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(y^678+1234)*56=368424 la ecuación

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Solución numérica:

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Solución

Ha introducido [src]
/ 678       \            
\y    + 1234/*56 = 368424
$$56 \left(y^{678} + 1234\right) = 368424$$
Respuesta rápida [src]
      678______
y1 = - \/ 5345 
$$y_{1} = - \sqrt[678]{5345}$$
     678______
y2 =  \/ 5345 
$$y_{2} = \sqrt[678]{5345}$$
       678______       ___ 678______
        \/ 5345    I*\/ 3 * \/ 5345 
y3 = - --------- - -----------------
           2               2        
$$y_{3} = - \frac{\sqrt[678]{5345}}{2} - \frac{\sqrt{3} \sqrt[678]{5345} i}{2}$$
       678______       ___ 678______
        \/ 5345    I*\/ 3 * \/ 5345 
y4 = - --------- + -----------------
           2               2        
$$y_{4} = - \frac{\sqrt[678]{5345}}{2} + \frac{\sqrt{3} \sqrt[678]{5345} i}{2}$$
     678______       ___ 678______
      \/ 5345    I*\/ 3 * \/ 5345 
y5 = --------- - -----------------
         2               2        
$$y_{5} = \frac{\sqrt[678]{5345}}{2} - \frac{\sqrt{3} \sqrt[678]{5345} i}{2}$$
     678______       ___ 678______
      \/ 5345    I*\/ 3 * \/ 5345 
y6 = --------- + -----------------
         2               2        
$$y_{6} = \frac{\sqrt[678]{5345}}{2} + \frac{\sqrt{3} \sqrt[678]{5345} i}{2}$$
       678______    / pi\     678______    / pi\
y7 = -  \/ 5345 *cos|---| - I* \/ 5345 *sin|---|
                    \339/                  \339/
$$y_{7} = - \sqrt[678]{5345} \cos{\left(\frac{\pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{\pi}{339} \right)}$$
       678______    / pi\     678______    / pi\
y8 = -  \/ 5345 *cos|---| + I* \/ 5345 *sin|---|
                    \339/                  \339/
$$y_{8} = - \sqrt[678]{5345} \cos{\left(\frac{\pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{\pi}{339} \right)}$$
     678______    / pi\     678______    / pi\
y9 =  \/ 5345 *cos|---| - I* \/ 5345 *sin|---|
                  \339/                  \339/
$$y_{9} = \sqrt[678]{5345} \cos{\left(\frac{\pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{\pi}{339} \right)}$$
      678______    / pi\     678______    / pi\
y10 =  \/ 5345 *cos|---| + I* \/ 5345 *sin|---|
                   \339/                  \339/
$$y_{10} = \sqrt[678]{5345} \cos{\left(\frac{\pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{\pi}{339} \right)}$$
        678______    /2*pi\     678______    /2*pi\
y11 = -  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                     \339 /                  \339 /
$$y_{11} = - \sqrt[678]{5345} \cos{\left(\frac{2 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{2 \pi}{339} \right)}$$
        678______    /2*pi\     678______    /2*pi\
y12 = -  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                     \339 /                  \339 /
$$y_{12} = - \sqrt[678]{5345} \cos{\left(\frac{2 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{2 \pi}{339} \right)}$$
      678______    /2*pi\     678______    /2*pi\
y13 =  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                   \339 /                  \339 /
$$y_{13} = \sqrt[678]{5345} \cos{\left(\frac{2 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{2 \pi}{339} \right)}$$
      678______    /2*pi\     678______    /2*pi\
y14 =  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                   \339 /                  \339 /
$$y_{14} = \sqrt[678]{5345} \cos{\left(\frac{2 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{2 \pi}{339} \right)}$$
        678______    / pi\     678______    / pi\
y15 = -  \/ 5345 *cos|---| - I* \/ 5345 *sin|---|
                     \113/                  \113/
$$y_{15} = - \sqrt[678]{5345} \cos{\left(\frac{\pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{\pi}{113} \right)}$$
        678______    / pi\     678______    / pi\
y16 = -  \/ 5345 *cos|---| + I* \/ 5345 *sin|---|
                     \113/                  \113/
$$y_{16} = - \sqrt[678]{5345} \cos{\left(\frac{\pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{\pi}{113} \right)}$$
      678______    / pi\     678______    / pi\
y17 =  \/ 5345 *cos|---| - I* \/ 5345 *sin|---|
                   \113/                  \113/
$$y_{17} = \sqrt[678]{5345} \cos{\left(\frac{\pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{\pi}{113} \right)}$$
      678______    / pi\     678______    / pi\
y18 =  \/ 5345 *cos|---| + I* \/ 5345 *sin|---|
                   \113/                  \113/
$$y_{18} = \sqrt[678]{5345} \cos{\left(\frac{\pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{\pi}{113} \right)}$$
        678______    /4*pi\     678______    /4*pi\
y19 = -  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                     \339 /                  \339 /
$$y_{19} = - \sqrt[678]{5345} \cos{\left(\frac{4 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{4 \pi}{339} \right)}$$
        678______    /4*pi\     678______    /4*pi\
y20 = -  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                     \339 /                  \339 /
$$y_{20} = - \sqrt[678]{5345} \cos{\left(\frac{4 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{4 \pi}{339} \right)}$$
      678______    /4*pi\     678______    /4*pi\
y21 =  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                   \339 /                  \339 /
$$y_{21} = \sqrt[678]{5345} \cos{\left(\frac{4 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{4 \pi}{339} \right)}$$
      678______    /4*pi\     678______    /4*pi\
y22 =  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                   \339 /                  \339 /
$$y_{22} = \sqrt[678]{5345} \cos{\left(\frac{4 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{4 \pi}{339} \right)}$$
        678______    /5*pi\     678______    /5*pi\
y23 = -  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                     \339 /                  \339 /
$$y_{23} = - \sqrt[678]{5345} \cos{\left(\frac{5 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{5 \pi}{339} \right)}$$
        678______    /5*pi\     678______    /5*pi\
y24 = -  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                     \339 /                  \339 /
$$y_{24} = - \sqrt[678]{5345} \cos{\left(\frac{5 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{5 \pi}{339} \right)}$$
      678______    /5*pi\     678______    /5*pi\
y25 =  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                   \339 /                  \339 /
$$y_{25} = \sqrt[678]{5345} \cos{\left(\frac{5 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{5 \pi}{339} \right)}$$
      678______    /5*pi\     678______    /5*pi\
y26 =  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                   \339 /                  \339 /
$$y_{26} = \sqrt[678]{5345} \cos{\left(\frac{5 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{5 \pi}{339} \right)}$$
        678______    /2*pi\     678______    /2*pi\
y27 = -  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                     \113 /                  \113 /
$$y_{27} = - \sqrt[678]{5345} \cos{\left(\frac{2 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{2 \pi}{113} \right)}$$
        678______    /2*pi\     678______    /2*pi\
y28 = -  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                     \113 /                  \113 /
$$y_{28} = - \sqrt[678]{5345} \cos{\left(\frac{2 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{2 \pi}{113} \right)}$$
      678______    /2*pi\     678______    /2*pi\
y29 =  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                   \113 /                  \113 /
$$y_{29} = \sqrt[678]{5345} \cos{\left(\frac{2 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{2 \pi}{113} \right)}$$
      678______    /2*pi\     678______    /2*pi\
y30 =  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                   \113 /                  \113 /
$$y_{30} = \sqrt[678]{5345} \cos{\left(\frac{2 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{2 \pi}{113} \right)}$$
        678______    /7*pi\     678______    /7*pi\
y31 = -  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                     \339 /                  \339 /
$$y_{31} = - \sqrt[678]{5345} \cos{\left(\frac{7 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{7 \pi}{339} \right)}$$
        678______    /7*pi\     678______    /7*pi\
y32 = -  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                     \339 /                  \339 /
$$y_{32} = - \sqrt[678]{5345} \cos{\left(\frac{7 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{7 \pi}{339} \right)}$$
      678______    /7*pi\     678______    /7*pi\
y33 =  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                   \339 /                  \339 /
$$y_{33} = \sqrt[678]{5345} \cos{\left(\frac{7 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{7 \pi}{339} \right)}$$
      678______    /7*pi\     678______    /7*pi\
y34 =  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                   \339 /                  \339 /
$$y_{34} = \sqrt[678]{5345} \cos{\left(\frac{7 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{7 \pi}{339} \right)}$$
        678______    /8*pi\     678______    /8*pi\
y35 = -  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                     \339 /                  \339 /
$$y_{35} = - \sqrt[678]{5345} \cos{\left(\frac{8 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{8 \pi}{339} \right)}$$
        678______    /8*pi\     678______    /8*pi\
y36 = -  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                     \339 /                  \339 /
$$y_{36} = - \sqrt[678]{5345} \cos{\left(\frac{8 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{8 \pi}{339} \right)}$$
      678______    /8*pi\     678______    /8*pi\
y37 =  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                   \339 /                  \339 /
$$y_{37} = \sqrt[678]{5345} \cos{\left(\frac{8 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{8 \pi}{339} \right)}$$
      678______    /8*pi\     678______    /8*pi\
y38 =  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                   \339 /                  \339 /
$$y_{38} = \sqrt[678]{5345} \cos{\left(\frac{8 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{8 \pi}{339} \right)}$$
        678______    /3*pi\     678______    /3*pi\
y39 = -  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                     \113 /                  \113 /
$$y_{39} = - \sqrt[678]{5345} \cos{\left(\frac{3 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{3 \pi}{113} \right)}$$
        678______    /3*pi\     678______    /3*pi\
y40 = -  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                     \113 /                  \113 /
$$y_{40} = - \sqrt[678]{5345} \cos{\left(\frac{3 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{3 \pi}{113} \right)}$$
      678______    /3*pi\     678______    /3*pi\
y41 =  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                   \113 /                  \113 /
$$y_{41} = \sqrt[678]{5345} \cos{\left(\frac{3 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{3 \pi}{113} \right)}$$
      678______    /3*pi\     678______    /3*pi\
y42 =  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                   \113 /                  \113 /
$$y_{42} = \sqrt[678]{5345} \cos{\left(\frac{3 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{3 \pi}{113} \right)}$$
        678______    /10*pi\     678______    /10*pi\
y43 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                     \ 339 /                  \ 339 /
$$y_{43} = - \sqrt[678]{5345} \cos{\left(\frac{10 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{10 \pi}{339} \right)}$$
        678______    /10*pi\     678______    /10*pi\
y44 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                     \ 339 /                  \ 339 /
$$y_{44} = - \sqrt[678]{5345} \cos{\left(\frac{10 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{10 \pi}{339} \right)}$$
      678______    /10*pi\     678______    /10*pi\
y45 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                   \ 339 /                  \ 339 /
$$y_{45} = \sqrt[678]{5345} \cos{\left(\frac{10 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{10 \pi}{339} \right)}$$
      678______    /10*pi\     678______    /10*pi\
y46 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                   \ 339 /                  \ 339 /
$$y_{46} = \sqrt[678]{5345} \cos{\left(\frac{10 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{10 \pi}{339} \right)}$$
        678______    /11*pi\     678______    /11*pi\
y47 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                     \ 339 /                  \ 339 /
$$y_{47} = - \sqrt[678]{5345} \cos{\left(\frac{11 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{11 \pi}{339} \right)}$$
        678______    /11*pi\     678______    /11*pi\
y48 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                     \ 339 /                  \ 339 /
$$y_{48} = - \sqrt[678]{5345} \cos{\left(\frac{11 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{11 \pi}{339} \right)}$$
      678______    /11*pi\     678______    /11*pi\
y49 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                   \ 339 /                  \ 339 /
$$y_{49} = \sqrt[678]{5345} \cos{\left(\frac{11 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{11 \pi}{339} \right)}$$
      678______    /11*pi\     678______    /11*pi\
y50 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                   \ 339 /                  \ 339 /
$$y_{50} = \sqrt[678]{5345} \cos{\left(\frac{11 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{11 \pi}{339} \right)}$$
        678______    /4*pi\     678______    /4*pi\
y51 = -  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                     \113 /                  \113 /
$$y_{51} = - \sqrt[678]{5345} \cos{\left(\frac{4 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{4 \pi}{113} \right)}$$
        678______    /4*pi\     678______    /4*pi\
y52 = -  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                     \113 /                  \113 /
