202419419692460747836103437018436993024000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{5}{\left(t \right)} + 15780784474432676374180625147462309048041340928000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos^{3}{\left(t \right)} + 15780784474432676374180625147462309048041340928000 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - \frac{15780784474432676374180625147462309048041340928 \sin^{75}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{5} - \frac{15780784474432676374180625147462309048041340928 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{75}{\left(t \right)} \cos{\left(t \right)}}{5} + \frac{107311204408781790681072445983849517619105178377231842749822064473931776 \sqrt{3} \sin^{74}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + 2454135522911855162003026527938432809357053776947946591721085403300584488960 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{101}{\left(t \right)} + 2454135522911855162003026527938432809357053776947946591721085403300584488960 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 61353388072796379050075663198460820233926344423698664793027135082514612224000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 61353388072796379050075663198460820233926344423698664793027135082514612224000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{99}{\left(t \right)} + 743909830382656095982167416281337445336356926137346310615454012875489673216000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{97}{\left(t \right)} + 743909830382656095982167416281337445336356926137346310615454012875489673216000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 5828571866915656009757188003853777922223002720251373155337577832838888161280000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 5828571866915656009757188003853777922223002720251373155337577832838888161280000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{95}{\left(t \right)} + 33172770351937932836782120787558415752652011575805666747370511337680703324160000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{93}{\left(t \right)} + 33172770351937932836782120787558415752652011575805666747370511337680703324160000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 146169701782328617741863113280757398253264547848760548425782063641612025384140800 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 146169701782328617741863113280757398253264547848760548425782063641612025384140800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{91}{\left(t \right)} + 518980191168640172035604404866518953904543008984296096139412380216893760339968000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{89}{\left(t \right)} + 518980191168640172035604404866518953904543008984296096139412380216893760339968000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 1525849594311485851422652582049949735442849952681939674363802297596212991229952000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 1525849594311485851422652582049949735442849952681939674363802297596212991229952000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{87}{\left(t \right)} + 3788709420657935317221328252304732529241587348541093416983490079968857665044480000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{85}{\left(t \right)} + 3788709420657935317221328252304732529241587348541093416983490079968857665044480000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 8063150818323298239214621665161353844283378203305403938708453247113209902530560000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 8063150818323298239214621665161353844283378203305403938708453247113209902530560000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{83}{\left(t \right)} + 14876513259806485251350976972222697842702832785098470266917096240923872270168883200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{81}{\left(t \right)} + 14876513259806485251350976972222697842702832785098470266917096240923872270168883200 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 24009081665469097749882067023607622667487717875848399409324833565535973633163264000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 24009081665469097749882067023607622667487717875848399409324833565535973633163264000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{79}{\left(t \right)} + 34137912993088873363113564049192088480334098854721942910133747725996462509654016000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{77}{\left(t \right)} + 34137912993088873363113564049192088480334098854721942910133747725996462509654016000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 43011959341424973070235922873650509358511132509265047433192387718430556212428800000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 43011959341424973070235922873650509358511132509265047433192387718430556212428800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{75}{\left(t \right)} + 48245557384214639643981406844572269841087445559603360929008571107757862263193600000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{73}{\left(t \right)} + 48245557384214639643981406844572269841087445559603360929008571107757862263193600000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 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13922658572236131758048414851114722189719604803916485010391770711410362810368000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 13922658572236131758048414851114722189719604803916485010391770711410362810368000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{47}{\left(t \right)} + 3573896731712399893249035062228109490664630697433919143292530428152213667840000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{45}{\left(t \right)} + 3573896731712399893249035062228109490664630697433919143292530428152213667840000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 821006874259332272708496155625981442003093890182731303922956237258862100480000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 821006874259332272708496155625981442003093890182731303922956237258862100480000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{43}{\left(t \right)} + 168306409223163115905241711903326195610634247487459917304206028638066730598400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{41}{\left(t \right)} + 168306409223163115905241711903326195610634247487459917304206028638066730598400 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 30687003084167188033213776363860316170241868405848231766545278713813008384000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 30687003084167188033213776363860316170241868405848231766545278713813008384000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{39}{\left(t \right)} + 4957022786803661118416655510982031771066184165742487806038908762824114176000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{37}{\left(t \right)} + 4957022786803661118416655510982031771066184165742487806038908762824114176000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 706224413316668137630595425580886480274015383179051858390889308136407040000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 706224413316668137630595425580886480274015383179051858390889308136407040000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{35}{\left(t \right)} + 88278051664583517203824428197610810034251922897381482298861163517050880000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{33}{\left(t \right)} + 88278051664583517203824428197610810034251922897381482298861163517050880000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 9623277719919433963318003601321969621316253572989278070381348814166425600 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 9623277719919433963318003601321969621316253572989278070381348814166425600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{31}{\left(t \right)} + 908447441008019482214264662885211975970609875054326380341989308628992000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{29}{\left(t \right)} + 908447441008019482214264662885211975970609875054326380341989308628992000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 73657900622271849909264702396098268321941341220621057865566700699648000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 73657900622271849909264702396098268321941341220621057865566700699648000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{27}{\left(t \right)} + 5080394249201687440685702096505080051916582321031800468231998668800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{25}{\left(t \right)} + 5080394249201687440685702096505080051916582321031800468231998668800000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 294701305754448451792613236367255589392386868559221716946622873600000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 294701305754448451792613236367255589392386868559221716946622873600000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{23}{\left(t \right)} + 14182500339432831742519512000174175239508618049412545128056225792000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{21}{\left(t \right)} + 14182500339432831742519512000174175239508618049412545128056225792000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 556981203904968588482576949159382657194426918021575769807912960000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 556981203904968588482576949159382657194426918021575769807912960000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{19}{\left(t \right)} + 17491404802434358382149891876310662264110697548707120849879040000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{17}{\left(t \right)} + 17491404802434358382149891876310662264110697548707120849879040000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 428186164074280498951037744830126371214460160311067829862400000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 428186164074280498951037744830126371214460160311067829862400000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{15}{\left(t \right)} + 7906846779780747849948140174419947195721565460289604812800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{13}{\left(t \right)} + 7906846779780747849948140174419947195721565460289604812800000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 105424623730409971332641868992265962609620872803861397504000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 105424623730409971332641868992265962609620872803861397504000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{11}{\left(t \right)} + 954933185963858435984074900292264154072652833368309760000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{9}{\left(t \right)} + 954933185963858435984074900292264154072652833368309760000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 5366946850057815376867542594978602230837872206807040000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 5366946850057815376867542594978602230837872206807040000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{7}{\left(t \right)} + 16126643179260262550683721739719357664777260236800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{5}{\left(t \right)} + 16126643179260262550683721739719357664777260236800000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 19359715701392872209704347826793946776443289600000 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 19359715701392872209704347826793946776443289600000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos^{3}{\left(t \right)} + 3871943140278574441940869565358789355288657920 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{73}{\left(t \right)} \cos{\left(t \right)} + 3871943140278574441940869565358789355288657920 \sin^{73}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)} - \frac{16790229278248010332578543174765115122079803689951138646855618316468224 \sqrt{3} \sin^{72}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - 2678350562380546248232538918364701587620571979160798855084307491642000015360 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 2678350562380546248232538918364701587620571979160798855084307491642000015360 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{101}{\left(t \right)} + 66958764059513656205813472959117539690514299479019971377107687291050000384000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{99}{\left(t \right)} + 66958764059513656205813472959117539690514299479019971377107687291050000384000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 811875014221603081495488359629300168747485881183117152947430708403981254656000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 811875014221603081495488359629300168747485881183117152947430708403981254656000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{97}{\left(t \right)} + 6361082585653797339552279931116166270598858450506897280825230292649750036480000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{95}{\left(t \right)} + 6361082585653797339552279931116166270598858450506897280825230292649750036480000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 36203505184756182514561218201704118188525534228080270852196720845276116418560000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 36203505184756182514561218201704118188525534228080270852196720845276116418560000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{93}{\left(t \right)} + 159524076529883557901003430939298356565439880293414751355047866798237708766412800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{91}{\left(t \right)} + 159524076529883557901003430939298356565439880293414751355047866798237708766412800 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 566395324913283377121913777404157728762931489871565673029225803658636545753088000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 566395324913283377121913777404157728762931489871565673029225803658636545753088000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{89}{\left(t \right)} + 1665254457579146518911433133566141156455070463309027186141226095549355374149632000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{87}{\left(t \right)} + 1665254457579146518911433133566141156455070463309027186141226095549355374149632000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 4134853969056916118628592461402340982909838684371259759066699306544085524807680000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 4134853969056916118628592461402340982909838684371259759066699306544085524807680000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{85}{\left(t \right)} + 8799817421326257380671107033240879527731195148790116923141949806234848681000960000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{83}{\left(t \right)} + 8799817421326257380671107033240879527731195148790116923141949806234848681000960000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 16235663142346944867338192476329422728664055049517765723196897392503295816446771200 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 16235663142346944867338192476329422728664055049517765723196897392503295816446771200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{81}{\left(t \right)} + 26202602415636540235336408695199681216842908047229897694229926333151386506625024000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{79}{\left(t \right)} + 26202602415636540235336408695199681216842908047229897694229926333151386506625024000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 37256825309733205647118956113487046730198509879655010783983176504949627689107456000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 37256825309733205647118956113487046730198509879655010783983176504949627689107456000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{77}{\left(t \right)} + 46941623400857487221171098551475722007544541625560026849846177294034676796620800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{75}{\left(t \right)} + 46941623400857487221171098551475722007544541625560026849846177294034676796620800000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 52653374088752522003481369263926879211950916499434232774682111657469959313817600000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 52653374088752522003481369263926879211950916499434232774682111657469959313817600000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{73}{\left(t \right)} + 52777264380726057349371913662194942457155506891197607440034304861369888629850112000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{71}{\left(t \right)} + 52777264380726057349371913662194942457155506891197607440034304861369888629850112000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 47417073467058567149826328680878268613850650722560350434405820773887009315880960000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 47417073467058567149826328680878268613850650722560350434405820773887009315880960000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{69}{\left(t \right)} + 38276432798709927699257397850829445748530043354355945531387831227113609929687040000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{67}{\left(t \right)} + 38276432798709927699257397850829445748530043354355945531387831227113609929687040000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 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2765848079572446453846883513585433982861122184091517732264733881233824169328640000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 2765848079572446453846883513585433982861122184091517732264733881233824169328640000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{57}{\left(t \right)} + 1202542643292368023411688484167579992548313993083268579245536470101662682316800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{55}{\left(t \right)} + 1202542643292368023411688484167579992548313993083268579245536470101662682316800000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 471721086225706864446854775450604980629560669984144006825757315985602877849600000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 471721086225706864446854775450604980629560669984144006825757315985602877849600000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{53}{\left(t \right)} + 166800576089409947268407848599333921150612652906393320813587786932509177607618560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{51}{\left(t \right)} + 166800576089409947268407848599333921150612652906393320813587786932509177607618560 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 53100495246758624065436490263561344441138383526593507795385924894055026655232000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 53100495246758624065436490263561344441138383526593507795385924894055026655232000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{49}{\left(t \right)} + 15194662262390595622986392952130186841604286305935432976457464048831575359488000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{47}{\left(t \right)} + 15194662262390595622986392952130186841604286305935432976457464048831575359488000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 3900415536104728787150524976551275640143957422282533018510286530392033853440000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 3900415536104728787150524976551275640143957422282533018510286530392033853440000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{45}{\left(t \right)} + 896015807954121766062262415691478085375469577824010741989007056277528903680000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{43}{\left(t \right)} + 896015807954121766062262415691478085375469577824010741989007056277528903680000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 183683240630594962042763795216753007501971263453922202107746446536893425254400 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 183683240630594962042763795216753007501971263453922202107746446536893425254400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{41}{\left(t \right)} + 33490632934049572321962543307402371634300510868176558589070179592981970944000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{39}{\left(t \right)} + 33490632934049572321962543307402371634300510868176558589070179592981970944000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 5409906928455158396677313406503645969419406971582748319879672852450902016000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 5409906928455158396677313406503645969419406971582748319879672852450902016000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{37}{\left(t \right)} + 770746577324004927613457133898077105548219446426307426848528696753520640000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{35}{\left(t \right)} + 770746577324004927613457133898077105548219446426307426848528696753520640000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 96343322165500615951682141737259638193527430803288428356066087094190080000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 96343322165500615951682141737259638193527430803288428356066087094190080000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{33}{\left(t \right)} + 10502480833865561650996558747622149570107605643611222080133797626091929600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{31}{\left(t \right)} + 10502480833865561650996558747622149570107605643611222080133797626091929600 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 991445130801110963147461600524226359157293501512778126054297301942272000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 991445130801110963147461600524226359157293501512778126054297301942272000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{29}{\left(t \right)} + 80387443037927915930875264907369704796537310933468496707105186643968000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{27}{\left(t \right)} + 80387443037927915930875264907369704796537310933468496707105186643968000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 5544549869975927987592203118611025903835871403518094530944224460800000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 5544549869975927987592203118611025903835871403518094530944224460800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{25}{\left(t \right)} + 321625843655602380112536372580210834270428858211642305704204697600000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{23}{\left(t \right)} + 321625843655602380112536372580210834270428858211642305704204697600000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 15478243725925864542915812930422646399264388801435285962014851072000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 15478243725925864542915812930422646399264388801435285962014851072000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{21}{\left(t \right)} + 607868190972698276799091454481253165742090506877367576019599360000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{19}{\left(t \right)} + 607868190972698276799091454481253165742090506877367576019599360000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 19089456736211583815735014888265955328107522075582356143472640000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 19089456736211583815735014888265955328107522075582356143472640000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{17}{\left(t \right)} + 467306162453159946529620927497330607787209842731514226278400000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{15}{\left(t \right)} + 467306162453159946529620927497330607787209842731514226278400000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 8629233113481646739893568263445025427888818118621711564800000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 8629233113481646739893568263445025427888818118621711564800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{13}{\left(t \right)} + 115056441513088623198580910179267005705184241581622820864000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{11}{\left(t \right)} + 115056441513088623198580910179267005705184241581622820864000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 1042177912256237528972653171913650413996234072297308160000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 1042177912256237528972653171913650413996234072297308160000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{9}{\left(t \right)} + 5857282525727549339870391170931796786811431959920640000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{7}{\left(t \right)} + 5857282525727549339870391170931796786811431959920640000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 17600007589325568929899011931886408614217043148800000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 17600007589325568929899011931886408614217043148800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{5}{\left(t \right)} + 21128460491387237610923183591700370485254553600000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos^{3}{\left(t \right)} + 21128460491387237610923183591700370485254553600000 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 4225692098277447522184636718340074097050910720 \sin^{71}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)} - 4225692098277447522184636718340074097050910720 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{71}{\left(t \right)} \cos{\left(t \right)} + \frac{2465168951799524854569395802568186982351528833225632536073289152331776 \sqrt{3} \sin^{70}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + 2610078881378689187003082043975013115779263281652778492111570241855047073792 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{101}{\left(t \right)} + 2610078881378689187003082043975013115779263281652778492111570241855047073792 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 65251972034467229675077051099375327894481582041319462302789256046376176844800 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 65251972034467229675077051099375327894481582041319462302789256046376176844800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{99}{\left(t \right)} + 791180160917915159810309244579925850720589182250998480421319729562311144243200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{97}{\left(t \right)} + 791180160917915159810309244579925850720589182250998480421319729562311144243200 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 6198937343274386819132319854440656149975750293925348918764979324405736800256000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 6198937343274386819132319854440656149975750293925348918764979324405736800256000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{95}{\left(t \right)} + 35280670738870240607327304796562640666072922571286067869689745608043587960832000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{93}{\left(t \right)} + 35280670738870240607327304796562640666072922571286067869689745608043587960832000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 155457776539906133876075892503590751398085530403582610634232921173968904425308160 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 155457776539906133876075892503590751398085530403582610634232921173968904425308160 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{91}{\left(t \right)} + 551957797023336938097237543862483119990543040129741449991225930232043849488793600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{89}{\left(t \right)} + 551957797023336938097237543862483119990543040129741449991225930232043849488793600 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 1622806794934972195880357387024259126976803961303110806886645822525548276377190400 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 1622806794934972195880357387024259126976803961303110806886645822525548276377190400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{87}{\left(t \right)} + 4029455730629975119526295006503849938247431031632384510306175598730216678096896000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{85}{\left(t \right)} + 4029455730629975119526295006503849938247431031632384510306175598730216678096896000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 8575508349802254741555961167687680637808635272448408060395194222938666263642112000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 8575508349802254741555961167687680637808635272448408060395194222938666263642112000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{83}{\left(t \right)} + 15821812905385159998170748354383770776756932077667312871429133341321839256419696640 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{81}{\left(t \right)} + 15821812905385159998170748354383770776756932077667312871429133341321839256419696640 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 25534692942296785288161166904929885421119461371516194419671124289365174693711052800 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 25534692942296785288161166904929885421119461371516194419671124289365174693711052800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{79}{\left(t \right)} + 36307141527328241581604159192947180833154234137624588940469879848941107767620403200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{77}{\left(t \right)} + 36307141527328241581604159192947180833154234137624588940469879848941107767620403200 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 45745072216129747350827521529575360466175759191967320283085392382618106603765760000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 45745072216129747350827521529575360466175759191967320283085392382618106603765760000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{75}{\left(t \right)} + 51311229259039222423000471616022860722234520588664340566700018615220725056798720000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{73}{\left(t \right)} + 51311229259039222423000471616022860722234520588664340566700018615220725056798720000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 51431961563178138240466355078648796865110366519461197838621665717844773821638246400 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 51431961563178138240466355078648796865110366519461197838621665717844773821638246400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{71}{\left(t \right)} + 46208402966917858575418990890973528433497594919828419933136652793376163980378112000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{69}{\left(t \right)} + 46208402966917858575418990890973528433497594919828419933136652793376163980378112000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 37300759021487909934374366140906342229449865778656676331568141411520517911871488000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 37300759021487909934374366140906342229449865778656676331568141411520517911871488000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{67}{\left(t \right)} + 27103701931264080897436658323930929567130745967214962984828476737029644620922880000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{65}{\left(t \right)} + 27103701931264080897436658323930929567130745967214962984828476737029644620922880000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 17752132259073550061478980890527860301278617241684654118718066634779650278031360000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 17752132259073550061478980890527860301278617241684654118718066634779650278031360000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{63}{\left(t \right)} + 10490400656846275989455235269996307446786832876258025293279957501990099586174156800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{61}{\left(t \right)} + 10490400656846275989455235269996307446786832876258025293279957501990099586174156800 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 5596145015858320826201255704609241766369106145562599387916071361821120032407552000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 5596145015858320826201255704609241766369106145562599387916071361821120032407552000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{59}{\left(t \right)} + 2695346069700991936395884522062668018592113187242126103795240664653354141483008000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{57}{\left(t \right)} + 2695346069700991936395884522062668018592113187242126103795240664653354141483008000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 1171889595522170407128645444375073051561788342279185262519669854197110496296960000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 1171889595522170407128645444375073051561788342279185262519669854197110496296960000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{55}{\left(t \right)} + 459696823243482963980562398821471912495865986239450139985100756950675745669120000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{53}{\left(t \right)} + 459696823243482963980562398821471912495865986239450139985100756950675745669120000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 162548796698895576063526864223272468258538212734269569498731627657758943668600832 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 162548796698895576063526864223272468258538212734269569498731627657758943668600832 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{51}{\left(t \right)} + 51746953211056933648082226786254878798521130613170536028052558181069310289510400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{49}{\left(t \right)} + 51746953211056933648082226786254878798521130613170536028052558181069310289510400 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 14807347341976717695341641759232750706426137831470412135881097318175084222873600 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 14807347341976717695341641759232750706426137831470412135881097318175084222873600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{47}{\left(t \right)} + 3800993179302059229831001790874478417944209487989056686665906677656550637568000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{45}{\left(t \right)} + 3800993179302059229831001790874478417944209487989056686665906677656550637568000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 873176189319997093594008667840518840061977216036339879938306876411631108096000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 873176189319997093594008667840518840061977216036339879938306876411631108096000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{43}{\left(t \right)} + 179001118810599404186771776907306362212705329287449675387352909664384377159680 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{41}{\left(t \right)} + 179001118810599404186771776907306362212705329287449675387352909664384377159680 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 32636950133769877341206635340743095494602654708791665919152704426886352076800 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 32636950133769877341206635340743095494602654708791665919152704426886352076800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{39}{\left(t \right)} + 5272007340082772006173774045161396170198912284071815519569014524839408435200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{37}{\left(t \right)} + 5272007340082772006173774045161396170198912284071815519569014524839408435200 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 751100095941236174556643520681067296975421695831127041458272082914705408000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 751100095941236174556643520681067296975421695831127041458272082914705408000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{35}{\left(t \right)} + 93887511992654521819580440085133412121927711978890880182284010364338176000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{33}{\left(t \right)} + 93887511992654521819580440085133412121927711978890880182284010364338176000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 10234770538100361059892724897192565365379372558577994850640191019936645120 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 10234770538100361059892724897192565365379372558577994850640191019936645120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{31}{\left(t \right)} + 966173000015984605263310618550079412747401706376177899311736782480998400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{29}{\left(t \right)} + 966173000015984605263310618550079412747401706376177899311736782480998400 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 78338351352647400426754915017574006438978516733203613457708387768729600 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 78338351352647400426754915017574006438978516733203613457708387768729600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{27}{\left(t \right)} + 5403218206623600411437892058724862498443976642251947023292705013760000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{25}{\left(t \right)} + 5403218206623600411437892058724862498443976642251947023292705013760000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 313427537836930162580256033671303499279221848100365148892136734720000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 313427537836930162580256033671303499279221848100365148892136734720000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{23}{\left(t \right)} + 15083700258402264074174821620431480902812551439830072790434080358400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{21}{\left(t \right)} + 15083700258402264074174821620431480902812551439830072790434080358400 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 592373511594962830527742064465064359556507807682454284866158592000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 592373511594962830527742064465064359556507807682454284866158592000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{19}{\left(t \right)} + 18602862740974817953765298822486627055038114650126335300599808000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{17}{\left(t \right)} + 18602862740974817953765298822486627055038114650126335300599808000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 455394436743569594951414903855241788373026062426593275412480000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 455394436743569594951414903855241788373026062426593275412480000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{15}{\left(t \right)} + 8409272269412506724955104758690544387570083539127432642560000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{13}{\left(t \right)} + 8409272269412506724955104758690544387570083539127432642560000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 112123630258833422999401396782540591834267780521699101900800 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 112123630258833422999401396782540591834267780521699101900800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{11}{\left(t \right)} + 1015612592924215788038056130276635795600251635160317952000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{9}{\left(t \right)} + 1015612592924215788038056130276635795600251635160317952000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 5707979245659984356697224337162947064794669968785408000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 5707979245659984356697224337162947064794669968785408000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{7}{\left(t \right)} + 17151379944891779917960409666955970747580138127360000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{5}{\left(t \right)} + 17151379944891779917960409666955970747580138127360000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 20589891890626386456134945578578596335630417920000 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 20589891890626386456134945578578596335630417920000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos^{3}{\left(t \right)} + 4117978378125277291226989115715719267126083584 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{69}{\left(t \right)} \cos{\left(t \right)} + 4117978378125277291226989115715719267126083584 \sin^{69}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)} - \frac{339206995550987962430611720284458042088726775278061318260972243124224 \sqrt{3} \sin^{68}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - 2277992952274704178835279194629977964887705230192491942892017778047596888064 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 2277992952274704178835279194629977964887705230192491942892017778047596888064 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{101}{\left(t \right)} + 56949823806867604470881979865749449122192630754812298572300444451189922201600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{99}{\left(t \right)} + 56949823806867604470881979865749449122192630754812298572300444451189922201600 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 690516613658269704209444005872212070606585647902099120189142888970677806694400 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 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481731023741349872312544374219265401598889126541805595862877988215913270424371200 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 481731023741349872312544374219265401598889126541805595862877988215913270424371200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{89}{\left(t \right)} + 1416333608972263679886651201621619014839130243012313226546157403141717357284556800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{87}{\left(t \right)} + 1416333608972263679886651201621619014839130243012313226546157403141717357284556800 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 3516779443473929177979422650765636888068628422697014159664541649784631073964032000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 3516779443473929177979422650765636888068628422697014159664541649784631073964032000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{85}{\left(t \right)} + 7484428046367592865956207179834560556658875873944927570568127100823702029205504000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{83}{\left(t \right)} + 7484428046367592865956207179834560556658875873944927570568127100823702029205504000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 13808769745548208837689202246794764227035625987428391367698194501019730243884154880 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 13808769745548208837689202246794764227035625987428391367698194501019730243884154880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{81}{\left(t \right)} + 22285859242049203231408518437115145534950244188086678611811182136477194877770137600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{79}{\left(t \right)} + 22285859242049203231408518437115145534950244188086678611811182136477194877770137600 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 31687706109788710844658987152773097557507378454935746151169024600303511466829414400 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 31687706109788710844658987152773097557507378454935746151169024600303511466829414400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{77}{\left(t \right)} + 39924828652916810745923127049249923978291789830489335336353545583936785004625920000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{75}{\left(t \right)} + 39924828652916810745923127049249923978291789830489335336353545583936785004625920000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 44782791607777535641502643754162809246414503460195886521383275175337731020554240000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 44782791607777535641502643754162809246414503460195886521383275175337731020554240000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{73}{\left(t \right)} + 44888162882148776901835591151231427621111949350690465077904176999279702152367308800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{71}{\left(t \right)} + 44888162882148776901835591151231427621111949350690465077904176999279702152367308800 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 40329208839430541747742913924934485753342766994760964718429534022790357402517504000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 40329208839430541747742913924934485753342766994760964718429534022790357402517504000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{69}{\left(t \right)} + 32554903520986099965045484734585669222577896248782947423310587705144023445405696000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{67}{\left(t \right)} + 32554903520986099965045484734585669222577896248782947423310587705144023445405696000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 23655239855188070604682440635395074689169914449064844926490925009327212157992960000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 23655239855188070604682440635395074689169914449064844926490925009327212157992960000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{65}{\left(t \right)} + 15493490431468209986692592696866949504017721744416740536649026906693846559621120000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{63}{\left(t \right)} + 15493490431468209986692592696866949504017721744416740536649026906693846559621120000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 9155684501845745339011153996804812972530472443341267610876034337674394951326105600 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 9155684501845745339011153996804812972530472443341267610876034337674394951326105600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{61}{\left(t \right)} + 4884135493751346971081899510049583773773036836863786519364249782303700742569984000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{59}{\left(t \right)} + 4884135493751346971081899510049583773773036836863786519364249782303700742569984000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 2352411413511356801631229571710944632298027357615337737910578347945226494017536000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 2352411413511356801631229571710944632298027357615337737910578347945226494017536000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{57}{\left(t \right)} + 1022787571091894261578795465961280274912185807658842494743729716497924562616320000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{55}{\left(t \right)} + 1022787571091894261578795465961280274912185807658842494743729716497924562616320000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 401208611357593390438392629328561423629204465668805814138782133856504947671040000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 401208611357593390438392629328561423629204465668805814138782133856504947671040000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{53}{\left(t \right)} + 141867364976045022859015633730579319395286699060489735879473362531660149496479744 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{51}{\left(t \right)} + 141867364976045022859015633730579319395286699060489735879473362531660149496479744 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 45163077467685850572321764896039414308530718905691249078054799662495759649996800 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 45163077467685850572321764896039414308530718905691249078054799662495759649996800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{49}{\left(t \right)} + 12923376809627001381425406088973226621010312259162792734664082704032272167731200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{47}{\left(t \right)} + 12923376809627001381425406088973226621010312259162792734664082704032272167731200 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 3317384672114074015321253795160538083518272120097591885014217658401141293056000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 3317384672114074015321253795160538083518272120097591885014217658401141293056000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{45}{\left(t \right)} + 762080111660979606239413815012595684071948864888859136285441939011044114432000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{43}{\left(t \right)} + 762080111660979606239413815012595684071948864888859136285441939011044114432000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 156226422890500819279079832077582115234749517302216122938515597497264043458560 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 156226422890500819279079832077582115234749517302216122938515597497264043458560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{41}{\left(t \right)} + 28484481031928620625919183969264621291048299087360583424974793372572686745600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{39}{\left(t \right)} + 28484481031928620625919183969264621291048299087360583424974793372572686745600 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 4601238549045455032173985829593986389615568533643035419980992587527251558400 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 4601238549045455032173985829593986389615568533643035419980992587527251558400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{37}{\left(t \right)} + 655536021234427107704570572737270788208459560424041681272733000936718336000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{35}{\left(t \right)} + 655536021234427107704570572737270788208459560424041681272733000936718336000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 81942002654303388463071321592158848526057445053005210159091625117089792000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 81942002654303388463071321592158848526057445053005210159091625117089792000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{33}{\left(t \right)} + 8932578750886699050040302309826547004159229175008919612947131001775063040 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{31}{\left(t \right)} + 8932578750886699050040302309826547004159229175008919612947131001775063040 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 843244738853236563968648330029198773179093899984565979086805986495692800 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 843244738853236563968648330029198773179093899984565979086805986495692800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{29}{\left(t \right)} + 68371195042154315997457972705070170798304910809559403709741025932083200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{27}{\left(t \right)} + 68371195042154315997457972705070170798304910809559403709741025932083200 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 4715755175870151251946910256610315260918738542679712692204124241920000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 4715755175870151251946910256610315260918738542679712692204124241920000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{25}{\left(t \right)} + 273549480567499316001964529387231402272713711176881190216128266240000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{23}{\left(t \right)} + 273549480567499316001964529387231402272713711176881190216128266240000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 13164568752310904582594542976760511234374347350387407279151172812800 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 13164568752310904582594542976760511234374347350387407279151172812800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{21}{\left(t \right)} + 517004560342925148965060596441607510237934269651427735229169664000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{19}{\left(t \right)} + 517004560342925148965060596441607510237934269651427735229169664000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 16235980651163289776612124641947033880624783098659368532443136000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 16235980651163289776612124641947033880624783098659368532443136000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{17}{\left(t \right)} + 397453626711463642022328632605802542977350871448209755996160000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{15}{\left(t \right)} + 397453626711463642022328632605802542977350871448209755996160000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 7339342538706004753253227590732149231115854160265236971520000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 7339342538706004753253227590732149231115854160265236971520000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{13}{\left(t \right)} + 97857900516080063376709701209761989748211388803536492953600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{11}{\left(t \right)} + 97857900516080063376709701209761989748211388803536492953600 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 886394026413768690006428452986974544820755333365366784000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 886394026413768690006428452986974544820755333365366784000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{9}{\left(t \right)} + 4981740814850566704171014990693554246282848120078336000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{7}{\left(t \right)} + 4981740814850566704171014990693554246282848120078336000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 14969173121546173990898482544151304826571058053120000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 14969173121546173990898482544151304826571058053120000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{5}{\left(t \right)} + 17970195824185082822207061877732658855427440640000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos^{3}{\left(t \right)} + 17970195824185082822207061877732658855427440640000 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 3594039164837016564441412375546531771085488128 \sin^{67}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)} - 3594039164837016564441412375546531771085488128 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{67}{\left(t \right)} \cos{\left(t \right)} + \frac{43683546785708580596017529358754177157271488773070559747691329355776 \sqrt{3} \sin^{66}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + 1784777610729755825444649999761474585530374296228065090621634056436299333632 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{101}{\left(t \right)} + 1784777610729755825444649999761474585530374296228065090621634056436299333632 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 44619440268243895636116249994036864638259357405701627265540851410907483340800 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 44619440268243895636116249994036864638259357405701627265540851410907483340800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{99}{\left(t \right)} + 541010713252457234587909531177696983738894708544132230594682823357253235507200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{97}{\left(t \right)} + 541010713252457234587909531177696983738894708544132230594682823357253235507200 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 4238846825483170085431043749433502140634638953541654590226380884036210917376000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 4238846825483170085431043749433502140634638953541654590226380884036210917376000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{95}{\left(t \right)} + 24124999315347573494035276339549268042596363106680432570155613078284216041472000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{93}{\left(t \right)} + 24124999315347573494035276339549268042596363106680432570155613078284216041472000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 106302365404257834364243859744582353711903553646909779724917259311260766683791360 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 106302365404257834364243859744582353711903553646909779724917259311260766683791360 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{91}{\left(t \right)} + 377429940996500555521982853082493197354763947124001478544586545692907243411865600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{89}{\left(t \right)} + 377429940996500555521982853082493197354763947124001478544586545692907243411865600 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 1109678812699388730060023319201062948904789853756280844753208369364400098141798400 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 1109678812699388730060023319201062948904789853756280844753208369364400098141798400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{87}{\left(t \right)} + 2755350584521919706772680184565139319461281871928808755144685183442175515426816000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{85}{\left(t \right)} + 2755350584521919706772680184565139319461281871928808755144685183442175515426816000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 5863951243982547068259806546638629833725292188976695555820740262197450455908352000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 5863951243982547068259806546638629833725292188976695555820740262197450455908352000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{83}{\left(t \right)} + 10818990045147799340939343078548272043223164088662003300489265783754296091150909440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{81}{\left(t \right)} + 10818990045147799340939343078548272043223164088662003300489265783754296091150909440 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 17460678520258961142680451546584545279154851133897819422648661836906831280917708800 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 17460678520258961142680451546584545279154851133897819422648661836906831280917708800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{79}{\left(t \right)} + 24826902270993210374748767042799900318798303956010961991578566049351900727554867200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{77}{\left(t \right)} + 24826902270993210374748767042799900318798303956010961991578566049351900727554867200 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 31280579784407891055717942560556903584692823286751212058354957223984490306600960000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 31280579784407891055717942560556903584692823286751212058354957223984490306600960000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{75}{\left(t \right)} + 35086730065484100390985948029926991936152539741492950070438845291520809102213120000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{73}{\left(t \right)} + 35086730065484100390985948029926991936152539741492950070438845291520809102213120000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 35169287077402886509552973789997408387767016305590580541192819045147916888335974400 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 35169287077402886509552973789997408387767016305590580541192819045147916888335974400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{71}{\left(t \right)} + 31597406358604155848426499889450796598384428712054037204977923360875081579364352000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{69}{\left(t \right)} + 31597406358604155848426499889450796598384428712054037204977923360875081579364352000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 25506340072608173998127415573412088820382611129007475816066516447935306817077248000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 25506340072608173998127415573412088820382611129007475816066516447935306817077248000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{67}{\left(t \right)} + 18533570276336223992541770462387849092046307883374334561471096809221284933140480000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{65}{\left(t \right)} + 18533570276336223992541770462387849092046307883374334561471096809221284933140480000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 12138946613740684720261276560160462563211616859286113864823174518320373757378560000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 12138946613740684720261276560160462563211616859286113864823174518320373757378560000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{63}{\left(t \right)} + 7173358764557385876879398117269823345947864837784387911993944691919945867250892800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{61}{\left(t \right)} + 7173358764557385876879398117269823345947864837784387911993944691919945867250892800 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 3826656122141824292367852521870882255071645799541400423215576282308108554862592000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 3826656122141824292367852521870882255071645799541400423215576282308108554862592000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{59}{\left(t \right)} + 1843083499388238798159691205901098009217200031072824854188621094013783053959168000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{57}{\left(t \right)} + 1843083499388238798159691205901098009217200031072824854188621094013783053959168000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 801340651907929912243344002565694786616173926553402110516791780005992632156160000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 801340651907929912243344002565694786616173926553402110516791780005992632156160000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{55}{\left(t \right)} + 314341686644804743536245961532760208236772173491753952891866512387219149291520000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{53}{\left(t \right)} + 314341686644804743536245961532760208236772173491753952891866512387219149291520000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 111151220397602957314416571997984009632522640546684197742563998780120691189481472 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 111151220397602957314416571997984009632522640546684197742563998780120691189481472 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{51}{\left(t \right)} + 35384679050692209644012552156322872089355570340355546318773622272777506940518400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{49}{\left(t \right)} + 35384679050692209644012552156322872089355570340355546318773622272777506940518400 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 10125296288478136092959451758582496122981502624028679920744963450962208987545600 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 10125296288478136092959451758582496122981502624028679920744963450962208987545600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{47}{\left(t \right)} + 2599127395479878684576644982671846102997483932507362033226943742992531324928000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{45}{\left(t \right)} + 2599127395479878684576644982671846102997483932507362033226943742992531324928000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 597079775649335899856606642449627589469553132625537757025907911819071062016000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 597079775649335899856606642449627589469553132625537757025907911819071062016000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{43}{\left(t \right)} + 122401354008113859470604361702173655841258392188235240190311121922909567713280 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{41}{\left(t \right)} + 122401354008113859470604361702173655841258392188235240190311121922909567713280 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 22317217420834224026898410969540778764885821857602498211417175105158827212800 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 22317217420834224026898410969540778764885821857602498211417175105158827212800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{39}{\left(t \right)} + 3605010075102587199197974014611021937434451462751506489574051952878367539200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{37}{\left(t \right)} + 3605010075102587199197974014611021937434451462751506489574051952878367539200 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 513603877728319750224948808051773817409250208397433081961025040776429568000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 513603877728319750224948808051773817409250208397433081961025040776429568000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{35}{\left(t \right)} + 64200484716039968778118601006471727176156276049679135245128130097053696000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{33}{\left(t \right)} + 64200484716039968778118601006471727176156276049679135245128130097053696000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 6998558333880400992076225516309884984477695147393593644304077478711787520 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 6998558333880400992076225516309884984477695147393593644304077478711787520 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{31}{\left(t \right)} + 660671196883240979069695768141232631998219919513067108349017730737766400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{29}{\left(t \right)} + 660671196883240979069695768141232631998219919513067108349017730737766400 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 53567934882424944248894251470910753945801615095654089866136572762521600 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 53567934882424944248894251470910753945801615095654089866136572762521600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{27}{\left(t \right)} + 3694732350761482784569319127344226449996928036096684891021728808960000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{25}{\left(t \right)} + 3694732350761482784569319127344226449996928036096684891021728808960000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 214322431443919556229746128446197246784184980656302023943252869120000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 214322431443919556229746128446197246784184980656302023943252869120000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{23}{\left(t \right)} + 10314267013238628643556532431473242501488902194084534902269044326400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{21}{\left(t \right)} + 10314267013238628643556532431473242501488902194084534902269044326400 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 405066294443021794600194535341032673683937870375374458749714432000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 405066294443021794600194535341032673683937870375374458749714432000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{19}{\left(t \right)} + 12720677965883073598897734792113710811502974993315330909011968000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{17}{\left(t \right)} + 12720677965883073598897734792113710811502974993315330909011968000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 311399705407174384305942100174142247527612606935503816622080000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 311399705407174384305942100174142247527612606935503816622080000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{15}{\left(t \right)} + 5750278650984754255649499008897513093549664616706746613760000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{13}{\left(t \right)} + 5750278650984754255649499008897513093549664616706746613760000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 76670382013130056741993320118633507913995528222756621516800 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 76670382013130056741993320118633507913995528222756621516800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{11}{\left(t \right)} + 694478097945018629909359783683274528206481233901780992000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{65}{\left(t \right)} \cos^{9}{\left(t \right)} + 694478097945018629909359783683274528206481233901780992000 \sin^{65}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 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24722357227712374259231291294799506513278212283978772407355283945245014543564800000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 24722357227712374259231291294799506513278212283978772407355283945245014543564800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{73}{\left(t \right)} + 24780527480012873963370659039022564175662396312882251871843178730998532224843776000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{71}{\left(t \right)} + 24780527480012873963370659039022564175662396312882251871843178730998532224843776000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 22263755157824066451465826480371835001571684187355148166109105891131493795758080000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 22263755157824066451465826480371835001571684187355148166109105891131493795758080000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{69}{\left(t \right)} + 17971946934629065689737474387770035483196419765696324423244699936214579329105920000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{67}{\left(t \right)} + 17971946934629065689737474387770035483196419765696324423244699936214579329105920000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 13058884205548558910734038808186560335859187126496821100223537047147788841779200000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 13058884205548558910734038808186560335859187126496821100223537047147788841779200000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{65}{\left(t \right)} + 8553187315914845602352118985478916711206017299225988089035299118599721346662400000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{63}{\left(t \right)} + 8553187315914845602352118985478916711206017299225988089035299118599721346662400000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 5054399129498429073139955312981447344028305847761357336364297072897522833293312000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 5054399129498429073139955312981447344028305847761357336364297072897522833293312000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{61}{\left(t \right)} + 2696288866549794894351332400234225979183273463091501653214227190786201149767680000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{59}{\left(t \right)} + 2696288866549794894351332400234225979183273463091501653214227190786201149767680000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 1298649620165154708730405727735191009204531187205784450105803480876920309022720000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 1298649620165154708730405727735191009204531187205784450105803480876920309022720000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{57}{\left(t \right)} + 564630269637023786404524229450083047480230950959036717437305861250834916966400000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{55}{\left(t \right)} + 564630269637023786404524229450083047480230950959036717437305861250834916966400000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 221487367283602258318222086716850011223741910861398449192101065638690999500800000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 221487367283602258318222086716850011223741910861398449192101065638690999500800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{53}{\left(t \right)} + 78317933071481758541323329863078163968715139680590491634326936809841137423482880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{51}{\left(t \right)} + 78317933071481758541323329863078163968715139680590491634326936809841137423482880 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 24932294182059551510686351112856224236402298884803365969867592929328324673536000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 24932294182059551510686351112856224236402298884803365969867592929328324673536000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{49}{\left(t \right)} + 7134355108412778818887418583283059598848755236442972301879920046748439937024000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{47}{\left(t \right)} + 7134355108412778818887418583283059598848755236442972301879920046748439937024000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 1831363476489887420026904323833821102383051009354780836420068762000157573120000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 1831363476489887420026904323833821102383051009354780836420068762000157573120000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{45}{\left(t \right)} + 420706616988691961958584626116268762227869415942113324733702051688234352640000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{43}{\left(t \right)} + 420706616988691961958584626116268762227869415942113324733702051688234352640000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 86244856482681852201509848353835096256713230268133231570408920596088042291200 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 86244856482681852201509848353835096256713230268133231570408920596088042291200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{41}{\left(t \right)} + 15724868643406228311635736726505697774716297243839158631350855087645786112000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{39}{\left(t \right)} + 15724868643406228311635736726505697774716297243839158631350855087645786112000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 2540115500072283663391526405958985646972784228496996442518302189019987968000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 2540115500072283663391526405958985646972784228496996442518302189019987968000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{37}{\left(t \right)} + 361888911136485460863107561228892120667764374480576155311291356644638720000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{35}{\left(t \right)} + 361888911136485460863107561228892120667764374480576155311291356644638720000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 45236113892060682607888445153611515083470546810072019413911419580579840000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 45236113892060682607888445153611515083470546810072019413911419580579840000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{33}{\left(t \right)} + 4931233514387274411761026109053035490417888179735323435011003101531340800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{31}{\left(t \right)} + 4931233514387274411761026109053035490417888179735323435011003101531340800 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 465513580459736191214419782430136813874084496133868423226950162579456000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 465513580459736191214419782430136813874084496133868423226950162579456000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{29}{\left(t \right)} + 37744344361600231720088090467308390314114959145989331612995959128064000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{27}{\left(t \right)} + 37744344361600231720088090467308390314114959145989331612995959128064000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 2603334447691017680184344100567747634144176936003084205055960678400000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 2603334447691017680184344100567747634144176936003084205055960678400000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{25}{\left(t \right)} + 151013095326338982709306215165342233506471802088451290583321804800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{23}{\left(t \right)} + 151013095326338982709306215165342233506471802088451290583321804800000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 7267505212580063542885361604832094987498955475506718359322361856000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 7267505212580063542885361604832094987498955475506718359322361856000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{21}{\left(t \right)} + 285412565190205058525882328424575867636378987256361407249121280000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{19}{\left(t \right)} + 285412565190205058525882328424575867636378987256361407249121280000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 8963079325554469202475368688210202739812394304233024488734720000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 8963079325554469202475368688210202739812394304233024488734720000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{17}{\left(t \right)} + 219414426574160812790094704729747925087206714913905128243200000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{15}{\left(t \right)} + 219414426574160812790094704729747925087206714913905128243200000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 4051686854352401372544362445293640662121714906080634470400000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 4051686854352401372544362445293640662121714906080634470400000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{13}{\left(t \right)} + 54022491391365351633924832603915208828289532081075126272000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{11}{\left(t \right)} + 54022491391365351633924832603915208828289532081075126272000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 489334161153671663350768411267347906053347210879303680000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 489334161153671663350768411267347906053347210879303680000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{9}{\left(t \right)} + 2750171921377520388161685169708097424627403031838720000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{7}{\left(t \right)} + 2750171921377520388161685169708097424627403031838720000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 8263737744523799243274294380132504280731379302400000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 8263737744523799243274294380132504280731379302400000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{5}{\left(t \right)} + 9920453474818486486523762761263510541094092800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{63}{\left(t \right)} \cos^{3}{\left(t \right)} + 9920453474818486486523762761263510541094092800000 \sin^{63}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 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496109911508102443382514110123171298889112692347971958834339816792179381108736000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 496109911508102443382514110123171298889112692347971958834339816792179381108736000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{87}{\left(t \right)} + 1231848999023175564241228989470238517282409572372172221154559803244168232304640000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{85}{\left(t \right)} + 1231848999023175564241228989470238517282409572372172221154559803244168232304640000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 2621627356895476200821077080154610177806153705304879342457140094083742648238080000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 2621627356895476200821077080154610177806153705304879342457140094083742648238080000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{83}{\left(t \right)} + 4836902473472153590514887212885255778052353586287502386833423473584505185999257600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{81}{\left(t \right)} + 4836902473472153590514887212885255778052353586287502386833423473584505185999257600 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 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15723317143750858625881383074467533409703918128349265076578859019376261674827776000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 15723317143750858625881383074467533409703918128349265076578859019376261674827776000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{71}{\left(t \right)} + 14126417746338662046690305105966924547780863943438792842238818650220860098478080000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{69}{\left(t \right)} + 14126417746338662046690305105966924547780863943438792842238818650220860098478080000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 11403252879574582616003017374696192104835155231450591812409648789937320802385920000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 11403252879574582616003017374696192104835155231450591812409648789937320802385920000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{67}{\left(t \right)} + 8285900212292506677278615267182700563980829258625175961252946021143480054579200000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{65}{\left(t \right)} + 8285900212292506677278615267182700563980829258625175961252946021143480054579200000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 5427022361267606712603537484938376977578086999801284840118888622035495708262400000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 5427022361267606712603537484938376977578086999801284840118888622035495708262400000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{63}{\left(t \right)} + 3207031026611576341729152932505772145187550786445071760207755745084100745101312000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{61}{\left(t \right)} + 3207031026611576341729152932505772145187550786445071760207755745084100745101312000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 1710803169711419567468535470324055665154299244125309528501424854972531138887680000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 1710803169711419567468535470324055665154299244125309528501424854972531138887680000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{59}{\left(t \right)} + 823996981215902256709058605024960377185331191882032823605144313889741833502720000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{57}{\left(t \right)} + 823996981215902256709058605024960377185331191882032823605144313889741833502720000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 358259557050392285525677654358678424863187474731318618958758397343366014566400000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 358259557050392285525677654358678424863187474731318618958758397343366014566400000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{55}{\left(t \right)} + 140534382165326579108345593033790796595181270926676793785631377905251306700800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{53}{\left(t \right)} + 140534382165326579108345593033790796595181270926676793785631377905251306700800000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 49692957533659478372711001696748425676056097399672914282599255227296862049402880 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 49692957533659478372711001696748425676056097399672914282599255227296862049402880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{51}{\left(t \right)} + 15819613559961762215844848513128072103214324146205644489652829431766802497536000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{49}{\left(t \right)} + 15819613559961762215844848513128072103214324146205644489652829431766802497536000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 4526769176975359659937338691732233722076549375169956109672346930246817153024000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 4526769176975359659937338691732233722076549375169956109672346930246817153024000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{47}{\left(t \right)} + 1162005480696799912707129351672336781336614236929787840652499770041035653120000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{45}{\left(t \right)} + 1162005480696799912707129351672336781336614236929787840652499770041035653120000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 266939578615632034342142876804767021647507787308299975050331418761248112640000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 266939578615632034342142876804767021647507787308299975050331418761248112640000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{43}{\left(t \right)} + 54722613616204567040139289744977239437739096398201494885317940846055863091200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{41}{\left(t \right)} + 54722613616204567040139289744977239437739096398201494885317940846055863091200 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 9977475133389331998903376811847182506179638894482741002933144894792794112000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 9977475133389331998903376811847182506179638894482741002933144894792794112000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{39}{\left(t \right)} + 1611710712034168289344915877465204343254661337964468503001378874319699968000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{37}{\left(t \right)} + 1611710712034168289344915877465204343254661337964468503001378874319699968000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 229619572270810950313726142651080673055277395503757385095176094713118720000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 229619572270810950313726142651080673055277395503757385095176094713118720000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{35}{\left(t \right)} + 28702446533851368789215767831385084131909674437969673136897011839139840000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{61}{\left(t \right)} \cos^{33}{\left(t \right)} + 28702446533851368789215767831385084131909674437969673136897011839139840000 \sin^{61}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 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4738499183904777256068708105920106885026536732276272502841528505841427656212480000 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 4738499183904777256068708105920106885026536732276272502841528505841427656212480000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{65}{\left(t \right)} + 3103578412849912588770147999199134334052468503011359767942989430726549108162560000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{63}{\left(t \right)} + 3103578412849912588770147999199134334052468503011359767942989430726549108162560000 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 1834020868343495220426359333276738445529130605998275412868810316719970113604812800 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 1834020868343495220426359333276738445529130605998275412868810316719970113604812800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{61}{\left(t \right)} + 978365562678718065146068722091569333510114880234161386611752338937416245051392000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{59}{\left(t \right)} + 978365562678718065146068722091569333510114880234161386611752338937416245051392000 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 471223273632844103055492889748649215702861275357537520999191904505696111034368000 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 471223273632844103055492889748649215702861275357537520999191904505696111034368000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{57}{\left(t \right)} + 204879684188193088284996908586369224218635337111972835217039958480737439580160000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{55}{\left(t \right)} + 204879684188193088284996908586369224218635337111972835217039958480737439580160000 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 80368099800796137427585136016199111802869289311193291446157944239565591019520000 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 80368099800796137427585136016199111802869289311193291446157944239565591019520000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{53}{\left(t \right)} + 28418160089561514194394104095328005933494580700437947855361449083110392984502272 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{51}{\left(t \right)} + 28418160089561514194394104095328005933494580700437947855361449083110392984502272 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 9046841504603132767186272743445116234025691621111352942520211831291640178278400 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 9046841504603132767186272743445116234025691621111352942520211831291640178278400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{49}{\left(t \right)} + 2588746123082783805526665564334371159812526673925318650218873400734898559385600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{47}{\left(t \right)} + 2588746123082783805526665564334371159812526673925318650218873400734898559385600 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 664521884273482450079389597987617596826876266744222421373148305992217264128000 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 664521884273482450079389597987617596826876266744222421373148305992217264128000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{45}{\left(t \right)} + 152656071520814569639412957672726140504668515866934048231908280104088764416000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{43}{\left(t \right)} + 152656071520814569639412957672726140504668515866934048231908280104088764416000 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 31294494661766986776079656322908858803457045752721479887541197421338196705280 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 31294494661766986776079656322908858803457045752721479887541197421338196705280 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{41}{\left(t \right)} + 5705868591907024236872868614275107495721480992782317511052392236709629132800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{39}{\left(t \right)} + 5705868591907024236872868614275107495721480992782317511052392236709629132800 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 921697063444539990469123767425413733798759452648430425153913543751578419200 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 921697063444539990469123767425413733798759452648430425153913543751578419200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{37}{\left(t \right)} + 131313692892370012210662137828586759903486760553711254601303829164064768000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{35}{\left(t \right)} + 131313692892370012210662137828586759903486760553711254601303829164064768000 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 16414211611546251526332767228573344987935845069213906825162978645508096000 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 16414211611546251526332767228573344987935845069213906825162978645508096000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{33}{\left(t \right)} + 1789329441610316649903528031949973431651907506446175337424359869927915520 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{31}{\left(t \right)} + 1789329441610316649903528031949973431651907506446175337424359869927915520 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 168914563172848902497403362391110773170264706012171499952169388762726400 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 168914563172848902497403362391110773170264706012171499952169388762726400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{29}{\left(t \right)} + 13695775392393154256546218572252224851643084271257148644770490980761600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{27}{\left(t \right)} + 13695775392393154256546218572252224851643084271257148644770490980761600 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 944636460638322396726978148553050313409168588318882281313754152960000 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 944636460638322396726978148553050313409168588318882281313754152960000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{25}{\left(t \right)} + 54796062029461324400303902690340875683255681037413095763471237120000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{23}{\left(t \right)} + 54796062029461324400303902690340875683255681037413095763471237120000 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 2637060485167826236764625316972654642256679649925505233617053286400 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 2637060485167826236764625316972654642256679649925505233617053286400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{21}{\left(t \right)} + 103563764403035755474427203436296895830667452146723024883679232000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{19}{\left(t \right)} + 103563764403035755474427203436296895830667452146723024883679232000 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 3252310335317009562312676955203904979903965553868764944007168000 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 3252310335317009562312676955203904979903965553868764944007168000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{17}{\left(t \right)} + 79615920081199744487458432195934026435837590057986901934080000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{15}{\left(t \right)} + 79615920081199744487458432195934026435837590057986901934080000 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 1470180342408518009001363094527190829070864589138962677760000 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 1470180342408518009001363094527190829070864589138962677760000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{13}{\left(t \right)} + 19602404565446906786684841260362544387611527855186169036800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{11}{\left(t \right)} + 19602404565446906786684841260362544387611527855186169036800 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 177558012368178503502580083880095510757350795789729792000 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 177558012368178503502580083880095510757350795789729792000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{9}{\left(t \right)} + 997917371800280629882023755247425592373709811744768000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{7}{\left(t \right)} + 997917371800280629882023755247425592373709811744768000 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 2998549795072958623443580995334812477084464578560000 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 2998549795072958623443580995334812477084464578560000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{5}{\left(t \right)} + 3599699633941126798851837929573604414267064320000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos^{3}{\left(t \right)} + 3599699633941126798851837929573604414267064320000 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 719939926788225359770367585914720882853412864 \sin^{59}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)} - 719939926788225359770367585914720882853412864 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{59}{\left(t \right)} \cos{\left(t \right)} + \frac{6005123284710411385380216679544172280079408994806662303397707776 \sqrt{3} \sin^{58}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + 235309498437288934681549613145014573299295282981520959999203202789397233664 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{101}{\left(t \right)} + 235309498437288934681549613145014573299295282981520959999203202789397233664 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 5882737460932223367038740328625364332482382074538023999980080069734930841600 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 5882737460932223367038740328625364332482382074538023999980080069734930841600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{99}{\left(t \right)} + 71328191713803208325344726484582542531348882653773540999758470845536036454400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{97}{\left(t \right)} + 71328191713803208325344726484582542531348882653773540999758470845536036454400 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 558860058788561219868680331219409611585826297081112279998107606624818429952000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 558860058788561219868680331219409611585826297081112279998107606624818429952000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{95}{\left(t \right)} + 3180699631464584755268231416354217984689644198621799187332979620517033017344000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{93}{\left(t \right)} + 3180699631464584755268231416354217984689644198621799187332979620517033017344000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 14015167007695528195318754430377638404116684858348264629658792306825579169054720 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 14015167007695528195318754430377638404116684858348264629658792306825579169054720 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{91}{\left(t \right)} + 49761297753387048246676960544026987418871740122060992767538531195776989868851200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{89}{\left(t \right)} + 49761297753387048246676960544026987418871740122060992767538531195776989868851200 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 146302801689681736319723045286125428448111383400345222975528031810625435651276800 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 146302801689681736319723045286125428448111383400345222975528031810625435651276800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{87}{\left(t \right)} + 363272241967246430875399273451622582186037436364308281233393312681953782136832000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{85}{\left(t \right)} + 363272241967246430875399273451622582186037436364308281233393312681953782136832000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 773117848289268045196362556320119854395925826108656085701837050066722151727104000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 773117848289268045196362556320119854395925826108656085701837050066722151727104000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{83}{\left(t \right)} + 1426402430093699543387288916410621131360483149170470478119889357373102369936506880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{81}{\left(t \right)} + 1426402430093699543387288916410621131360483149170470478119889357373102369936506880 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 2302059080232936954598484665912953409141535623788910475413100290755364396833177600 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 2302059080232936954598484665912953409141535623788910475413100290755364396833177600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{79}{\left(t \right)} + 3273240254706207232319720384344980628623120965074857082228001975917783751747174400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{77}{\left(t \right)} + 3273240254706207232319720384344980628623120965074857082228001975917783751747174400 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 4124109074231958714461186160646858882217460101884766880791249173901716928593920000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 4124109074231958714461186160646858882217460101884766880791249173901716928593920000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{75}{\left(t \right)} + 4625921349460349039767302250792012392387607863451310359226397017736103581450240000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{73}{\left(t \right)} + 4625921349460349039767302250792012392387607863451310359226397017736103581450240000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 4636805870282608684566754726676228892134402234894725207130459128366070883994828800 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 4636805870282608684566754726676228892134402234894725207130459128366070883994828800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{71}{\left(t \right)} + 4165880274082031240040443699748174395277002007913229678281271873141391809839104000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{69}{\left(t \right)} + 4165880274082031240040443699748174395277002007913229678281271873141391809839104000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 3362819016427663772080840094977441981729628126869715523431870066270762063364096000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 3362819016427663772080840094977441981729628126869715523431870066270762063364096000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{67}{\left(t \right)} + 2443511785310751623005894987712267293634841575926673373225393391649994791976960000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{65}{\left(t \right)} + 2443511785310751623005894987712267293634841575926673373225393391649994791976960000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 1600428771665521530857662214174116589983054131601096010533590993361400097669120000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 1600428771665521530857662214174116589983054131601096010533590993361400097669120000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{63}{\left(t \right)} + 945753377256094129641199764688517022393111050893022673724693927639502370216345600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{61}{\left(t \right)} + 945753377256094129641199764688517022393111050893022673724693927639502370216345600 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 504515816076939906408958283152102209052382929499894554699429852899915369283584000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 504515816076939906408958283152102209052382929499894554699429852899915369283584000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{59}{\left(t \right)} + 242996691134959692684734277986720556982397722162973688495966651178193503911936000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{57}{\left(t \right)} + 242996691134959692684734277986720556982397722162973688495966651178193503911936000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 105650735276069431602058381733356763905390313983901603693898543990518914744320000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 105650735276069431602058381733356763905390313983901603693898543990518914744320000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{55}{\left(t \right)} + 41443586123918683284689019808232875314861167574277191580583557141017699287040000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{53}{\left(t \right)} + 41443586123918683284689019808232875314861167574277191580583557141017699287040000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 14654452053417646409466037404191144711334908854264414942894345805063858467897344 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 14654452053417646409466037404191144711334908854264414942894345805063858467897344 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{51}{\left(t \right)} + 4665203681246522050830534256791619613145858458023364944138662580874019392716800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{49}{\left(t \right)} + 4665203681246522050830534256791619613145858458023364944138662580874019392716800 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 1334944127967041317437047854302624790367460258916883728307562504116157756211200 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 1334944127967041317437047854302624790367460258916883728307562504116157756211200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{47}{\left(t \right)} + 342675389991539623895670766171432702884504307534467921328950196369102995456000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{45}{\left(t \right)} + 342675389991539623895670766171432702884504307534467921328950196369102995456000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 78720475699853444440336217775176138156566555349103121315489773133844447232000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 78720475699853444440336217775176138156566555349103121315489773133844447232000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{43}{\left(t \right)} + 16137697518469956110268924643911108322096143846566139869675403492438111682560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{41}{\left(t \right)} + 16137697518469956110268924643911108322096143846566139869675403492438111682560 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 2942357191305882600750294815860370381307852314240670663475178757387032985600 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 2942357191305882600750294815860370381307852314240670663475178757387032985600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{39}{\left(t \right)} + 475293452547802267538478229675974351576153533297608335575149509752546918400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{37}{\left(t \right)} + 475293452547802267538478229675974351576153533297608335575149509752546918400 