$$y_{52} = - \sqrt[678]{5345} \cos{\left(\frac{4 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{4 \pi}{113} \right)}$$
      678______    /4*pi\     678______    /4*pi\
y53 =  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                   \113 /                  \113 /
$$y_{53} = \sqrt[678]{5345} \cos{\left(\frac{4 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{4 \pi}{113} \right)}$$
      678______    /4*pi\     678______    /4*pi\
y54 =  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                   \113 /                  \113 /
$$y_{54} = \sqrt[678]{5345} \cos{\left(\frac{4 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{4 \pi}{113} \right)}$$
        678______    /13*pi\     678______    /13*pi\
y55 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                     \ 339 /                  \ 339 /
$$y_{55} = - \sqrt[678]{5345} \cos{\left(\frac{13 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{13 \pi}{339} \right)}$$
        678______    /13*pi\     678______    /13*pi\
y56 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                     \ 339 /                  \ 339 /
$$y_{56} = - \sqrt[678]{5345} \cos{\left(\frac{13 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{13 \pi}{339} \right)}$$
      678______    /13*pi\     678______    /13*pi\
y57 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                   \ 339 /                  \ 339 /
$$y_{57} = \sqrt[678]{5345} \cos{\left(\frac{13 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{13 \pi}{339} \right)}$$
      678______    /13*pi\     678______    /13*pi\
y58 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                   \ 339 /                  \ 339 /
$$y_{58} = \sqrt[678]{5345} \cos{\left(\frac{13 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{13 \pi}{339} \right)}$$
        678______    /14*pi\     678______    /14*pi\
y59 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                     \ 339 /                  \ 339 /
$$y_{59} = - \sqrt[678]{5345} \cos{\left(\frac{14 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{14 \pi}{339} \right)}$$
        678______    /14*pi\     678______    /14*pi\
y60 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                     \ 339 /                  \ 339 /
$$y_{60} = - \sqrt[678]{5345} \cos{\left(\frac{14 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{14 \pi}{339} \right)}$$
      678______    /14*pi\     678______    /14*pi\
y61 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                   \ 339 /                  \ 339 /
$$y_{61} = \sqrt[678]{5345} \cos{\left(\frac{14 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{14 \pi}{339} \right)}$$
      678______    /14*pi\     678______    /14*pi\
y62 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                   \ 339 /                  \ 339 /
$$y_{62} = \sqrt[678]{5345} \cos{\left(\frac{14 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{14 \pi}{339} \right)}$$
        678______    /5*pi\     678______    /5*pi\
y63 = -  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                     \113 /                  \113 /
$$y_{63} = - \sqrt[678]{5345} \cos{\left(\frac{5 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{5 \pi}{113} \right)}$$
        678______    /5*pi\     678______    /5*pi\
y64 = -  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                     \113 /                  \113 /
$$y_{64} = - \sqrt[678]{5345} \cos{\left(\frac{5 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{5 \pi}{113} \right)}$$
      678______    /5*pi\     678______    /5*pi\
y65 =  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                   \113 /                  \113 /
$$y_{65} = \sqrt[678]{5345} \cos{\left(\frac{5 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{5 \pi}{113} \right)}$$
      678______    /5*pi\     678______    /5*pi\
y66 =  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                   \113 /                  \113 /
$$y_{66} = \sqrt[678]{5345} \cos{\left(\frac{5 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{5 \pi}{113} \right)}$$
        678______    /16*pi\     678______    /16*pi\
y67 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                     \ 339 /                  \ 339 /
$$y_{67} = - \sqrt[678]{5345} \cos{\left(\frac{16 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{16 \pi}{339} \right)}$$
        678______    /16*pi\     678______    /16*pi\
y68 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                     \ 339 /                  \ 339 /
$$y_{68} = - \sqrt[678]{5345} \cos{\left(\frac{16 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{16 \pi}{339} \right)}$$
      678______    /16*pi\     678______    /16*pi\
y69 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                   \ 339 /                  \ 339 /
$$y_{69} = \sqrt[678]{5345} \cos{\left(\frac{16 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{16 \pi}{339} \right)}$$
      678______    /16*pi\     678______    /16*pi\
y70 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                   \ 339 /                  \ 339 /
$$y_{70} = \sqrt[678]{5345} \cos{\left(\frac{16 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{16 \pi}{339} \right)}$$
        678______    /17*pi\     678______    /17*pi\
y71 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                     \ 339 /                  \ 339 /
$$y_{71} = - \sqrt[678]{5345} \cos{\left(\frac{17 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{17 \pi}{339} \right)}$$
        678______    /17*pi\     678______    /17*pi\
y72 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                     \ 339 /                  \ 339 /
$$y_{72} = - \sqrt[678]{5345} \cos{\left(\frac{17 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{17 \pi}{339} \right)}$$
      678______    /17*pi\     678______    /17*pi\
y73 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                   \ 339 /                  \ 339 /
$$y_{73} = \sqrt[678]{5345} \cos{\left(\frac{17 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{17 \pi}{339} \right)}$$
      678______    /17*pi\     678______    /17*pi\
y74 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                   \ 339 /                  \ 339 /
$$y_{74} = \sqrt[678]{5345} \cos{\left(\frac{17 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{17 \pi}{339} \right)}$$
        678______    /6*pi\     678______    /6*pi\
y75 = -  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                     \113 /                  \113 /
$$y_{75} = - \sqrt[678]{5345} \cos{\left(\frac{6 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{6 \pi}{113} \right)}$$
        678______    /6*pi\     678______    /6*pi\
y76 = -  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                     \113 /                  \113 /
$$y_{76} = - \sqrt[678]{5345} \cos{\left(\frac{6 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{6 \pi}{113} \right)}$$
      678______    /6*pi\     678______    /6*pi\
y77 =  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                   \113 /                  \113 /
$$y_{77} = \sqrt[678]{5345} \cos{\left(\frac{6 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{6 \pi}{113} \right)}$$
      678______    /6*pi\     678______    /6*pi\
y78 =  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                   \113 /                  \113 /
$$y_{78} = \sqrt[678]{5345} \cos{\left(\frac{6 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{6 \pi}{113} \right)}$$
        678______    /19*pi\     678______    /19*pi\
y79 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                     \ 339 /                  \ 339 /
$$y_{79} = - \sqrt[678]{5345} \cos{\left(\frac{19 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{19 \pi}{339} \right)}$$
        678______    /19*pi\     678______    /19*pi\
y80 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                     \ 339 /                  \ 339 /
$$y_{80} = - \sqrt[678]{5345} \cos{\left(\frac{19 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{19 \pi}{339} \right)}$$
      678______    /19*pi\     678______    /19*pi\
y81 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                   \ 339 /                  \ 339 /
$$y_{81} = \sqrt[678]{5345} \cos{\left(\frac{19 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{19 \pi}{339} \right)}$$
      678______    /19*pi\     678______    /19*pi\
y82 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                   \ 339 /                  \ 339 /
$$y_{82} = \sqrt[678]{5345} \cos{\left(\frac{19 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{19 \pi}{339} \right)}$$
        678______    /20*pi\     678______    /20*pi\
y83 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                     \ 339 /                  \ 339 /
$$y_{83} = - \sqrt[678]{5345} \cos{\left(\frac{20 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{20 \pi}{339} \right)}$$
        678______    /20*pi\     678______    /20*pi\
y84 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                     \ 339 /                  \ 339 /
$$y_{84} = - \sqrt[678]{5345} \cos{\left(\frac{20 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{20 \pi}{339} \right)}$$
      678______    /20*pi\     678______    /20*pi\
y85 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                   \ 339 /                  \ 339 /
$$y_{85} = \sqrt[678]{5345} \cos{\left(\frac{20 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{20 \pi}{339} \right)}$$
      678______    /20*pi\     678______    /20*pi\
y86 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                   \ 339 /                  \ 339 /
$$y_{86} = \sqrt[678]{5345} \cos{\left(\frac{20 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{20 \pi}{339} \right)}$$
        678______    /7*pi\     678______    /7*pi\
y87 = -  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                     \113 /                  \113 /
$$y_{87} = - \sqrt[678]{5345} \cos{\left(\frac{7 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{7 \pi}{113} \right)}$$
        678______    /7*pi\     678______    /7*pi\
y88 = -  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                     \113 /                  \113 /
$$y_{88} = - \sqrt[678]{5345} \cos{\left(\frac{7 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{7 \pi}{113} \right)}$$
      678______    /7*pi\     678______    /7*pi\
y89 =  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                   \113 /                  \113 /
$$y_{89} = \sqrt[678]{5345} \cos{\left(\frac{7 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{7 \pi}{113} \right)}$$
      678______    /7*pi\     678______    /7*pi\
y90 =  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                   \113 /                  \113 /
$$y_{90} = \sqrt[678]{5345} \cos{\left(\frac{7 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{7 \pi}{113} \right)}$$
        678______    /22*pi\     678______    /22*pi\
y91 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                     \ 339 /                  \ 339 /
$$y_{91} = - \sqrt[678]{5345} \cos{\left(\frac{22 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{22 \pi}{339} \right)}$$
        678______    /22*pi\     678______    /22*pi\
y92 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                     \ 339 /                  \ 339 /
$$y_{92} = - \sqrt[678]{5345} \cos{\left(\frac{22 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{22 \pi}{339} \right)}$$
      678______    /22*pi\     678______    /22*pi\
y93 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                   \ 339 /                  \ 339 /
$$y_{93} = \sqrt[678]{5345} \cos{\left(\frac{22 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{22 \pi}{339} \right)}$$
      678______    /22*pi\     678______    /22*pi\
y94 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                   \ 339 /                  \ 339 /
$$y_{94} = \sqrt[678]{5345} \cos{\left(\frac{22 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{22 \pi}{339} \right)}$$
        678______    /23*pi\     678______    /23*pi\
y95 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                     \ 339 /                  \ 339 /
$$y_{95} = - \sqrt[678]{5345} \cos{\left(\frac{23 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{23 \pi}{339} \right)}$$
        678______    /23*pi\     678______    /23*pi\
y96 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                     \ 339 /                  \ 339 /
$$y_{96} = - \sqrt[678]{5345} \cos{\left(\frac{23 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{23 \pi}{339} \right)}$$
      678______    /23*pi\     678______    /23*pi\
y97 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                   \ 339 /                  \ 339 /
$$y_{97} = \sqrt[678]{5345} \cos{\left(\frac{23 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{23 \pi}{339} \right)}$$
      678______    /23*pi\     678______    /23*pi\
y98 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                   \ 339 /                  \ 339 /
$$y_{98} = \sqrt[678]{5345} \cos{\left(\frac{23 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{23 \pi}{339} \right)}$$
        678______    /8*pi\     678______    /8*pi\
y99 = -  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                     \113 /                  \113 /
$$y_{99} = - \sqrt[678]{5345} \cos{\left(\frac{8 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{8 \pi}{113} \right)}$$
         678______    /8*pi\     678______    /8*pi\
y100 = -  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                      \113 /                  \113 /
$$y_{100} = - \sqrt[678]{5345} \cos{\left(\frac{8 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{8 \pi}{113} \right)}$$
       678______    /8*pi\     678______    /8*pi\
y101 =  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                    \113 /                  \113 /
$$y_{101} = \sqrt[678]{5345} \cos{\left(\frac{8 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{8 \pi}{113} \right)}$$
       678______    /8*pi\     678______    /8*pi\
y102 =  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                    \113 /                  \113 /