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 67714806672346320341302868542710050088868549520012042381805561090932736000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 67714806672346320341302868542710050088868549520012042381805561090932736000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{35}{\left(t \right)} + 8464350834043290042662858567838756261108568690001505297725695136366592000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{33}{\left(t \right)} + 8464350834043290042662858567838756261108568690001505297725695136366592000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 922707255755048760694676450472092990221945070382581676411416436843479040 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 922707255755048760694676450472092990221945070382581676411416436843479040 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{31}{\left(t \right)} + 87104526096668014518703180545868153373816429170230692109150640196812800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{29}{\left(t \right)} + 87104526096668014518703180545868153373816429170230692109150640196812800 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 7062529142973082258273230855070390814093223986775461522363565421363200 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 7062529142973082258273230855070390814093223986775461522363565421363200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{27}{\left(t \right)} + 487122659479255461362224114579345716167295797050514642353174609920000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{25}{\left(t \right)} + 487122659479255461362224114579345716167295797050514642353174609920000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 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41055708034639169022917835288500035934815586675471847260160000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 41055708034639169022917835288500035934815586675471847260160000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{15}{\left(t \right)} + 758130972230552837070925935725142709023583276677747179520000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{13}{\left(t \right)} + 758130972230552837070925935725142709023583276677747179520000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 10108412963074037827612345809668569453647777022369962393600 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 10108412963074037827612345809668569453647777022369962393600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{11}{\left(t \right)} + 91561711622047444090691538131055882732316820854800384000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{9}{\left(t \right)} + 91561711622047444090691538131055882732316820854800384000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 514598138381639589429819965409386735548950418292736000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 514598138381639589429819965409386735548950418292736000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{7}{\left(t \right)} + 1546268444656368958623257107600320719798528901120000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{5}{\left(t \right)} + 1546268444656368958623257107600320719798528901120000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 1856264639443420118395266635774694741654896640000 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 1856264639443420118395266635774694741654896640000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos^{3}{\left(t \right)} + 371252927888684023679053327154938948330979328 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{57}{\left(t \right)} \cos{\left(t \right)} + 371252927888684023679053327154938948330979328 \sin^{57}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)} - \frac{541869687219637448618408090381802809404633189246521260296372224 \sqrt{3} \sin^{56}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} - 109427144378179819274986358560443840030791163064833173705923167730733678592 \sin^{55}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 109427144378179819274986358560443840030791163064833173705923167730733678592 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{55}{\left(t \right)} \cos^{101}{\left(t \right)} + 2735678609454495481874658964011096000769779076620829342648079193268341964800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{55}{\left(t \right)} \cos^{99}{\left(t \right)} + 2735678609454495481874658964011096000769779076620829342648079193268341964800 \sin^{55}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 33170103139635757717730239938634539009333571304027555779607960218378646323200 \sin^{55}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 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2151215173000791686325353843899781986669761698737847125094793018737418798366720000 \sin^{55}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 2151215173000791686325353843899781986669761698737847125094793018737418798366720000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{55}{\left(t \right)} \cos^{73}{\left(t \right)} + 2156276855760793549116707617650134414873690549793700883036192531722683313186406400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{55}{\left(t \right)} \cos^{71}{\left(t \right)} + 2156276855760793549116707617650134414873690549793700883036192531722683313186406400 \sin^{55}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 1937279987597587954284542000232542638363081353330278137102829227719598289190912000 \sin^{55}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 1937279987597587954284542000232542638363081353330278137102829227719598289190912000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{55}{\left(t \right)} \cos^{69}{\left(t \right)} + 1563828423723354131771859205006992250244896996061790785372163352496543197298688000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{55}{\left(t \right)} \cos^{67}{\left(t \right)} + 1563828423723354131771859205006992250244896996061790785372163352496543197298688000 \sin^{55}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 1136318417644510370139105011768292133053964788805061393842578045767305270394880000 \sin^{55}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 1136318417644510370139105011768292133053964788805061393842578045767305270394880000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{55}{\left(t \right)} \cos^{65}{\left(t \right)} + 744255337872427844769472288409641631006105592667642550353033573835895849615360000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{55}{\left(t \right)} \cos^{63}{\left(t \right)} + 744255337872427844769472288409641631006105592667642550353033573835895849615360000 \sin^{55}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 439808388723987829518460030432072601322670523667035019599245777538649703632076800 \sin^{55}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 439808388723987829518460030432072601322670523667035019599245777538649703632076800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{55}{\left(t \right)} \cos^{61}{\left(t \right)} + 234617494888926599833536544263040537776108145536664250961622973551359245156352000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{55}{\left(t \right)} \cos^{59}{\left(t \right)} + 234617494888926599833536544263040537776108145536664250961622973551359245156352000 \sin^{55}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 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35875356437068437356376745098559150600883166871463606163918028800000 \sin^{51}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 35875356437068437356376745098559150600883166871463606163918028800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{51}{\left(t \right)} \cos^{25}{\left(t \right)} + 2081042113625659670105082313409484145826766300236224317200793600000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{51}{\left(t \right)} \cos^{23}{\left(t \right)} + 2081042113625659670105082313409484145826766300236224317200793600000 \sin^{51}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 100150151718234871623807086332831424517913128198868295265288192000 \sin^{51}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 100150151718234871623807086332831424517913128198868295265288192000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{51}{\left(t \right)} \cos^{21}{\left(t \right)} + 3933139484593763044341328318155843459777489532406981418024960000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{51}{\left(t \right)} \cos^{19}{\left(t \right)} + 3933139484593763044341328318155843459777489532406981418024960000 \sin^{51}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 123516079873326302500866837577554197320598501325588702167040000 \sin^{51}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 123516079873326302500866837577554197320598501325588702167040000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{51}{\left(t \right)} \cos^{17}{\left(t \right)} + 3023649446103459057548759793820176188998739322535831142400000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{51}{\left(t \right)} \cos^{15}{\left(t \right)} + 3023649446103459057548759793820176188998739322535831142400000 \sin^{51}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 55834435794524101914962893919974844399124447717280972800000 \sin^{51}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 55834435794524101914962893919974844399124447717280972800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{51}{\left(t \right)} \cos^{13}{\left(t \right)} + 744459143926988025532838585599664591988325969563746304000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{51}{\left(t \right)} \cos^{11}{\left(t \right)} + 744459143926988025532838585599664591988325969563746304000 \sin^{51}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 6743289347164746608087306028982469130329039579381760000 \sin^{51}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 6743289347164746608087306028982469130329039579381760000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{51}{\left(t \right)} \cos^{9}{\left(t \right)} + 37898856226538118230920226577982564361544180695040000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{51}{\left(t \right)} \cos^{7}{\left(t \right)} + 37898856226538118230920226577982564361544180695040000 \sin^{51}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 113878774719165018722717026977111070797909196800000 \sin^{51}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 113878774719165018722717026977111070797909196800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{51}{\left(t \right)} \cos^{5}{\left(t \right)} + 136709213348337357410224522181405847296409600000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{51}{\left(t \right)} \cos^{3}{\left(t \right)} + 136709213348337357410224522181405847296409600000 \sin^{51}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 27341842669667471482044904436281169459281920 \sin^{51}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)} - 27341842669667471482044904436281169459281920 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{51}{\left(t \right)} \cos{\left(t \right)} + \frac{248411592963686202178136807256899335378934056258825238347776 \sqrt{3} \sin^{50}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{5} + \frac{29460917780817316751060489948630854355298688390828085854643323422357061632 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{101}{\left(t \right)}}{5} + \frac{29460917780817316751060489948630854355298688390828085854643323422357061632 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)}}{5} - 147304588904086583755302449743154271776493441954140429273216617111785308160 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 147304588904086583755302449743154271776493441954140429273216617111785308160 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{99}{\left(t \right)} + 1786068140462049828033042203135745545289982983693952704937751482480396861440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{97}{\left(t \right)} + 1786068140462049828033042203135745545289982983693952704937751482480396861440 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 13993935945888225456753732725599655818766876985643340780955578625619604275200 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 13993935945888225456753732725599655818766876985643340780955578625619604275200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{95}{\left(t \right)} + 79645174504527908165977299145307416124778670969071669991610461162217825894400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{93}{\left(t \right)} + 79645174504527908165977299145307416124778670969071669991610461162217825894400 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 350941789974688235350295762339217730419287912291088432194611989921098757046272 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 350941789974688235350295762339217730419287912291088432194611989921098757046272 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{91}{\left(t \right)} + 1246030025575023388810225645539509760930184475820752811116507996129433086853120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{89}{\left(t \right)} + 1246030025575023388810225645539509760930184475820752811116507996129433086853120 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 3663443116667580285995041298867314412320081546422305499964664062352895435079680 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 3663443116667580285995041298867314412320081546422305499964664062352895435079680 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{87}{\left(t \right)} + 9096388988736417082412959203369588435482267698487450137480195073301516858163200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{85}{\left(t \right)} + 9096388988736417082412959203369588435482267698487450137480195073301516858163200 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 19358981693977503021545528561017329234487903050627137472073235668821176903270400 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 19358981693977503021545528561017329234487903050627137472073235668821176903270400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{83}{\left(t \right)} + 35717321225388493074751500195076972437630181128407068635975119808975071386533888 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{81}{\left(t \right)} + 35717321225388493074751500195076972437630181128407068635975119808975071386533888 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 57643889209513604758025914512994500971864847990687608217406219916425549326581760 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 57643889209513604758025914512994500971864847990687608217406219916425549326581760 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{79}{\left(t \right)} + 81962404969777156765318097198164056069370330736758942934124468943667577948733440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{77}{\left(t \right)} + 81962404969777156765318097198164056069370330736758942934124468943667577948733440 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 103268282123724534386010865170100601148410894164351453298963190313639521288192000 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 103268282123724534386010865170100601148410894164351453298963190313639521288192000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{75}{\left(t \right)} + 115833733395423574491949894860648556354592120073884250564991518703131373338624000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{73}{\left(t \right)} + 115833733395423574491949894860648556354592120073884250564991518703131373338624000 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 116106283356353982902519188730908905898955866238763978213379734041256388334714880 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 116106283356353982902519188730908905898955866238763978213379734041256388334714880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{71}{\left(t \right)} + 104314238952974281513982083625425970143593161073889511676083354802691286394470400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{69}{\left(t \right)} + 104314238952974281513982083625425970143593161073889511676083354802691286394470400 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 84205469998184058571527706059078795176153515565669846774669696045545978173849600 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 84205469998184058571527706059078795176153515565669846774669696045545978173849600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{67}{\left(t \right)} + 61185885212095123860408851455529815600558702875461321589317919382688388612096000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{65}{\left(t \right)} + 61185885212095123860408851455529815600558702875461321589317919382688388612096000 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 40074965752951192236057259432861633609722659193284608292418754215561985523712000 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 40074965752951192236057259432861633609722659193284608292418754215561985523712000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{63}{\left(t \right)} + 23681800074634595161995086746106671611245483917031623212801207569258660820418560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{61}{\left(t \right)} + 23681800074634595161995086746106671611245483917031623212801207569258660820418560 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 12633148321911764146091411555337193716668024874365874950770987762986084886118400 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 12633148321911764146091411555337193716668024874365874950770987762986084886118400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{59}{\left(t \right)} + 6084671962738970318615706090026917603045525966587060400240222252976689486233600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{57}{\left(t \right)} + 6084671962738970318615706090026917603045525966587060400240222252976689486233600 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 2645509549016943616789437430446485914367619985472634956626183588250734559232000 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 2645509549016943616789437430446485914367619985472634956626183588250734559232000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{55}{\left(t \right)} + 1037753334606153047046514518357708701606377247590828021637080239799013474304000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{53}{\left(t \right)} + 1037753334606153047046514518357708701606377247590828021637080239799013474304000 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - \frac{1834747895583678587178237668456428984440074973740583942254357863964655822569472 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)}}{5} - \frac{1834747895583678587178237668456428984440074973740583942254357863964655822569472 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{51}{\left(t \right)}}{5} + 116817368611746687593208999161077209248393546924751316489687545912510570823680 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{49}{\left(t \right)} + 116817368611746687593208999161077209248393546924751316489687545912510570823680 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 33427192235933603146915208283535030956922354371161716134035401265680345989120 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 33427192235933603146915208283535030956922354371161716134035401265680345989120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{47}{\left(t \right)} + 8580640864134741879230466412068144107245693644383029811192123092752767385600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{45}{\left(t \right)} + 8580640864134741879230466412068144107245693644383029811192123092752767385600 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 1971171990643872223834876451145328879420696014469729529234518806640145203200 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 1971171990643872223834876451145328879420696014469729529234518806640145203200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{43}{\left(t \right)} + 404090258081993805886149672484792420281242682966294553493076355361229766656 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{41}{\left(t \right)} + 404090258081993805886149672484792420281242682966294553493076355361229766656 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 73677045653098449881065157676049108887183097876042485209116306026591682560 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 73677045653098449881065157676049108887183097876042485209116306026591682560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{39}{\left(t \right)} + 11901416152143430667828310166880175447538997657825796668660101823688867840 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{37}{\left(t \right)} + 11901416152143430667828310166880175447538997657825796668660101823688867840 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 1695588461295875468279474311427976149242326667668532768262294018300313600 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 1695588461295875468279474311427976149242326667668532768262294018300313600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{35}{\left(t \right)} + 211948557661984433534934288928497018655290833458566596032786752287539200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{33}{\left(t \right)} + 211948557661984433534934288928497018655290833458566596032786752287539200 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 23104721890185555831500529078798795879785550196801984974123566842773504 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 23104721890185555831500529078798795879785550196801984974123566842773504 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{31}{\left(t \right)} + 2181109813852152080447641091423063413130797381859562383624946088673280 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{29}{\left(t \right)} + 2181109813852152080447641091423063413130797381859562383624946088673280 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 176846741663688006522781710115383519983578166096721274347968601784320 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 176846741663688006522781710115383519983578166096721274347968601784320 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{27}{\left(t \right)} + 12197621188603268701168093333510111204300276736297626095732129792000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{25}{\left(t \right)} + 12197621188603268701168093333510111204300276736297626095732129792000 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 707554318632724287835727986559224609581100542080316267848269824000 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 707554318632724287835727986559224609581100542080316267848269824000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{23}{\left(t \right)} + 34051051584199856352094409353162684336090463587615220390197985280 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{21}{\left(t \right)} + 34051051584199856352094409353162684336090463587615220390197985280 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 1337267424761879435076051628172986776324346441018373682128486400 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 1337267424761879435076051628172986776324346441018373682128486400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{19}{\left(t \right)} + 41995467156930942850294724776368427089003490450700158736793600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{17}{\left(t \right)} + 41995467156930942850294724776368427089003490450700158736793600 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 1028040811675176079566578329898859904259571369662182588416000 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 1028040811675176079566578329898859904259571369662182588416000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{15}{\left(t \right)} + 18983708170138194651087383932791447095702312223875530752000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{13}{\left(t \right)} + 18983708170138194651087383932791447095702312223875530752000 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 253116108935175928681165119103885961276030829651673743360 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 253116108935175928681165119103885961276030829651673743360 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{11}{\left(t \right)} + 2292718378036013846749684049854039504311873456989798400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{9}{\left(t \right)} + 2292718378036013846749684049854039504311873456989798400 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 12885611117022960198512877036514071882925021436313600 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 12885611117022960198512877036514071882925021436313600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{7}{\left(t \right)} + 38718783404516106365723789172217764071289126912000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{5}{\left(t \right)} + 38718783404516106365723789172217764071289126912000 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 46481132538434701519476337541677988080779264000 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 46481132538434701519476337541677988080779264000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos^{3}{\left(t \right)} + \frac{46481132538434701519476337541677988080779264 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{49}{\left(t \right)} \cos{\left(t \right)}}{5} + \frac{46481132538434701519476337541677988080779264 \sin^{49}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{5} - 3245748195144205979453659296963694101883131452624423878656 \sqrt{3} \sin^{48}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)} - \frac{9003648469397392021633871148542069834155732210918354720649830650907459584 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)}}{5} - \frac{9003648469397392021633871148542069834155732210918354720649830650907459584 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{101}{\left(t \right)}}{5} + 45018242346986960108169355742710349170778661054591773603249153254537297920 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{99}{\left(t \right)} + 45018242346986960108169355742710349170778661054591773603249153254537297920 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 545846188457216891311553438380362983695691265286925254939395983211264737280 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 545846188457216891311553438380362983695691265286925254939395983211264737280 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{97}{\left(t \right)} + 4276733022963761210276088795557483171223972800186218492308669559181043302400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{95}{\left(t \right)} + 4276733022963761210276088795557483171223972800186218492308669559181043302400 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 24340625056477344075672895996590831954973938944809845090991138858307734732800 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 24340625056477344075672895996590831954973938944809845090991138858307734732800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{93}{\left(t \right)} + 107252480512014907685017623833399181645811482550498959527251481327238081675264 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{91}{\left(t \right)} + 107252480512014907685017623833399181645811482550498959527251481327238081675264 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 380803355009414632339091829302095498662655130864138593002342360563464997437440 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 380803355009414632339091829302095498662655130864138593002342360563464997437440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{89}{\left(t \right)} + 1119596960811090025033827590298326857819234900881660932421633299721155153756160 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{87}{\left(t \right)} + 1119596960811090025033827590298326857819234900881660932421633299721155153756160 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 2779977507992210626018097719117109147642189920327765426631161488098384569958400 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 2779977507992210626018097719117109147642189920327765426631161488098384569958400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{85}{\left(t \right)} + 5916362388803935434859028479146668186007737522748834113086830859286305623244800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{83}{\left(t \right)} + 5916362388803935434859028479146668186007737522748834113086830859286305623244800 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 10915688607343260877314907544025602803184275729471598938645202935383233874886656 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 10915688607343260877314907544025602803184275729471598938645202935383233874886656 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{81}{\left(t \right)} + 17616739529726611017525591337651126076640608429586441596587763675082236488581120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{79}{\left(t \right)} + 17616739529726611017525591337651126076640608429586441596587763675082236488581120 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 25048801518830025040544200183222694890223365110818221645148226475507555007201280 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 25048801518830025040544200183222694890223365110818221645148226475507555007201280 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{77}{\left(t \right)} + 31560161064838890966202904740134695153464452062702003399059436540758855778304000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{75}{\left(t \right)} + 31560161064838890966202904740134695153464452062702003399059436540758855778304000 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 35400330164505749376957660175707562960758922351062338530257283262703351103488000 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 35400330164505749376957660175707562960758922351062338530257283262703351103488000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{73}{\left(t \right)} + 35483625059010468787256384082003345461843060991888367562093182752733241341378560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{71}{\left(t \right)} + 35483625059010468787256384082003345461843060991888367562093182752733241341378560 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 31879819388954718051050657573674880688374625109899705231568093879408771517644800 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 31879819388954718051050657573674880688374625109899705231568093879408771517644800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{69}{\left(t \right)} + 25734312036867061559281856113689361519531323883894942777289907107474550502195200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{67}{\left(t \right)} + 25734312036867061559281856113689361519531323883894942777289907107474550502195200 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 18699220636544663633014763334642168177301724163602524477400694696996243505152000 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 18699220636544663633014763334642168177301724163602524477400694696996243505152000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{65}{\left(t \right)} + 12247442756099428812266979494034636467004638048675337669408642140722685804544000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{63}{\left(t \right)} + 12247442756099428812266979494034636467004638048675337669408642140722685804544000 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 7237473203682506213749018194756092987220553296889082354016169465033312142622720 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 7237473203682506213749018194756092987220553296889082354016169465033312142622720 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{61}{\left(t \right)} + 3860858218962638938618373178034443817775882861812439953769927653137119497420800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{59}{\left(t \right)} + 3860858218962638938618373178034443817775882861812439953769927653137119497420800 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 1859556712105257041240143025434421803841356168582739872838487881886846890803200 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 1859556712105257041240143025434421803841356168582739872838487881886846890803200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{57}{\left(t \right)} + 808502918306633496191366532797574697322328768949017336016733861689933430784000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{55}{\left(t \right)} + 808502918306633496191366532797574697322328768949017336016733861689933430784000 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 317151227000217251384277825776680206104235874003849728026301029626725531648000 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 317151227000217251384277825776680206104235874003849728026301029626725531648000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{53}{\left(t \right)} + \frac{560723369336384100447403195973170604392289025238806319150500220380050739953664 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{51}{\left(t \right)}}{5} + \frac{560723369336384100447403195973170604392289025238806319150500220380050739953664 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)}}{5} - 35700942174483914919338301198915488065517362573676597762960642929603022684160 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 35700942174483914919338301198915488065517362573676597762960642929603022684160 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{49}{\left(t \right)} + 10215794716595092853631051180207171623009534495968341521212482299490667069440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{47}{\left(t \right)} + 10215794716595092853631051180207171623009534495968341521212482299490667069440 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 2622358018768829638766899298490680215727893899634730524418382733128184627200 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 2622358018768829638766899298490680215727893899634730524418382733128184627200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{45}{\left(t \right)} + 602416387993033714976563073426950821777218948289085739703688699742414438400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{43}{\left(t \right)} + 602416387993033714976563073426950821777218948289085739703688699742414438400 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 123495359538571911570195430052524918464329884399262576639256183447194959872 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 123495359538571911570195430052524918464329884399262576639256183447194959872 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{41}{\left(t \right)} + 22516685469865846429348395381245777560116248207439179471393133026837790720 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{39}{\left(t \right)} + 22516685469865846429348395381245777560116248207439179471393133026837790720 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 3637231131736142012829026184056935115983851675052790250089469788112814080 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 3637231131736142012829026184056935115983851675052790250089469788112814080 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{37}{\left(t \right)} + 518194394616411005898300881039319114217509397395580700487644949459763200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{35}{\left(t \right)} + 518194394616411005898300881039319114217509397395580700487644949459763200 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 64774299327051375737287610129914889277188674674447587560955618682470400 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 64774299327051375737287610129914889277188674674447587560955618682470400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{33}{\left(t \right)} + 7061110432135710410042781236140172545381446733741978775875601509122048 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{31}{\left(t \right)} + 7061110432135710410042781236140172545381446733741978775875601509122048 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 666576180116977870739715676588753267630410010672257111003881652879360 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 666576180116977870739715676588753267630410010672257111003881652879360 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{29}{\left(t \right)} + 54046717306781989519436406209898913591654865730183009000314728611840 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{27}{\left(t \right)} + 54046717306781989519436406209898913591654865730183009000314728611840 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 3727755332067942825512910020844046459526280000490126894121877504000 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 3727755332067942825512910020844046459526280000490126894121877504000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{25}{\left(t \right)} + 216238014218316986095326432482756793364702244669036364602277888000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{23}{\left(t \right)} + 216238014218316986095326432482756793364702244669036364602277888000 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 10406454434256504955837584563232670680676295524697375046484623360 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 10406454434256504955837584563232670680676295524697375046484623360 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{21}{\left(t \right)} + 408686718170470430262327628568459576132388621267569503685836800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{19}{\left(t \right)} + 408686718170470430262327628568459576132388621267569503685836800 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 12834373538604674841981963705043989151940775667885495497523200 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 12834373538604674841981963705043989151940775667885495497523200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{17}{\left(t \right)} + 314182950761436348640929344064724336644817029813598420992000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{15}{\left(t \right)} + 314182950761436348640929344064724336644817029813598420992000 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 5801673806674250756153524819377011898270769016444289024000 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 5801673806674250756153524819377011898270769016444289024000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{13}{\left(t \right)} + 77355650755656676748713664258360158643610253552590520320 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{11}{\left(t \right)} + 77355650755656676748713664258360158643610253552590520320 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 700685242351962651709362900890943465974730557541580800 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 700685242351962651709362900890943465974730557541580800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{9}{\left(t \right)} + 3938014208320946256094371984132159182515547091763200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{7}{\left(t \right)} + 3938014208320946256094371984132159182515547091763200 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 11832975385579766394514338894627882159001042944000 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 11832975385579766394514338894627882159001042944000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{5}{\left(t \right)} + 14205252563721208156679878625003459974791168000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos^{3}{\left(t \right)} + 14205252563721208156679878625003459974791168000 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - \frac{14205252563721208156679878625003459974791168 \sin^{47}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{5} - \frac{14205252563721208156679878625003459974791168 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{47}{\left(t \right)} \cos{\left(t \right)}}{5} + 194239167714175379760806450952310908868443240333826473984 \sqrt{3} \sin^{46}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)} + \frac{2469037035874830232213651626477416917991462841198057192547556299754176512 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{101}{\left(t \right)}}{5} + \frac{2469037035874830232213651626477416917991462841198057192547556299754176512 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)}}{5} - 12345185179374151161068258132387084589957314205990285962737781498770882560 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 12345185179374151161068258132387084589957314205990285962737781498770882560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{99}{\left(t \right)} + 149685370299911582827952629855193400653232434747632217298195600672596951040 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{97}{\left(t \right)} + 149685370299911582827952629855193400653232434747632217298195600672596951040 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 1172792592040544360301484522576773036045944849569077166460089242383233843200 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 1172792592040544360301484522576773036045944849569077166460089242383233843200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{95}{\left(t \right)} + 6674839088293254425622120896071712162183365803992755591923242289657701990400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{93}{\left(t \right)} + 6674839088293254425622120896071712162183365803992755591923242289657701990400 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 29411448866942697921741261127322302221999546584751236745042833920533832138752 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 29411448866942697921741261127322302221999546584751236745042833920533832138752 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{91}{\left(t \right)} + 104426287865341759908310062779189557091407964602773673017638785329554962513920 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{89}{\left(t \right)} + 104426287865341759908310062779189557091407964602773673017638785329554962513920 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 307022910866765174292635115452179435135107287633961305922827396498875880570880 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 307022910866765174292635115452179435135107287633961305922827396498875880570880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{87}{\left(t \right)} + 762342893490507277200802545501165649061696424118293867627672645518608249651200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{85}{\left(t \right)} + 762342893490507277200802545501165649061696424118293867627672645518608249651200 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 1622422055377233436094015673758890996721046235944061308028123835334473967206400 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 1622422055377233436094015673758890996721046235944061308028123835334473967206400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{83}{\left(t \right)} + 2993368692170995689593458918085153888950330305316793113311888476192104469495808 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{81}{\left(t \right)} + 2993368692170995689593458918085153888950330305316793113311888476192104469495808 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 4830972965914375065942456680872873487785007030031188068470667816530669113180160 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 4830972965914375065942456680872873487785007030031188068470667816530669113180160 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{79}{\left(t \right)} + 6869039685909502046886930593116116990444306870825595534856730801629545145303040 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{77}{\left(t \right)} + 6869039685909502046886930593116116990444306870825595534856730801629545145303040 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 8654625598957595417165230853395638117933808391623760952405695307092928233472000 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 8654625598957595417165230853395638117933808391623760952405695307092928233472000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{75}{\left(t \right)} + 9707700889860658314685751052749841593247182917680971068292268697864617590784000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{73}{\left(t \right)} + 9707700889860658314685751052749841593247182917680971068292268697864617590784000 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 9730542539013271628367364584638664749937176289251985117864721094800769632174080 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 9730542539013271628367364584638664749937176289251985117864721094800769632174080 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{71}{\left(t \right)} + 8742284312394736228611304119011300361271681822374830379331585358610066466406400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{69}{\left(t \right)} + 8742284312394736228611304119011300361271681822374830379331585358610066466406400 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 7057024685909003943577799710527194267532562434929079944761641193094872930713600 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 7057024685909003943577799710527194267532562434929079944761641193094872930713600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{67}{\left(t \right)} + 5127817734171684776075332106734699086672542826193386341976192533600441204736000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{65}{\left(t \right)} + 5127817734171684776075332106734699086672542826193386341976192533600441204736000 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 3358570679691395876727702900317463729282601149319644855563354174054090145792000 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 3358570679691395876727702900317463729282601149319644855563354174054090145792000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{63}{\left(t \right)} + 1984705361030134250903776932656351222522937116676077631834469607230088895528960 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{61}{\left(t \right)} + 1984705361030134250903776932656351222522937116676077631834469607230088895528960 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 1058748791146274148312141401688288626843158136382356060381859917057642358374400 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 1058748791146274148312141401688288626843158136382356060381859917057642358374400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{59}{\left(t \right)} + 509939321609787636118872300987978176040716899603739675935668543967448373657600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{57}{\left(t \right)} + 509939321609787636118872300987978176040716899603739675935668543967448373657600 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 221712748525994624399509696081729641756833434610321598232899366942368858112000 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 221712748525994624399509696081729641756833434610321598232899366942368858112000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{55}{\left(t \right)} + 86971201518831772893557668611007433485205220648950166412083057591702257664000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{53}{\left(t \right)} + 86971201518831772893557668611007433485205220648950166412083057591702257664000 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - \frac{153765084285294574475809958104261142401842830107343894216562845822129591549952 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)}}{5} - \frac{153765084285294574475809958104261142401842830107343894216562845822129591549952 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{51}{\left(t \right)}}{5} + 9790136603403630651396424047698539472050803891969660624495295537011889274880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{49}{\left(t \right)} + 9790136603403630651396424047698539472050803891969660624495295537011889274880 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 2801439393363595985483299423085731234011493351126782644452230686390007889920 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 2801439393363595985483299423085731234011493351126782644452230686390007889920 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{47}{\left(t \right)} + 719119487135744505202186235836739044444914587900848223464300287801006489600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{45}{\left(t \right)} + 719119487135744505202186235836739044444914587900848223464300287801006489600 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 165198405738323045634110776858075555134747255986935993054207885444330291200 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 165198405738323045634110776858075555134747255986935993054207885444330291200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{43}{\left(t \right)} + 33865673176356224354992709255905488802623187477321878576112616516087709696 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{41}{\left(t \right)} + 33865673176356224354992709255905488802623187477321878576112616516087709696 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 6174666918550223234430648251427368224882208095444381788071024049216552960 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 6174666918550223234430648251427368224882208095444381788071024049216552960 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{39}{\left(t \right)} + 997424366668383946186752233629007321252801537476424723578568452803133440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{37}{\left(t \right)} + 997424366668383946186752233629007321252801537476424723578568452803133440 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 142102521709878309836647197464105520666952729219843413806987364374937600 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 142102521709878309836647197464105520666952729219843413806987364374937600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{35}{\left(t \right)} + 17762815213734788729580899683013190083369091152480426725873420546867200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{33}{\left(t \right)} + 17762815213734788729580899683013190083369091152480426725873420546867200 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 1936342054068671474697170602807591710187048178380283880446860789284864 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 1936342054068671474697170602807591710187048178380283880446860789284864 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{31}{\left(t \right)} + 182792706927055575410865714457747915349688792880951277776559123988480 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{29}{\left(t \right)} + 182792706927055575410865714457747915349688792880951277776559123988480 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 14821030291382884492772895766844425568893685909266319819721010053120 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 14821030291382884492772895766844425568893685909266319819721010053120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{27}{\left(t \right)} + 1022248481472715929573682326872758554730570441534710089433219072000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{25}{\left(t \right)} + 1022248481472715929573682326872758554730570441534710089433219072000 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 59298146466260949256480942038016259164698915902391758025129984000 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 59298146466260949256480942038016259164698915902391758025129984000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{23}{\left(t \right)} + 2853723298688808182968145335579532472301135327802603354959380480 