$$y_{102} = \sqrt[678]{5345} \cos{\left(\frac{8 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{8 \pi}{113} \right)}$$
         678______    /25*pi\     678______    /25*pi\
y103 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{103} = - \sqrt[678]{5345} \cos{\left(\frac{25 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{25 \pi}{339} \right)}$$
         678______    /25*pi\     678______    /25*pi\
y104 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{104} = - \sqrt[678]{5345} \cos{\left(\frac{25 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{25 \pi}{339} \right)}$$
       678______    /25*pi\     678______    /25*pi\
y105 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{105} = \sqrt[678]{5345} \cos{\left(\frac{25 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{25 \pi}{339} \right)}$$
       678______    /25*pi\     678______    /25*pi\
y106 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{106} = \sqrt[678]{5345} \cos{\left(\frac{25 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{25 \pi}{339} \right)}$$
         678______    /26*pi\     678______    /26*pi\
y107 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{107} = - \sqrt[678]{5345} \cos{\left(\frac{26 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{26 \pi}{339} \right)}$$
         678______    /26*pi\     678______    /26*pi\
y108 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{108} = - \sqrt[678]{5345} \cos{\left(\frac{26 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{26 \pi}{339} \right)}$$
       678______    /26*pi\     678______    /26*pi\
y109 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{109} = \sqrt[678]{5345} \cos{\left(\frac{26 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{26 \pi}{339} \right)}$$
       678______    /26*pi\     678______    /26*pi\
y110 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{110} = \sqrt[678]{5345} \cos{\left(\frac{26 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{26 \pi}{339} \right)}$$
         678______    /9*pi\     678______    /9*pi\
y111 = -  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                      \113 /                  \113 /
$$y_{111} = - \sqrt[678]{5345} \cos{\left(\frac{9 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{9 \pi}{113} \right)}$$
         678______    /9*pi\     678______    /9*pi\
y112 = -  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                      \113 /                  \113 /
$$y_{112} = - \sqrt[678]{5345} \cos{\left(\frac{9 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{9 \pi}{113} \right)}$$
       678______    /9*pi\     678______    /9*pi\
y113 =  \/ 5345 *cos|----| - I* \/ 5345 *sin|----|
                    \113 /                  \113 /
$$y_{113} = \sqrt[678]{5345} \cos{\left(\frac{9 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{9 \pi}{113} \right)}$$
       678______    /9*pi\     678______    /9*pi\
y114 =  \/ 5345 *cos|----| + I* \/ 5345 *sin|----|
                    \113 /                  \113 /
$$y_{114} = \sqrt[678]{5345} \cos{\left(\frac{9 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{9 \pi}{113} \right)}$$
         678______    /28*pi\     678______    /28*pi\
y115 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{115} = - \sqrt[678]{5345} \cos{\left(\frac{28 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{28 \pi}{339} \right)}$$
         678______    /28*pi\     678______    /28*pi\
y116 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{116} = - \sqrt[678]{5345} \cos{\left(\frac{28 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{28 \pi}{339} \right)}$$
       678______    /28*pi\     678______    /28*pi\
y117 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{117} = \sqrt[678]{5345} \cos{\left(\frac{28 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{28 \pi}{339} \right)}$$
       678______    /28*pi\     678______    /28*pi\
y118 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{118} = \sqrt[678]{5345} \cos{\left(\frac{28 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{28 \pi}{339} \right)}$$
         678______    /29*pi\     678______    /29*pi\
y119 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{119} = - \sqrt[678]{5345} \cos{\left(\frac{29 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{29 \pi}{339} \right)}$$
         678______    /29*pi\     678______    /29*pi\
y120 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{120} = - \sqrt[678]{5345} \cos{\left(\frac{29 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{29 \pi}{339} \right)}$$
       678______    /29*pi\     678______    /29*pi\
y121 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{121} = \sqrt[678]{5345} \cos{\left(\frac{29 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{29 \pi}{339} \right)}$$
       678______    /29*pi\     678______    /29*pi\
y122 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{122} = \sqrt[678]{5345} \cos{\left(\frac{29 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{29 \pi}{339} \right)}$$
         678______    /10*pi\     678______    /10*pi\
y123 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{123} = - \sqrt[678]{5345} \cos{\left(\frac{10 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{10 \pi}{113} \right)}$$
         678______    /10*pi\     678______    /10*pi\
y124 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{124} = - \sqrt[678]{5345} \cos{\left(\frac{10 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{10 \pi}{113} \right)}$$
       678______    /10*pi\     678______    /10*pi\
y125 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{125} = \sqrt[678]{5345} \cos{\left(\frac{10 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{10 \pi}{113} \right)}$$
       678______    /10*pi\     678______    /10*pi\
y126 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{126} = \sqrt[678]{5345} \cos{\left(\frac{10 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{10 \pi}{113} \right)}$$
         678______    /31*pi\     678______    /31*pi\
y127 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{127} = - \sqrt[678]{5345} \cos{\left(\frac{31 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{31 \pi}{339} \right)}$$
         678______    /31*pi\     678______    /31*pi\
y128 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{128} = - \sqrt[678]{5345} \cos{\left(\frac{31 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{31 \pi}{339} \right)}$$
       678______    /31*pi\     678______    /31*pi\
y129 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{129} = \sqrt[678]{5345} \cos{\left(\frac{31 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{31 \pi}{339} \right)}$$
       678______    /31*pi\     678______    /31*pi\
y130 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{130} = \sqrt[678]{5345} \cos{\left(\frac{31 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{31 \pi}{339} \right)}$$
         678______    /32*pi\     678______    /32*pi\
y131 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{131} = - \sqrt[678]{5345} \cos{\left(\frac{32 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{32 \pi}{339} \right)}$$
         678______    /32*pi\     678______    /32*pi\
y132 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{132} = - \sqrt[678]{5345} \cos{\left(\frac{32 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{32 \pi}{339} \right)}$$
       678______    /32*pi\     678______    /32*pi\
y133 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{133} = \sqrt[678]{5345} \cos{\left(\frac{32 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{32 \pi}{339} \right)}$$
       678______    /32*pi\     678______    /32*pi\
y134 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{134} = \sqrt[678]{5345} \cos{\left(\frac{32 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{32 \pi}{339} \right)}$$
         678______    /11*pi\     678______    /11*pi\
y135 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{135} = - \sqrt[678]{5345} \cos{\left(\frac{11 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{11 \pi}{113} \right)}$$
         678______    /11*pi\     678______    /11*pi\
y136 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{136} = - \sqrt[678]{5345} \cos{\left(\frac{11 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{11 \pi}{113} \right)}$$
       678______    /11*pi\     678______    /11*pi\
y137 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{137} = \sqrt[678]{5345} \cos{\left(\frac{11 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{11 \pi}{113} \right)}$$
       678______    /11*pi\     678______    /11*pi\
y138 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{138} = \sqrt[678]{5345} \cos{\left(\frac{11 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{11 \pi}{113} \right)}$$
         678______    /34*pi\     678______    /34*pi\
y139 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{139} = - \sqrt[678]{5345} \cos{\left(\frac{34 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{34 \pi}{339} \right)}$$
         678______    /34*pi\     678______    /34*pi\
y140 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{140} = - \sqrt[678]{5345} \cos{\left(\frac{34 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{34 \pi}{339} \right)}$$
       678______    /34*pi\     678______    /34*pi\
y141 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{141} = \sqrt[678]{5345} \cos{\left(\frac{34 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{34 \pi}{339} \right)}$$
       678______    /34*pi\     678______    /34*pi\
y142 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{142} = \sqrt[678]{5345} \cos{\left(\frac{34 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{34 \pi}{339} \right)}$$
         678______    /35*pi\     678______    /35*pi\
y143 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{143} = - \sqrt[678]{5345} \cos{\left(\frac{35 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{35 \pi}{339} \right)}$$
         678______    /35*pi\     678______    /35*pi\
y144 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{144} = - \sqrt[678]{5345} \cos{\left(\frac{35 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{35 \pi}{339} \right)}$$
       678______    /35*pi\     678______    /35*pi\
y145 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{145} = \sqrt[678]{5345} \cos{\left(\frac{35 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{35 \pi}{339} \right)}$$
       678______    /35*pi\     678______    /35*pi\
y146 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{146} = \sqrt[678]{5345} \cos{\left(\frac{35 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{35 \pi}{339} \right)}$$
         678______    /12*pi\     678______    /12*pi\
y147 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{147} = - \sqrt[678]{5345} \cos{\left(\frac{12 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{12 \pi}{113} \right)}$$
         678______    /12*pi\     678______    /12*pi\
y148 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{148} = - \sqrt[678]{5345} \cos{\left(\frac{12 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{12 \pi}{113} \right)}$$
       678______    /12*pi\     678______    /12*pi\
y149 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{149} = \sqrt[678]{5345} \cos{\left(\frac{12 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{12 \pi}{113} \right)}$$
       678______    /12*pi\     678______    /12*pi\
y150 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{150} = \sqrt[678]{5345} \cos{\left(\frac{12 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{12 \pi}{113} \right)}$$
         678______    /37*pi\     678______    /37*pi\
y151 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{151} = - \sqrt[678]{5345} \cos{\left(\frac{37 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{37 \pi}{339} \right)}$$
         678______    /37*pi\     678______    /37*pi\
y152 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{152} = - \sqrt[678]{5345} \cos{\left(\frac{37 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{37 \pi}{339} \right)}$$
       678______    /37*pi\     678______    /37*pi\
y153 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{153} = \sqrt[678]{5345} \cos{\left(\frac{37 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{37 \pi}{339} \right)}$$
       678______    /37*pi\     678______    /37*pi\
y154 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{154} = \sqrt[678]{5345} \cos{\left(\frac{37 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{37 \pi}{339} \right)}$$
         678______    /38*pi\     678______    /38*pi\
y155 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{155} = - \sqrt[678]{5345} \cos{\left(\frac{38 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{38 \pi}{339} \right)}$$
         678______    /38*pi\     678______    /38*pi\
y156 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{156} = - \sqrt[678]{5345} \cos{\left(\frac{38 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{38 \pi}{339} \right)}$$
       678______    /38*pi\     678______    /38*pi\
y157 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{157} = \sqrt[678]{5345} \cos{\left(\frac{38 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{38 \pi}{339} \right)}$$
       678______    /38*pi\     678______    /38*pi\
y158 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{158} = \sqrt[678]{5345} \cos{\left(\frac{38 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{38 \pi}{339} \right)}$$
         678______    /13*pi\     678______    /13*pi\
y159 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{159} = - \sqrt[678]{5345} \cos{\left(\frac{13 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{13 \pi}{113} \right)}$$
         678______    /13*pi\     678______    /13*pi\
y160 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{160} = - \sqrt[678]{5345} \cos{\left(\frac{13 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{13 \pi}{113} \right)}$$
       678______    /13*pi\     678______    /13*pi\
y161 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{161} = \sqrt[678]{5345} \cos{\left(\frac{13 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{13 \pi}{113} \right)}$$
       678______    /13*pi\     678______    /13*pi\
y162 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{162} = \sqrt[678]{5345} \cos{\left(\frac{13 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{13 \pi}{113} \right)}$$
         678______    /40*pi\     678______    /40*pi\
y163 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{163} = - \sqrt[678]{5345} \cos{\left(\frac{40 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{40 \pi}{339} \right)}$$
         678______    /40*pi\     678______    /40*pi\
y164 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{164} = - \sqrt[678]{5345} \cos{\left(\frac{40 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{40 \pi}{339} \right)}$$
       678______    /40*pi\     678______    /40*pi\
y165 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{165} = \sqrt[678]{5345} \cos{\left(\frac{40 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{40 \pi}{339} \right)}$$
       678______    /40*pi\     678______    /40*pi\
y166 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{166} = \sqrt[678]{5345} \cos{\left(\frac{40 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{40 \pi}{339} \right)}$$
         678______    /41*pi\     678______    /41*pi\
y167 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{167} = - \sqrt[678]{5345} \cos{\left(\frac{41 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{41 \pi}{339} \right)}$$
         678______    /41*pi\     678______    /41*pi\
y168 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{168} = - \sqrt[678]{5345} \cos{\left(\frac{41 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{41 \pi}{339} \right)}$$
       678______    /41*pi\     678______    /41*pi\
y169 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{169} = \sqrt[678]{5345} \cos{\left(\frac{41 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{41 \pi}{339} \right)}$$
       678______    /41*pi\     678______    /41*pi\
y170 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{170} = \sqrt[678]{5345} \cos{\left(\frac{41 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{41 \pi}{339} \right)}$$
         678______    /14*pi\     678______    /14*pi\
y171 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{171} = - \sqrt[678]{5345} \cos{\left(\frac{14 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{14 \pi}{113} \right)}$$
         678______    /14*pi\     678______    /14*pi\
y172 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{172} = - \sqrt[678]{5345} \cos{\left(\frac{14 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{14 \pi}{113} \right)}$$
       678______    /14*pi\     678______    /14*pi\
y173 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{173} = \sqrt[678]{5345} \cos{\left(\frac{14 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{14 \pi}{113} \right)}$$
       678______    /14*pi\     678______    /14*pi\
y174 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{174} = \sqrt[678]{5345} \cos{\left(\frac{14 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{14 \pi}{113} \right)}$$
         678______    /43*pi\     678______    /43*pi\
y175 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{175} = - \sqrt[678]{5345} \cos{\left(\frac{43 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{43 \pi}{339} \right)}$$
         678______    /43*pi\     678______    /43*pi\
y176 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{176} = - \sqrt[678]{5345} \cos{\left(\frac{43 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{43 \pi}{339} \right)}$$
       678______    /43*pi\     678______    /43*pi\
y177 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{177} = \sqrt[678]{5345} \cos{\left(\frac{43 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{43 \pi}{339} \right)}$$
       678______    /43*pi\     678______    /43*pi\
y178 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{178} = \sqrt[678]{5345} \cos{\left(\frac{43 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{43 \pi}{339} \right)}$$
         678______    /44*pi\     678______    /44*pi\
y179 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{179} = - \sqrt[678]{5345} \cos{\left(\frac{44 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{44 \pi}{339} \right)}$$
         678______    /44*pi\     678______    /44*pi\
y180 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{180} = - \sqrt[678]{5345} \cos{\left(\frac{44 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{44 \pi}{339} \right)}$$
       678______    /44*pi\     678______    /44*pi\
y181 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{181} = \sqrt[678]{5345} \cos{\left(\frac{44 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{44 \pi}{339} \right)}$$
       678______    /44*pi\     678______    /44*pi\
y182 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{182} = \sqrt[678]{5345} \cos{\left(\frac{44 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{44 \pi}{339} \right)}$$
         678______    /15*pi\     678______    /15*pi\
y183 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{183} = - \sqrt[678]{5345} \cos{\left(\frac{15 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{15 \pi}{113} \right)}$$
         678______    /15*pi\     678______    /15*pi\
y184 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{184} = - \sqrt[678]{5345} \cos{\left(\frac{15 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{15 \pi}{113} \right)}$$
       678______    /15*pi\     678______    /15*pi\
y185 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{185} = \sqrt[678]{5345} \cos{\left(\frac{15 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{15 \pi}{113} \right)}$$
       678______    /15*pi\     678______    /15*pi\
y186 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{186} = \sqrt[678]{5345} \cos{\left(\frac{15 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{15 \pi}{113} \right)}$$
         678______    /46*pi\     678______    /46*pi\
y187 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{187} = - \sqrt[678]{5345} \cos{\left(\frac{46 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{46 \pi}{339} \right)}$$
         678______    /46*pi\     678______    /46*pi\
y188 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{188} = - \sqrt[678]{5345} \cos{\left(\frac{46 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{46 \pi}{339} \right)}$$
       678______    /46*pi\     678______    /46*pi\
y189 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{189} = \sqrt[678]{5345} \cos{\left(\frac{46 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{46 \pi}{339} \right)}$$
       678______    /46*pi\     678______    /46*pi\
y190 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{190} = \sqrt[678]{5345} \cos{\left(\frac{46 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{46 \pi}{339} \right)}$$
         678______    /47*pi\     678______    /47*pi\
y191 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{191} = - \sqrt[678]{5345} \cos{\left(\frac{47 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{47 \pi}{339} \right)}$$
         678______    /47*pi\     678______    /47*pi\
y192 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{192} = - \sqrt[678]{5345} \cos{\left(\frac{47 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{47 \pi}{339} \right)}$$
       678______    /47*pi\     678______    /47*pi\
y193 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{193} = \sqrt[678]{5345} \cos{\left(\frac{47 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{47 \pi}{339} \right)}$$
       678______    /47*pi\     678______    /47*pi\
y194 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{194} = \sqrt[678]{5345} \cos{\left(\frac{47 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{47 \pi}{339} \right)}$$
         678______    /16*pi\     678______    /16*pi\
y195 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{195} = - \sqrt[678]{5345} \cos{\left(\frac{16 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{16 \pi}{113} \right)}$$
         678______    /16*pi\     678______    /16*pi\
y196 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{196} = - \sqrt[678]{5345} \cos{\left(\frac{16 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{16 \pi}{113} \right)}$$
       678______    /16*pi\     678______    /16*pi\
y197 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{197} = \sqrt[678]{5345} \cos{\left(\frac{16 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{16 \pi}{113} \right)}$$
       678______    /16*pi\     678______    /16*pi\
y198 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{198} = \sqrt[678]{5345} \cos{\left(\frac{16 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{16 \pi}{113} \right)}$$
         678______    /49*pi\     678______    /49*pi\
y199 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{199} = - \sqrt[678]{5345} \cos{\left(\frac{49 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{49 \pi}{339} \right)}$$
         678______    /49*pi\     678______    /49*pi\
y200 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{200} = - \sqrt[678]{5345} \cos{\left(\frac{49 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{49 \pi}{339} \right)}$$
       678______    /49*pi\     678______    /49*pi\
y201 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{201} = \sqrt[678]{5345} \cos{\left(\frac{49 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{49 \pi}{339} \right)}$$
       678______    /49*pi\     678______    /49*pi\
y202 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{202} = \sqrt[678]{5345} \cos{\left(\frac{49 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{49 \pi}{339} \right)}$$
         678______    /50*pi\     678______    /50*pi\
y203 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{203} = - \sqrt[678]{5345} \cos{\left(\frac{50 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{50 \pi}{339} \right)}$$
         678______    /50*pi\     678______    /50*pi\
y204 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{204} = - \sqrt[678]{5345} \cos{\left(\frac{50 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{50 \pi}{339} \right)}$$
       678______    /50*pi\     678______    /50*pi\
y205 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{205} = \sqrt[678]{5345} \cos{\left(\frac{50 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{50 \pi}{339} \right)}$$
       678______    /50*pi\     678______    /50*pi\
y206 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{206} = \sqrt[678]{5345} \cos{\left(\frac{50 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{50 \pi}{339} \right)}$$
         678______    /17*pi\     678______    /17*pi\
y207 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{207} = - \sqrt[678]{5345} \cos{\left(\frac{17 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{17 \pi}{113} \right)}$$
         678______    /17*pi\     678______    /17*pi\
y208 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{208} = - \sqrt[678]{5345} \cos{\left(\frac{17 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{17 \pi}{113} \right)}$$
       678______    /17*pi\     678______    /17*pi\
y209 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{209} = \sqrt[678]{5345} \cos{\left(\frac{17 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{17 \pi}{113} \right)}$$
       678______    /17*pi\     678______    /17*pi\
y210 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{210} = \sqrt[678]{5345} \cos{\left(\frac{17 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{17 \pi}{113} \right)}$$
         678______    /52*pi\     678______    /52*pi\
y211 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{211} = - \sqrt[678]{5345} \cos{\left(\frac{52 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{52 \pi}{339} \right)}$$
         678______    /52*pi\     678______    /52*pi\
y212 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{212} = - \sqrt[678]{5345} \cos{\left(\frac{52 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{52 \pi}{339} \right)}$$
       678______    /52*pi\     678______    /52*pi\
y213 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{213} = \sqrt[678]{5345} \cos{\left(\frac{52 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{52 \pi}{339} \right)}$$
       678______    /52*pi\     678______    /52*pi\
y214 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{214} = \sqrt[678]{5345} \cos{\left(\frac{52 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{52 \pi}{339} \right)}$$
         678______    /53*pi\     678______    /53*pi\
y215 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{215} = - \sqrt[678]{5345} \cos{\left(\frac{53 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{53 \pi}{339} \right)}$$
         678______    /53*pi\     678______    /53*pi\
y216 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{216} = - \sqrt[678]{5345} \cos{\left(\frac{53 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{53 \pi}{339} \right)}$$
       678______    /53*pi\     678______    /53*pi\
y217 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{217} = \sqrt[678]{5345} \cos{\left(\frac{53 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{53 \pi}{339} \right)}$$
       678______    /53*pi\     678______    /53*pi\
y218 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{218} = \sqrt[678]{5345} \cos{\left(\frac{53 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{53 \pi}{339} \right)}$$
         678______    /18*pi\     678______    /18*pi\
y219 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{219} = - \sqrt[678]{5345} \cos{\left(\frac{18 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{18 \pi}{113} \right)}$$
         678______    /18*pi\     678______    /18*pi\
y220 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{220} = - \sqrt[678]{5345} \cos{\left(\frac{18 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{18 \pi}{113} \right)}$$
       678______    /18*pi\     678______    /18*pi\
y221 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{221} = \sqrt[678]{5345} \cos{\left(\frac{18 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{18 \pi}{113} \right)}$$
       678______    /18*pi\     678______    /18*pi\
y222 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{222} = \sqrt[678]{5345} \cos{\left(\frac{18 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{18 \pi}{113} \right)}$$
         678______    /55*pi\     678______    /55*pi\
y223 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{223} = - \sqrt[678]{5345} \cos{\left(\frac{55 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{55 \pi}{339} \right)}$$