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{21}{\left(t \right)} + 2853723298688808182968145335579532472301135327802603354959380480 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 112072638848878370145503847408042821359490639165459825845862400 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 112072638848878370145503847408042821359490639165459825845862400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{19}{\left(t \right)} + 3519522525426599062451167621804300424466762683151755614617600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{17}{\left(t \right)} + 3519522525426599062451167621804300424466762683151755614617600 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 86157222164665827722182805919321919815587825780948729856000 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 86157222164665827722182805919321919815587825780948729856000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{15}{\left(t \right)} + 1590971432017976932369852950214751360231025191977746432000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{13}{\left(t \right)} + 1590971432017976932369852950214751360231025191977746432000 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 21212952426906359098264706002863351469747002559703285760 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 21212952426906359098264706002863351469747002559703285760 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{11}{\left(t \right)} + 192146308214731513571238279011443400994085168113254400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{9}{\left(t \right)} + 192146308214731513571238279011443400994085168113254400 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 1079906991170711035727553555263029953399113750937600 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 1079906991170711035727553555263029953399113750937600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{7}{\left(t \right)} + 3244912834046607679469812365574008273434836992000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{5}{\left(t \right)} + 3244912834046607679469812365574008273434836992000 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 3895453582288844753265080871037224818049024000 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 3895453582288844753265080871037224818049024000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos^{3}{\left(t \right)} + \frac{3895453582288844753265080871037224818049024 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{45}{\left(t \right)} \cos{\left(t \right)}}{5} + \frac{3895453582288844753265080871037224818049024 \sin^{45}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{5} - 10612788008781761681169969892861388255819047368470347776 \sqrt{3} \sin^{44}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)} - 121247354440281841760491820943087437937080764523118879991174639720071168 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 121247354440281841760491820943087437937080764523118879991174639720071168 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{101}{\left(t \right)} + 3031183861007046044012295523577185948427019113077971999779365993001779200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{99}{\left(t \right)} + 3031183861007046044012295523577185948427019113077971999779365993001779200 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 36753104314710433283649083223373379624677606746070410497324812665146572800 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 36753104314710433283649083223373379624677606746070410497324812665146572800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{97}{\left(t \right)} + 287962466795669374181168074739832665100566815742407339979039769335169024000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{95}{\left(t \right)} + 287962466795669374181168074739832665100566815742407339979039769335169024000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 1638911383286290149148288612874750754107522853658935524802581812192739328000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 1638911383286290149148288612874750754107522853658935524802581812192739328000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{93}{\left(t \right)} + 7221561105722537436141827508940743849151674384648741165077481542988217712640 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{91}{\left(t \right)} + 7221561105722537436141827508940743849151674384648741165077481542988217712640 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 25640383181222307120343988628818864464408205594431035785580951755024655974400 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 25640383181222307120343988628818864464408205594431035785580951755024655974400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{89}{\left(t \right)} + 75385089721750377616495229240490486305495092945838713507837083961777559961600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{87}{\left(t \right)} + 75385089721750377616495229240490486305495092945838713507837083961777559961600 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 187182406883829911812697053582875494189255818421902512140723194212158275584000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 187182406883829911812697053582875494189255818421902512140723194212158275584000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{85}{\left(t \right)} + 398362558239945709755227062753299128659185459718407910453333977425875304448000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{83}{\left(t \right)} + 398362558239945709755227062753299128659185459718407910453333977425875304448000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 734978919952699834498393930779836892376197173180462594786401188350739936706560 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 734978919952699834498393930779836892376197173180462594786401188350739936706560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{81}{\left(t \right)} + 1186176397880761734941228202892893043875782976123729213240565758523155362611200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{79}{\left(t \right)} + 1186176397880761734941228202892893043875782976123729213240565758523155362611200 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 1686594565736708091869558850988332296760878919175927475076429437900111531212800 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 1686594565736708091869558850988332296760878919175927475076429437900111531212800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{77}{\left(t \right)} + 2125019678315481017607534361324821859314104739014762733849612687009424343040000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{75}{\left(t \right)} + 2125019678315481017607534361324821859314104739014762733849612687009424343040000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 2383587272064000925480876374559112891199085091394881289089619546350687354880000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 2383587272064000925480876374559112891199085091394881289089619546350687354880000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{73}{\left(t \right)} + 2389195712704151515893772554263957862707788821021692774475712768812688972185600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{71}{\left(t \right)} + 2389195712704151515893772554263957862707788821021692774475712768812688972185600 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 2146543023132636127560811279221524642276529018886677102068023190730150248448000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 2146543023132636127560811279221524642276529018886677102068023190730150248448000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{69}{\left(t \right)} + 1732751596986585789717763321781230735331655955004908022151295828661687549952000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{67}{\left(t \right)} + 1732751596986585789717763321781230735331655955004908022151295828661687549952000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 1259062390086797601268496722635752007888347568931411825038797273875108331520000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 1259062390086797601268496722635752007888347568931411825038797273875108331520000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{65}{\left(t \right)} + 824649050817083809017962765702948683529210103627591370785644998093638205440000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{63}{\left(t \right)} + 824649050817083809017962765702948683529210103627591370785644998093638205440000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 487316048467220463391552371857586237673042595612429775673642091060959327027200 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 487316048467220463391552371857586237673042595612429775673642091060959327027200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{61}{\left(t \right)} + 259960640683236956058784719164535153912382578129596354111617390348974686208000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{59}{\left(t \right)} + 259960640683236956058784719164535153912382578129596354111617390348974686208000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 125208315573831785654187395331869641438568881599132509716347187134864556032000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 125208315573831785654187395331869641438568881599132509716347187134864556032000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{57}{\left(t \right)} + 54438398075579037240951041448638974538508209390927178137542255276028067840000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{55}{\left(t \right)} + 54438398075579037240951041448638974538508209390927178137542255276028067840000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 21354536087213158522971748989309860900385210427197585502966822176534036480000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 21354536087213158522971748989309860900385210427197585502966822176534036480000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{53}{\left(t \right)} + 7550963960438572853722810442619966814376210407057066233849068321622435299328 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{51}{\left(t \right)} + 7550963960438572853722810442619966814376210407057066233849068321622435299328 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 2403828183871427168869657690283123531083902741331836314050184172034169241600 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 2403828183871427168869657690283123531083902741331836314050184172034169241600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{49}{\left(t \right)} + 687853422477668657149917269061228651208179171035593952878895927461832294400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{47}{\left(t \right)} + 687853422477668657149917269061228651208179171035593952878895927461832294400 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 176569516930651552616608227549199318948528135422083269154180874236854272000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 176569516930651552616608227549199318948528135422083269154180874236854272000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{45}{\left(t \right)} + 40562108551820390669089699674973908626835263746792319723131400443920384000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{43}{\left(t \right)} + 40562108551820390669089699674973908626835263746792319723131400443920384000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 8315232253123180087163388433369651268501229068092425543241937091003678720 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 8315232253123180087163388433369651268501229068092425543241937091003678720 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{41}{\left(t \right)} + 1516101252322599454882525240305827019502327880577861599749581797798707200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{39}{\left(t \right)} + 1516101252322599454882525240305827019502327880577861599749581797798707200 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 244903304315897843929782914507122333343321806076800713378666361179340800 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 244903304315897843929782914507122333343321806076800713378666361179340800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{37}{\left(t \right)} + 34891244169836192147391052948775909092332143335229409640108504645632000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{35}{\left(t \right)} + 34891244169836192147391052948775909092332143335229409640108504645632000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 4361405521229524018423881618596988636541517916903676205013563080704000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 4361405521229524018423881618596988636541517916903676205013563080704000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{33}{\left(t \right)} + 475441129347218442447965996225078321697712722370158988502577425940480 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{31}{\left(t \right)} + 475441129347218442447965996225078321697712722370158988502577425940480 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 44882137861553824319632206674893461358182516109162144096922999193600 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 44882137861553824319632206674893461358182516109162144096922999193600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{29}{\left(t \right)} + 3639092259044904674564773514180550920933717522364498170020783718400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{27}{\left(t \right)} + 3639092259044904674564773514180550920933717522364498170020783718400 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 250998511075890071993538071330364823706166849483968995173335040000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 250998511075890071993538071330364823706166849483968995173335040000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{25}{\left(t \right)} + 14559812748412286647796659875405777919903751672462262015098880000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{23}{\left(t \right)} + 14559812748412286647796659875405777919903751672462262015098880000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 700690988517341294925214256503903062395368049237246359476633600 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 700690988517341294925214256503903062395368049237246359476633600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{21}{\left(t \right)} + 27517835431644242669654962533224799887374933723662010810368000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{19}{\left(t \right)} + 27517835431644242669654962533224799887374933723662010810368000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 864168477225281019798277764282305907793178337381011423232000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 864168477225281019798277764282305907793178337381011423232000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{17}{\left(t \right)} + 21154675085074198771071671096262078526148796508715089920000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{15}{\left(t \right)} + 21154675085074198771071671096262078526148796508715089920000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 390640306968699693215812108311657700056724935530250240000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 390640306968699693215812108311657700056724935530250240000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{13}{\left(t \right)} + 5208537426249329242877494777488769334089665807070003200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{11}{\left(t \right)} + 5208537426249329242877494777488769334089665807070003200 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 47178781034867112707223684578702620779797697527808000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 47178781034867112707223684578702620779797697527808000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{9}{\left(t \right)} + 265155734439237084665247524729761818914960965632000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{7}{\left(t \right)} + 265155734439237084665247524729761818914960965632000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 796741990502515278441248571904332388566589440000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 796741990502515278441248571904332388566589440000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{5}{\left(t \right)} + 956472977794135988524908249585032879431680000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos^{3}{\left(t \right)} + 956472977794135988524908249585032879431680000 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 191294595558827197704981649917006575886336 \sin^{43}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)} - 191294595558827197704981649917006575886336 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{43}{\left(t \right)} \cos{\left(t \right)} + 527490163415623848067398516909173299646036057962881024 \sqrt{3} \sin^{42}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)} + 26587265920246358210229265252940251689457001059829127885388708029923328 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{101}{\left(t \right)} + 26587265920246358210229265252940251689457001059829127885388708029923328 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 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1583552617403460734540085051134893563813492464627929400695717783710140989440 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 1583552617403460734540085051134893563813492464627929400695717783710140989440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{91}{\left(t \right)} + 5622454107004308725029291338470965180029288404995440824278678833119782502400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{89}{\left(t \right)} + 5622454107004308725029291338470965180029288404995440824278678833119782502400 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 16530533273127875421975520156426155690593023052475074865851599518573369753600 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 16530533273127875421975520156426155690593023052475074865851599518573369753600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{87}{\left(t \right)} + 41045583636740750453342748757973912397498301125541031681173638750262001664000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{85}{\left(t \right)} + 41045583636740750453342748757973912397498301125541031681173638750262001664000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 87353421585884161221216619151585505871598948549228349475318256827480670208000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 87353421585884161221216619151585505871598948549228349475318256827480670208000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{83}{\left(t \right)} + 161167062825956277453144662334675258333100060073326304781962183846701836533760 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{81}{\left(t \right)} + 161167062825956277453144662334675258333100060073326304781962183846701836533760 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 260106189239030560138885154738291019577423998892600165020939990273533096755200 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 260106189239030560138885154738291019577423998892600165020939990273533096755200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{79}{\left(t \right)} + 369838487824246577697477329393507543461649748425415859639149048670179871948800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{77}{\left(t \right)} + 369838487824246577697477329393507543461649748425415859639149048670179871948800 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 465976874579621019645362682922854331947701937671279929253569756282056867840000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 465976874579621019645362682922854331947701937671279929253569756282056867840000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{75}{\left(t \right)} + 522675887973237696869653075820028883135690587064006266160254116161891860480000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{73}{\left(t \right)} + 522675887973237696869653075820028883135690587064006266160254116161891860480000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 523905713591998256156405200704311304037186329621803927962984125846978664857600 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 523905713591998256156405200704311304037186329621803927962984125846978664857600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{71}{\left(t \right)} + 470696539555310933265520297507779687220909593019589466529243550565644894208000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{69}{\left(t \right)} + 470696539555310933265520297507779687220909593019589466529243550565644894208000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 379959857231395572636022408831581193298806538943524027198305034793954312192000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 379959857231395572636022408831581193298806538943524027198305034793954312192000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{67}{\left(t \right)} + 276088717398829100035321160888801375212039304212011869356491971420403793920000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{65}{\left(t \right)} + 276088717398829100035321160888801375212039304212011869356491971420403793920000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 180830037126718474876935497190326046922505275273364499227643864322135818240000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 180830037126718474876935497190326046922505275273364499227643864322135818240000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{63}{\left(t \right)} + 106859250064570198747589070370908298353267961106853833762335796072862135091200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{61}{\left(t \right)} + 106859250064570198747589070370908298353267961106853833762335796072862135091200 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 57004482403342149422312433561334444871996471114867777504320180545197703168000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 57004482403342149422312433561334444871996471114867777504320180545197703168000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{59}{\left(t \right)} + 27455830248462870919313068961796572661250048587667959270000366678674767872000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{57}{\left(t \right)} + 27455830248462870919313068961796572661250048587667959270000366678674767872000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 11937317499331683008396986505128944635326108081594764900000159425510768640000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 11937317499331683008396986505128944635326108081594764900000159425510768640000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{55}{\left(t \right)} + 4682648394063497364313620528738903446587626278717683270805983590434734080000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{53}{\left(t \right)} + 4682648394063497364313620528738903446587626278717683270805983590434734080000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 1655784472140852668021296218962076258713384652154572804556995797577721970688 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 1655784472140852668021296218962076258713384652154572804556995797577721970688 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{51}{\left(t \right)} + 527114339493904500604492689248581969055066579752950022240727612274612633600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{49}{\left(t \right)} + 527114339493904500604492689248581969055066579752950022240727612274612633600 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 150833326978468867752883752783460289470856190248941558875581112796997222400 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 150833326978468867752883752783460289470856190248941558875581112796997222400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{47}{\left(t \right)} + 38718376344919463820494713326111458234706388121938123372079973151014912000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{45}{\left(t \right)} + 38718376344919463820494713326111458234706388121938123372079973151014912000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 8894508019012582023843613114740514689177329568565678657112106508222464000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 8894508019012582023843613114740514689177329568565678657112106508222464000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{43}{\left(t \right)} + 1823374143897579314887940688521805511281352561555964124707981834185605120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{41}{\left(t \right)} + 1823374143897579314887940688521805511281352561555964124707981834185605120 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 332452508705028486585459031567790626180330761574018704364709170328371200 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 332452508705028486585459031567790626180330761574018704364709170328371200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{39}{\left(t \right)} + 53702691548629371799075758086433090580140745723008995672883857247436800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{37}{\left(t \right)} + 53702691548629371799075758086433090580140745723008995672883857247436800 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 7650994046955337908959232834566451168134027545340494634535692009472000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 7650994046955337908959232834566451168134027545340494634535692009472000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{35}{\left(t \right)} + 956374255869417238619904104320806396016753443167561829316961501184000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{33}{\left(t \right)} + 956374255869417238619904104320806396016753443167561829316961501184000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 104255303496973835242960974888597796137210924793650696118947891118080 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 104255303496973835242960974888597796137210924793650696118947891118080 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{31}{\left(t \right)} + 9841809249388806061347227447165807578057020895233952433103804825600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{29}{\left(t \right)} + 9841809249388806061347227447165807578057020895233952433103804825600 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 797984533734227518487613036256687100923542234748698845927335526400 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 797984533734227518487613036256687100923542234748698845927335526400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{27}{\left(t \right)} + 55039255828443111950015754835191703692731584527446333812899840000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{25}{\left(t \right)} + 55039255828443111950015754835191703692731584527446333812899840000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 3192693276303131336318694479721082433626296202096508644884480000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 3192693276303131336318694479721082433626296202096508644884480000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{23}{\left(t \right)} + 153648363922088195560337171836577092118265504725894478535065600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{21}{\left(t \right)} + 153648363922088195560337171836577092118265504725894478535065600 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 6034144097808341702452265946455073894681778813129382166528000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 6034144097808341702452265946455073894681778813129382166528000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{19}{\left(t \right)} + 189495904549399893365188154722419192505400689328570499072000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{17}{\left(t \right)} + 189495904549399893365188154722419192505400689328570499072000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 4638822632788247083603137202507201774918009530687160320000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 4638822632788247083603137202507201774918009530687160320000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{15}{\left(t \right)} + 85660077025919335350626113114479578230020062356439040000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{13}{\left(t \right)} + 85660077025919335350626113114479578230020062356439040000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 1142134360345591138008348174859727709733600831419187200 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 1142134360345591138008348174859727709733600831419187200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{11}{\left(t \right)} + 10345419930666586395003153757787388675123195936768000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{9}{\left(t \right)} + 10345419930666586395003153757787388675123195936768000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 58143668819483022693715035170222176415786729472000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 58143668819483022693715035170222176415786729472000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{7}{\left(t \right)} + 174710543327773505690249504718215674326282240000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{5}{\left(t \right)} + 174710543327773505690249504718215674326282240000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 209736546611972996026710089697737904353280000 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 209736546611972996026710089697737904353280000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos^{3}{\left(t \right)} + 41947309322394599205342017939547580870656 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{41}{\left(t \right)} \cos{\left(t \right)} + 41947309322394599205342017939547580870656 \sin^{41}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)} - 23754901491726644173345834782580609312535388914712576 \sqrt{3} \sin^{40}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)} - \frac{25954235779288111586176187508822626649231834367928434364308024505401344 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)}}{5} - \frac{25954235779288111586176187508822626649231834367928434364308024505401344 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{101}{\left(t \right)}}{5} + 129771178896440557930880937544113133246159171839642171821540122527006720 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{99}{\left(t \right)} + 129771178896440557930880937544113133246159171839642171821540122527006720 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 1573475544119341764911931367722371740609679958555661333336173985639956480 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 1573475544119341764911931367722371740609679958555661333336173985639956480 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{97}{\left(t \right)} + 12328261995161853003433689066690747658385121324766006323046311640065638400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{95}{\left(t \right)} + 12328261995161853003433689066690747658385121324766006323046311640065638400 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 70165147370901639945323769414720388040105944414781528174525297107717324800 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 70165147370901639945323769414720388040105944414781528174525297107717324800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{93}{\left(t \right)} + 309169796731151857695921367126336362458824719284500502040592519676741812224 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{91}{\left(t \right)} + 309169796731151857695921367126336362458824719284500502040592519676741812224 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 1097717230415126941553337832749093201815242021927681303787742057894814679040 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 1097717230415126941553337832749093201815242021927681303787742057894814679040 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{89}{\left(t \right)} + 3227389829515442344290458697207011349115780691197514616666264667911943618560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{87}{\left(t \right)} + 3227389829515442344290458697207011349115780691197514616666264667911943618560 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 8013661567173194136128822376556811468083001648319915709181519946479724134400 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 8013661567173194136128822376556811468083001648319915709181519946479724134400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{85}{\left(t \right)} + 17054715642958336238428006596261932098740747097706487278514516809174797516800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{83}{\left(t \right)} + 17054715642958336238428006596261932098740747097706487278514516809174797516800 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 31465950361258130359899672170103264722176678395268469028859283512927501418496 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 31465950361258130359899672170103264722176678395268469028859283512927501418496 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{81}{\left(t \right)} + 50782636946667871265210911163190151441306590259983841742183521910546937937920 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{79}{\left(t \right)} + 50782636946667871265210911163190151441306590259983841742183521910546937937920 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 72206561908543379455221764310160996580607808025914524977167195216558927380480 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 72206561908543379455221764310160996580607808025914524977167195216558927380480 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{77}{\left(t \right)} + 90976437417926008597427952380176321951694187831059414759030285750306340864000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{75}{\left(t \right)} + 90976437417926008597427952380176321951694187831059414759030285750306340864000 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 102046244794774978912646552898196115278872924141067890059859136964940791808000 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 102046244794774978912646552898196115278872924141067890059859136964940791808000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{73}{\left(t \right)} + 102286353606056802392441015375603635550117331021399814507058805522505358376960 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{71}{\left(t \right)} + 102286353606056802392441015375603635550117331021399814507058805522505358376960 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 91897895817941658399458724751518891314558539589538895846185645586625907916800 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 91897895817941658399458724751518891314558539589538895846185645586625907916800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{69}{\left(t \right)} + 74182638792796278467032946486165852025005086174688024357764316316914889523200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{67}{\left(t \right)} + 74182638792796278467032946486165852025005086174688024357764316316914889523200 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 53903035301676157625943655221146935160445768917583269731505575372555026432000 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 53903035301676157625943655221146935160445768917583269731505575372555026432000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{65}{\left(t \right)} + 35304912010454559380735025641920799637251029934323545087301897320036040704000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{63}{\left(t \right)} + 35304912010454559380735025641920799637251029934323545087301897320036040704000 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 20862996441177991184053104215272572535638030501814319925027464947558797803520 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 20862996441177991184053104215272572535638030501814319925027464947558797803520 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{61}{\left(t \right)} + 11129446564462038696737189409593867808342168170045613703224416201681456332800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{59}{\left(t \right)} + 11129446564462038696737189409593867808342168170045613703224416201681456332800 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 5360424000890370036627789654445997519577390438544696809857214446788883251200 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 5360424000890370036627789654445997519577390438544696809857214446788883251200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{57}{\left(t \right)} + 2330619130821900015925125936715651095468430625454216004285745411647340544000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{55}{\left(t \right)} + 2330619130821900015925125936715651095468430625454216004285745411647340544000 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 914231353126682818746944960372833530048060368702023876681168224799162368000 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 914231353126682818746944960372833530048060368702023876681168224799162368000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{53}{\left(t \right)} + \frac{1616361032327975223544598689939169681124970731865178213972305421444919066624 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{51}{\left(t \right)}}{5} + \frac{1616361032327975223544598689939169681124970731865178213972305421444919066624 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)}}{5} - 102912799615476592975162858377104098720274903666052147199380152872662466560 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 102912799615476592975162858377104098720274903666052147199380152872662466560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{49}{\left(t \right)} + 29448411457701064656515399352961294610976684762888590066184883927032791040 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{47}{\left(t \right)} + 29448411457701064656515399352961294610976684762888590066184883927032791040 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 7559302048293800079239444030336046607728390061902205039310851900912435200 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 7559302048293800079239444030336046607728390061902205039310851900912435200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{45}{\left(t \right)} + 1736546803711980299893276846211243344077478630053299166388554127795814400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{43}{\left(t \right)} + 1736546803711980299893276846211243344077478630053299166388554127795814400 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 355992094760955961478121753473304885535883119160926329109653596198141952 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 355992094760955961478121753473304885535883119160926329109653596198141952 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{41}{\left(t \right)} + 64907394556696037857161049020378169873302672497784604185490838016491520 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{39}{\left(t \right)} + 64907394556696037857161049020378169873302672497784604185490838016491520 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 10484811207113353541724314674017889113265574164968422964705895938785280 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 10484811207113353541724314674017889113265574164968422964705895938785280 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{37}{\left(t \right)} + 1493765504405565972701564505796307132826167282661715619123635106611200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{35}{\left(t \right)} + 1493765504405565972701564505796307132826167282661715619123635106611200 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 186720688050695746587695563224538391603270910332714452390454388326400 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 186720688050695746587695563224538391603270910332714452390454388326400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{33}{\left(t \right)} + 20354606873218701166482857002059569722026894840665135908937445408768 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{31}{\left(t \right)} + 20354606873218701166482857002059569722026894840665135908937445408768 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 1921496091547338326263030120637133860477799317640914522653599989760 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 1921496091547338326263030120637133860477799317640914522653599989760 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{29}{\left(t \right)} + 155796980395730134561867307078686529227929674403317393728670269440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{27}{\left(t \right)} + 155796980395730134561867307078686529227929674403317393728670269440 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 10745759471267464714050694991632665959057118883929998506328064000 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 10745759471267464714050694991632665959057118883929998506328064000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{25}{\left(t \right)} + 623335353944897070424126065088401808469895925171223116382208000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{23}{\left(t \right)} + 623335353944897070424126065088401808469895925171223116382208000 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 29998013908598171514161066882379337032613741398865112475893760 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 29998013908598171514161066882379337032613741398865112475893760 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{21}{\left(t \right)} + 1178094800048295284764490018117419188961680625420498422988800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{19}{\left(t \right)} + 1178094800048295284764490018117419188961680625420498422988800 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 36996819459644741085584354017234223298673467916530430771200 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 36996819459644741085584354017234223298673467916530430771200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{17}{\left(t \right)} + 905674894972943478227279168108548917960182813134159872000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{15}{\left(t \right)} + 905674894972943478227279168108548917960182813134159872000 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 16724110276489013092265098274731727178242012174352384000 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 16724110276489013092265098274731727178242012174352384000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{13}{\left(t \right)} + 222988137019853507896867976996423029043226828991365120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{11}{\left(t \right)} + 222988137019853507896867976996423029043226828991365120 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 2019820081701571629500615733663252074666909682892800 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 2019820081701571629500615733663252074666909682892800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{9}{\left(t \right)} + 11351859150470494906868173533233853490701218611200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{7}{\left(t \right)} + 11351859150470494906868173533233853490701218611200 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 34110153697327208253810617587842107844655104000 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 34110153697327208253810617587842107844655104000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{5}{\left(t \right)} + 40948563862337584938548160369558352754688000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos^{3}{\left(t \right)} + 40948563862337584938548160369558352754688000 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - \frac{40948563862337584938548160369558352754688 \sin^{39}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{5} - \frac{40948563862337584938548160369558352754688 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{39}{\left(t \right)} \cos{\left(t \right)}}{5} + 964994387712354463075044738596480042325549406204512 \sqrt{3} \sin^{38}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)} + \frac{4495579409175430267731780024319206719747730076352260370255317007597568 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{101}{\left(t \right)}}{5} + \frac{4495579409175430267731780024319206719747730076352260370255317007597568 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)}}{5} - 22477897045877151338658900121596033598738650381761301851276585037987840 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 22477897045877151338658900121596033598738650381761301851276585037987840 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{99}{\left(t \right)} + 272544501681260459981239163974351907384706135878855784946728593585602560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{97}{\left(t \right)} + 272544501681260459981239163974351907384706135878855784946728593585602560 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 2135400219358329377172595511551623191880171786267323675871275578608844800 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 2135400219358329377172595511551623191880171786267323675871275578608844800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{95}{\left(t \right)} + 12153430154707366806798717423166855431911758955435510139626752023566745600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{93}{\left(t \right)} + 12153430154707366806798717423166855431911758955435510139626752023566745600 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 53551851186952671003430980140396270355771182092055837309976404179631996928 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 53551851186952671003430980140396270355771182092055837309976404179631996928 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{91}{\left(t \right)} + 190137556740909084546756272572949523736581191736421656406432179733533818880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{89}{\left(t \right)} + 190137556740909084546756272572949523736581191736421656406432179733533818880 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 559021941017050672538389409684524406193266360957774270909233781889375928320 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 559021941017050672538389409684524406193266360957774270909233781889375928320 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{87}{\left(t \right)} + 1388060594033505576173786204074005913475807438383603913161174913590807756800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{85}{\left(t \right)} + 1388060594033505576173786204074005913475807438383603913161174913590807756800 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 2954077674481563149292929613798525405602359420149721148522500457129154969600 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 2954077674481563149292929613798525405602359420149721148522500457129154969600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{83}{\left(t \right)} + 5450273309418484010445455137458279373336353130176235519024013343403290918912 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{81}{\left(t \right)} + 5450273309418484010445455137458279373336353130176235519024013343403290918912 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 8796150999878656523497261611015404913045391160039276935707804987310724874240 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 8796150999878656523497261611015404913045391160039276935707804987310724874240 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{79}{\left(t \right)} + 12507027202952464744347668853162528860736415555680846892959535216332436930560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{77}{\left(t \right)} + 12507027202952464744347668853162528860736415555680846892959535216332436930560 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 15758190772950718179217885159820162357691770262462605501739467447633707008000 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 15758190772950718179217885159820162357691770262462605501739467447633707008000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{75}{\left(t \right)} + 17675611826303940947702453412240140584769714069315405922009261451851595776000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{73}{\left(t \right)} + 17675611826303940947702453412240140584769714069315405922009261451851595776000 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 17717201501189361985226459184974823268498583984772618641825753831738305413120 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 17717201501189361985226459184974823268498583984772618641825753831738305413120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{71}{\left(t \right)} + 15917798223724817408601896924000817780291696548819149561015325708202383769600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{69}{\left(t \right)} + 15917798223724817408601896924000817780291696548819149561015325708202383769600 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 12849306999874250197305145709735599894934261069528711091422009909030839910400 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 12849306999874250197305145709735599894934261069528711091422009909030839910400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{67}{\left(t \right)} + 9336640757022448060033718681362758053737801488529500437364570208289685504000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{65}{\left(t \right)} + 9336640757022448060033718681362758053737801488529500437364570208289685504000 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 6115226694657977676747230949196660245723004483715228356636443645195583488000 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 6115226694657977676747230949196660245723004483715228356636443645195583488000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{63}{\left(t \right)} + 3613716774874448683352816789040901413956937962095467756999848416582765117440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{61}{\left(t \right)} + 3613716774874448683352816789040901413956937962095467756999848416582765117440 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 1927751263269371359112262120736104732581006688640439400207875737598400921600 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 1927751263269371359112262120736104732581006688640439400207875737598400921600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{59}{\left(t \right)} + 928488589214531135376622752207686807388229620140631214610611478511117926400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{57}{\left(t \right)} + 928488589214531135376622752207686807388229620140631214610611478511117926400 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 403690690962839624076792500959863829299230269626361397656787599352659968000 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 403690690962839624076792500959863829299230269626361397656787599352659968000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{55}{\left(t \right)} + 158355641109600740694597058353499215933990821226788146942670793496068096000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{53}{\left(t \right)} + 158355641109600740694597058353499215933990821226788146942670793496068096000 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - \frac{279972773481774109548047599168986613771295771928961443794641962901048393728 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)}}{5} - \frac{279972773481774109548047599168986613771295771928961443794641962901048393728 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{51}{\left(t \right)}}{5} + 17825709330310461756567479676819573901758696497556017081519563646246584320 