         678______    /55*pi\     678______    /55*pi\
y224 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{224} = - \sqrt[678]{5345} \cos{\left(\frac{55 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{55 \pi}{339} \right)}$$
       678______    /55*pi\     678______    /55*pi\
y225 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{225} = \sqrt[678]{5345} \cos{\left(\frac{55 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{55 \pi}{339} \right)}$$
       678______    /55*pi\     678______    /55*pi\
y226 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{226} = \sqrt[678]{5345} \cos{\left(\frac{55 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{55 \pi}{339} \right)}$$
         678______    /56*pi\     678______    /56*pi\
y227 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{227} = - \sqrt[678]{5345} \cos{\left(\frac{56 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{56 \pi}{339} \right)}$$
         678______    /56*pi\     678______    /56*pi\
y228 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{228} = - \sqrt[678]{5345} \cos{\left(\frac{56 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{56 \pi}{339} \right)}$$
       678______    /56*pi\     678______    /56*pi\
y229 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{229} = \sqrt[678]{5345} \cos{\left(\frac{56 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{56 \pi}{339} \right)}$$
       678______    /56*pi\     678______    /56*pi\
y230 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{230} = \sqrt[678]{5345} \cos{\left(\frac{56 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{56 \pi}{339} \right)}$$
         678______    /19*pi\     678______    /19*pi\
y231 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{231} = - \sqrt[678]{5345} \cos{\left(\frac{19 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{19 \pi}{113} \right)}$$
         678______    /19*pi\     678______    /19*pi\
y232 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{232} = - \sqrt[678]{5345} \cos{\left(\frac{19 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{19 \pi}{113} \right)}$$
       678______    /19*pi\     678______    /19*pi\
y233 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{233} = \sqrt[678]{5345} \cos{\left(\frac{19 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{19 \pi}{113} \right)}$$
       678______    /19*pi\     678______    /19*pi\
y234 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{234} = \sqrt[678]{5345} \cos{\left(\frac{19 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{19 \pi}{113} \right)}$$
         678______    /58*pi\     678______    /58*pi\
y235 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{235} = - \sqrt[678]{5345} \cos{\left(\frac{58 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{58 \pi}{339} \right)}$$
         678______    /58*pi\     678______    /58*pi\
y236 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{236} = - \sqrt[678]{5345} \cos{\left(\frac{58 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{58 \pi}{339} \right)}$$
       678______    /58*pi\     678______    /58*pi\
y237 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{237} = \sqrt[678]{5345} \cos{\left(\frac{58 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{58 \pi}{339} \right)}$$
       678______    /58*pi\     678______    /58*pi\
y238 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{238} = \sqrt[678]{5345} \cos{\left(\frac{58 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{58 \pi}{339} \right)}$$
         678______    /59*pi\     678______    /59*pi\
y239 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{239} = - \sqrt[678]{5345} \cos{\left(\frac{59 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{59 \pi}{339} \right)}$$
         678______    /59*pi\     678______    /59*pi\
y240 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{240} = - \sqrt[678]{5345} \cos{\left(\frac{59 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{59 \pi}{339} \right)}$$
       678______    /59*pi\     678______    /59*pi\
y241 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{241} = \sqrt[678]{5345} \cos{\left(\frac{59 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{59 \pi}{339} \right)}$$
       678______    /59*pi\     678______    /59*pi\
y242 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{242} = \sqrt[678]{5345} \cos{\left(\frac{59 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{59 \pi}{339} \right)}$$
         678______    /20*pi\     678______    /20*pi\
y243 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{243} = - \sqrt[678]{5345} \cos{\left(\frac{20 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{20 \pi}{113} \right)}$$
         678______    /20*pi\     678______    /20*pi\
y244 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{244} = - \sqrt[678]{5345} \cos{\left(\frac{20 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{20 \pi}{113} \right)}$$
       678______    /20*pi\     678______    /20*pi\
y245 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{245} = \sqrt[678]{5345} \cos{\left(\frac{20 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{20 \pi}{113} \right)}$$
       678______    /20*pi\     678______    /20*pi\
y246 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{246} = \sqrt[678]{5345} \cos{\left(\frac{20 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{20 \pi}{113} \right)}$$
         678______    /61*pi\     678______    /61*pi\
y247 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{247} = - \sqrt[678]{5345} \cos{\left(\frac{61 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{61 \pi}{339} \right)}$$
         678______    /61*pi\     678______    /61*pi\
y248 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{248} = - \sqrt[678]{5345} \cos{\left(\frac{61 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{61 \pi}{339} \right)}$$
       678______    /61*pi\     678______    /61*pi\
y249 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{249} = \sqrt[678]{5345} \cos{\left(\frac{61 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{61 \pi}{339} \right)}$$
       678______    /61*pi\     678______    /61*pi\
y250 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{250} = \sqrt[678]{5345} \cos{\left(\frac{61 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{61 \pi}{339} \right)}$$
         678______    /62*pi\     678______    /62*pi\
y251 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{251} = - \sqrt[678]{5345} \cos{\left(\frac{62 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{62 \pi}{339} \right)}$$
         678______    /62*pi\     678______    /62*pi\
y252 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{252} = - \sqrt[678]{5345} \cos{\left(\frac{62 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{62 \pi}{339} \right)}$$
       678______    /62*pi\     678______    /62*pi\
y253 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{253} = \sqrt[678]{5345} \cos{\left(\frac{62 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{62 \pi}{339} \right)}$$
       678______    /62*pi\     678______    /62*pi\
y254 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{254} = \sqrt[678]{5345} \cos{\left(\frac{62 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{62 \pi}{339} \right)}$$
         678______    /21*pi\     678______    /21*pi\
y255 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{255} = - \sqrt[678]{5345} \cos{\left(\frac{21 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{21 \pi}{113} \right)}$$
         678______    /21*pi\     678______    /21*pi\
y256 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{256} = - \sqrt[678]{5345} \cos{\left(\frac{21 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{21 \pi}{113} \right)}$$
       678______    /21*pi\     678______    /21*pi\
y257 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{257} = \sqrt[678]{5345} \cos{\left(\frac{21 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{21 \pi}{113} \right)}$$
       678______    /21*pi\     678______    /21*pi\
y258 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{258} = \sqrt[678]{5345} \cos{\left(\frac{21 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{21 \pi}{113} \right)}$$
         678______    /64*pi\     678______    /64*pi\
y259 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{259} = - \sqrt[678]{5345} \cos{\left(\frac{64 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{64 \pi}{339} \right)}$$
         678______    /64*pi\     678______    /64*pi\
y260 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{260} = - \sqrt[678]{5345} \cos{\left(\frac{64 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{64 \pi}{339} \right)}$$
       678______    /64*pi\     678______    /64*pi\
y261 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{261} = \sqrt[678]{5345} \cos{\left(\frac{64 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{64 \pi}{339} \right)}$$
       678______    /64*pi\     678______    /64*pi\
y262 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{262} = \sqrt[678]{5345} \cos{\left(\frac{64 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{64 \pi}{339} \right)}$$
         678______    /65*pi\     678______    /65*pi\
y263 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{263} = - \sqrt[678]{5345} \cos{\left(\frac{65 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{65 \pi}{339} \right)}$$
         678______    /65*pi\     678______    /65*pi\
y264 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{264} = - \sqrt[678]{5345} \cos{\left(\frac{65 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{65 \pi}{339} \right)}$$
       678______    /65*pi\     678______    /65*pi\
y265 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{265} = \sqrt[678]{5345} \cos{\left(\frac{65 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{65 \pi}{339} \right)}$$
       678______    /65*pi\     678______    /65*pi\
y266 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{266} = \sqrt[678]{5345} \cos{\left(\frac{65 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{65 \pi}{339} \right)}$$
         678______    /22*pi\     678______    /22*pi\
y267 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{267} = - \sqrt[678]{5345} \cos{\left(\frac{22 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{22 \pi}{113} \right)}$$
         678______    /22*pi\     678______    /22*pi\
y268 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{268} = - \sqrt[678]{5345} \cos{\left(\frac{22 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{22 \pi}{113} \right)}$$
       678______    /22*pi\     678______    /22*pi\
y269 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{269} = \sqrt[678]{5345} \cos{\left(\frac{22 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{22 \pi}{113} \right)}$$
       678______    /22*pi\     678______    /22*pi\
y270 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{270} = \sqrt[678]{5345} \cos{\left(\frac{22 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{22 \pi}{113} \right)}$$
         678______    /67*pi\     678______    /67*pi\
y271 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{271} = - \sqrt[678]{5345} \cos{\left(\frac{67 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{67 \pi}{339} \right)}$$
         678______    /67*pi\     678______    /67*pi\
y272 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{272} = - \sqrt[678]{5345} \cos{\left(\frac{67 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{67 \pi}{339} \right)}$$
       678______    /67*pi\     678______    /67*pi\
y273 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{273} = \sqrt[678]{5345} \cos{\left(\frac{67 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{67 \pi}{339} \right)}$$
       678______    /67*pi\     678______    /67*pi\
y274 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{274} = \sqrt[678]{5345} \cos{\left(\frac{67 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{67 \pi}{339} \right)}$$
         678______    /68*pi\     678______    /68*pi\
y275 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{275} = - \sqrt[678]{5345} \cos{\left(\frac{68 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{68 \pi}{339} \right)}$$
         678______    /68*pi\     678______    /68*pi\
y276 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{276} = - \sqrt[678]{5345} \cos{\left(\frac{68 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{68 \pi}{339} \right)}$$
       678______    /68*pi\     678______    /68*pi\
y277 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{277} = \sqrt[678]{5345} \cos{\left(\frac{68 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{68 \pi}{339} \right)}$$
       678______    /68*pi\     678______    /68*pi\
y278 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{278} = \sqrt[678]{5345} \cos{\left(\frac{68 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{68 \pi}{339} \right)}$$
         678______    /23*pi\     678______    /23*pi\
y279 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{279} = - \sqrt[678]{5345} \cos{\left(\frac{23 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{23 \pi}{113} \right)}$$
         678______    /23*pi\     678______    /23*pi\
y280 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{280} = - \sqrt[678]{5345} \cos{\left(\frac{23 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{23 \pi}{113} \right)}$$
       678______    /23*pi\     678______    /23*pi\
y281 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{281} = \sqrt[678]{5345} \cos{\left(\frac{23 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{23 \pi}{113} \right)}$$
       678______    /23*pi\     678______    /23*pi\
y282 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{282} = \sqrt[678]{5345} \cos{\left(\frac{23 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{23 \pi}{113} \right)}$$
         678______    /70*pi\     678______    /70*pi\
y283 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{283} = - \sqrt[678]{5345} \cos{\left(\frac{70 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{70 \pi}{339} \right)}$$
         678______    /70*pi\     678______    /70*pi\
y284 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{284} = - \sqrt[678]{5345} \cos{\left(\frac{70 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{70 \pi}{339} \right)}$$
       678______    /70*pi\     678______    /70*pi\
y285 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{285} = \sqrt[678]{5345} \cos{\left(\frac{70 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{70 \pi}{339} \right)}$$
       678______    /70*pi\     678______    /70*pi\
y286 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{286} = \sqrt[678]{5345} \cos{\left(\frac{70 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{70 \pi}{339} \right)}$$
         678______    /71*pi\     678______    /71*pi\
y287 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{287} = - \sqrt[678]{5345} \cos{\left(\frac{71 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{71 \pi}{339} \right)}$$
         678______    /71*pi\     678______    /71*pi\
y288 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{288} = - \sqrt[678]{5345} \cos{\left(\frac{71 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{71 \pi}{339} \right)}$$
       678______    /71*pi\     678______    /71*pi\
y289 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{289} = \sqrt[678]{5345} \cos{\left(\frac{71 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{71 \pi}{339} \right)}$$
       678______    /71*pi\     678______    /71*pi\
y290 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{290} = \sqrt[678]{5345} \cos{\left(\frac{71 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{71 \pi}{339} \right)}$$
         678______    /24*pi\     678______    /24*pi\
y291 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{291} = - \sqrt[678]{5345} \cos{\left(\frac{24 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{24 \pi}{113} \right)}$$
         678______    /24*pi\     678______    /24*pi\
y292 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{292} = - \sqrt[678]{5345} \cos{\left(\frac{24 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{24 \pi}{113} \right)}$$
       678______    /24*pi\     678______    /24*pi\
y293 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{293} = \sqrt[678]{5345} \cos{\left(\frac{24 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{24 \pi}{113} \right)}$$
       678______    /24*pi\     678______    /24*pi\
y294 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{294} = \sqrt[678]{5345} \cos{\left(\frac{24 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{24 \pi}{113} \right)}$$
         678______    /73*pi\     678______    /73*pi\
y295 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{295} = - \sqrt[678]{5345} \cos{\left(\frac{73 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{73 \pi}{339} \right)}$$
         678______    /73*pi\     678______    /73*pi\
y296 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{296} = - \sqrt[678]{5345} \cos{\left(\frac{73 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{73 \pi}{339} \right)}$$
       678______    /73*pi\     678______    /73*pi\
y297 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{297} = \sqrt[678]{5345} \cos{\left(\frac{73 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{73 \pi}{339} \right)}$$
       678______    /73*pi\     678______    /73*pi\
y298 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{298} = \sqrt[678]{5345} \cos{\left(\frac{73 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{73 \pi}{339} \right)}$$
         678______    /74*pi\     678______    /74*pi\
y299 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{299} = - \sqrt[678]{5345} \cos{\left(\frac{74 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{74 \pi}{339} \right)}$$
         678______    /74*pi\     678______    /74*pi\
y300 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{300} = - \sqrt[678]{5345} \cos{\left(\frac{74 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{74 \pi}{339} \right)}$$
       678______    /74*pi\     678______    /74*pi\
y301 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{301} = \sqrt[678]{5345} \cos{\left(\frac{74 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{74 \pi}{339} \right)}$$
       678______    /74*pi\     678______    /74*pi\
y302 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{302} = \sqrt[678]{5345} \cos{\left(\frac{74 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{74 \pi}{339} \right)}$$
         678______    /25*pi\     678______    /25*pi\
y303 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{303} = - \sqrt[678]{5345} \cos{\left(\frac{25 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{25 \pi}{113} \right)}$$
         678______    /25*pi\     678______    /25*pi\
y304 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{304} = - \sqrt[678]{5345} \cos{\left(\frac{25 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{25 \pi}{113} \right)}$$
       678______    /25*pi\     678______    /25*pi\
y305 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{305} = \sqrt[678]{5345} \cos{\left(\frac{25 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{25 \pi}{113} \right)}$$
       678______    /25*pi\     678______    /25*pi\
y306 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{306} = \sqrt[678]{5345} \cos{\left(\frac{25 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{25 \pi}{113} \right)}$$
         678______    /76*pi\     678______    /76*pi\
y307 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{307} = - \sqrt[678]{5345} \cos{\left(\frac{76 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{76 \pi}{339} \right)}$$
         678______    /76*pi\     678______    /76*pi\
y308 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{308} = - \sqrt[678]{5345} \cos{\left(\frac{76 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{76 \pi}{339} \right)}$$
       678______    /76*pi\     678______    /76*pi\
y309 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{309} = \sqrt[678]{5345} \cos{\left(\frac{76 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{76 \pi}{339} \right)}$$
       678______    /76*pi\     678______    /76*pi\
y310 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{310} = \sqrt[678]{5345} \cos{\left(\frac{76 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{76 \pi}{339} \right)}$$
         678______    /77*pi\     678______    /77*pi\
y311 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{311} = - \sqrt[678]{5345} \cos{\left(\frac{77 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{77 \pi}{339} \right)}$$
         678______    /77*pi\     678______    /77*pi\
y312 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{312} = - \sqrt[678]{5345} \cos{\left(\frac{77 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{77 \pi}{339} \right)}$$
       678______    /77*pi\     678______    /77*pi\
y313 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{313} = \sqrt[678]{5345} \cos{\left(\frac{77 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{77 \pi}{339} \right)}$$
       678______    /77*pi\     678______    /77*pi\
y314 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{314} = \sqrt[678]{5345} \cos{\left(\frac{77 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{77 \pi}{339} \right)}$$
         678______    /26*pi\     678______    /26*pi\
y315 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{315} = - \sqrt[678]{5345} \cos{\left(\frac{26 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{26 \pi}{113} \right)}$$
         678______    /26*pi\     678______    /26*pi\
y316 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{316} = - \sqrt[678]{5345} \cos{\left(\frac{26 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{26 \pi}{113} \right)}$$
       678______    /26*pi\     678______    /26*pi\
y317 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{317} = \sqrt[678]{5345} \cos{\left(\frac{26 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{26 \pi}{113} \right)}$$
       678______    /26*pi\     678______    /26*pi\
y318 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{318} = \sqrt[678]{5345} \cos{\left(\frac{26 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{26 \pi}{113} \right)}$$
         678______    /79*pi\     678______    /79*pi\
y319 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{319} = - \sqrt[678]{5345} \cos{\left(\frac{79 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{79 \pi}{339} \right)}$$
         678______    /79*pi\     678______    /79*pi\
y320 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{320} = - \sqrt[678]{5345} \cos{\left(\frac{79 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{79 \pi}{339} \right)}$$
       678______    /79*pi\     678______    /79*pi\
y321 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{321} = \sqrt[678]{5345} \cos{\left(\frac{79 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{79 \pi}{339} \right)}$$
       678______    /79*pi\     678______    /79*pi\
y322 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{322} = \sqrt[678]{5345} \cos{\left(\frac{79 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{79 \pi}{339} \right)}$$
         678______    /80*pi\     678______    /80*pi\
y323 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{323} = - \sqrt[678]{5345} \cos{\left(\frac{80 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{80 \pi}{339} \right)}$$
         678______    /80*pi\     678______    /80*pi\
y324 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{324} = - \sqrt[678]{5345} \cos{\left(\frac{80 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{80 \pi}{339} \right)}$$
       678______    /80*pi\     678______    /80*pi\
y325 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{325} = \sqrt[678]{5345} \cos{\left(\frac{80 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{80 \pi}{339} \right)}$$
       678______    /80*pi\     678______    /80*pi\
y326 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{326} = \sqrt[678]{5345} \cos{\left(\frac{80 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{80 \pi}{339} \right)}$$
         678______    /27*pi\     678______    /27*pi\
y327 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{327} = - \sqrt[678]{5345} \cos{\left(\frac{27 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{27 \pi}{113} \right)}$$
         678______    /27*pi\     678______    /27*pi\
y328 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{328} = - \sqrt[678]{5345} \cos{\left(\frac{27 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{27 \pi}{113} \right)}$$
       678______    /27*pi\     678______    /27*pi\
y329 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{329} = \sqrt[678]{5345} \cos{\left(\frac{27 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{27 \pi}{113} \right)}$$
       678______    /27*pi\     678______    /27*pi\
y330 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{330} = \sqrt[678]{5345} \cos{\left(\frac{27 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{27 \pi}{113} \right)}$$
         678______    /82*pi\     678______    /82*pi\
y331 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{331} = - \sqrt[678]{5345} \cos{\left(\frac{82 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{82 \pi}{339} \right)}$$
         678______    /82*pi\     678______    /82*pi\
y332 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{332} = - \sqrt[678]{5345} \cos{\left(\frac{82 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{82 \pi}{339} \right)}$$
       678______    /82*pi\     678______    /82*pi\
y333 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{333} = \sqrt[678]{5345} \cos{\left(\frac{82 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{82 \pi}{339} \right)}$$
       678______    /82*pi\     678______    /82*pi\
y334 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{334} = \sqrt[678]{5345} \cos{\left(\frac{82 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{82 \pi}{339} \right)}$$
         678______    /83*pi\     678______    /83*pi\
y335 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{335} = - \sqrt[678]{5345} \cos{\left(\frac{83 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{83 \pi}{339} \right)}$$
         678______    /83*pi\     678______    /83*pi\
y336 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{336} = - \sqrt[678]{5345} \cos{\left(\frac{83 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{83 \pi}{339} \right)}$$
       678______    /83*pi\     678______    /83*pi\
y337 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{337} = \sqrt[678]{5345} \cos{\left(\frac{83 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{83 \pi}{339} \right)}$$
       678______    /83*pi\     678______    /83*pi\
y338 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{338} = \sqrt[678]{5345} \cos{\left(\frac{83 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{83 \pi}{339} \right)}$$
         678______    /28*pi\     678______    /28*pi\
y339 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{339} = - \sqrt[678]{5345} \cos{\left(\frac{28 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{28 \pi}{113} \right)}$$
         678______    /28*pi\     678______    /28*pi\
y340 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{340} = - \sqrt[678]{5345} \cos{\left(\frac{28 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{28 \pi}{113} \right)}$$
       678______    /28*pi\     678______    /28*pi\
y341 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{341} = \sqrt[678]{5345} \cos{\left(\frac{28 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{28 \pi}{113} \right)}$$
       678______    /28*pi\     678______    /28*pi\
y342 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{342} = \sqrt[678]{5345} \cos{\left(\frac{28 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{28 \pi}{113} \right)}$$
         678______    /85*pi\     678______    /85*pi\
y343 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{343} = - \sqrt[678]{5345} \cos{\left(\frac{85 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{85 \pi}{339} \right)}$$
         678______    /85*pi\     678______    /85*pi\
y344 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{344} = - \sqrt[678]{5345} \cos{\left(\frac{85 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{85 \pi}{339} \right)}$$
       678______    /85*pi\     678______    /85*pi\
y345 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{345} = \sqrt[678]{5345} \cos{\left(\frac{85 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{85 \pi}{339} \right)}$$