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{49}{\left(t \right)} + 17825709330310461756567479676819573901758696497556017081519563646246584320 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 5100811802280619193660100729439999837946171904932315390145628562396282880 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 5100811802280619193660100729439999837946171904932315390145628562396282880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{47}{\left(t \right)} + 1309360172460426801943999071173214244115646805953607745238275189007974400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{45}{\left(t \right)} + 1309360172460426801943999071173214244115646805953607745238275189007974400 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 300790365018835297386843885704191518925061165233635970615689249344716800 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 300790365018835297386843885704191518925061165233635970615689249344716800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{43}{\left(t \right)} + 61662024828861235964302996569359261379637538872895373976216296115666944 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{41}{\left(t \right)} + 61662024828861235964302996569359261379637538872895373976216296115666944 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 11242725424617055645665342993010805020130266554665355703938455112253440 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 11242725424617055645665342993010805020130266554665355703938455112253440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{39}{\left(t \right)} + 1816092824794528979527283116747839138132255833623562743536014233436160 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{37}{\left(t \right)} + 1816092824794528979527283116747839138132255833623562743536014233436160 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 258737783722422717571729616361632441660633463406342046229689951846400 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 258737783722422717571729616361632441660633463406342046229689951846400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{35}{\left(t \right)} + 32342222965302839696466202045204055207579182925792755778711243980800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{33}{\left(t \right)} + 32342222965302839696466202045204055207579182925792755778711243980800 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 3525657712261584283394996970202464040210829611251254256316654288896 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 3525657712261584283394996970202464040210829611251254256316654288896 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{31}{\left(t \right)} + 332825760597610495502782917108956566295944201582963455186142494720 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{29}{\left(t \right)} + 332825760597610495502782917108956566295944201582963455186142494720 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 26985872480887337473198614900726208078049529858078117988065607680 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 26985872480887337473198614900726208078049529858078117988065607680 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{27}{\left(t \right)} + 1861292138431321026907799202618000344941871223233316711825408000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{25}{\left(t \right)} + 1861292138431321026907799202618000344941871223233316711825408000 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 107969026945574738004739928525129906516174118876081423384576000 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 107969026945574738004739928525129906516174118876081423384576000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{23}{\left(t \right)} + 5196009421755784266478109060271876751090879470911418500382720 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{21}{\left(t \right)} + 5196009421755784266478109060271876751090879470911418500382720 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 204059898746093222536345746476158863726181707208178899353600 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 204059898746093222536345746476158863726181707208178899353600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{19}{\left(t \right)} + 6408284997568198490981301151652772198297578243606603366400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{17}{\left(t \right)} + 6408284997568198490981301151652772198297578243606603366400 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 156873561751975483255356209342785121133355648558301184000 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 156873561751975483255356209342785121133355648558301184000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{15}{\left(t \right)} + 2896812930079092730567657274795747975473896919400448000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{13}{\left(t \right)} + 2896812930079092730567657274795747975473896919400448000 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 38624172401054569740902096997276639672985292258672640 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 38624172401054569740902096997276639672985292258672640 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{11}{\left(t \right)} + 349856634067523276638605951062288402835011705241600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{9}{\left(t \right)} + 349856634067523276638605951062288402835011705241600 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 1966275743454566789618821081843451481208415846400 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 1966275743454566789618821081843451481208415846400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{7}{\left(t \right)} + 5908280479130308863037322962269986421900288000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{5}{\left(t \right)} + 5908280479130308863037322962269986421900288000 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 7092773684430142692721876305246082139136000 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 7092773684430142692721876305246082139136000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos^{3}{\left(t \right)} + \frac{7092773684430142692721876305246082139136 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{37}{\left(t \right)} \cos{\left(t \right)}}{5} + \frac{7092773684430142692721876305246082139136 \sin^{37}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{5} - 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553018238066723994281474260455248240279255671589058255092348126250947051520 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 553018238066723994281474260455248240279255671589058255092348126250947051520 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{61}{\left(t \right)} + 295009729167601407437676142557501321667957365495067242770782454329167052800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{59}{\left(t \right)} + 295009729167601407437676142557501321667957365495067242770782454329167052800 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 142089476198731097463426184046488835873290654185124170250612877915534131200 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 142089476198731097463426184046488835873290654185124170250612877915534131200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{57}{\left(t \right)} + 61778033129883085853663558281082102553604632254401813152440381702406144000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{55}{\left(t \right)} + 61778033129883085853663558281082102553604632254401813152440381702406144000 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 24233652798482098644899274095457370820780764461636237560620116835565568000 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 24233652798482098644899274095457370820780764461636237560620116835565568000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{53}{\left(t \right)} + \frac{42845098147716350404181916600768631611140391568172868007176366565279924224 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{51}{\left(t \right)}}{5} + \frac{42845098147716350404181916600768631611140391568172868007176366565279924224 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)}}{5} - 2727923348802106509621769638042701336987888756289592687567102341084610560 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 2727923348802106509621769638042701336987888756289592687567102341084610560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{49}{\left(t \right)} + 780592982610039610059197400231397034023931638025028044539749223932887040 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{47}{\left(t \right)} + 780592982610039610059197400231397034023931638025028044539749223932887040 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 200375430803916417760731475505827363644536023153746038218908840964915200 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 200375430803916417760731475505827363644536023153746038218908840964915200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{45}{\left(t \right)} + 46030878470253747256350649788371220497263496334007710576757591926374400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{43}{\left(t \right)} + 46030878470253747256350649788371220497263496334007710576757591926374400 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 9436330086402018187551883206616100201939016748471580668235306344906752 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 9436330086402018187551883206616100201939016748471580668235306344906752 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{41}{\left(t \right)} + 1720508991910606401657426110603216025598979210801269967560434536939520 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{39}{\left(t \right)} + 1720508991910606401657426110603216025598979210801269967560434536939520 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 277922293500265694017732204906723544576305695127135291175318354657280 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 277922293500265694017732204906723544576305695127135291175318354657280 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{37}{\left(t \right)} + 39595442086197961834276637062694670529867161449591866449672221491200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{35}{\left(t \right)} + 39595442086197961834276637062694670529867161449591866449672221491200 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 4949430260774745229284579632836833816233395181198983306209027686400 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 4949430260774745229284579632836833816233395181198983306209027686400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{33}{\left(t \right)} + 539542287767972227192340988546608697330058024148284773599929171968 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{31}{\left(t \right)} + 539542287767972227192340988546608697330058024148284773599929171968 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 50933353988513003218026981340662930412017196290039903757805813760 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 50933353988513003218026981340662930412017196290039903757805813760 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{29}{\left(t \right)} + 4129731404474027287948133622215913276650042942435667872254525440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{27}{\left(t \right)} + 4129731404474027287948133622215913276650042942435667872254525440 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 284839284052219624062636550768287736611049226717230912241664000 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 284839284052219624062636550768287736611049226717230912241664000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{25}{\left(t \right)} + 16522833627240987020026836488450486612999072419915034001408000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{23}{\left(t \right)} + 16522833627240987020026836488450486612999072419915034001408000 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 795161368310972500338791506006679668250580360208411011317760 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 795161368310972500338791506006679668250580360208411011317760 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{21}{\left(t \right)} + 31227916490096067603218351827463649641920270450516348108800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{19}{\left(t \right)} + 31227916490096067603218351827463649641920270450516348108800 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 980679643469765669805502428079215598360796670551929651200 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 980679643469765669805502428079215598360796670551929651200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{17}{\left(t \right)} + 24006845617374924597441919904019965688146797320732672000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{15}{\left(t \right)} + 24006845617374924597441919904019965688146797320732672000 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 443308228729934687168671816409459593673165291433984000 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 443308228729934687168671816409459593673165291433984000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{13}{\left(t \right)} + 5910776383065795828915624218792794582308870552453120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{11}{\left(t \right)} + 5910776383065795828915624218792794582308870552453120 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 53539641150958295551771958503557921941203537612800 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 53539641150958295551771958503557921941203537612800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{9}{\left(t \right)} + 300905249343001259624571424749020837887133491200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{7}{\left(t \right)} + 300905249343001259624571424749020837887133491200 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 904162407881614361852678559942971267689704000 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 904162407881614361852678559942971267689704000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{5}{\left(t \right)} + 1085429061082370182296132725021574150888000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos^{3}{\left(t \right)} + 1085429061082370182296132725021574150888000 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - \frac{1085429061082370182296132725021574150888 \sin^{35}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{5} - \frac{1085429061082370182296132725021574150888 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{35}{\left(t \right)} \cos{\left(t \right)}}{5} + 1145484473118674438571790606727205738456043160952 \sqrt{3} \sin^{34}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)} + 18513956500854972216479356125424141479625944863709009856726919282688 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{101}{\left(t \right)} + 18513956500854972216479356125424141479625944863709009856726919282688 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 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1102701735611596457600117441090567282544156220465341587248019474208522240 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 1102701735611596457600117441090567282544156220465341587248019474208522240 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{91}{\left(t \right)} + 3915177704897556571532331871957200324990554665747954837702409569330790400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{89}{\left(t \right)} + 3915177704897556571532331871957200324990554665747954837702409569330790400 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 11510983298270235449942984950731307867944580077176014684120448411212185600 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 11510983298270235449942984950731307867944580077176014684120448411212185600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{87}{\left(t \right)} + 28581959208680509897786419833507425446560760993259737547867010151481344000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{85}{\left(t \right)} + 28581959208680509897786419833507425446560760993259737547867010151481344000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 60828272162063649269648021696951700309347260575398928627511842117255168000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 60828272162063649269648021696951700309347260575398928627511842117255168000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{83}{\left(t \right)} + 112228162139007432902500600030875887070745695761611023317759348706335784960 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{81}{\left(t \right)} + 112228162139007432902500600030875887070745695761611023317759348706335784960 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 181124102328530892733351325892526967897628395611180201064412432028611379200 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 181124102328530892733351325892526967897628395611180201064412432028611379200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{79}{\left(t \right)} + 257535832998379863105233916503436782479440375009646848388461426790681804800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{77}{\left(t \right)} + 257535832998379863105233916503436782479440375009646848388461426790681804800 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 324481487199550225397841141483110004450223284163348151152570763197808640000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 324481487199550225397841141483110004450223284163348151152570763197808640000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{75}{\left(t \right)} + 363963661514113438039688091007425299842214738590200729345138551244718080000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{73}{\left(t \right)} + 363963661514113438039688091007425299842214738590200729345138551244718080000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 364820046600028999070369710045089829959490537975118848708303583129999769600 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 364820046600028999070369710045089829959490537975118848708303583129999769600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{71}{\left(t \right)} + 327768010617213553852285286368635394104229780212020840636366500468359168000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{69}{\left(t \right)} + 327768010617213553852285286368635394104229780212020840636366500468359168000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 264583815799437447085579688996368330180522834628980678585982596763615232000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 264583815799437447085579688996368330180522834628980678585982596763615232000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{67}{\left(t \right)} + 192253484041257901083525891902848939104749823942806082509123533217464320000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{65}{\left(t \right)} + 192253484041257901083525891902848939104749823942806082509123533217464320000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 125920410600122134043011110486076498127087603985931469245741729358807040000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 125920410600122134043011110486076498127087603985931469245741729358807040000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{63}{\left(t \right)} + 74411092639009673586041878102865830611975830980436377607405503192970035200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{61}{\left(t \right)} + 74411092639009673586041878102865830611975830980436377607405503192970035200 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 39694886669996118820763750525036925914164322132420852430713604777443328000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 39694886669996118820763750525036925914164322132420852430713604777443328000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{59}{\left(t \right)} + 19118778457314564222238484737146281624741732076017386092065730972352512000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{57}{\left(t \right)} + 19118778457314564222238484737146281624741732076017386092065730972352512000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 8312512372745462705321080320498383315105100902616254822637274335805440000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 8312512372745462705321080320498383315105100902616254822637274335805440000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{55}{\left(t \right)} + 3260747040953606669768219829669184902389089745516409169735180804423680000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{53}{\left(t \right)} + 3260747040953606669768219829669184902389089745516409169735180804423680000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 1153000153681195318430042531771023781484782134014602282418359932444213248 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 1153000153681195318430042531771023781484782134014602282418359932444213248 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{51}{\left(t \right)} + 367054362853291129177963124069517705904069156488536329512081839200665600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{49}{\left(t \right)} + 367054362853291129177963124069517705904069156488536329512081839200665600 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 105032298655127446401000102473469297884269408553797305857338486711910400 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 105032298655127446401000102473469297884269408553797305857338486711910400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{47}{\left(t \right)} + 26961415949418875750256722733145020662256656213586361994629299044352000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{45}{\left(t \right)} + 26961415949418875750256722733145020662256656213586361994629299044352000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 6193661847535273545347950389887127136108498489085162323195560198144000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 6193661847535273545347950389887127136108498489085162323195560198144000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{43}{\left(t \right)} + 1269700678744731076796329829926861062902242190262458276255089840619520 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{41}{\left(t \right)} + 1269700678744731076796329829926861062902242190262458276255089840619520 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 231502227541115063090494919902513237275303625153042883468669956915200 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 231502227541115063090494919902513237275303625153042883468669956915200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{39}{\left(t \right)} + 37395695303631408399039046114767188833763430257947873869134875852800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{37}{\left(t \right)} + 37395695303631408399039046114767188833763430257947873869134875852800 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 5327744921141516800405834249729382398297367947197458285290586112000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 5327744921141516800405834249729382398297367947197458285290586112000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{35}{\left(t \right)} + 665968115142689600050729281216172799787170993399682285661323264000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{33}{\left(t \right)} + 665968115142689600050729281216172799787170993399682285661323264000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 72597842881488800357178400765543232680096002796976354656706887680 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 72597842881488800357178400765543232680096002796976354656706887680 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{31}{\left(t \right)} + 6853311990765544304551346426434745272535104430704148063295897600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{29}{\left(t \right)} + 6853311990765544304551346426434745272535104430704148063295897600 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 555673945197206294963622683224438805881224683570606599726694400 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 555673945197206294963622683224438805881224683570606599726694400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{27}{\left(t \right)} + 38326407510418515675546980485556581475254249185154317680640000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{25}{\left(t \right)} + 38326407510418515675546980485556581475254249185154317680640000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 2223221621033104314092258641028502834630132991824840622080000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 2223221621033104314092258641028502834630132991824840622080000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{23}{\left(t \right)} + 106992540512218145115689947099496698916575150231570454937600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{21}{\left(t \right)} + 106992540512218145115689947099496698916575150231570454937600 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 4201856696428575355928294739335339560593071216204709888000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 4201856696428575355928294739335339560593071216204709888000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{19}{\left(t \right)} + 131954859309025457606122556469274826102368615779827712000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{17}{\left(t \right)} + 131954859309025457606122556469274826102368615779827712000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 3230229114052030785951592569627290724660186432798720000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 3230229114052030785951592569627290724660186432798720000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{15}{\left(t \right)} + 59649117162892613945128840064140311676963669923840000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{13}{\left(t \right)} + 59649117162892613945128840064140311676963669923840000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 795321562171901519268384534188537489026182265651200 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 795321562171901519268384534188537489026182265651200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{11}{\left(t \right)} + 7203999657354180428155657012577332328135708928000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{9}{\left(t \right)} + 7203999657354180428155657012577332328135708928000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 40488155440770183056675711833031976151706112000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 40488155440770183056675711833031976151706112000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{7}{\left(t \right)} + 121659120915775790434722691805985505263540000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{5}{\left(t \right)} + 121659120915775790434722691805985505263540000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 146049364844868896080099269875132659380000 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 146049364844868896080099269875132659380000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos^{3}{\left(t \right)} + 29209872968973779216019853975026531876 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{33}{\left(t \right)} \cos{\left(t \right)} + 29209872968973779216019853975026531876 \sin^{33}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)} - 33085394278568972939783652723323903264090326848 \sqrt{3} \sin^{32}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)} - 2178112529512349672526983073579310762308934689848118806673755209728 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 2178112529512349672526983073579310762308934689848118806673755209728 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{101}{\left(t \right)} + 54452813237808741813174576839482769057723367246202970166843880243200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{99}{\left(t \right)} + 54452813237808741813174576839482769057723367246202970166843880243200 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 660240360508430994484741744178728574824895827860211013272982047948800 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 660240360508430994484741744178728574824895827860211013272982047948800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{97}{\left(t \right)} + 5173017257591830472251584799750863060483719888389282165850168623104000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{95}{\left(t \right)} + 5173017257591830472251584799750863060483719888389282165850168623104000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 29441742751216003898713121301707060465331171396028062951733186265088000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 29441742751216003898713121301707060465331171396028062951733186265088000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{93}{\left(t \right)} + 129729615954305465600013816598890268534606614172393127911531702848061440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{91}{\left(t \right)} + 129729615954305465600013816598890268534606614172393127911531702848061440 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 460609141752653714297921396700847097057712313617406451494401125803622400 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 460609141752653714297921396700847097057712313617406451494401125803622400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{89}{\left(t \right)} + 1354233329208262994110939405968389160934656479667766433425935107201433600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{87}{\left(t \right)} + 1354233329208262994110939405968389160934656479667766433425935107201433600 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 3362583436315354105621931745118520640771854234501145593866707076644864000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 3362583436315354105621931745118520640771854234501145593866707076644864000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{85}{\left(t \right)} + 7156267313183958737605649611406082389334971832399873956177863778500608000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{83}{\left(t \right)} + 7156267313183958737605649611406082389334971832399873956177863778500608000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 13203313192824403870882423533044222008323023030777767449148158671333621760 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 13203313192824403870882423533044222008323023030777767449148158671333621760 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{81}{\left(t \right)} + 21308717921003634439217803046179643282073928895432964831107344944542515200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{79}{\left(t \right)} + 21308717921003634439217803046179643282073928895432964831107344944542515200 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 30298333293927042718262813706286680291698867648193746869230756093021388800 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 30298333293927042718262813706286680291698867648193746869230756093021388800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{77}{\left(t \right)} + 38174292611711791223275428409777647582379209901570370723831854493859840000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{75}{\left(t \right)} + 38174292611711791223275428409777647582379209901570370723831854493859840000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 42819254295778051534080951883226505863789969245905968158251594264084480000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 42819254295778051534080951883226505863789969245905968158251594264084480000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{73}{\left(t \right)} + 42920005482356352831808201181775274112881239761778688083329833309411737600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{71}{\left(t \right)} + 42920005482356352831808201181775274112881239761778688083329833309411737600 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 38560942425554535747327680749251222835791738848473040074866647113924608000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 38560942425554535747327680749251222835791738848473040074866647113924608000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{69}{\left(t \right)} + 31127507741110287892421139881925685903590921721056550421880305501601792000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{67}{\left(t \right)} + 31127507741110287892421139881925685903590921721056550421880305501601792000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 22618056946030341303944222576805757541735273405036009706955709790289920000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 22618056946030341303944222576805757541735273405036009706955709790289920000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{65}{\left(t \right)} + 14814165952955545181530718880714882132598541645403702264204909336330240000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{63}{\left(t \right)} + 14814165952955545181530718880714882132598541645403702264204909336330240000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 8754246192824667480710809188572450660232450703580750306753588610937651200 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 8754246192824667480710809188572450660232450703580750306753588610937651200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{61}{\left(t \right)} + 4669986667058366920089853002945520695784037897931864991848659385581568000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{59}{\left(t \right)} + 4669986667058366920089853002945520695784037897931864991848659385581568000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 2249268053801713437910409969076033132322556714825574834360674232041472000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 2249268053801713437910409969076033132322556714825574834360674232041472000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{57}{\left(t \right)} + 977942632087701494743656508293927448835894223837206449722032274800640000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{55}{\left(t \right)} + 977942632087701494743656508293927448835894223837206449722032274800640000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 383617298935718431737437627019904106163422323001930490557080094638080000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 383617298935718431737437627019904106163422323001930490557080094638080000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{53}{\left(t \right)} + 135647076903670037462357944914238091939386133413482621460983521464025088 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{51}{\left(t \right)} + 135647076903670037462357944914238091939386133413482621460983521464025088 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 43182866218034250491525073419943259518125783116298391707303745788313600 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 43182866218034250491525073419943259518125783116298391707303745788313600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{49}{\left(t \right)} + 12356741018250287811882364996878740927561106888682035983216292554342400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{47}{\left(t \right)} + 12356741018250287811882364996878740927561106888682035983216292554342400 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 3171931288166926558853732086252355372030194848657219058191682240512000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 3171931288166926558853732086252355372030194848657219058191682240512000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{45}{\left(t \right)} + 728666099710032181805641222339662016012764528127666155670065905664000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{43}{\left(t \right)} + 728666099710032181805641222339662016012764528127666155670065905664000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 149376550440556597270156450579630713282616728266171561912363510661120 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 149376550440556597270156450579630713282616728266171561912363510661120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{41}{\left(t \right)} + 27235556181307654481234696459119204385329838253299162761019994931200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{39}{\left(t \right)} + 27235556181307654481234696459119204385329838253299162761019994931200 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 4399493565133106870475181895854963392207462383287985161074691276800 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 4399493565133106870475181895854963392207462383287985161074691276800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{37}{\left(t \right)} + 626793520134296094165392264674044988034984464376171562975363072000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{35}{\left(t \right)} + 626793520134296094165392264674044988034984464376171562975363072000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 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4508989118872766550064350645359597820618146962959331491840000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 4508989118872766550064350645359597820618146962959331491840000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{25}{\left(t \right)} + 261555484827424036952030428356294451132956822567628308480000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{23}{\left(t \right)} + 261555484827424036952030428356294451132956822567628308480000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 12587357707319781778316464364646670460773547086067112345600 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 12587357707319781778316464364646670460773547086067112345600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{21}{\left(t \right)} + 494336081932773571285681734039451713010949554847612928000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{19}{\left(t \right)} + 494336081932773571285681734039451713010949554847612928000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 15524101095179465600720300761091156012043366562332672000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 15524101095179465600720300761091156012043366562332672000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{17}{\left(t \right)} + 380026954594356563053128537603210673489433697976320000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{15}{\left(t \right)} + 380026954594356563053128537603210673489433697976320000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 7017543195634425170015157654604742550231019991040000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 7017543195634425170015157654604742550231019991040000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{13}{\left(t \right)} + 93567242608459002266868768728063234003080266547200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{11}{\left(t \right)} + 93567242608459002266868768728063234003080266547200 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 847529371453432991547724354420862626839495168000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 847529371453432991547724354420862626839495168000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{9}{\left(t \right)} + 4763312404796492124314789627415526606083072000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{7}{\left(t \right)} + 4763312404796492124314789627415526606083072000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 14312837754797151815849728447763000619240000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)} - 14312837754797151815849728447763000619240000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{5}{\left(t \right)} + 17182278217043399538835208220603842280000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos^{3}{\left(t \right)} + 17182278217043399538835208220603842280000 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)} - 3436455643408679907767041644120768456 \sin^{31}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)} - 3436455643408679907767041644120768456 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{31}{\left(t \right)} \cos{\left(t \right)} + \frac{3368130523214574960486316765108970072742733383 \sqrt{3} \sin^{30}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{4} + \frac{1112991567278288568928623218916900554366653440416895873739885903872 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{29}{\left(t \right)} \cos^{101}{\left(t \right)}}{5} + \frac{1112991567278288568928623218916900554366653440416895873739885903872 \sin^{29}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)}}{5} - 5564957836391442844643116094584502771833267202084479368699429519360 \sin^{29}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 5564957836391442844643116094584502771833267202084479368699429519360 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{29}{\left(t \right)} \cos^{99}{\left(t \right)} + 67475113766246244491297782646837096108478364825274312345480582922240 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{29}{\left(t \right)} \cos^{97}{\left(t \right)} + 67475113766246244491297782646837096108478364825274312345480582922240 \sin^{29}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 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138399669908097207090458642587978232930684673196815690449024137329377280 \sin^{29}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 138399669908097207090458642587978232930684673196815690449024137329377280 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{29}{\left(t \right)} \cos^{87}{\left(t \right)} + 343648636898162562442680936589035625925035652536930263988575558382387200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{29}{\left(t \right)} \cos^{85}{\left(t \right)} + 343648636898162562442680936589035625925035652536930263988575558382387200 \sin^{29}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 731354791347371607249808147099742485943024593860646459257737726813798400 \sin^{29}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 731354791347371607249808147099742485943024593860646459257737726813798400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{29}{\left(t \right)} \cos^{83}{\left(t \right)} + 1349349590035900615375896031399024886564880375672892717330526105971458048 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{29}{\left(t \right)} \cos^{81}{\left(t \right)} + 1349349590035900615375896031399024886564880375672892717330526105971458048 \sin^{29}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 2177704139179492310821160091532644862893269656346445856365915472354344960 \sin^{29}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 2177704139179492310821160091532644862893269656346445856365915472354344960 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{29}{\left(t \right)} \cos^{79}{\left(t \right)} + 3096423072895840629448837005147979414426367792617602702020286062253834240 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{29}{\left(t \right)} \cos^{77}{\left(t \right)} + 3096423072895840629448837005147979414426367792617602702020286062253834240 \sin^{29}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 3901328805372743498642433892427825522155237934995653271776222492229632000 \sin^{29}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 3901328805372743498642433892427825522155237934995653271776222492229632000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{29}{\left(t \right)} \cos^{75}{\left(t \right)} + 4376033680777317354581899478175895654211502351504675866722415677538304000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{29}{\left(t \right)} \cos^{73}{\left(t \right)} + 4376033680777317354581899478175895654211502351504675866722415677538304000 \sin^{29}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 4386330230614440454239739241653956585162588239390569221702939008544276480 \sin^{29}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 4386330230614440454239739241653956585162588239390569221702939008544276480 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{29}{\left(t \right)} \cos^{71}{\left(t \right)} + 3940843566567661345606015724923476619482012871327464535123734265488998400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{29}{\left(t \right)} \cos^{69}{\left(t \right)} + 3940843566567661345606015724923476619482012871327464535123734265488998400 \sin^{29}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 3181162879036545905489193416504493174762588703360724383774580672141721600 \sin^{29}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 3181162879036545905489193416504493174762588703360724383774580672141721600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{29}{\left(t \right)} \cos^{67}{\left(t \right)} + 2311515709869034880512980988618610386133385084250932860161407703842816000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{29}{\left(t \right)} \cos^{65}{\left(t \right)} + 2311515709869034880512980988618610386133385084250932860161407703842816000 \sin^{29}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 1513975201785566705365227314182949492672158651673125616012150075031552000 \sin^{29}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 1513975201785566705365227314182949492672158651673125616012150075031552000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{29}{\left(t \right)} \cos^{63}{\left(t \right)} + 894664720805158324951764015974986715825953753223087668712179934963957760 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{29}{\left(t \right)} \cos^{61}{\left(t \right)} + 894664720805158324951764015974986715825953753223087668712179934963957760 \sin^{29}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 477262373666404531393798164037289477701006070887542246419698156988006400 \sin^{29}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 477262373666404531393798164037289477701006070887542246419698156988006400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{29}{\left(t \right)} \cos^{59}{\left(t \right)} + 229870251652263021676558381455023166270327224701954351203893080856985600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{29}{\left(t \right)} \cos^{57}{\left(t \right)} + 229870251652263021676558381455023166270327224701954351203893080856985600 \sin^{29}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 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78826796147329487832121569115851694146123529472346699977679048089272320 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 78826796147329487832121569115851694146123529472346699977679048089272320 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{61}{\left(t \right)} + 42050460874253524250408431987660487835635517530456196190624446991564800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{59}{\left(t \right)} + 42050460874253524250408431987660487835635517530456196190624446991564800 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 20253325123875604774453711560490322375380393495875318270134676828979200 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 20253325123875604774453711560490322375380393495875318270134676828979200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{57}{\left(t \right)} + 8805793532119828162805961548039270597991475432989268813102033403904000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{55}{\left(t \right)} + 8805793532119828162805961548039270597991475432989268813102033403904000 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 3454246311530557593469114850670009930297642912447270743297425932288000 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 3454246311530557593469114850670009930297642912447270743297425932288000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{53}{\left(t \right)} + \frac{6107107478786025825253395055984577556766232669206774674149849048285184 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{51}{\left(t \right)}}{5} + \frac{6107107478786025825253395055984577556766232669206774674149849048285184 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)}}{5} - 388836105068237091264834144676772739451072506225483314752264297512960 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 388836105068237091264834144676772739451072506225483314752264297512960 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{49}{\left(t \right)} + 111265125955599045902266087061237861517201873927535560385731640688640 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{47}{\left(t \right)} + 111265125955599045902266087061237861517201873927535560385731640688640 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 28561360457352433657947767884023111773388873887648637152587363123200 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 28561360457352433657947767884023111773388873887648637152587363123200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{45}{\left(t \right)} + 6561206166259204040898151631443871718704680596822634955402536550400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{43}{\left(t \right)} + 6561206166259204040898151631443871718704680596822634955402536550400 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 1345047264083136828384121084445993702334459522348640165857519992832 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 1345047264083136828384121084445993702334459522348640165857519992832 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{41}{\left(t \right)} + 245240034124555101949418991553967996218064148534815177505578680320 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{39}{\left(t \right)} + 245240034124555101949418991553967996218064148534815177505578680320 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 39614830879954558058465429931626723653791152670031036256071188480 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 39614830879954558058465429931626723653791152670031036256071188480 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{37}{\left(t \right)} + 5643903992395154133159932351181554930323027178226945463890739200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{35}{\left(t \right)} + 5643903992395154133159932351181554930323027178226945463890739200 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 705487999049394266644991543897694366290378397278368182986342400 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 705487999049394266644991543897694366290378397278368182986342400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{33}{\left(t \right)} + 76905944511758144232069407862254155094511579131883652474994688 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{31}{\left(t \right)} + 76905944511758144232069407862254155094511579131883652474994688 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 7260001272268835230240927174496648755666783186278079172444160 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 7260001272268835230240927174496648755666783186278079172444160 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{29}{\left(t \right)} + 588648751805581234884399500634863412621631069157682095063040 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{27}{\left(t \right)} + 588648751805581234884399500634863412621631069157682095063040 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 40600773416131982457009727866368974766984316102768820224000 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 40600773416131982457009727866368974766984316102768820224000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{25}{\left(t \right)} + 2355152051881552576320866938023925396319392863464521728000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{23}{\left(t \right)} + 2355152051881552576320866938023925396319392863464521728000 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 113341692496799717735441721392401409697870781554230108160 