       678______    /85*pi\     678______    /85*pi\
y346 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{346} = \sqrt[678]{5345} \cos{\left(\frac{85 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{85 \pi}{339} \right)}$$
         678______    /86*pi\     678______    /86*pi\
y347 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{347} = - \sqrt[678]{5345} \cos{\left(\frac{86 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{86 \pi}{339} \right)}$$
         678______    /86*pi\     678______    /86*pi\
y348 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{348} = - \sqrt[678]{5345} \cos{\left(\frac{86 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{86 \pi}{339} \right)}$$
       678______    /86*pi\     678______    /86*pi\
y349 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{349} = \sqrt[678]{5345} \cos{\left(\frac{86 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{86 \pi}{339} \right)}$$
       678______    /86*pi\     678______    /86*pi\
y350 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{350} = \sqrt[678]{5345} \cos{\left(\frac{86 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{86 \pi}{339} \right)}$$
         678______    /29*pi\     678______    /29*pi\
y351 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{351} = - \sqrt[678]{5345} \cos{\left(\frac{29 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{29 \pi}{113} \right)}$$
         678______    /29*pi\     678______    /29*pi\
y352 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{352} = - \sqrt[678]{5345} \cos{\left(\frac{29 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{29 \pi}{113} \right)}$$
       678______    /29*pi\     678______    /29*pi\
y353 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{353} = \sqrt[678]{5345} \cos{\left(\frac{29 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{29 \pi}{113} \right)}$$
       678______    /29*pi\     678______    /29*pi\
y354 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{354} = \sqrt[678]{5345} \cos{\left(\frac{29 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{29 \pi}{113} \right)}$$
         678______    /88*pi\     678______    /88*pi\
y355 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{355} = - \sqrt[678]{5345} \cos{\left(\frac{88 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{88 \pi}{339} \right)}$$
         678______    /88*pi\     678______    /88*pi\
y356 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{356} = - \sqrt[678]{5345} \cos{\left(\frac{88 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{88 \pi}{339} \right)}$$
       678______    /88*pi\     678______    /88*pi\
y357 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{357} = \sqrt[678]{5345} \cos{\left(\frac{88 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{88 \pi}{339} \right)}$$
       678______    /88*pi\     678______    /88*pi\
y358 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{358} = \sqrt[678]{5345} \cos{\left(\frac{88 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{88 \pi}{339} \right)}$$
         678______    /89*pi\     678______    /89*pi\
y359 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{359} = - \sqrt[678]{5345} \cos{\left(\frac{89 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{89 \pi}{339} \right)}$$
         678______    /89*pi\     678______    /89*pi\
y360 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{360} = - \sqrt[678]{5345} \cos{\left(\frac{89 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{89 \pi}{339} \right)}$$
       678______    /89*pi\     678______    /89*pi\
y361 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{361} = \sqrt[678]{5345} \cos{\left(\frac{89 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{89 \pi}{339} \right)}$$
       678______    /89*pi\     678______    /89*pi\
y362 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{362} = \sqrt[678]{5345} \cos{\left(\frac{89 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{89 \pi}{339} \right)}$$
         678______    /30*pi\     678______    /30*pi\
y363 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{363} = - \sqrt[678]{5345} \cos{\left(\frac{30 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{30 \pi}{113} \right)}$$
         678______    /30*pi\     678______    /30*pi\
y364 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{364} = - \sqrt[678]{5345} \cos{\left(\frac{30 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{30 \pi}{113} \right)}$$
       678______    /30*pi\     678______    /30*pi\
y365 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{365} = \sqrt[678]{5345} \cos{\left(\frac{30 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{30 \pi}{113} \right)}$$
       678______    /30*pi\     678______    /30*pi\
y366 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{366} = \sqrt[678]{5345} \cos{\left(\frac{30 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{30 \pi}{113} \right)}$$
         678______    /91*pi\     678______    /91*pi\
y367 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{367} = - \sqrt[678]{5345} \cos{\left(\frac{91 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{91 \pi}{339} \right)}$$
         678______    /91*pi\     678______    /91*pi\
y368 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{368} = - \sqrt[678]{5345} \cos{\left(\frac{91 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{91 \pi}{339} \right)}$$
       678______    /91*pi\     678______    /91*pi\
y369 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{369} = \sqrt[678]{5345} \cos{\left(\frac{91 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{91 \pi}{339} \right)}$$
       678______    /91*pi\     678______    /91*pi\
y370 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{370} = \sqrt[678]{5345} \cos{\left(\frac{91 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{91 \pi}{339} \right)}$$
         678______    /92*pi\     678______    /92*pi\
y371 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{371} = - \sqrt[678]{5345} \cos{\left(\frac{92 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{92 \pi}{339} \right)}$$
         678______    /92*pi\     678______    /92*pi\
y372 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{372} = - \sqrt[678]{5345} \cos{\left(\frac{92 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{92 \pi}{339} \right)}$$
       678______    /92*pi\     678______    /92*pi\
y373 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{373} = \sqrt[678]{5345} \cos{\left(\frac{92 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{92 \pi}{339} \right)}$$
       678______    /92*pi\     678______    /92*pi\
y374 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{374} = \sqrt[678]{5345} \cos{\left(\frac{92 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{92 \pi}{339} \right)}$$
         678______    /31*pi\     678______    /31*pi\
y375 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{375} = - \sqrt[678]{5345} \cos{\left(\frac{31 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{31 \pi}{113} \right)}$$
         678______    /31*pi\     678______    /31*pi\
y376 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{376} = - \sqrt[678]{5345} \cos{\left(\frac{31 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{31 \pi}{113} \right)}$$
       678______    /31*pi\     678______    /31*pi\
y377 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{377} = \sqrt[678]{5345} \cos{\left(\frac{31 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{31 \pi}{113} \right)}$$
       678______    /31*pi\     678______    /31*pi\
y378 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{378} = \sqrt[678]{5345} \cos{\left(\frac{31 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{31 \pi}{113} \right)}$$
         678______    /94*pi\     678______    /94*pi\
y379 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{379} = - \sqrt[678]{5345} \cos{\left(\frac{94 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{94 \pi}{339} \right)}$$
         678______    /94*pi\     678______    /94*pi\
y380 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{380} = - \sqrt[678]{5345} \cos{\left(\frac{94 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{94 \pi}{339} \right)}$$
       678______    /94*pi\     678______    /94*pi\
y381 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{381} = \sqrt[678]{5345} \cos{\left(\frac{94 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{94 \pi}{339} \right)}$$
       678______    /94*pi\     678______    /94*pi\
y382 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{382} = \sqrt[678]{5345} \cos{\left(\frac{94 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{94 \pi}{339} \right)}$$
         678______    /95*pi\     678______    /95*pi\
y383 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{383} = - \sqrt[678]{5345} \cos{\left(\frac{95 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{95 \pi}{339} \right)}$$
         678______    /95*pi\     678______    /95*pi\
y384 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{384} = - \sqrt[678]{5345} \cos{\left(\frac{95 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{95 \pi}{339} \right)}$$
       678______    /95*pi\     678______    /95*pi\
y385 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{385} = \sqrt[678]{5345} \cos{\left(\frac{95 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{95 \pi}{339} \right)}$$
       678______    /95*pi\     678______    /95*pi\
y386 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{386} = \sqrt[678]{5345} \cos{\left(\frac{95 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{95 \pi}{339} \right)}$$
         678______    /32*pi\     678______    /32*pi\
y387 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{387} = - \sqrt[678]{5345} \cos{\left(\frac{32 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{32 \pi}{113} \right)}$$
         678______    /32*pi\     678______    /32*pi\
y388 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{388} = - \sqrt[678]{5345} \cos{\left(\frac{32 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{32 \pi}{113} \right)}$$
       678______    /32*pi\     678______    /32*pi\
y389 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{389} = \sqrt[678]{5345} \cos{\left(\frac{32 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{32 \pi}{113} \right)}$$
       678______    /32*pi\     678______    /32*pi\
y390 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{390} = \sqrt[678]{5345} \cos{\left(\frac{32 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{32 \pi}{113} \right)}$$
         678______    /97*pi\     678______    /97*pi\
y391 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{391} = - \sqrt[678]{5345} \cos{\left(\frac{97 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{97 \pi}{339} \right)}$$
         678______    /97*pi\     678______    /97*pi\
y392 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{392} = - \sqrt[678]{5345} \cos{\left(\frac{97 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{97 \pi}{339} \right)}$$
       678______    /97*pi\     678______    /97*pi\
y393 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{393} = \sqrt[678]{5345} \cos{\left(\frac{97 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{97 \pi}{339} \right)}$$
       678______    /97*pi\     678______    /97*pi\
y394 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{394} = \sqrt[678]{5345} \cos{\left(\frac{97 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{97 \pi}{339} \right)}$$
         678______    /98*pi\     678______    /98*pi\
y395 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{395} = - \sqrt[678]{5345} \cos{\left(\frac{98 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{98 \pi}{339} \right)}$$
         678______    /98*pi\     678______    /98*pi\
y396 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 339 /                  \ 339 /
$$y_{396} = - \sqrt[678]{5345} \cos{\left(\frac{98 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{98 \pi}{339} \right)}$$
       678______    /98*pi\     678______    /98*pi\
y397 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{397} = \sqrt[678]{5345} \cos{\left(\frac{98 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{98 \pi}{339} \right)}$$
       678______    /98*pi\     678______    /98*pi\
y398 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 339 /                  \ 339 /
$$y_{398} = \sqrt[678]{5345} \cos{\left(\frac{98 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{98 \pi}{339} \right)}$$
         678______    /33*pi\     678______    /33*pi\
y399 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{399} = - \sqrt[678]{5345} \cos{\left(\frac{33 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{33 \pi}{113} \right)}$$
         678______    /33*pi\     678______    /33*pi\
y400 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{400} = - \sqrt[678]{5345} \cos{\left(\frac{33 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{33 \pi}{113} \right)}$$
       678______    /33*pi\     678______    /33*pi\
y401 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{401} = \sqrt[678]{5345} \cos{\left(\frac{33 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{33 \pi}{113} \right)}$$
       678______    /33*pi\     678______    /33*pi\
y402 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{402} = \sqrt[678]{5345} \cos{\left(\frac{33 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{33 \pi}{113} \right)}$$
         678______    /100*pi\     678______    /100*pi\
y403 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{403} = - \sqrt[678]{5345} \cos{\left(\frac{100 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{100 \pi}{339} \right)}$$
         678______    /100*pi\     678______    /100*pi\
y404 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{404} = - \sqrt[678]{5345} \cos{\left(\frac{100 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{100 \pi}{339} \right)}$$
       678______    /100*pi\     678______    /100*pi\
y405 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{405} = \sqrt[678]{5345} \cos{\left(\frac{100 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{100 \pi}{339} \right)}$$
       678______    /100*pi\     678______    /100*pi\
y406 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{406} = \sqrt[678]{5345} \cos{\left(\frac{100 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{100 \pi}{339} \right)}$$