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 113341692496799717735441721392401409697870781554230108160 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{21}{\left(t \right)} + 4451203301858608178944590133227835436667103864262860800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{19}{\left(t \right)} + 4451203301858608178944590133227835436667103864262860800 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 139785325366249394782126906893238674427353631205299200 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 139785325366249394782126906893238674427353631205299200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{17}{\left(t \right)} + 3421917389626668170921099311951987134084544215552000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{15}{\left(t \right)} + 3421917389626668170921099311951987134084544215552000 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 63188815433446997474395299794567944237356640344000 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 63188815433446997474395299794567944237356640344000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{13}{\left(t \right)} + 842517539112626632991937330594239256498088537920 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{11}{\left(t \right)} + 842517539112626632991937330594239256498088537920 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 7631499448483936893042910603208688917555149800 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 7631499448483936893042910603208688917555149800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{9}{\left(t \right)} + 42890803805208798274829686248463125188989200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{7}{\left(t \right)} + 42890803805208798274829686248463125188989200 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - \frac{1031028937625211496991098227126517432427625 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)}}{8} - \frac{1031028937625211496991098227126517432427625 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{5}{\left(t \right)}}{8} + \frac{1237729817077084630241414438327151779625 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos^{3}{\left(t \right)}}{8} + \frac{1237729817077084630241414438327151779625 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)}}{8} - \frac{9901838536616677041931315506617214237 \sin^{27}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{320} - \frac{9901838536616677041931315506617214237 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{27}{\left(t \right)} \cos{\left(t \right)}}{320} + \frac{722297870126151011203297134319912634332275 \sqrt{3} \sin^{26}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{2} + \frac{7383126070944446623136453996545458702777103516279028441721864192 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{101}{\left(t \right)}}{5} + \frac{7383126070944446623136453996545458702777103516279028441721864192 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)}}{5} - 36915630354722233115682269982727293513885517581395142208609320960 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 36915630354722233115682269982727293513885517581395142208609320960 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{99}{\left(t \right)} + 447602018051007076527647523540568433855861900674416099279388016640 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{97}{\left(t \right)} + 447602018051007076527647523540568433855861900674416099279388016640 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 3506984883698612145989815648359092883819124170232538509817885491200 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 3506984883698612145989815648359092883819124170232538509817885491200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{95}{\left(t \right)} + 19959675685737804284012349217418743483298687171987533628143199846400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{93}{\left(t \right)} + 19959675685737804284012349217418743483298687171987533628143199846400 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 87948634126840472350395467183278800232724531054673490281481510060032 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 87948634126840472350395467183278800232724531054673490281481510060032 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{91}{\left(t \right)} + 312264432338649017520686033749141484868849066377630610440898446622720 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{89}{\left(t \right)} + 312264432338649017520686033749141484868849066377630610440898446622720 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 918086211207640890222109168350010448600579282713955435305498658734080 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 918086211207640890222109168350010448600579282713955435305498658734080 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{87}{\left(t \right)} + 2279623031225494194131663729836472954915161194510534725571737498419200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{85}{\left(t \right)} + 2279623031225494194131663729836472954915161194510534725571737498419200 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 4851505425428615849049438194267365519434830234471138005703954163302400 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 4851505425428615849049438194267365519434830234471138005703954163302400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{83}{\left(t \right)} + 8951027509915796241496213468423289383357261782599249620523795431292928 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{81}{\left(t \right)} + 8951027509915796241496213468423289383357261782599249620523795431292928 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 14445989239700672177287045229937484398063813704297052502990395078082560 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 14445989239700672177287045229937484398063813704297052502990395078082560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{79}{\left(t \right)} + 20540390950199393252080017436317360628496985110797371527689468001648640 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{77}{\left(t \right)} + 20540390950199393252080017436317360628496985110797371527689468001648640 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 25879802921338758076228138679710202383384795564001993304118029975552000 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 25879802921338758076228138679710202383384795564001993304118029975552000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{75}{\left(t \right)} + 29028798874807302975038290105439060065416251170419179366454650732544000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{73}{\left(t \right)} + 29028798874807302975038290105439060065416251170419179366454650732544000 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 29097101930983320158508968435098916677334877643761342141434544028385280 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 29097101930983320158508968435098916677334877643761342141434544028385280 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{71}{\left(t \right)} + 26141927516117826704910401328409182952293054133066830830195098150502400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{69}{\left(t \right)} + 26141927516117826704910401328409182952293054133066830830195098150502400 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 21102519802167402279867432397631509130164272613439489947265922603417600 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 21102519802167402279867432397631509130164272613439489947265922603417600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{67}{\left(t \right)} + 15333639896900094136285786752344033565109202153058165967779608395776000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{65}{\left(t \right)} + 15333639896900094136285786752344033565109202153058165967779608395776000 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 10043085780425792650666714130190244206387313690891898177726994972672000 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 10043085780425792650666714130190244206387313690891898177726994972672000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{63}{\left(t \right)} + 5934836003370366844503361381309297435712003184211431079400546091663360 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{61}{\left(t \right)} + 5934836003370366844503361381309297435712003184211431079400546091663360 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 3165961339953450667501793141928106227007307304416586199680218981990400 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 3165961339953450667501793141928106227007307304416586199680218981990400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{59}{\left(t \right)} + 1524864246778279123945356661890198016679218815326520101419406170521600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{57}{\left(t \right)} + 1524864246778279123945356661890198016679218815326520101419406170521600 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 662984455120990923454502896473999137686616876228921783225828769792000 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 662984455120990923454502896473999137686616876228921783225828769792000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{55}{\left(t \right)} + 260068737740717656651149573699093411740556126612825403452895002624000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{53}{\left(t \right)} + 260068737740717656651149573699093411740556126612825403452895002624000 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - \frac{459801528325588816959232446299997151957303231851475313304718364639232 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)}}{5} - \frac{459801528325588816959232446299997151957303231851475313304718364639232 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{51}{\left(t \right)}}{5} + 29275305207840244323028053363695244862146385603849129875170477998080 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{49}{\left(t \right)} + 29275305207840244323028053363695244862146385603849129875170477998080 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 8377104077738152104610767172564240538939909426976615550277092638720 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 8377104077738152104610767172564240538939909426976615550277092638720 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{47}{\left(t \right)} + 2150372698526534580424638894743052816915378535942658009557735833600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{45}{\left(t \right)} + 2150372698526534580424638894743052816915378535942658009557735833600 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 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44319114518180826564655560858609407513983806365153671249920 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 44319114518180826564655560858609407513983806365153671249920 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{27}{\left(t \right)} + 3056814986928855822052855959050945976664842332061745152000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{25}{\left(t \right)} + 3056814986928855822052855959050945976664842332061745152000 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 177318397728533881228791140121492452618641547635359744000 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 177318397728533881228791140121492452618641547635359744000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{23}{\left(t \right)} + 8533447890685693034135573618346824282272124479951687680 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{21}{\left(t \right)} + 8533447890685693034135573618346824282272124479951687680 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 335129206124489804978453697289354405463353379741798400 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 335129206124489804978453697289354405463353379741798400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{19}{\left(t \right)} + 10524377778540012348461292217830711009009250225881600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{17}{\left(t \right)} + 10524377778540012348461292217830711009009250225881600 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 257634706941003974258538365185574320905979197696000 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 257634706941003974258538365185574320905979197696000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{15}{\left(t \right)} + 4757459077035584751933236857119980357638820412000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{13}{\left(t \right)} + 4757459077035584751933236857119980357638820412000 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)} - 63432787693807796692443158094933071435184272160 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)} - 63432787693807796692443158094933071435184272160 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{11}{\left(t \right)} + 574572352298983665692419910280190864449132900 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{9}{\left(t \right)} + 574572352298983665692419910280190864449132900 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 3229230402322670140382930045733710197626600 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - 3229230402322670140382930045733710197626600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{7}{\left(t \right)} + \frac{155251461650128372133794713737197605655125 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{5}{\left(t \right)}}{16} + \frac{155251461650128372133794713737197605655125 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)}}{16} - \frac{186376304501954828491950436659300847125 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)}}{16} - \frac{186376304501954828491950436659300847125 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos^{3}{\left(t \right)}}{16} + \frac{1491010436015638627935603493274406777 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{25}{\left(t \right)} \cos{\left(t \right)}}{640} + \frac{1491010436015638627935603493274406777 \sin^{25}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{640} - \frac{23877025174759591361843514878623695039015 \sqrt{3} \sin^{24}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{4} - 94012640971279031703774881110510934245888414893196457237544960 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 94012640971279031703774881110510934245888414893196457237544960 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{101}{\left(t \right)} + 2350316024281975792594372027762773356147210372329911430938624000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{99}{\left(t \right)} + 2350316024281975792594372027762773356147210372329911430938624000 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 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19881012245669504511079331520531079257354567044416210342162464768000 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 19881012245669504511079331520531079257354567044416210342162464768000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{89}{\left(t \right)} + 58452008353627391143173334147920868968627713245795125337786417152000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{87}{\left(t \right)} + 58452008353627391143173334147920868968627713245795125337786417152000 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 145137289763932143089876723037126885924140143962894825482071572480000 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 145137289763932143089876723037126885924140143962894825482071572480000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{85}{\left(t \right)} + 308881924369394048114353025950808500812913639715904372179793346560000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{83}{\left(t \right)} + 308881924369394048114353025950808500812913639715904372179793346560000 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 569887150461532018770981332879241683999825665275843566671718724403200 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 569887150461532018770981332879241683999825665275843566671718724403200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{81}{\left(t \right)} + 919736157026783033358682845709092809723927018524854785844040433664000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{79}{\left(t \right)} + 919736157026783033358682845709092809723927018524854785844040433664000 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 1307749848272457125556877171242616338826208729465027898621994991616000 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 1307749848272457125556877171242616338826208729465027898621994991616000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{77}{\left(t \right)} + 1647695432173520251033200679947593530351323996010313665372540108800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{75}{\left(t \right)} + 1647695432173520251033200679947593530351323996010313665372540108800000 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 1848183289991975995864067706203675301278623801172698176981408153600000 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 1848183289991975995864067706203675301278623801172698176981408153600000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{73}{\left(t \right)} + 1852531956556662998207277277277095713752220563057810407986070290432000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{71}{\left(t \right)} + 1852531956556662998207277277277095713752220563057810407986070290432000 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 1664384179718876912451850678803640680324260662122251538424985026560000 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 1664384179718876912451850678803640680324260662122251538424985026560000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{69}{\left(t \right)} + 1343539036640539194388843319034264163635246558580612687644265021440000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{67}{\left(t \right)} + 1343539036640539194388843319034264163635246558580612687644265021440000 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 976250417884131630069129037712905362804066351001156576895985254400000 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 976250417884131630069129037712905362804066351001156576895985254400000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{65}{\left(t \right)} + 639415478380249956536505568560499418912604861474441734575148236800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{63}{\left(t \right)} + 639415478380249956536505568560499418912604861474441734575148236800000 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 377854584255328958690791259421220125363667435327552912525501661184000 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 377854584255328958690791259421220125363667435327552912525501661184000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{61}{\left(t \right)} + 201567997025898811598161702584556848069225847055385369249589493760000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{59}{\left(t \right)} + 201567997025898811598161702584556848069225847055385369249589493760000 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 97083886679432032509254456402177293082293218293284386762695639040000 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 97083886679432032509254456402177293082293218293284386762695639040000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{57}{\left(t \right)} + 42210385512796535873588894087903170905344877518819298592476364800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{55}{\left(t \right)} + 42210385512796535873588894087903170905344877518819298592476364800000 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 16557856817108509549096959276258069508099923171444741306423705600000 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 16557856817108509549096959276258069508099923171444741306423705600000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{53}{\left(t \right)} + 5854858170529568976560684800084853378064132833422860525951422300160 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{51}{\left(t \right)} + 5854858170529568976560684800084853378064132833422860525951422300160 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 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36581431597982831007581912793730318194978750 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)} - 36581431597982831007581912793730318194978750 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{9}{\left(t \right)} + 205596163135993429990424238904947593227500 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{7}{\left(t \right)} + 205596163135993429990424238904947593227500 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)} - \frac{19768861839999368268310022971629576271875 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)}}{32} - \frac{19768861839999368268310022971629576271875 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{5}{\left(t \right)}}{32} + \frac{23732127058822771030384181238450871875 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{23}{\left(t \right)} \cos^{3}{\left(t \right)}}{32} + \frac{23732127058822771030384181238450871875 \sin^{23}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)}}{32} - 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98505797605892336810937610582409671202041152260114761080385830912000 \sin^{21}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 98505797605892336810937610582409671202041152260114761080385830912000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{21}{\left(t \right)} \cos^{71}{\left(t \right)} + 88501302536543896353576759507633688970583847733696855658159144960000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{21}{\left(t \right)} \cos^{69}{\left(t \right)} + 88501302536543896353576759507633688970583847733696855658159144960000 \sin^{21}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 71440810481306518743248709482065748928061660218767341314417623040000 \sin^{21}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 71440810481306518743248709482065748928061660218767341314417623040000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{21}{\left(t \right)} \cos^{67}{\left(t \right)} + 51910751518429025306324011463086392767849681967905131138016870400000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{21}{\left(t \right)} \cos^{65}{\left(t \right)} + 51910751518429025306324011463086392767849681967905131138016870400000 \sin^{21}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 34000024386339478563206370081085824502919089943891080043613388800000 \sin^{21}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 34000024386339478563206370081085824502919089943891080043613388800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{21}{\left(t \right)} \cos^{63}{\left(t \right)} + 20091889410802485613444764319791654417193749713718135113272786944000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{21}{\left(t \right)} \cos^{61}{\left(t \right)} + 20091889410802485613444764319791654417193749713718135113272786944000 \sin^{21}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 10718096521133333193428942991570593224361946049813471715037020160000 \sin^{21}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 10718096521133333193428942991570593224361946049813471715037020160000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{21}{\left(t \right)} \cos^{59}{\left(t \right)} + 5162299985266142123758170968842130128167335903362957093518704640000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{21}{\left(t \right)} \cos^{57}{\left(t \right)} + 5162299985266142123758170968842130128167335903362957093518704640000 \sin^{21}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 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337639423302758282645244425833795338077517069880052984353652736000 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 337639423302758282645244425833795338077517069880052984353652736000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{85}{\left(t \right)} + 718565952157152242552699675492436232318818379488317889778286592000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{83}{\left(t \right)} + 718565952157152242552699675492436232318818379488317889778286592000 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 1325754181729945887509730901283544848628219910155946506640938762240 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 1325754181729945887509730901283544848628219910155946506640938762240 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{81}{\left(t \right)} + 2139623704936991319985061107280899755702336525072926946366377164800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{79}{\left(t \right)} + 2139623704936991319985061107280899755702336525072926946366377164800 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 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879020161722608745588208438990884880752226549975168411205684428800 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 879020161722608745588208438990884880752226549975168411205684428800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{61}{\left(t \right)} + 468916722799583327212516255881213453565835139679339387532869632000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{59}{\left(t \right)} + 468916722799583327212516255881213453565835139679339387532869632000 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 225850624355393717914419979886843193107320945772129372841443328000 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 225850624355393717914419979886843193107320945772129372841443328000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{57}{\left(t \right)} + 98195923632779877354095643429062257872748237292230162104975360000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{55}{\left(t \right)} + 98195923632779877354095643429062257872748237292230162104975360000 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 38519289122398027547618110128012086353043510845718575102033920000 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 38519289122398027547618110128012086353043510845718575102033920000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{53}{\left(t \right)} + 13620420633679942540837763741265073734436185435046088156079194112 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{51}{\left(t \right)} + 13620420633679942540837763741265073734436185435046088156079194112 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 4336022680940210398265660234680279450281789801957239602701926400 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 4336022680940210398265660234680279450281789801957239602701926400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{49}{\left(t \right)} + 1240749260299481818681802319817188031435276229479392763025817600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{47}{\left(t \right)} + 1240749260299481818681802319817188031435276229479392763025817600 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 318495903871518770420551934774501391997894567835111981580288000 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 318495903871518770420551934774501391997894567835111981580288000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{45}{\left(t \right)} + 73165887581946759790636748493608139103935954631378323111936000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{43}{\left(t \right)} + 73165887581946759790636748493608139103935954631378323111936000 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 14999006954299085757080533441189668516306870699432556237946880 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 14999006954299085757080533441189668516306870699432556237946880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{41}{\left(t \right)} + 2734741800924096982356899505406250921626778668900746579148800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{39}{\left(t \right)} + 2734741800924096982356899505406250921626778668900746579148800 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 441756315728318055743773058892599815694766866782450561843200 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 441756315728318055743773058892599815694766866782450561843200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{37}{\left(t \right)} + 62936788536598908891582321823233352303867735430335561728000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{35}{\left(t \right)} + 62936788536598908891582321823233352303867735430335561728000 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 7867098567074863611447790227904169037983466928791945216000 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 7867098567074863611447790227904169037983466928791945216000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{33}{\left(t \right)} + 857600195443765351929253616052850075349406504765012049920 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{31}{\left(t \right)} + 857600195443765351929253616052850075349406504765012049920 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 80958351783428369811029800994572435498479129681592934400 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 80958351783428369811029800994572435498479129681592934400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{29}{\left(t \right)} + 6564190685142840795488902783343710986363172676885913600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{27}{\left(t \right)} + 6564190685142840795488902783343710986363172676885913600 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 452750843096651795104816087560845940273351256364160000 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 452750843096651795104816087560845940273351256364160000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{25}{\left(t \right)} + 26262974504976018379346204322571139032249883723520000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{23}{\left(t \right)} + 26262974504976018379346204322571139032249883723520000 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 1263905648051970884506036083023736065927025654194400 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 1263905648051970884506036083023736065927025654194400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{21}{\left(t \right)} + 49636641820974466319997283128257513957448299772000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{19}{\left(t \right)} + 49636641820974466319997283128257513957448299772000 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 1558786165560158732955579704150944095954349315500 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 1558786165560158732955579704150944095954349315500 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{17}{\left(t \right)} + 38158780062672184405277348938823600880155430000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{15}{\left(t \right)} + 38158780062672184405277348938823600880155430000 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - \frac{2818546254629195439026167819344925065011480625 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)}}{4} - \frac{2818546254629195439026167819344925065011480625 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{13}{\left(t \right)}}{4} + \frac{37580616728389272520348904257932334200153075 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{11}{\left(t \right)}}{4} + \frac{37580616728389272520348904257932334200153075 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)}}{4} - \frac{2723233096260092211619485815792198130445875 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)}}{32} - \frac{2723233096260092211619485815792198130445875 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{9}{\left(t \right)}}{32} + \frac{7652602036860957640038699602788192257375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{7}{\left(t \right)}}{16} + \frac{7652602036860957640038699602788192257375 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)}}{16} - \frac{2943308475715752938476422924149304714375 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)}}{2048} - \frac{2943308475715752938476422924149304714375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{5}{\left(t \right)}}{2048} + \frac{3533383524268610970559931481571794375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos^{3}{\left(t \right)}}{2048} + \frac{3533383524268610970559931481571794375 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)}}{2048} - \frac{5653413638829777552895890370514871 \sin^{19}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{16384} - \frac{5653413638829777552895890370514871 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{19}{\left(t \right)} \cos{\left(t \right)}}{16384} + \frac{38401718742672083688008818369892931255 \sqrt{3} \sin^{18}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{4096} + 7730198393367314428043126722145844464788805646437238964224 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{101}{\left(t \right)} + 7730198393367314428043126722145844464788805646437238964224 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 193254959834182860701078168053646111619720141160930974105600 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 193254959834182860701078168053646111619720141160930974105600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{99}{\left(t \right)} + 2343216387989467186000572787650459103389106711576288061030400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{97}{\left(t \right)} + 2343216387989467186000572787650459103389106711576288061030400 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 18359221184247371766602425965096380603873413410288442540032000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 18359221184247371766602425965096380603873413410288442540032000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{95}{\left(t \right)} + 104489786193157893218514588402911822421263919292149456175104000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{93}{\left(t \right)} + 104489786193157893218514588402911822421263919292149456175104000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 460414994741640990539686386373251461742537648586250130051563520 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 460414994741640990539686386373251461742537648586250130051563520 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{91}{\left(t \right)} + 1634718132925773197793833313319922078261403619315542350050099200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{89}{\left(t \right)} + 1634718132925773197793833313319922078261403619315542350050099200 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 4806221976067480646048228819806959842998965479830949397843148800 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 4806221976067480646048228819806959842998965479830949397843148800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{87}{\left(t \right)} + 11933927528890381631322198598094047707989958443466114163802112000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{85}{\left(t \right)} + 11933927528890381631322198598094047707989958443466114163802112000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 25397845766612863471788268811328357942645296174556089117835264000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 25397845766612863471788268811328357942645296174556089117835264000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{83}{\left(t \right)} + 46859025439400733105449355956900820404180571442055984422406062080 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{81}{\left(t \right)} + 46859025439400733105449355956900820404180571442055984422406062080 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 75625393456846944133411626569870578384683659732838054532585881600 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 75625393456846944133411626569870578384683659732838054532585881600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{79}{\left(t \right)} + 107529856321454248689694656529034728640722078682629108788520550400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{77}{\left(t \right)} + 107529856321454248689694656529034728640722078682629108788520550400 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 135481914463370737739005203849579565263509250329572484547870720000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 135481914463370737739005203849579565263509250329572484547870720000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{75}{\left(t \right)} + 151967047743174569199772863620313291435522626719341894004899840000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{73}{\left(t \right)} + 151967047743174569199772863620313291435522626719341894004899840000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 152324617267276156421419388005302263885959150546916816108440780800 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 152324617267276156421419388005302263885959150546916816108440780800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{71}{\left(t \right)} + 136854148326068421784868981411013752710041424319495576972427264000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{69}{\left(t \right)} + 136854148326068421784868981411013752710041424319495576972427264000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 110472625757187762163689418729372547368346691920556670568103936000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 110472625757187762163689418729372547368346691920556670568103936000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{67}{\left(t \right)} + 80272283959745172710404404869411962772731590165851645788815360000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{65}{\left(t \right)} + 80272283959745172710404404869411962772731590165851645788815360000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 52575998850827247623188849972948186143543497652487627651153920000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 52575998850827247623188849972948186143543497652487627651153920000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{63}{\left(t \right)} + 31069129320910726642328161030889068749200235644016907465103769600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{61}{\left(t \right)} + 31069129320910726642328161030889068749200235644016907465103769600 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 16573947829418922892381207059877532153732494602142834904530944000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 16573947829418922892381207059877532153732494602142834904530944000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{59}{\left(t \right)} + 7982731865393204994494794659084370818799479480577536741605376000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{57}{\left(t \right)} + 7982731865393204994494794659084370818799479480577536741605376000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 3470752984953567388910780286558422095130208469816320322437120000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 3470752984953567388910780286558422095130208469816320322437120000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{55}{\left(t \right)} + 1361471360051687207656613648592407351461438684294724337008640000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{53}{\left(t \right)} + 1361471360051687207656613648592407351461438684294724337008640000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 481416272914276596627378586142275239476764718766614525566255104 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 481416272914276596627378586142275239476764718766614525566255104 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{51}{\left(t \right)} + 153257519313926411348372860713172341049645732975338563882188800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{49}{\left(t \right)} + 153257519313926411348372860713172341049645732975338563882188800 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 43854510853908927448240635942277625749365902282136453591859200 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 43854510853908927448240635942277625749365902282136453591859200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{47}{\left(t \right)} + 11257296312945372001222484672682872681198836523316277149696000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{45}{\left(t \right)} + 11257296312945372001222484672682872681198836523316277149696000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 2586061756203575015336685405623603097720762348484020928512000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 2586061756203575015336685405623603097720762348484020928512000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{43}{\left(t \right)} + 530142660021732878144020508152838635032756281439224290344960 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{41}{\left(t \right)} + 530142660021732878144020508152838635032756281439224290344960 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 96659952037623105411953248330812093343980808677558426009600 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 96659952037623105411953248330812093343980808677558426009600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{39}{\left(t \right)} + 15613958245048033801609175913731824820960135225258174054400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{37}{\left(t \right)} + 15613958245048033801609175913731824820960135225258174054400 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 2224512368697481070785567803177532708549272996814258176000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 2224512368697481070785567803177532708549272996814258176000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{35}{\left(t \right)} + 278064046087185133848195975397191588568659124601782272000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{33}{\left(t \right)} + 278064046087185133848195975397191588568659124601782272000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 30312036672361280524990154680660885259352730945600880640 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 30312036672361280524990154680660885259352730945600880640 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{31}{\left(t \right)} + 2861487836909105257892950799932179923571709627026124800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{29}{\left(t \right)} + 2861487836909105257892950799932179923571709627026124800 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 232012527316954480369698713508014588397706185975091200 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 232012527316954480369698713508014588397706185975091200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{27}{\left(t \right)} + 16002561837438498752154516530158052043559955526720000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{25}{\left(t \right)} + 16002561837438498752154516530158052043559955526720000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 928269665223418590919429710450530131152279891840000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 928269665223418590919429710450530131152279891840000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{23}{\left(t \right)} + 44672977638877019687997554815431762561703469794800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{21}{\left(t \right)} + 44672977638877019687997554815431762561703469794800 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 1754416236334566709532768791842090716561318574000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 1754416236334566709532768791842090716561318574000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{19}{\left(t \right)} + 55095583776516565385573404177307036049647319750 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{17}{\left(t \right)} + 55095583776516565385573404177307036049647319750 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 1348729101016317390099716136531383991423435000 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 1348729101016317390099716136531383991423435000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{15}{\left(t \right)} + \frac{199244071741046887173821701987590816914825625 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{13}{\left(t \right)}}{8} + \frac{199244071741046887173821701987590816914825625 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)}}{8} - \frac{2656587623213958495650956026501210892197675 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)}}{8} - \frac{2656587623213958495650956026501210892197675 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{11}{\left(t \right)}}{8} + \frac{192506349508257862003692465688493542912875 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{9}{\left(t \right)}}{64} + \frac{192506349508257862003692465688493542912875 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)}}{64} - \frac{540965253535851077489300385314915616375 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)}}{32} - \frac{540965253535851077489300385314915616375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{7}{\left(t \right)}}{32} + \frac{208063559052250414418961686659582929375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{5}{\left(t \right)}}{4096} + \frac{208063559052250414418961686659582929375 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)}}{4096} - \frac{249776181335234591139209707874649375 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)}}{4096} - \frac{249776181335234591139209707874649375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos^{3}{\left(t \right)}}{4096} + \frac{399641890136375345822735532599439 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{17}{\left(t \right)} \cos{\left(t \right)}}{32768} + \frac{399641890136375345822735532599439 \sin^{17}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{32768} - \frac{74039325920905269847198193110716705 \sqrt{3} \sin^{16}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{1024} - 215785505233570353492172667120655756816764689637821120512 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 215785505233570353492172667120655756816764689637821120512 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{101}{\left(t \right)} + 5394637630839258837304316678016393920419117240945528012800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{99}{\left(t \right)} + 5394637630839258837304316678016393920419117240945528012800 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 65409981273926013402314839720948776285081796546464527155200 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 65409981273926013402314839720948776285081796546464527155200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{97}{\left(t \right)} + 512490574929729589543910084411557422439816137889825161216000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{95}{\left(t \right)} + 512490574929729589543910084411557422439816137889825161216000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 2916792061221156296740144503857965486307859816037012733952000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 2916792061221156296740144503857965486307859816037012733952000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{93}{\left(t \right)} + 12852306913970273955951836729630993184931264410453616109813760 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{91}{\left(t \right)} + 12852306913970273955951836729630993184931264410453616109813760 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 45632525878059350348924739452280255058200101031796748687769600 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 45632525878059350348924739452280255058200101031796748687769600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{89}{\left(t \right)} + 134163831844248228214810985117764067866966195660305648215654400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{87}{\left(t \right)} + 134163831844248228214810985117764067866966195660305648215654400 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 333130981923048419921966134922165535362609677403815994720256000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 333130981923048419921966134922165535362609677403815994720256000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{85}{\left(t \right)} + 708971064092641509064697158936916395771707774987608399020032000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{83}{\left(t \right)} + 708971064092641509064697158936916395771707774987608399020032000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 1308051613250923584224366258238610750198800844852137496191959040 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 1308051613250923584224366258238610750198800844852137496191959040 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{81}{\left(t \right)} + 2111053676135300575152705503592446358849954376778730586295500800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{79}{\left(t \right)} + 2111053676135300575152705503592446358849954376778730586295500800 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 3001654445754880505295253137920509666489778879482257552388915200 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 3001654445754880505295253137920509666489778879482257552388915200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{77}{\left(t \right)} + 3781925362688509920464841486769872921969880551071809913487360000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{75}{\left(t \right)} + 3781925362688509920464841486769872921969880551071809913487360000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 4242101496935907514607781086281323406246116016796079142993920000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 4242101496935907514607781086281323406246116016796079142993920000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{73}{\left(t \right)} + 4252082912222815532289211159425514755437283348600305211565670400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{71}{\left(t \right)} + 4252082912222815532289211159425514755437283348600305211565670400 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 3820230741450185829791088151046360913088184258508086713516032000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 3820230741450185829791088151046360913088184258508086713516032000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{69}{\left(t \right)} + 3083800719001957236096420555663929893697690907470383250669568000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{67}{\left(t \right)} + 3083800719001957236096420555663929893697690907470383250669568000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 2240769831388617300618842172052550684953098576058256122183680000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 2240769831388617300618842172052550684953098576058256122183680000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{65}{\left(t \right)} + 1467638719973831214440411247192313898916649359757454302248960000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{63}{\left(t \right)} + 1467638719973831214440411247192313898916649359757454302248960000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 867282756084535883283380521387707994641057481031670651735244800 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 867282756084535883283380521387707994641057481031670651735244800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{61}{\left(t \right)} + 462655358128278635747915468009717646327508059501524127055872000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{59}{\left(t \right)} + 462655358128278635747915468009717646327508059501524127055872000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 222834879657938398861102642371813306928721102085087232524288000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 222834879657938398861102642371813306928721102085087232524288000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{57}{\left(t \right)} + 96884730286060173417870714074701437795096131341342275010560000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{55}{\left(t \right)} + 96884730286060173417870714074701437795096131341342275010560000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 38004947653331170000266719254632060714030308100181139128320000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 38004947653331170000266719254632060714030308100181139128320000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{53}{\left(t \right)} + 13438549490217901712094311928437896668481116944224050795773952 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{51}{\left(t \right)} + 13438549490217901712094311928437896668481116944224050795773952 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 4278124512868224947327321235014663050646925222628498499174400 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 4278124512868224947327321235014663050646925222628498499174400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{49}{\left(t \right)} + 1224181747974469239113449607584104495466700063704958474649600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{47}{\left(t \right)} + 1224181747974469239113449607584104495466700063704958474649600 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 314243082627374916290282823375383966470246668138549608448000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 314243082627374916290282823375383966470246668138549608448000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{45}{\left(t \right)} + 72188916018819006996262154179969216192533595934693523456000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{43}{\left(t \right)} + 72188916018819006996262154179969216192533595934693523456000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 14798727783857896434233741606893689319469387166612172308480 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 14798727783857896434233741606893689319469387166612172308480 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{41}{\left(t \right)} + 2698225262133978311992126800695904083493717155202780364800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{39}{\left(t \right)} + 2698225262133978311992126800695904083493717155202780364800 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 435857619319895853246889968035206932604798520245302067200 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 435857619319895853246889968035206932604798520245302067200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{37}{\left(t \right)} + 62096404380717862402881203044364624048173466249330688000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{35}{\left(t \right)} + 62096404380717862402881203044364624048173466249330688000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 7762050547589732800360150380545578006021683281166336000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 7762050547589732800360150380545578006021683281166336000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{33}{\left(t \right)} + 846148806946045597577721887637495976041045034606264320 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{31}{\left(t \right)} + 846148806946045597577721887637495976041045034606264320 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 79877328780713939875501089653279242529916360688742400 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 79877328780713939875501089653279242529916360688742400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{29}{\left(t \right)} + 6476540171409238368283872134049668313236461677465600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{27}{\left(t \right)} + 6476540171409238368283872134049668313236461677465600 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 446705338647708503754723778345955475764399415360000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 446705338647708503754723778345955475764399415360000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{25}{\left(t \right)} + 25912289505415625690690156120950758997682689920000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{23}{\left(t \right)} + 25912289505415625690690156120950758997682689920000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 1247028932448126986364463763320755276763479452400 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 1247028932448126986364463763320755276763479452400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{21}{\left(t \right)} + 48973852245792502564954137046495143155242062000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{19}{\left(t \right)} + 48973852245792502564954137046495143155242062000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 1537971960920823664293510461435500185293931750 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 1537971960920823664293510461435500185293931750 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{17}{\left(t \right)} + 37649252409322488721995360133059980056155000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{15}{\left(t \right)} + 37649252409322488721995360133059980056155000 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - \frac{5561821378649913106658405474202042508295625 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)}}{8} - \frac{5561821378649913106658405474202042508295625 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{13}{\left(t \right)}}{8} + \frac{74157618381998841422112072989360566777275 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{11}{\left(t \right)}}{8} + \frac{74157618381998841422112072989360566777275 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)}}{8} - \frac{5373740462463684161022613984736272954875 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)}}{64} - \frac{5373740462463684161022613984736272954875 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{9}{\left(t \right)}}{64} + \frac{15100836305598470143379485304357250375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{7}{\left(t \right)}}{32} + \frac{15100836305598470143379485304357250375 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)}}{32} - \frac{5808013963691719285915186655522019375 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)}}{4096} - \frac{5808013963691719285915186655522019375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{5}{\left(t \right)}}{4096} + \frac{6972405718717550163163489382379375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos^{3}{\left(t \right)}}{4096} + \frac{6972405718717550163163489382379375 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)}}{4096} - \frac{11155849149948080261061583011807 \sin^{15}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{32768} - \frac{11155849149948080261061583011807 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{15}{\left(t \right)} \cos{\left(t \right)}}{32768} + \frac{57225597892922286308767360374762735 \sqrt{3} \sin^{14}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{131072} + 4622088545394713814091825795118085366332168994690170880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{101}{\left(t \right)} + 4622088545394713814091825795118085366332168994690170880 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 115552213634867845352295644877952134158304224867254272000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 115552213634867845352295644877952134158304224867254272000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{99}{\left(t \right)} + 1401070590322772624896584694145169626669438726515458048000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{97}{\left(t \right)} + 1401070590322772624896584694145169626669438726515458048000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 10977460295312445308468086263405452745038901362389155840000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 10977460295312445308468086263405452745038901362389155840000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{95}{\left(t \right)} + 62477186133868096931398444085084940037194059707035156480000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{93}{\left(t \right)} + 62477186133868096931398444085084940037194059707035156480000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 275294211743549319741930407305437430521783509403841226342400 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 275294211743549319741930407305437430521783509403841226342400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{91}{\left(t \right)} + 977440884780953036849673121682869600389843045356723503104000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{89}{\left(t \right)} + 977440884780953036849673121682869600389843045356723503104000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 2873766287973493260415167979878667304371980935196265414656000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 2873766287973493260415167979878667304371980935196265414656000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{87}{\left(t \right)} + 7135608547923313768218368863081881112418199944390183485440000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{85}{\left(t \right)} + 7135608547923313768218368863081881112418199944390183485440000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 15186038704554744686208323477840926470018220394471416135680000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 15186038704554744686208323477840926470018220394471416135680000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{83}{\left(t \right)} + 28018241409903503946054356816616509337183616627799762770329600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{81}{\left(t \right)} + 28018241409903503946054356816616509337183616627799762770329600 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 45218407995554173886379860848063416499234028878369382203392000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 45218407995554173886379860848063416499234028878369382203392000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{79}{\left(t \right)} + 64294923868678590994696364643340170334848384811431465320448000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{77}{\left(t \right)} + 64294923868678590994696364643340170334848384811431465320448000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 81008193203242256558304438211104989148681651950742562406400000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 81008193203242256558304438211104989148681651950742562406400000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{75}{\left(t \right)} + 90865087143669989602981847013369840403068580531127766220800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{73}{\left(t \right)} + 90865087143669989602981847013369840403068580531127766220800000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 91078887348713918990282980771048357674605212485318655082496000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 91078887348713918990282980771048357674605212485318655082496000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{71}{\left(t \right)} + 81828687852360161592832365536488758848278120592278479175680000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{69}{\left(t \right)} + 81828687852360161592832365536488758848278120592278479175680000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 66054482965158202731563475794515022202826916622682627768320000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 66054482965158202731563475794515022202826916622682627768320000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{67}{\left(t \right)} + 47996905813097677797833216659632358612826468887416746803200000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{65}{\left(t \right)} + 47996905813097677797833216659632358612826468887416746803200000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 31436569889280350370510644829700726108985757399945471590400000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 31436569889280350370510644829700726108985757399945471590400000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{63}{\left(t \right)} + 18577048018946607047073634179051272835028771013530277117952000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{61}{\left(t \right)} + 18577048018946607047073634179051272835028771013530277117952000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 9909998491119799419324994724810353501507210576838032097280000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 9909998491119799419324994724810353501507210576838032097280000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{59}{\left(t \right)} + 4773084937593539755286776305393797884030133765592443781120000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{57}{\left(t \right)} + 4773084937593539755286776305393797884030133765592443781120000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 2075254320692843371863815784953825166969623376344540774400000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 2075254320692843371863815784953825166969623376344540774400000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{55}{\left(t \right)} + 814059466258623592416973790643893589345814432990416076800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{53}{\left(t \right)} + 814059466258623592416973790643893589345814432990416076800000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 287851427269049302278641932371680773192679983505411124756480 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 287851427269049302278641932371680773192679983505411124756480 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{51}{\left(t \right)} + 91636693972085601686937725352211264854738300362299539456000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{49}{\left(t \right)} + 91636693972085601686937725352211264854738300362299539456000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 26221763267506991045881723540663192987352816542027874304000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 26221763267506991045881723540663192987352816542027874304000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{47}{\left(t \right)} + 6731032981614517790795531712447024985592798889136619520000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{45}{\left(t \right)} + 6731032981614517790795531712447024985592798889136619520000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 1546274210929415694534379067502400591639336510229053440000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 1546274210929415694534379067502400591639336510229053440000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{43}{\left(t \right)} + 316986213240530217379547708837992121286063984596955955200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{41}{\left(t \right)} + 316986213240530217379547708837992121286063984596955955200 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 57795522750727809620394392915762939364920502100426752000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 57795522750727809620394392915762939364920502100426752000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{39}{\left(t \right)} + 9335995517868026232338524407118875545390421180284928000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{37}{\left(t \right)} + 9335995517868026232338524407118875545390421180284928000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 1330094341080247970685949881611237357213017942917120000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 1330094341080247970685949881611237357213017942917120000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{35}{\left(t \right)} + 166261792635030996335743735201404669651627242864640000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{33}{\left(t \right)} + 166261792635030996335743735201404669651627242864640000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 18124362449884697622533822562614662889496068672716800 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 18124362449884697622533822562614662889496068672716800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{31}{\left(t \right)} + 1710958694813334085460549655975993567042272107776000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{29}{\left(t \right)} + 1710958694813334085460549655975993567042272107776000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 138726380660540601523828350484540018949373414144000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 138726380660540601523828350484540018949373414144000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{27}{\left(t \right)} + 9568351807019459994746225362367467351134626400000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{25}{\left(t \right)} + 9568351807019459994746225362367467351134626400000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 555036800911595409531306893655616012802260800000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 555036800911595409531306893655616012802260800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{23}{\left(t \right)} + 26711146043870529083694144257176520616108801000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{21}{\left(t \right)} + 26711146043870529083694144257176520616108801000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)} - 1049011523012691303410890328413298659996005000 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)} - 1049011523012691303410890328413298659996005000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{19}{\left(t \right)} + 32943095858157177631745940116427482549135625 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{17}{\left(t \right)} + 32943095858157177631745940116427482549135625 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)} - 806440535083407041168811263560036292512500 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)} - 806440535083407041168811263560036292512500 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{15}{\left(t \right)} + \frac{238266521729188443981694236960919813696875 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{13}{\left(t \right)}}{16} + \frac{238266521729188443981694236960919813696875 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)}}{16} - \frac{3176886956389179253089256492812264182625 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)}}{16} - \frac{3176886956389179253089256492812264182625 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{11}{\left(t \right)}}{16} + \frac{230209199738346322687627282087845230625 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{13}{\left(t \right)} \cos^{9}{\left(t \right)}}{128} + \frac{230209199738346322687627282087845230625 \sin^{13}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)}}{128} - 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\frac{261645494287824193193062166970765 \sqrt{3} \sin^{12}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{131072} - 73158057333763733258758606335067097924900402107514880 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 73158057333763733258758606335067097924900402107514880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{101}{\left(t \right)} + 1828951433344093331468965158376677448122510052687872000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{99}{\left(t \right)} + 1828951433344093331468965158376677448122510052687872000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 22176036129297131644061202545317214058485434388840448000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 22176036129297131644061202545317214058485434388840448000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{97}{\left(t \right)} + 173750386167688866489551690045784357571638455005347840000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{95}{\left(t \right)} + 173750386167688866489551690045784357571638455005347840000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 988884033774697962794050048424639878835457925557780480000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 988884033774697962794050048424639878835457925557780480000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{93}{\left(t \right)} + 4357335331979879655006203687058465824005501975141967462400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{91}{\left(t \right)} + 4357335331979879655006203687058465824005501975141967462400 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 15470858160088136541045962559103861369806768980889698304000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 15470858160088136541045962559103861369806768980889698304000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{89}{\left(t \right)} + 45485748876203830014688129551650984119524048893122707456000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{87}{\left(t \right)} + 45485748876203830014688129551650984119524048893122707456000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 112941856075084917597612169504948605269606249119812157440000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 112941856075084917597612169504948605269606249119812157440000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{85}{\left(t \right)} + 240363437288001234887225899202839339419931248126779719680000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{83}{\left(t \right)} + 240363437288001234887225899202839339419931248126779719680000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 443470541796362278366931784029238581229773152793908582809600 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 443470541796362278366931784029238581229773152793908582809600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{81}{\left(t \right)} + 715713438241320122389940979332172582577161983058606292992000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{79}{\left(t \right)} + 715713438241320122389940979332172582577161983058606292992000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 1017655044999377049023197329987932890851902194661455822848000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 1017655044999377049023197329987932890851902194661455822848000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{77}{\left(t \right)} + 1282191369694175327018617325581613058765659263830746726400000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{75}{\left(t \right)} + 1282191369694175327018617325581613058765659263830746726400000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 1438205518913607789982261377240837571314803019770285260800000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 1438205518913607789982261377240837571314803019770285260800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{73}{\left(t \right)} + 1441589531899286867135160815775521895012014320993274167296000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{71}{\left(t \right)} + 1441589531899286867135160815775521895012014320993274167296000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 1295178095065765544691746045423320452549856616517394759680000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 1295178095065765544691746045423320452549856616517394759680000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{69}{\left(t \right)} + 1045505209269955319208999819799547835190848112128499384320000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{67}{\left(t \right)} + 1045505209269955319208999819799547835190848112128499384320000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 759691285191075257352067958492557624147821544890118963200000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 759691285191075257352067958492557624147821544890118963200000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{65}{\left(t \right)} + 497575578604680870312465563457113765523719374430955110400000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{63}{\left(t \right)} + 497575578604680870312465563457113765523719374430955110400000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 294036068481703601800272618905438165814172917827792535552000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 294036068481703601800272618905438165814172917827792535552000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{61}{\left(t \right)} + 156854683909769552497432952218995043246258608967809761280000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{59}{\left(t \right)} + 156854683909769552497432952218995043246258608967809761280000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 75548016463534111386438423664918067157944487361244037120000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 75548016463534111386438423664918067157944487361244037120000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{57}{\left(t \right)} + 32846963679797439733234097245616550938236733635323494400000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{55}{\left(t \right)} + 32846963679797439733234097245616550938236733635323494400000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 12884869798736331211145283212301887169028718703987916800000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 12884869798736331211145283212301887169028718703987916800000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{53}{\left(t \right)} + 4556089960833166716260972143869947302968554933730127380480 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{51}{\left(t \right)} + 4556089960833166716260972143869947302968554933730127380480 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 1450418451668562689038381204844252974567692254111072256000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 1450418451668562689038381204844252974567692254111072256000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{49}{\left(t \right)} + 415036025743820069313874682664717746147223963124629504000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{47}{\left(t \right)} + 415036025743820069313874682664717746147223963124629504000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 106538265536918098149766938630452100015470436962795520000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 106538265536918098149766938630452100015470436962795520000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{45}{\left(t \right)} + 24474307721691238671607460889851308065720017816125440000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{43}{\left(t \right)} + 24474307721691238671607460889851308065720017816125440000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 5017233082946703927679529482419518153472603652305715200 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 5017233082946703927679529482419518153472603652305715200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{41}{\left(t \right)} + 914783030551292441231891770988130939623335869284352000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{39}{\left(t \right)} + 914783030551292441231891770988130939623335869284352000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 147769409576644895722890605469819864557721763811328000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 147769409576644895722890605469819864557721763811328000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{37}{\left(t \right)} + 21052629586903275510045472963814227650693059973120000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{35}{\left(t \right)} + 21052629586903275510045472963814227650693059973120000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 2631578698362909438755684120476778456336632496640000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 2631578698362909438755684120476778456336632496640000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{33}{\left(t \right)} + 286870996568791886070949301924501563591861476556800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{31}{\left(t \right)} + 286870996568791886070949301924501563591861476556800 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 27080920900048713203312271340529118958867131576000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 27080920900048713203312271340529118958867131576000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{29}{\left(t \right)} + 2195750343247192962430724703286144780448686344000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{27}{\left(t \right)} + 2195750343247192962430724703286144780448686344000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 151447126815648920371389118966043517327212025000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 151447126815648920371389118966043517327212025000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{25}{\left(t \right)} + 8785079235207881887873769826529636566269550000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{23}{\left(t \right)} + 8785079235207881887873769826529636566269550000 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - \frac{1691127752777517263415700691606955039006888375 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)}}{4} - \frac{1691127752777517263415700691606955039006888375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{21}{\left(t \right)}}{4} + \frac{66414690580348962391273900662530272304941875 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{19}{\left(t \right)}}{4} + \frac{66414690580348962391273900662530272304941875 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)}}{4} - \frac{16685464135949739319975216422606127524886875 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)}}{32} - \frac{16685464135949739319975216422606127524886875 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{17}{\left(t \right)}}{32} + \frac{102114223598223618849297530126108491584375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{15}{\left(t \right)}}{8} + \frac{102114223598223618849297530126108491584375 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)}}{8} - \frac{120680446070627913185533444694491853690625 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)}}{512} - \frac{120680446070627913185533444694491853690625 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{13}{\left(t \right)}}{512} + \frac{1609072614275038842473779262593224715875 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{11}{\left(t \right)}}{512} + \frac{1609072614275038842473779262593224715875 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)}}{512} - \frac{116599464802539046556070961057480051875 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)}}{4096} - \frac{116599464802539046556070961057480051875 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{9}{\left(t \right)}}{4096} + \frac{327658070500912615773784314493119375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{7}{\left(t \right)}}{2048} + \frac{327658070500912615773784314493119375 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)}}{2048} - \frac{126022334808043313759147813266584375 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)}}{262144} - \frac{126022334808043313759147813266584375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{5}{\left(t \right)}}{262144} + \frac{151287316696330508714463161184375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos^{3}{\left(t \right)}}{262144} + \frac{151287316696330508714463161184375 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)}}{262144} - \frac{242059706714128813943141057895 \sin^{11}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{2097152} - \frac{242059706714128813943141057895 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{11}{\left(t \right)} \cos{\left(t \right)}}{2097152} + \frac{1733012652384537708456000391845 \sqrt{3} \sin^{10}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{262144} + 812867303708485925097317848167412199165560023416832 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{101}{\left(t \right)} + 812867303708485925097317848167412199165560023416832 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 20321682592712148127432946204185304979139000585420800 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 20321682592712148127432946204185304979139000585420800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{99}{\left(t \right)} + 246400401436634796045124472725746822872060382098227200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{97}{\left(t \right)} + 246400401436634796045124472725746822872060382098227200 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 1930559846307654072106129889397603973018205055614976000 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 1930559846307654072106129889397603973018205055614976000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{95}{\left(t \right)} + 10987600375274421808822778315829331987060643617308672000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{93}{\left(t \right)} + 10987600375274421808822778315829331987060643617308672000 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 48414837021998662833402263189538509155616688612688527360 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 48414837021998662833402263189538509155616688612688527360 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{91}{\left(t \right)} + 171898424000979294900510695101154015220075210898774425600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{89}{\left(t \right)} + 171898424000979294900510695101154015220075210898774425600 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 505397209735598111274312550573899823550267209923585638400 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 505397209735598111274312550573899823550267209923585638400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{87}{\left(t \right)} + 1254909511945387973306801883388317836328958323553468416000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{85}{\left(t \right)} + 1254909511945387973306801883388317836328958323553468416000 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 2670704858755569276524732213364881549110347201408663552000 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 2670704858755569276524732213364881549110347201408663552000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{83}{\left(t \right)} + 4927450464404025315188130933658206458108590586598984253440 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{81}{\left(t \right)} + 4927450464404025315188130933658206458108590586598984253440 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 7952371536014668026554899770357473139746244256206736588800 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 7952371536014668026554899770357473139746244256206736588800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{79}{\left(t \right)} + 11307278277770856100257748110977032120576691051793953587200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{77}{\left(t \right)} + 11307278277770856100257748110977032120576691051793953587200 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 14246570774379725855762414728684589541840658487008296960000 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 14246570774379725855762414728684589541840658487008296960000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{75}{\left(t \right)} + 15980061321262308777580681969342639681275589108558725120000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{73}{\left(t \right)} + 15980061321262308777580681969342639681275589108558725120000 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 16017661465547631857057342397505798833466825788814157414400 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 16017661465547631857057342397505798833466825788814157414400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{71}{\left(t \right)} + 14390867722952950496574956060259116139442851294637719552000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{69}{\left(t \right)} + 14390867722952950496574956060259116139442851294637719552000 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 11616724547443947991211109108883864835453867912538882048000 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 11616724547443947991211109108883864835453867912538882048000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{67}{\left(t \right)} + 8441014279900836192800755094361751379420239387667988480000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{65}{\left(t \right)} + 8441014279900836192800755094361751379420239387667988480000 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 5528617540052009670138506260634597394707993049232834560000 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 5528617540052009670138506260634597394707993049232834560000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{63}{\left(t \right)} + 3267067427574484464447473543393757397935254642531028172800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{61}{\left(t \right)} + 3267067427574484464447473543393757397935254642531028172800 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 1742829821219661694415921691322167147180651210753441792000 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 1742829821219661694415921691322167147180651210753441792000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{59}{\left(t \right)} + 839422405150379015404871374054645190643827637347155968000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{57}{\left(t \right)} + 839422405150379015404871374054645190643827637347155968000 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 364966263108860441480378858284628343758185929281372160000 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 364966263108860441480378858284628343758185929281372160000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{55}{\left(t \right)} + 143165219985959235679392035692243190766985763377643520000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{53}{\left(t \right)} + 143165219985959235679392035692243190766985763377643520000 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 50623221787035185736233023820777192255206165930334748672 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 50623221787035185736233023820777192255206165930334748672 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{51}{\left(t \right)} + 16115760574095140989315346720491699717418802823456358400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{49}{\left(t \right)} + 16115760574095140989315346720491699717418802823456358400 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 4611511397153556325709718696274641623858044034718105600 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 4611511397153556325709718696274641623858044034718105600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{47}{\left(t \right)} + 1183758505965756646108521540338356666838560410697728000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{45}{\left(t \right)} + 1183758505965756646108521540338356666838560410697728000 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 271936752463235985240082898776125645174666864623616000 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 271936752463235985240082898776125645174666864623616000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{43}{\left(t \right)} + 55747034254963376974216994249105757260806707247841280 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{41}{\left(t \right)} + 55747034254963376974216994249105757260806707247841280 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 10164255895014360458132130788757010440259287436492800 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 10164255895014360458132130788757010440259287436492800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{39}{\left(t \right)} + 1641882328629387730254340060775776272863575153459200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{37}{\left(t \right)} + 1641882328629387730254340060775776272863575153459200 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 233918106521147505667171921820158085007700666368000 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 233918106521147505667171921820158085007700666368000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{35}{\left(t \right)} + 29239763315143438208396490227519760625962583296000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{33}{\left(t \right)} + 29239763315143438208396490227519760625962583296000 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 3187455517431020956343881132494461817687349739520 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 3187455517431020956343881132494461817687349739520 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{31}{\left(t \right)} + 300899121111652368925691903783656877320745906400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{29}{\left(t \right)} + 300899121111652368925691903783656877320745906400 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 24397226036079921804785830036512719782763181600 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 24397226036079921804785830036512719782763181600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{27}{\left(t \right)} + 1682745853507210226348767988511594636969022500 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{25}{\left(t \right)} + 1682745853507210226348767988511594636969022500 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 97611991502309798754152998072551517402995000 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 97611991502309798754152998072551517402995000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{23}{\left(t \right)} + \frac{37580616728389272520348904257932334200153075 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{21}{\left(t \right)}}{8} + \frac{37580616728389272520348904257932334200153075 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)}}{8} - \frac{1475882012896643608694975570278450495665375 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)}}{8} - \frac{1475882012896643608694975570278450495665375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{19}{\left(t \right)}}{8} + \frac{370788091909994207110560364946802833886375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{17}{\left(t \right)}}{64} + \frac{370788091909994207110560364946802833886375 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)}}{64} - \frac{2269204968849413752206611780580188701875 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)}}{16} - \frac{2269204968849413752206611780580188701875 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{15}{\left(t \right)}}{16} + \frac{2681787690458398070789632104322041193125 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{13}{\left(t \right)}}{1024} + \frac{2681787690458398070789632104322041193125 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)}}{1024} - \frac{35757169206111974277195094724293882575 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)}}{1024} - \frac{35757169206111974277195094724293882575 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{11}{\left(t \right)}}{1024} + \frac{2591099217834201034579354690166223375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{9}{\left(t \right)}}{8192} + \frac{2591099217834201034579354690166223375 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)}}{8192} - \frac{7281290455575835906084095877624875 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)}}{4096} - \frac{7281290455575835906084095877624875 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{7}{\left(t \right)}}{4096} + \frac{2800496329067629194647729183701875 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{5}{\left(t \right)}}{524288} + \frac{2800496329067629194647729183701875 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)}}{524288} - \frac{3361940371029566860321403581875 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)}}{524288} - \frac{3361940371029566860321403581875 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos^{3}{\left(t \right)}}{524288} + \frac{5379104593647306976514245731 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{9}{\left(t \right)} \cos{\left(t \right)}}{4194304} + \frac{5379104593647306976514245731 \sin^{9}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{4194304} - \frac{977213859381525144675366525 \sqrt{3} \sin^{8}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{65536} - 5890342780496274819545781508459508689605507416064 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 5890342780496274819545781508459508689605507416064 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{101}{\left(t \right)} + 147258569512406870488644537711487717240137685401600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{99}{\left(t \right)} + 147258569512406870488644537711487717240137685401600 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 1785510155337933304674815019751788571536669435494400 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 1785510155337933304674815019751788571536669435494400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{97}{\left(t \right)} + 13989564103678652696421231082591333137813080113152000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{95}{\left(t \right)} + 13989564103678652696421231082591333137813080113152000 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 79620292574452331947991147216154579616381475487744000 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 79620292574452331947991147216154579616381475487744000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{93}{\left(t \right)} + 350832152333323643720306254996655863446497743570206720 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{91}{\left(t \right)} + 350832152333323643720306254996655863446497743570206720 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 1245640753630284745655874602182275472609240658686771200 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 1245640753630284745655874602182275472609240658686771200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{89}{\left(t \right)} + 3662298621272450081697917033144201619929472535678156800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{87}{\left(t \right)} + 3662298621272450081697917033144201619929472535678156800 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 9093547188010057777585520894118245190789553069228032000 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 9093547188010057777585520894118245190789553069228032000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{85}{\left(t \right)} + 19352933759098328090758929082354214123988023198613504000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{83}{\left(t \right)} + 19352933759098328090758929082354214123988023198613504000 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 35706162785536415327450224156943525058757902801441914880 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 35706162785536415327450224156943525058757902801441914880 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{81}{\left(t \right)} + 57625880695758463960542751959112124201059740987005337600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{79}{\left(t \right)} + 57625880695758463960542751959112124201059740987005337600 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 81936799114281565943896725441862551598381819215898214400 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 81936799114281565943896725441862551598381819215898214400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{77}{\left(t \right)} + 103236020104200911998278367599163692332178684688465920000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{75}{\left(t \right)} + 103236020104200911998278367599163692332178684688465920000 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 115797545806248614330294796879294490444026008033034240000 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 115797545806248614330294796879294490444026008033034240000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{73}{\left(t \right)} + 116070010619910375775777843460186948068600186875464908800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{71}{\left(t \right)} + 116070010619910375775777843460186948068600186875464908800 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 104281650166325728236050406233761711155382980395925504000 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 104281650166325728236050406233761711155382980395925504000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{69}{\left(t \right)} + 84179163387274985443558761658578730691694695018397696000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{67}{\left(t \right)} + 84179163387274985443558761658578730691694695018397696000 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 61166770144208957918846051408418488256668401359912960000 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 61166770144208957918846051408418488256668401359912960000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{65}{\left(t \right)} + 40062445942405867174916712033584039092086906153861120000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{63}{\left(t \right)} + 40062445942405867174916712033584039092086906153861120000 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 23674401649090467133677344517346068100980106105297305600 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 23674401649090467133677344517346068100980106105297305600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{61}{\left(t \right)} + 12629201603041026771129867328421501066526458048937984000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{59}{\left(t \right)} + 12629201603041026771129867328421501066526458048937984000 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 6082771051814340691339647638077139062636432154689536000 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 6082771051814340691339647638077139062636432154689536000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{57}{\left(t \right)} + 2644683066006235083191151146990060462015840067256320000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{55}{\left(t \right)} + 2644683066006235083191151146990060462015840067256320000 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 1037429130333037939705739389074226020050621473751040000 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 1037429130333037939705739389074226020050621473751040000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{53}{\left(t \right)} + 366834940485762215479949447976646320689899753118367744 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{51}{\left(t \right)} + 366834940485762215479949447976646320689899753118367744 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 116780873725327108618227150148490577662455092923596800 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 116780873725327108618227150148490577662455092923596800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{49}{\left(t \right)} + 33416749254735915403693613741120591477232203150131200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{47}{\left(t \right)} + 33416749254735915403693613741120591477232203150131200 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 8577960188157656855858851741582294687235945005056000 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 8577960188157656855858851741582294687235945005056000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{45}{\left(t \right)} + 1970556177269825980000600715769026414309180178432000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{43}{\left(t \right)} + 1970556177269825980000600715769026414309180178432000 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 403964016340314325900123146732650414933381936578560 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 403964016340314325900123146732650414933381936578560 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{41}{\left(t \right)} + 73654028224741742450232831802587032175791937945600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{39}{\left(t \right)} + 73654028224741742450232831802587032175791937945600 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 11897698033546287900393768556346204875823008358400 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 11897698033546287900393768556346204875823008358400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{37}{\left(t \right)} + 1695058742906865983095448708841725253678990336000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{35}{\left(t \right)} + 1695058742906865983095448708841725253678990336000 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 211882342863358247886931088605215656709873792000 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 211882342863358247886931088605215656709873792000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{33}{\left(t \right)} + 23097503749500151857564356032568563896285143040 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{31}{\left(t \right)} + 23097503749500151857564356032568563896285143040 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 2180428413852553398012260172345339690730042800 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 2180428413852553398012260172345339690730042800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{29}{\left(t \right)} + 176791493015071897136129203163135650599733200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{27}{\left(t \right)} + 176791493015071897136129203163135650599733200 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 12193810532660943669193970931243439398326250 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 12193810532660943669193970931243439398326250 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{25}{\left(t \right)} + 707333271755868106914152159946025488427500 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{23}{\left(t \right)} + 707333271755868106914152159946025488427500 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - \frac{544646619252018442323897163158439626089175 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)}}{16} - \frac{544646619252018442323897163158439626089175 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{21}{\left(t \right)}}{16} + \frac{21389594389806429111521385076499282545875 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{19}{\left(t \right)}}{16} + \frac{21389594389806429111521385076499282545875 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)}}{16} - \frac{5373740462463684161022613984736272954875 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)}}{128} - \frac{5373740462463684161022613984736272954875 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{17}{\left(t \right)}}{128} + \frac{32887028534049474669661040298263604375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{15}{\left(t \right)}}{32} + \frac{32887028534049474669661040298263604375 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{15}{\left(t \right)}}{32} - \frac{38866488267513015518690320352493350625 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{13}{\left(t \right)}}{2048} - \frac{38866488267513015518690320352493350625 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{13}{\left(t \right)}}{2048} + \frac{518219843566840206915870938033244675 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{11}{\left(t \right)}}{2048} + \frac{518219843566840206915870938033244675 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{11}{\left(t \right)}}{2048} - \frac{37552162577307261370715285364727875 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{9}{\left(t \right)}}{16384} - \frac{37552162577307261370715285364727875 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{9}{\left(t \right)}}{16384} + \frac{105525948631533853711363708371375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{7}{\left(t \right)}}{8192} + \frac{105525948631533853711363708371375 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)}}{8192} - \frac{40586903319820712965909118604375 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)}}{1048576} - \frac{40586903319820712965909118604375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{5}{\left(t \right)}}{1048576} + \frac{48723773493182128410455124375 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos^{3}{\left(t \right)}}{1048576} + \frac{48723773493182128410455124375 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)}}{1048576} - \frac{77958037589091405456728199 \sin^{7}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{8388608} - \frac{77958037589091405456728199 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{7}{\left(t \right)} \cos{\left(t \right)}}{8388608} + \frac{2806217319787052591043808275 \sqrt{3} \sin^{6}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{134217728} + 24828823442477272422814414226746222898778734592 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{101}{\left(t \right)} + 24828823442477272422814414226746222898778734592 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 620720586061931810570360355668655572469468364800 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 620720586061931810570360355668655572469468364800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{99}{\left(t \right)} + 7526237106000923203165619312482448816192303923200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{97}{\left(t \right)} + 7526237106000923203165619312482448816192303923200 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 58968455675883522004184233788522279384599494656000 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 58968455675883522004184233788522279384599494656000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{95}{\left(t \right)} + 335613437186571451406626674335456879153755717632000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{93}{\left(t \right)} + 335613437186571451406626674335456879153755717632000 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{93}{\left(t \right)} - 1478818787434724311145409746071813153829075193692160 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{91}{\left(t \right)} - 1478818787434724311145409746071813153829075193692160 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{91}{\left(t \right)} + 5250593301131268498348728752675187660536743041433600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{89}{\left(t \right)} + 5250593301131268498348728752675187660536743041433600 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{89}{\left(t \right)} - 15437228230975803234776446747496634688582682306150400 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{87}{\left(t \right)} - 15437228230975803234776446747496634688582682306150400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{87}{\left(t \right)} + 38330889391451467950480919063926766159490287927296000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{85}{\left(t \right)} + 38330889391451467950480919063926766159490287927296000 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{85}{\left(t \right)} - 81575995371550559997177340571946707467633176870912000 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{83}{\left(t \right)} - 81575995371550559997177340571946707467633176870912000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{83}{\left(t \right)} + 150507711460510783194792193355241675277783211326832640 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{81}{\left(t \right)} + 150507711460510783194792193355241675277783211326832640 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{81}{\left(t \right)} - 242903150263132826810798432585579006066289554541772800 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{79}{\left(t \right)} - 242903150263132826810798432585579006066289554541772800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{79}{\left(t \right)} + 345377916780391988121604021332620149250505460364083200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{77}{\left(t \right)} + 345377916780391988121604021332620149250505460364083200 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{77}{\left(t \right)} - 435157852707390435962233183376643424121989638389760000 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{75}{\left(t \right)} - 435157852707390435962233183376643424121989638389760000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{75}{\left(t \right)} + 488106877143962444989199264244316398900952663326720000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{73}{\left(t \right)} + 488106877143962444989199264244316398900952663326720000 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{73}{\left(t \right)} - 489255363913712944859762086042538319839543140181606400 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{71}{\left(t \right)} - 489255363913712944859762086042538319839543140181606400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{71}{\left(t \right)} + 439565366016226473897442499178843021730839540006912000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{69}{\left(t \right)} + 439565366016226473897442499178843021730839540006912000 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{69}{\left(t \right)} - 354829873772134623507574065602198583806822279282688000 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{67}{\left(t \right)} - 354829873772134623507574065602198583806822279282688000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{67}{\left(t \right)} + 257828617629142536390157984660134133558819034234880000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{65}{\left(t \right)} + 257828617629142536390157984660134133558819034234880000 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{65}{\left(t \right)} - 168870205698619672957296457789093701512208958095360000 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{63}{\left(t \right)} - 168870205698619672957296457789093701512208958095360000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{63}{\left(t \right)} + 99791737180028062988202375524742559237370981174476800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{61}{\left(t \right)} + 99791737180028062988202375524742559237370981174476800 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{61}{\left(t \right)} - 53234290177410992009981375732005524367132801892352000 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{59}{\left(t \right)} - 53234290177410992009981375732005524367132801892352000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{59}{\left(t \right)} + 25639942209574699822989281493299863571931970142208000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{57}{\left(t \right)} + 25639942209574699822989281493299863571931970142208000 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{57}{\left(t \right)} - 11147800960684652096951861518826027639970421800960000 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{55}{\left(t \right)} - 11147800960684652096951861518826027639970421800960000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{55}{\left(t \right)} + 4372944949215936718952333835921065118639713157120000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{53}{\left(t \right)} + 4372944949215936718952333835921065118639713157120000 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{53}{\left(t \right)} - 1546273334042755223821545244381688625951002572357632 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{51}{\left(t \right)} - 1546273334042755223821545244381688625951002572357632 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{51}{\left(t \right)} + 492251776040118282011796498016519897814443386470400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{49}{\left(t \right)} + 492251776040118282011796498016519897814443386470400 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{49}{\left(t \right)} - 140857433630962309007941768077786515660753967513600 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{47}{\left(t \right)} - 140857433630962309007941768077786515660753967513600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{47}{\left(t \right)} + 36157600150805056999806480644967520761131040768000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{45}{\left(t \right)} + 36157600150805056999806480644967520761131040768000 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{45}{\left(t \right)} - 8306238402783288956245005024317453773683818496000 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{43}{\left(t \right)} - 8306238402783288956245005024317453773683818496000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{43}{\left(t \right)} + 1702778872570574236030226029985078023605182791680 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{41}{\left(t \right)} + 1702778872570574236030226029985078023605182791680 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{41}{\left(t \right)} - 310464591071773703624024381343702865453960396800 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{39}{\left(t \right)} - 310464591071773703624024381343702865453960396800 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{39}{\left(t \right)} + 50150874890500209937428570791503472981188915200 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{37}{\left(t \right)} + 50150874890500209937428570791503472981188915200 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{37}{\left(t \right)} - 7144968607194738186472184441123289909124608000 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{35}{\left(t \right)} - 7144968607194738186472184441123289909124608000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{35}{\left(t \right)} + 893121075899342273309023055140411238640576000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{33}{\left(t \right)} + 893121075899342273309023055140411238640576000 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{33}{\left(t \right)} - 97360011790345882980500095681240433926533120 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{31}{\left(t \right)} - 97360011790345882980500095681240433926533120 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{31}{\left(t \right)} + 9190886529687599630320647053242098254783400 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{29}{\left(t \right)} + 9190886529687599630320647053242098254783400 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{29}{\left(t \right)} - 745207015920616186242214625938548507144600 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{27}{\left(t \right)} - 745207015920616186242214625938548507144600 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{27}{\left(t \right)} + 51399040783998357497606059726236898306875 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{25}{\left(t \right)} + 51399040783998357497606059726236898306875 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{25}{\left(t \right)} - 2981533261114658820794298546540854126250 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{23}{\left(t \right)} - 2981533261114658820794298546540854126250 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{23}{\left(t \right)} + \frac{4591561222116574584023219761672915354425 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{21}{\left(t \right)}}{32} + \frac{4591561222116574584023219761672915354425 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{21}{\left(t \right)}}{32} - \frac{180321751178617025829766795104971872125 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{19}{\left(t \right)}}{32} - \frac{180321751178617025829766795104971872125 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{19}{\left(t \right)}}{32} + \frac{45302508916795410430138455913071751125 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{17}{\left(t \right)}}{256} + \frac{45302508916795410430138455913071751125 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{17}{\left(t \right)}}{256} - 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\frac{889620602674512616595197862625 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{7}{\left(t \right)}}{16384} - \frac{889620602674512616595197862625 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{7}{\left(t \right)}}{16384} + \frac{342161770259427929459691485625 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{5}{\left(t \right)}}{2097152} + \frac{342161770259427929459691485625 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{5}{\left(t \right)}}{2097152} - \frac{410758427682386469939605625 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)}}{2097152} - \frac{410758427682386469939605625 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos^{3}{\left(t \right)}}{2097152} + \frac{657213484291818351903369 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{5}{\left(t \right)} \cos{\left(t \right)}}{16777216} + \frac{657213484291818351903369 \sin^{5}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{16777216} - \frac{2106453475294289589433875 \sqrt{3} \sin^{4}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{134217728} - 49737226447270177129035284909347401640181760 \sin^{3}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{101}{\left(t \right)} - 49737226447270177129035284909347401640181760 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{3}{\left(t \right)} \cos^{101}{\left(t \right)} + 1243430661181754428225882122733685041004544000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{3}{\left(t \right)} \cos^{99}{\left(t \right)} + 1243430661181754428225882122733685041004544000 \sin^{3}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{99}{\left(t \right)} - 15076596766828772442238820738145931122180096000 \sin^{3}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{97}{\left(t \right)} - 15076596766828772442238820738145931122180096000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{3}{\left(t \right)} \cos^{97}{\left(t \right)} + 118125912812266670681458801659700078895431680000 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin^{3}{\left(t \right)} \cos^{95}{\left(t \right)} + 118125912812266670681458801659700078895431680000 \sin^{3}{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{95}{\left(t \right)} - 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\frac{63218891815554909646875 \sin{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos^{3}{\left(t \right)}}{268435456} - \frac{63218891815554909646875 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin{\left(t \right)} \cos^{3}{\left(t \right)}}{268435456} + \frac{101150226904887855435 \sqrt{3} \sin{\left(0.134872 \pi \right)} \sin{\left(t \right)} \cos{\left(t \right)}}{2147483648} + \frac{101150226904887855435 \sin{\left(t \right)} \cos{\left(0.134872 \pi \right)} \cos{\left(t \right)}}{2147483648} + \frac{946119822322470075388570329392254797500378153111935122973303121117184 \sin{\left(0.134872 \pi \right)} \cos^{200}{\left(t \right)}}{5} - 9461198223224700753885703293922547975003781531119351229733031211171840 \sin{\left(0.134872 \pi \right)} \cos^{198}{\left(t \right)} + 232982006246908256064435443612842743884468120203814024032175893575106560 \sin{\left(0.134872 \pi \right)} \cos^{196}{\left(t \right)} - 3766739542621333987640745623892914412548380522076891708337463050947788800 \sin{\left(0.134872 \pi \right)} \cos^{194}{\left(t \right)} + 44972660062126271417488774760777583365636627394006052086597988378057113600 \sin{\left(0.134872 \pi \right)} \cos^{192}{\left(t \right)} - 422881381999562724467217525135188599278109333280253831312749084564130889728 \sin{\left(0.134872 \pi \right)} \cos^{190}{\left(t \right)} + 3261527153695081064350898051461473926133356133611236057225261947314849710080 \sin{\left(0.134872 \pi \right)} \cos^{188}{\left(t \right)} - 21218032682328695391991149499848182336629213218585606000705275540303637381120 \sin{\left(0.134872 \pi \right)} \cos^{186}{\left(t \right)} + 118833415462065496165106682013309888379461462703699658607465581273087265996800 \sin{\left(0.134872 \pi \right)} \cos^{184}{\left(t \right)} - 581931175892767508271011081552089959498724021547262202534988518415851428249600 \sin{\left(0.134872 \pi \right)} \cos^{182}{\left(t \right)} + 2522365367928887797034690401116966769185127199711830457356262075480918124920832 \sin{\left(0.134872 \pi \right)} \cos^{180}{\left(t \right)} - 9772800884399803369463410861470498954202116206675706750363006742664163297853440 \sin{\left(0.134872 \pi \right)} \cos^{178}{\left(t \right)} + 34120330747329366684210352681902652931193691623174292650369779525086118003343360 \sin{\left(0.134872 \pi \right)} \cos^{176}{\left(t \right)} - 108073445806020618456774872748107950460794498353945723326963102568146075123712000 \sin{\left(0.134872 \pi \right)} \cos^{174}{\left(t \right)} + 312329768207837236634584986507636859136985022028655353647104772802067315032064000 \sin{\left(0.134872 \pi \right)} \cos^{172}{\left(t \right)} - 827589472299901694044721948032668045129459771883496510042220322311207555830906880 \sin{\left(0.134872 \pi \right)} \cos^{170}{\left(t \right)} + 2019076557334933395881866641217608095836394297402586169625763405231062591628902400 \sin{\left(0.134872 \pi \right)} \cos^{168}{\left(t \right)} - 4552170676035751474996918232561974665444059659910555896417584225101469951039897600 \sin{\left(0.134872 \pi \right)} \cos^{166}{\left(t \right)} + 9514953816897072107765994382621526716003723602331358821953421239738191541436416000 \sin{\left(0.134872 \pi \right)} \cos^{164}{\left(t \right)} - 18490385681396665570282099581000192801120350344396763886919079425754676961738752000 \sin{\left(0.134872 \pi \right)} \cos^{162}{\left(t \right)} + 33490711065429710514173452866086599211029234561288638590182182609898158646949314560 \sin{\left(0.134872 \pi \right)} \cos^{160}{\left(t \right)} - 56664251762738217310492992877975730508684738443680697375248385580992894119339622400 \sin{\left(0.134872 \pi \right)} \cos^{158}{\left(t \right)} + 89735280211088114057973006979766724399797856347927948103320445143137750991083929600 \sin{\left(0.134872 \pi \right)} \cos^{156}{\left(t \right)} - 133247302597894288744889910880051547284887752793717623749587838587636380432596992000 \sin{\left(0.134872 \pi \right)} \cos^{154}{\left(t \right)} + 185817527450969769851272258531946884299628624013114029994542415530414796150145024000 \sin{\left(0.134872 \pi \right)} \cos^{152}{\left(t \right)} - \frac{1218538254301330902178971679378641396698593193813998061838496434644022971782322454528 \sin{\left(0.134872 \pi \right)} \cos^{150}{\left(t \right)}}{5} + 300998341994194801765031134329273156677868676853921935036365995958155541769837608960 \sin{\left(0.134872 \pi \right)} \cos^{148}{\left(t \right)} - 350488114345199213615928995850335409798956911455465939769384425608308283383889264640 \sin{\left(0.134872 \pi \right)} \cos^{146}{\left(t \right)} + 385165769346338629165760841058534085623126963014545989665587016721754898216203059200 \sin{\left(0.134872 \pi \right)} \cos^{144}{\left(t \right)} - 399845408468431389986960437541708705946331438918911626295309933874489658402301542400 \sin{\left(0.134872 \pi \right)} \cos^{142}{\left(t \right)} + 392436508252692808348966758846082926983208238727178852043367426276227055908376543232 \sin{\left(0.134872 \pi \right)} \cos^{140}{\left(t \right)} - 364421380540055451921687971327771223472668081963681067988353221766337970413104005120 \sin{\left(0.134872 \pi \right)} \cos^{138}{\left(t \right)} + 320393909062978440012622432381084577333252546391618037173912109873250821643886919680 \sin{\left(0.134872 \pi \right)} \cos^{136}{\left(t \right)} - 266849581309938493859179271389798259836622970048544146366949117096392899899372339200 \sin{\left(0.134872 \pi \right)} \cos^{134}{\left(t \right)} + 210657035706313068637415528645862180492925875806394125467388694405205273830909542400 \sin{\left(0.134872 \pi \right)} \cos^{132}{\left(t \right)} - 157691838157297211380008195729188260826133084175072173921302394097610804981995143168 \sin{\left(0.134872 \pi \right)} \cos^{130}{\left(t \right)} + 111978833244320555337175535331067375256362289194442765779989886052546290631269416960 \sin{\left(0.134872 \pi \right)} \cos^{128}{\left(t \right)} - 75457134522453778293861942561011078269251590662612402608170932999096024726492938240 \sin{\left(0.134872 \pi \right)} \cos^{126}{\left(t \right)} + 48263883557856035092930701564974191144440893150428254592214595302784372540702720000 \sin{\left(0.134872 \pi \right)} \cos^{124}{\left(t \right)} - 29308837076939809174923517290531388888955745434397664398807812054390318919843840000 \sin{\left(0.134872 \pi \right)} \cos^{122}{\left(t \right)} + 16900666130069744650008631337610326671045496644631965697468785997926167495888076800 \sin{\left(0.134872 \pi \right)} \cos^{120}{\left(t \right)} - 9255311870585824267607119784517390123582209391215848679239694126798039263739904000 \sin{\left(0.134872 \pi \right)} \cos^{118}{\left(t \right)} + 4813850048421786084937609092263678723861361620521624731222996425353139318685696000 \sin{\left(0.134872 \pi \right)} \cos^{116}{\left(t \right)} - 2378046202264354405757210238883034890249983854901439561343311076663119482716160000 \sin{\left(0.134872 \pi \right)} \cos^{114}{\left(t \right)} + 1115748513169049149729180590664745609564404575278275948034110332516546662891520000 \sin{\left(0.134872 \pi \right)} \cos^{112}{\left(t \right)} - 497167939631455879191153157818785570541386296769158658994984216983717136669081600 \sin{\left(0.134872 \pi \right)} \cos^{110}{\left(t \right)} + 210369974455856719067685148300650726665415785511794618907039129080843043078144000 \sin{\left(0.134872 \pi \right)} \cos^{108}{\left(t \right)} - 84516597997909895895778388741563057896869170399607099711088310932353713176576000 \sin{\left(0.134872 \pi \right)} \cos^{106}{\left(t \right)} + 32232378553890389984923707055016338897757465273698842509060200818157100728320000 \sin{\left(0.134872 \pi \right)} \cos^{104}{\left(t \right)} - 11666212970309293739643963710411373911095349642244289801224924691312976855040000 \sin{\left(0.134872 \pi \right)} \cos^{102}{\left(t \right)} + 4006177534004211470193737138155265801070143067146689117740639138996876252020736 \sin{\left(0.134872 \pi \right)} \cos^{100}{\left(t \right)} - 1304815027853720672289709095530238565291302025422826104277942080407588988518400 \sin{\left(0.134872 \pi \right)} \cos^{98}{\left(t \right)} + 402922675895837730989669135333629411436431816972108398754746537693429733785600 \sin{\left(0.134872 \pi \right)} \cos^{96}{\left(t \right)} - 117913451552112697555698322238566943662567647631421787852756014111284789248000 \sin{\left(0.134872 \pi \right)} \cos^{94}{\left(t \right)} + 32686434343879033549971928367882807632488786643641846442440166012203565056000 \sin{\left(0.134872 \pi \right)} \cos^{92}{\left(t \right)} - 8578395872318346986845297313351563181792981873999045091414077424895556321280 \sin{\left(0.134872 \pi \right)} \cos^{90}{\left(t \right)} + 2130237814275482371175310995782056705300154539023200371472803824820604108800 \sin{\left(0.134872 \pi \right)} \cos^{88}{\left(t \right)} - 500217786348088977846834160952871615009752887705852718807379035787834163200 \sin{\left(0.134872 \pi \right)} \cos^{86}{\left(t \right)} + 110994172480710612799306632970054987424760005133856950415309032042528768000 \sin{\left(0.134872 \pi \right)} \cos^{84}{\left(t \right)} - 23255540645976511372663957358673619795811598623429819037610727593476096000 \sin{\left(0.134872 \pi \right)} \cos^{82}{\left(t \right)} + 4597122052695713944560535856437803056064899942167287441899120615353221120 \sin{\left(0.134872 \pi \right)} \cos^{80}{\left(t \right)} - 856640269284022648001609464933568678922342482441834433093597189793382400 \sin{\left(0.134872 \pi \right)} \cos^{78}{\left(t \right)} + 150332557775825152638431114024982862482690186697804394727680713005465600 \sin{\left(0.134872 \pi \right)} \cos^{76}{\left(t \right)} - 24820286737405960202730197831722926548236996413436596279335536558080000 \sin{\left(0.134872 \pi \right)} \cos^{74}{\left(t \right)} + 3851079646009507037429587795466660420886266504635354236585781493760000 \sin{\left(0.134872 \pi \right)} \cos^{72}{\left(t \right)} - 560875189470102563400001504570529004888051121700738770866852279091200 \sin{\left(0.134872 \pi \right)} \cos^{70}{\left(t \right)} + 76578108467339308605325849928642443849199652810226375601732714496000 \sin{\left(0.134872 \pi \right)} \cos^{68}{\left(t \right)} - 9788179277780212378124356757796402597266121035893596881424482304000 \sin{\left(0.134872 \pi \right)} \cos^{66}{\left(t \right)} + 1169543479881826846650888215545526045629224020832874627376087040000 \sin{\left(0.134872 \pi \right)} \cos^{64}{\left(t \right)} - 130423700378457955683603863399700216173720302356404206703738880000 \sin{\left(0.134872 \pi \right)} \cos^{62}{\left(t \right)} + 13551165792069450230642577235650170812335444601975843674547814400 \sin{\left(0.134872 \pi \right)} \cos^{60}{\left(t \right)} - 1309398594386009766799724953985195017896808436810636712738816000 \sin{\left(0.134872 \pi \right)} \cos^{58}{\left(t \right)} + 117428161703563050375431062767878003720888907663193494257664000 \sin{\left(0.134872 \pi \right)} \cos^{56}{\left(t \right)} - 9752959175034359701119827238837888347005119070290043207680000 \sin{\left(0.134872 \pi \right)} \cos^{54}{\left(t \right)} + 748417233991536289806009908771826374118636067652566056960000 \sin{\left(0.134872 \pi \right)} \cos^{52}{\left(t \right)} - \frac{264640333939407232075405103741717805888349713521947357741056 \sin{\left(0.134872 \pi \right)} \cos^{50}{\left(t \right)}}{5} + 3439987362858381359214465747916005010751574692958250352640 \sin{\left(0.134872 \pi \right)} \cos^{48}{\left(t \right)} - 204851955722957141441976420845172297124262287702296821760 \sin{\left(0.134872 \pi \right)} \cos^{46}{\left(t \right)} + 11140278172197385529237368409770561555465083426433228800 \sin{\left(0.134872 \pi \right)} \cos^{44}{\left(t \right)} - 551245064907350492240744351691753908958571446877593600 \sin{\left(0.134872 \pi \right)} \cos^{42}{\left(t \right)} + 24719895879438998636420879521177089354860938320917088 \sin{\left(0.134872 \pi \right)} \cos^{40}{\left(t \right)} - 1000182528579853664094215480159670593256122621138880 \sin{\left(0.134872 \pi \right)} \cos^{38}{\left(t \right)} + 36333625340617875457742532169917756669029258095320 \sin{\left(0.134872 \pi \right)} \cos^{36}{\left(t \right)} - 1178569867397243411511574259450529641720133487800 \sin{\left(0.134872 \pi \right)} \cos^{34}{\left(t \right)} + \frac{135709707637490466719620927658404583129104040775 \sin{\left(0.134872 \pi \right)} \cos^{32}{\left(t \right)}}{4} - 860767455092011144410894886426709376368741742 \sin{\left(0.134872 \pi \right)} \cos^{30}{\left(t \right)} + \frac{76383892893721919179669374866507258000898135 \sin{\left(0.134872 \pi \right)} \cos^{28}{\left(t \right)}}{4} - \frac{1468472765427061613768437783518448963703565 \sin{\left(0.134872 \pi \right)} \cos^{26}{\left(t \right)}}{4} + \frac{6198099334594740577594055579785661210437125 \sin{\left(0.134872 \pi \right)} \cos^{24}{\left(t \right)}}{1024} - \frac{43290702913962658149001906570018283583375 \sin{\left(0.134872 \pi \right)} \cos^{22}{\left(t \right)}}{512} + \frac{4040465605303181427240177946535039801115 \sin{\left(0.134872 \pi \right)} \cos^{20}{\left(t \right)}}{4096} - \frac{38697876046355704767397611142335798075 \sin{\left(0.134872 \pi \right)} \cos^{18}{\left(t \right)}}{4096} + \frac{9534259315768796826750136078546500975 \sin{\left(0.134872 \pi \right)} \cos^{16}{\left(t \right)}}{131072} - \frac{14371810846802527625490105635433375 \sin{\left(0.134872 \pi \right)} \cos^{14}{\left(t \right)}}{32768} + \frac{525024001228032924094580334333375 \sin{\left(0.134872 \pi \right)} \cos^{12}{\left(t \right)}}{262144} - \frac{1736921507822063809034701857945 \sin{\left(0.134872 \pi \right)} \cos^{10}{\left(t \right)}}{262144} + \frac{2004140201333150548886194451475 \sin{\left(0.134872 \pi \right)} \cos^{8}{\left(t \right)}}{134217728} - \frac{1404161886631173440316621075 \sin{\left(0.134872 \pi \right)} \cos^{6}{\left(t \right)}}{67108864} + \frac{8428342656849780554121375 \sin{\left(0.134872 \pi \right)} \cos^{4}{\left(t \right)}}{536870912} - \frac{2528755672622196385875 \sin{\left(0.134872 \pi \right)} \cos^{2}{\left(t \right)}}{536870912} + \frac{20230045380977571087 \sin{\left(0.134872 \pi \right)}}{42949672960}$$

20230045380977571087*sin(0.134872*pi)/42949672960 - 399845408468431389986960437541708705946331438918911626295309933874489658402301542400*cos(t)^142*sin(0.134872*pi) - 364421380540055451921687971327771223472668081963681067988353221766337970413104005120*cos(t)^138*sin(0.134872*pi) - 350488114345199213615928995850335409798956911455465939769384425608308283383889264640*cos(t)^146*sin(0.134872*pi) - 266849581309938493859179271389798259836622970048544146366949117096392899899372339200*cos(t)^134*sin(0.134872*pi) - 157691838157297211380008195729188260826133084175072173921302394097610804981995143168*cos(t)^130*sin(0.134872*pi) - 133247302597894288744889910880051547284887752793717623749587838587636380432596992000*cos(t)^154*sin(0.134872*pi) - 75457134522453778293861942561011078269251590662612402608170932999096024726492938240*cos(t)^126*sin(0.134872*pi) - 56664251762738217310492992877975730508684738443680697375248385580992894119339622400*cos(t)^158*sin(0.134872*pi) - 29308837076939809174923517290531388888955745434397664398807812054390318919843840000*cos(t)^122*sin(0.134872*pi) - 18490385681396665570282099581000192801120350344396763886919079425754676961738752000*cos(t)^162*sin(0.134872*pi) - 9255311870585824267607119784517390123582209391215848679239694126798039263739904000*cos(t)^118*sin(0.134872*pi) - 4552170676035751474996918232561974665444059659910555896417584225101469951039897600*cos(t)^166*sin(0.134872*pi) - 2378046202264354405757210238883034890249983854901439561343311076663119482716160000*cos(t)^114*sin(0.134872*pi) - 827589472299901694044721948032668045129459771883496510042220322311207555830906880*cos(t)^170*sin(0.134872*pi) - 497167939631455879191153157818785570541386296769158658994984216983717136669081600*cos(t)^110*sin(0.134872*pi) - 108073445806020618456774872748107950460794498353945723326963102568146075123712000*cos(t)^174*sin(0.134872*pi) - 84516597997909895895778388741563057896869170399607099711088310932353713176576000*cos(t)^106*sin(0.134872*pi) - 11666212970309293739643963710411373911095349642244289801224924691312976855040000*cos(t)^102*sin(0.134872*pi) - 9772800884399803369463410861470498954202116206675706750363006742664163297853440*cos(t)^178*sin(0.134872*pi) - 1304815027853720672289709095530238565291302025422826104277942080407588988518400*cos(t)^98*sin(0.134872*pi) - 581931175892767508271011081552089959498724021547262202534988518415851428249600*cos(t)^182*sin(0.134872*pi) - 117913451552112697555698322238566943662567647631421787852756014111284789248000*cos(t)^94*sin(0.134872*pi) - 21218032682328695391991149499848182336629213218585606000705275540303637381120*cos(t)^186*sin(0.134872*pi) - 8578395872318346986845297313351563181792981873999045091414077424895556321280*cos(t)^90*sin(0.134872*pi) - 500217786348088977846834160952871615009752887705852718807379035787834163200*cos(t)^86*sin(0.134872*pi) - 422881381999562724467217525135188599278109333280253831312749084564130889728*cos(t)^190*sin(0.134872*pi) - 23255540645976511372663957358673619795811598623429819037610727593476096000*cos(t)^82*sin(0.134872*pi) - 3766739542621333987640745623892914412548380522076891708337463050947788800*cos(t)^194*sin(0.134872*pi) - 856640269284022648001609464933568678922342482441834433093597189793382400*cos(t)^78*sin(0.134872*pi) - 24820286737405960202730197831722926548236996413436596279335536558080000*cos(t)^74*sin(0.134872*pi) - 9461198223224700753885703293922547975003781531119351229733031211171840*cos(t)^198*sin(0.134872*pi) - 560875189470102563400001504570529004888051121700738770866852279091200*cos(t)^70*sin(0.134872*pi) - 9788179277780212378124356757796402597266121035893596881424482304000*cos(t)^66*sin(0.134872*pi) - 130423700378457955683603863399700216173720302356404206703738880000*cos(t)^62*sin(0.134872*pi) - 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5653413638829777552895890370514871*sqrt(3)*sin(t)^19*cos(t)*sin(0.134872*pi)/16384 - 4368774273345501543650457526574925*sqrt(3)*cos(t)^11*sin(t)^5*sin(0.134872*pi)/4096 - 298695471426088440282401625928125*sqrt(3)*cos(t)^3*sin(t)^13*sin(0.134872*pi)/8192 - 261645494287824193193062166970765*sqrt(3)*cos(t)^2*sin(t)^12*cos(0.134872*pi)/131072 - 42670781632298348611771660846875*sqrt(3)*cos(t)^15*sin(t)*sin(0.134872*pi)/8192 - 40586903319820712965909118604375*sqrt(3)*cos(t)^5*sin(t)^7*sin(0.134872*pi)/1048576 - 40586903319820712965909118604375*sqrt(3)*cos(t)^9*sin(t)^3*sin(0.134872*pi)/2097152 - 11155849149948080261061583011807*sqrt(3)*sin(t)^15*cos(t)*sin(0.134872*pi)/32768 - 3361940371029566860321403581875*sqrt(3)*cos(t)^3*sin(t)^9*sin(0.134872*pi)/524288 - 889620602674512616595197862625*sqrt(3)*cos(t)^7*sin(t)^5*sin(0.134872*pi)/16384 - 672388074205913372064280716375*sqrt(3)*cos(t)^11*sin(t)*sin(0.134872*pi)/524288 - 242059706714128813943141057895*sqrt(3)*sin(t)^11*cos(t)*sin(0.134872*pi)/2097152 - 43866893623003580699960446875*sqrt(3)*cos(t)^5*sin(t)^3*sin(0.134872*pi)/134217728 - 977213859381525144675366525*sqrt(3)*cos(t)^2*sin(t)^8*cos(0.134872*pi)/65536 - 410758427682386469939605625*sqrt(3)*cos(t)^3*sin(t)^5*sin(0.134872*pi)/2097152 - 136919475894128823313201875*sqrt(3)*cos(t)^7*sin(t)*sin(0.134872*pi)/2097152 - 77958037589091405456728199*sqrt(3)*sin(t)^7*cos(t)*sin(0.134872*pi)/8388608 - 2106453475294289589433875*sqrt(3)*cos(t)^2*sin(t)^4*cos(0.134872*pi)/134217728 - 84258139011771583577355*sqrt(3)*sin(t)^3*cos(t)*sin(0.134872*pi)/1073741824 - 63218891815554909646875*sqrt(3)*cos(t)^3*sin(t)*sin(0.134872*pi)/268435456 + 101150226904887855435*sqrt(3)*cos(t)*sin(t)*sin(0.134872*pi)/2147483648 + 2528755672622196385875*sqrt(3)*cos(t)^2*sin(t)^2*cos(0.134872*pi)/536870912 + 657213484291818351903369*sqrt(3)*sin(t)^5*cos(t)*sin(0.134872*pi)/16777216 + 52661336882357239735846875*sqrt(3)*cos(t)^3*sin(t)^3*sin(0.134872*pi)/134217728 + 52661336882357239735846875*sqrt(3)*cos(t)^5*sin(t)*sin(0.134872*pi)/268435456 + 2806217319787052591043808275*sqrt(3)*cos(t)^2*sin(t)^6*cos(0.134872*pi)/134217728 + 5379104593647306976514245731*sqrt(3)*sin(t)^9*cos(t)*sin(0.134872*pi)/4194304 + 48723773493182128410455124375*sqrt(3)*cos(t)^3*sin(t)^7*sin(0.134872*pi)/1048576 + 48723773493182128410455124375*sqrt(3)*cos(t)^9*sin(t)*sin(0.134872*pi)/4194304 + 114053923419809309819897161875*sqrt(3)*cos(t)^7*sin(t)^3*sin(0.134872*pi)/1048576 + 342161770259427929459691485625*sqrt(3)*cos(t)^5*sin(t)^5*sin(0.134872*pi)/2097152 + 477912754281741504451842601485*sqrt(3)*sin(t)^13*cos(t)*sin(0.134872*pi)/65536 + 1733012652384537708456000391845*sqrt(3)*cos(t)^2*sin(t)^10*cos(0.134872*pi)/262144 + 50429105565443502904821053728125*sqrt(3)*cos(t)^13*sin(t)*sin(0.134872*pi)/524288 + 105525948631533853711363708371375*sqrt(3)*cos(t)^7*sin(t)^7*sin(0.134872*pi)/8192 + 151287316696330508714463161184375*sqrt(3)*cos(t)^3*sin(t)^11*sin(0.134872*pi)/262144 + 316577845894601561134091125114125*sqrt(3)*cos(t)^9*sin(t)^5*sin(0.134872*pi)/32768 + 399641890136375345822735532599439*sqrt(3)*sin(t)^17*cos(t)*sin(0.134872*pi)/32768 + 560099265813525838929545836740375*sqrt(3)*cos(t)^11*sin(t)^3*sin(0.134872*pi)/262144 + 2800496329067629194647729183701875*sqrt(3)*cos(t)^5*sin(t)^9*sin(0.134872*pi)/524288 + 4038152599164126823497064550367765*sqrt(3)*sin(t)^21*cos(t)*sin(0.134872*pi)/512 + 6972405718717550163163489382379375*sqrt(3)*cos(t)^3*sin(t)^15*sin(0.134872*pi)/4096 + 6972405718717550163163489382379375*sqrt(3)*cos(t)^17*sin(t)*sin(0.134872*pi)/32768 + 35544761099704524393605793485446875*sqrt(3)*cos(t)^15*sin(t)^3*sin(0.134872*pi)/4096 + 57225597892922286308767360374762735*sqrt(3)*cos(t)^2*sin(t)^14*cos(0.134872*pi)/131072 + 248813327697931670755240554398128125*sqrt(3)*cos(t)^5*sin(t)^13*sin(0.134872*pi)/8192 + 327658070500912615773784314493119375*sqrt(3)*cos(t)^7*sin(t)^11*sin(0.134872*pi)/2048 + 327658070500912615773784314493119375*sqrt(3)*cos(t)^13*sin(t)^5*sin(0.134872*pi)/4096 + 518219843566840206915870938033244675*sqrt(3)*cos(t)^11*sin(t)^7*sin(0.134872*pi)/2048 + 706676704853722194111986296314358875*sqrt(3)*cos(t)^21*sin(t)*sin(0.134872*pi)/4096 + 1491010436015638627935603493274406777*sqrt(3)*sin(t)^25*cos(t)*sin(0.134872*pi)/640 + 1755991070533006766056785015951821244*sqrt(3)*sin(t)^29*cos(t)*sin(0.134872*pi)/5 + 2591099217834201034579354690166223375*sqrt(3)*cos(t)^9*sin(t)^9*sin(0.134872*pi)/8192 + 3533383524268610970559931481571794375*sqrt(3)*cos(t)^3*sin(t)^19*sin(0.134872*pi)/2048 + 7910709019607590343461393746150290625*sqrt(3)*cos(t)^25*sin(t)*sin(0.134872*pi)/128 + 15100836305598470143379485304357250375*sqrt(3)*cos(t)^7*sin(t)^15*sin(0.134872*pi)/32 + 23118173228027823824329076295509214375*sqrt(3)*cos(t)^19*sin(t)^3*sin(0.134872*pi)/2048 + 23732127058822771030384181238450871875*sqrt(3)*cos(t)^3*sin(t)^23*sin(0.134872*pi)/32 + 32887028534049474669661040298263604375*sqrt(3)*cos(t)^15*sin(t)^7*sin(0.134872*pi)/32 + 38401718742672083688008818369892931255*sqrt(3)*cos(t)^2*sin(t)^18*cos(0.134872*pi)/4096 + 45302508916795410430138455913071751125*sqrt(3)*cos(t)^17*sin(t)^5*sin(0.134872*pi)/256 + 176818545296726375748773491189593111375*sqrt(3)*cos(t)^29*sin(t)*sin(0.134872*pi)/16 + 191123926994529411589378111957747059375*sqrt(3)*cos(t)^23*sin(t)^3*sin(0.134872*pi)/32 + 208063559052250414418961686659582929375*sqrt(3)*cos(t)^5*sin(t)^17*sin(0.134872*pi)/4096 + 230209199738346322687627282087845230625*sqrt(3)*cos(t)^9*sin(t)^13*sin(0.134872*pi)/128 + 1237729817077084630241414438327151779625*sqrt(3)*cos(t)^3*sin(t)^27*sin(0.134872*pi)/8 + 1609072614275038842473779262593224715875*sqrt(3)*cos(t)^11*sin(t)^11*sin(0.134872*pi)/512 + 2102363196939823527483159231535217653125*sqrt(3)*cos(t)^5*sin(t)^21*sin(0.134872*pi)/64 + 2681787690458398070789632104322041193125*sqrt(3)*cos(t)^13*sin(t)^9*sin(0.134872*pi)/1024 + 4591561222116574584023219761672915354425*sqrt(3)*cos(t)^21*sin(t)^5*sin(0.134872*pi)/32 + 7092773684430142692721876305246082139136*sqrt(3)*sin(t)^37*cos(t)*sin(0.134872*pi)/5 + 7652602036860957640038699602788192257375*sqrt(3)*cos(t)^7*sin(t)^19*sin(0.134872*pi)/16 + 11942420126932951702599593364399815819625*sqrt(3)*cos(t)^27*sin(t)^3*sin(0.134872*pi)/8 + 21389594389806429111521385076499282545875*sqrt(3)*cos(t)^19*sin(t)^7*sin(0.134872*pi)/16 + 36571490034757483183114180080402501206016*sqrt(3)*sin(t)^97*cos(t)*sin(0.134872*pi)/5 + 74157618381998841422112072989360566777275*sqrt(3)*cos(t)^11*sin(t)^15*sin(0.134872*pi)/8 + 85580889856285188962115770857995280449285*sqrt(3)*cos(t)^2*sin(t)^22*cos(0.134872*pi)/1024 + 102114223598223618849297530126108491584375*sqrt(3)*cos(t)^15*sin(t)^11*sin(0.134872*pi)/8 + 155251461650128372133794713737197605655125*sqrt(3)*cos(t)^5*sin(t)^25*sin(0.134872*pi)/16 + 192506349508257862003692465688493542912875*sqrt(3)*cos(t)^9*sin(t)^17*sin(0.134872*pi)/64 + 238266521729188443981694236960919813696875*sqrt(3)*cos(t)^13*sin(t)^13*sin(0.134872*pi)/16 + 370788091909994207110560364946802833886375*sqrt(3)*cos(t)^17*sin(t)^9*sin(0.134872*pi)/64 + 722297870126151011203297134319912634332275*sqrt(3)*cos(t)^2*sin(t)^26*cos(0.134872*pi)/2 + 3895453582288844753265080871037224818049024*sqrt(3)*sin(t)^45*cos(t)*sin(0.134872*pi)/5 + 37580616728389272520348904257932334200153075*sqrt(3)*cos(t)^11*sin(t)^19*sin(0.134872*pi)/4 + 37580616728389272520348904257932334200153075*sqrt(3)*cos(t)^21*sin(t)^9*sin(0.134872*pi)/8 + 46481132538434701519476337541677988080779264*sqrt(3)*sin(t)^49*cos(t)*sin(0.134872*pi)/5 + 66414690580348962391273900662530272304941875*sqrt(3)*cos(t)^19*sin(t)^11*sin(0.134872*pi)/4 + 80016195702514892978277174539565335656267776*sqrt(3)*sin(t)^89*cos(t)*sin(0.134872*pi)/5 + 199244071741046887173821701987590816914825625*sqrt(3)*cos(t)^13*sin(t)^17*sin(0.134872*pi)/8 + 798156779456926447376290913170983888277733376*sqrt(3)*sin(t)^85*cos(t)*sin(0.134872*pi)/5 + 3368130523214574960486316765108970072742733383*sqrt(3)*cos(t)^2*sin(t)^30*cos(0.134872*pi)/4 + 11390641425154413021964962512453997508360667136*sqrt(3)*sin(t)^77*cos(t)*sin(0.134872*pi)/5 + 248411592963686202178136807256899335378934056258825238347776*sqrt(3)*cos(t)^2*sin(t)^50*cos(0.134872*pi)/5 + 45271121298177803258747223457587209199811349069446210991947776*sqrt(3)*cos(t)^2*sin(t)^54*cos(0.134872*pi)/5 + 6005123284710411385380216679544172280079408994806662303397707776*sqrt(3)*cos(t)^2*sin(t)^58*cos(0.134872*pi)/5 + 7383126070944446623136453996545458702777103516279028441721864192*sqrt(3)*cos(t)^101*sin(t)^25*sin(0.134872*pi)/5 + 590367796216652938650186647499794399087003697766948477449353035776*sqrt(3)*cos(t)^2*sin(t)^62*cos(0.134872*pi)/5 + 1112991567278288568928623218916900554366653440416895873739885903872*sqrt(3)*cos(t)^101*sin(t)^29*sin(0.134872*pi)/5 + 43683546785708580596017529358754177157271488773070559747691329355776*sqrt(3)*cos(t)^2*sin(t)^66*cos(0.134872*pi)/5 + 946119822322470075388570329392254797500378153111935122973303121117184*sqrt(3)*cos(t)^2*sin(t)^198*cos(0.134872*pi)/5 + 2465168951799524854569395802568186982351528833225632536073289152331776*sqrt(3)*cos(t)^2*sin(t)^70*cos(0.134872*pi)/5 + 4495579409175430267731780024319206719747730076352260370255317007597568*sqrt(3)*cos(t)^101*sin(t)^37*sin(0.134872*pi)/5 + 6107107478786025825253395055984577556766232669206774674149849048285184*sqrt(3)*cos(t)^51*sin(t)^27*sin(0.134872*pi)/5 + 23179935646900516847019973070110242538759264751242410512845926467371008*sqrt(3)*cos(t)^101*sin(t)^97*sin(0.134872*pi)/5 + 107311204408781790681072445983849517619105178377231842749822064473931776*sqrt(3)*cos(t)^2*sin(t)^74*cos(0.134872*pi)/5 + 1118550159940740246628137271923993234344822071516585299135187614940790784*sqrt(3)*cos(t)^2*sin(t)^194*cos(0.134872*pi)/5 + 2469037035874830232213651626477416917991462841198057192547556299754176512*sqrt(3)*cos(t)^101*sin(t)^45*sin(0.134872*pi)/5 + 3638849761949769267496964200526778599817366657097382034579404448413515776*sqrt(3)*cos(t)^2*sin(t)^78*cos(0.134872*pi)/5 + 29460917780817316751060489948630854355298688390828085854643323422357061632*sqrt(3)*cos(t)^101*sin(t)^49*sin(0.134872*pi)/5 + 42845098147716350404181916600768631611140391568172868007176366565279924224*sqrt(3)*cos(t)^51*sin(t)^35*sin(0.134872*pi)/5 + 50716289255136237024038448188414245263847277548119127783163862442089381888*sqrt(3)*cos(t)^101*sin(t)^89*sin(0.134872*pi)/5 + 58921835561634633502120979897261708710597376781656171709286646844714123264*sqrt(3)*cos(t)^51*sin(t)^99*sin(0.134872*pi)/5 + 96930942728353756408014071711705862298550860063410040013137439339027890176*sqrt(3)*cos(t)^2*sin(t)^82*cos(0.134872*pi)/5 + 207148152757465427395868282956347337999786056431162387190437814250487414784*sqrt(3)*cos(t)^2*sin(t)^190*cos(0.134872*pi)/5 + 505891960277401664624207030495167500108615112963296701852694907993548914688*sqrt(3)*cos(t)^101*sin(t)^85*sin(0.134872*pi)/5 + 1616361032327975223544598689939169681124970731865178213972305421444919066624*sqrt(3)*cos(t)^51*sin(t)^39*sin(0.134872*pi)/5 + 2043049012065245581645651711625789000223515272923388881973487458065554866176*sqrt(3)*cos(t)^2*sin(t)^86*cos(0.134872*pi)/5 + 7219676719790763017534122015781163197419263588319454017278563130766490861568*sqrt(3)*cos(t)^101*sin(t)^77*sin(0.134872*pi)/5 + 14400377011235057126814270914587773972276020058086073516753002128004081516544*sqrt(3)*cos(t)^2*sin(t)^186*cos(0.134872*pi)/5 + 17146254148435678349117205150103157234783836643461945967402414231811809869824*sqrt(3)*cos(t)^51*sin(t)^95*sin(0.134872*pi)/5 + 34283839302279568659995583299473321382687651947802612481679855458440315928576*sqrt(3)*cos(t)^2*sin(t)^90*cos(0.134872*pi)/5 + 460418925343447888688627552652894001533081956886702319533259095953846436888576*sqrt(3)*cos(t)^2*sin(t)^94*cos(0.134872*pi)/5 + 502477290909919060992391933481896304186437267483656336550554530791922224594944*sqrt(3)*cos(t)^2*sin(t)^182*cos(0.134872*pi)/5 + 560723369336384100447403195973170604392289025238806319150500220380050739953664*sqrt(3)*cos(t)^51*sin(t)^47*sin(0.134872*pi)/5 + 4969880685132862595188827353635939770807432999140290847149236809524642710552576*sqrt(3)*cos(t)^2*sin(t)^98*cos(0.134872*pi)/5 + 10204648251090520504810788531306280352618453158306497610656922316117255707951104*sqrt(3)*cos(t)^2*sin(t)^178*cos(0.134872*pi)/5 + 10965064225060205821529985680747685896185623387222624737825270365939011164307456*sqrt(3)*cos(t)^51*sin(t)^87*sin(0.134872*pi)/5 + 43270057866658273942439960214916480320933465874628294264570664571105145725648896*sqrt(3)*cos(t)^2*sin(t)^102*cos(0.134872*pi)/5 + 131942297565738337078545497633467050237576330240799427110690786228227029235400704*sqrt(3)*cos(t)^2*sin(t)^174*cos(0.134872*pi)/5 + 285738569803107944598012001560615779501041449027256549087800958471800571092271104*sqrt(3)*cos(t)^51*sin(t)^79*sin(0.134872*pi)/5 + 304691155086755803496713368647650075316491991504169580274711215142088207966928896*sqrt(3)*cos(t)^2*sin(t)^106*cos(0.134872*pi)/5 + 622914277770306391416417538706046826127214513599367966299345963971873592410374144*sqrt(3)*cos(t)^51*sin(t)^75*sin(0.134872*pi)/5 + 1153223909574821427967596066431111593618528948614347578711399137397833228777160704*sqrt(3)*cos(t)^2*sin(t)^170*cos(0.134872*pi)/5 + 1738680980964751604114053416238324294696344547790989780714436654656458675921616896*sqrt(3)*cos(t)^2*sin(t)^110*cos(0.134872*pi)/5 + 7110659334749979937153319532355811847153201576209795876629114551997108407767138304*sqrt(3)*cos(t)^2*sin(t)^166*cos(0.134872*pi)/5 + 8050169426441277884254201657329770698124240945906807847260440375389322775044816896*sqrt(3)*cos(t)^2*sin(t)^114*cos(0.134872*pi)/5 + 30257478537261468797601755118598327696728479799377927587343928882613822500315856896*sqrt(3)*cos(t)^2*sin(t)^118*cos(0.134872*pi)/5 + 31924575039056583100998700282653572099951521288313810504308299625180716359749730304*sqrt(3)*cos(t)^2*sin(t)^162*cos(0.134872*pi)/5 + 92298333271611791422176184883203638786279723748206421094039059164934579620094672896*sqrt(3)*cos(t)^2*sin(t)^122*cos(0.134872*pi)/5 + 106926201959221807820455466708085604149495942372773184020623815545898124785802543104*sqrt(3)*cos(t)^2*sin(t)^158*cos(0.134872*pi)/5 + 228264588094600507426832389863388074410333211309127161173820747646492840549045764096*sqrt(3)*cos(t)^2*sin(t)^126*cos(0.134872*pi)/5 + 272281344200971291557855537217040573605061531894009437660984113356622409144524079104*sqrt(3)*cos(t)^2*sin(t)^154*cos(0.134872*pi)/5 + 456829612659483787640995691853992502259187186212274201880383287871815412302674395136*sqrt(3)*cos(t)^2*sin(t)^130*cos(0.134872*pi)/5 + 535132468466348697089767275476517258678765887990991468885756998070514487732264239104*sqrt(3)*cos(t)^2*sin(t)^150*cos(0.134872*pi)/5 + 737792340677610913749814405573672898977672657423024306378185401327753542644988379136*sqrt(3)*cos(t)^2*sin(t)^134*cos(0.134872*pi)/5 + 821585924135991803735951267744241645369516078446603082229090543217269224799129829376*sqrt(3)*cos(t)^2*sin(t)^146*cos(0.134872*pi)/5 + 957929698062995973295142100307106129674750335283339460450390960793189286491073806336*sqrt(3)*cos(t)^2*sin(t)^138*cos(0.134872*pi)/5 + 994974199141688881485110493785235024490366336242003331710103498784502298960698802176*sqrt(3)*cos(t)^2*sin(t)^142*cos(0.134872*pi)/5

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¿Cómo vas a descomponer esta 2*8503592005455053*9516*sin(100*t+pi/6)*sin(100*t+0.134872*pi)/(34359738368*5) expresión en fracciones?

Solución

¿Cómo vas a descomponer esta 285035920054550539516sin(100t+pi/6)sin(100t+0.134872pi)/(343597383685) expresión en fracciones?