         678______    /101*pi\     678______    /101*pi\
y407 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{407} = - \sqrt[678]{5345} \cos{\left(\frac{101 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{101 \pi}{339} \right)}$$
         678______    /101*pi\     678______    /101*pi\
y408 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{408} = - \sqrt[678]{5345} \cos{\left(\frac{101 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{101 \pi}{339} \right)}$$
       678______    /101*pi\     678______    /101*pi\
y409 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{409} = \sqrt[678]{5345} \cos{\left(\frac{101 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{101 \pi}{339} \right)}$$
       678______    /101*pi\     678______    /101*pi\
y410 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{410} = \sqrt[678]{5345} \cos{\left(\frac{101 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{101 \pi}{339} \right)}$$
         678______    /34*pi\     678______    /34*pi\
y411 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{411} = - \sqrt[678]{5345} \cos{\left(\frac{34 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{34 \pi}{113} \right)}$$
         678______    /34*pi\     678______    /34*pi\
y412 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{412} = - \sqrt[678]{5345} \cos{\left(\frac{34 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{34 \pi}{113} \right)}$$
       678______    /34*pi\     678______    /34*pi\
y413 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{413} = \sqrt[678]{5345} \cos{\left(\frac{34 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{34 \pi}{113} \right)}$$
       678______    /34*pi\     678______    /34*pi\
y414 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{414} = \sqrt[678]{5345} \cos{\left(\frac{34 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{34 \pi}{113} \right)}$$
         678______    /103*pi\     678______    /103*pi\
y415 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{415} = - \sqrt[678]{5345} \cos{\left(\frac{103 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{103 \pi}{339} \right)}$$
         678______    /103*pi\     678______    /103*pi\
y416 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{416} = - \sqrt[678]{5345} \cos{\left(\frac{103 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{103 \pi}{339} \right)}$$
       678______    /103*pi\     678______    /103*pi\
y417 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{417} = \sqrt[678]{5345} \cos{\left(\frac{103 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{103 \pi}{339} \right)}$$
       678______    /103*pi\     678______    /103*pi\
y418 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{418} = \sqrt[678]{5345} \cos{\left(\frac{103 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{103 \pi}{339} \right)}$$
         678______    /104*pi\     678______    /104*pi\
y419 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{419} = - \sqrt[678]{5345} \cos{\left(\frac{104 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{104 \pi}{339} \right)}$$
         678______    /104*pi\     678______    /104*pi\
y420 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{420} = - \sqrt[678]{5345} \cos{\left(\frac{104 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{104 \pi}{339} \right)}$$
       678______    /104*pi\     678______    /104*pi\
y421 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{421} = \sqrt[678]{5345} \cos{\left(\frac{104 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{104 \pi}{339} \right)}$$
       678______    /104*pi\     678______    /104*pi\
y422 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{422} = \sqrt[678]{5345} \cos{\left(\frac{104 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{104 \pi}{339} \right)}$$
         678______    /35*pi\     678______    /35*pi\
y423 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{423} = - \sqrt[678]{5345} \cos{\left(\frac{35 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{35 \pi}{113} \right)}$$
         678______    /35*pi\     678______    /35*pi\
y424 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{424} = - \sqrt[678]{5345} \cos{\left(\frac{35 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{35 \pi}{113} \right)}$$
       678______    /35*pi\     678______    /35*pi\
y425 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{425} = \sqrt[678]{5345} \cos{\left(\frac{35 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{35 \pi}{113} \right)}$$
       678______    /35*pi\     678______    /35*pi\
y426 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{426} = \sqrt[678]{5345} \cos{\left(\frac{35 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{35 \pi}{113} \right)}$$
         678______    /106*pi\     678______    /106*pi\
y427 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{427} = - \sqrt[678]{5345} \cos{\left(\frac{106 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{106 \pi}{339} \right)}$$
         678______    /106*pi\     678______    /106*pi\
y428 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{428} = - \sqrt[678]{5345} \cos{\left(\frac{106 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{106 \pi}{339} \right)}$$
       678______    /106*pi\     678______    /106*pi\
y429 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{429} = \sqrt[678]{5345} \cos{\left(\frac{106 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{106 \pi}{339} \right)}$$
       678______    /106*pi\     678______    /106*pi\
y430 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{430} = \sqrt[678]{5345} \cos{\left(\frac{106 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{106 \pi}{339} \right)}$$
         678______    /107*pi\     678______    /107*pi\
y431 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{431} = - \sqrt[678]{5345} \cos{\left(\frac{107 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{107 \pi}{339} \right)}$$
         678______    /107*pi\     678______    /107*pi\
y432 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{432} = - \sqrt[678]{5345} \cos{\left(\frac{107 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{107 \pi}{339} \right)}$$
       678______    /107*pi\     678______    /107*pi\
y433 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{433} = \sqrt[678]{5345} \cos{\left(\frac{107 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{107 \pi}{339} \right)}$$
       678______    /107*pi\     678______    /107*pi\
y434 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{434} = \sqrt[678]{5345} \cos{\left(\frac{107 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{107 \pi}{339} \right)}$$
         678______    /36*pi\     678______    /36*pi\
y435 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{435} = - \sqrt[678]{5345} \cos{\left(\frac{36 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{36 \pi}{113} \right)}$$
         678______    /36*pi\     678______    /36*pi\
y436 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{436} = - \sqrt[678]{5345} \cos{\left(\frac{36 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{36 \pi}{113} \right)}$$
       678______    /36*pi\     678______    /36*pi\
y437 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{437} = \sqrt[678]{5345} \cos{\left(\frac{36 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{36 \pi}{113} \right)}$$
       678______    /36*pi\     678______    /36*pi\
y438 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{438} = \sqrt[678]{5345} \cos{\left(\frac{36 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{36 \pi}{113} \right)}$$
         678______    /109*pi\     678______    /109*pi\
y439 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{439} = - \sqrt[678]{5345} \cos{\left(\frac{109 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{109 \pi}{339} \right)}$$
         678______    /109*pi\     678______    /109*pi\
y440 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{440} = - \sqrt[678]{5345} \cos{\left(\frac{109 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{109 \pi}{339} \right)}$$
       678______    /109*pi\     678______    /109*pi\
y441 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{441} = \sqrt[678]{5345} \cos{\left(\frac{109 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{109 \pi}{339} \right)}$$
       678______    /109*pi\     678______    /109*pi\
y442 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{442} = \sqrt[678]{5345} \cos{\left(\frac{109 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{109 \pi}{339} \right)}$$
         678______    /110*pi\     678______    /110*pi\
y443 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{443} = - \sqrt[678]{5345} \cos{\left(\frac{110 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{110 \pi}{339} \right)}$$
         678______    /110*pi\     678______    /110*pi\
y444 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{444} = - \sqrt[678]{5345} \cos{\left(\frac{110 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{110 \pi}{339} \right)}$$
       678______    /110*pi\     678______    /110*pi\
y445 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{445} = \sqrt[678]{5345} \cos{\left(\frac{110 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{110 \pi}{339} \right)}$$
       678______    /110*pi\     678______    /110*pi\
y446 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{446} = \sqrt[678]{5345} \cos{\left(\frac{110 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{110 \pi}{339} \right)}$$
         678______    /37*pi\     678______    /37*pi\
y447 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{447} = - \sqrt[678]{5345} \cos{\left(\frac{37 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{37 \pi}{113} \right)}$$
         678______    /37*pi\     678______    /37*pi\
y448 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{448} = - \sqrt[678]{5345} \cos{\left(\frac{37 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{37 \pi}{113} \right)}$$
       678______    /37*pi\     678______    /37*pi\
y449 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{449} = \sqrt[678]{5345} \cos{\left(\frac{37 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{37 \pi}{113} \right)}$$
       678______    /37*pi\     678______    /37*pi\
y450 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{450} = \sqrt[678]{5345} \cos{\left(\frac{37 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{37 \pi}{113} \right)}$$
         678______    /112*pi\     678______    /112*pi\
y451 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{451} = - \sqrt[678]{5345} \cos{\left(\frac{112 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{112 \pi}{339} \right)}$$
         678______    /112*pi\     678______    /112*pi\
y452 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{452} = - \sqrt[678]{5345} \cos{\left(\frac{112 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{112 \pi}{339} \right)}$$
       678______    /112*pi\     678______    /112*pi\
y453 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{453} = \sqrt[678]{5345} \cos{\left(\frac{112 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{112 \pi}{339} \right)}$$
       678______    /112*pi\     678______    /112*pi\
y454 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{454} = \sqrt[678]{5345} \cos{\left(\frac{112 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{112 \pi}{339} \right)}$$
         678______    /38*pi\     678______    /38*pi\
y455 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{455} = - \sqrt[678]{5345} \cos{\left(\frac{38 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{38 \pi}{113} \right)}$$
         678______    /38*pi\     678______    /38*pi\
y456 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{456} = - \sqrt[678]{5345} \cos{\left(\frac{38 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{38 \pi}{113} \right)}$$
       678______    /38*pi\     678______    /38*pi\
y457 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{457} = \sqrt[678]{5345} \cos{\left(\frac{38 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{38 \pi}{113} \right)}$$
       678______    /38*pi\     678______    /38*pi\
y458 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{458} = \sqrt[678]{5345} \cos{\left(\frac{38 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{38 \pi}{113} \right)}$$
         678______    /115*pi\     678______    /115*pi\
y459 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{459} = - \sqrt[678]{5345} \cos{\left(\frac{115 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{115 \pi}{339} \right)}$$
         678______    /115*pi\     678______    /115*pi\
y460 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{460} = - \sqrt[678]{5345} \cos{\left(\frac{115 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{115 \pi}{339} \right)}$$
       678______    /115*pi\     678______    /115*pi\
y461 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{461} = \sqrt[678]{5345} \cos{\left(\frac{115 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{115 \pi}{339} \right)}$$
       678______    /115*pi\     678______    /115*pi\
y462 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{462} = \sqrt[678]{5345} \cos{\left(\frac{115 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{115 \pi}{339} \right)}$$
         678______    /116*pi\     678______    /116*pi\
y463 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{463} = - \sqrt[678]{5345} \cos{\left(\frac{116 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{116 \pi}{339} \right)}$$
         678______    /116*pi\     678______    /116*pi\
y464 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{464} = - \sqrt[678]{5345} \cos{\left(\frac{116 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{116 \pi}{339} \right)}$$
       678______    /116*pi\     678______    /116*pi\
y465 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{465} = \sqrt[678]{5345} \cos{\left(\frac{116 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{116 \pi}{339} \right)}$$
       678______    /116*pi\     678______    /116*pi\
y466 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{466} = \sqrt[678]{5345} \cos{\left(\frac{116 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{116 \pi}{339} \right)}$$
         678______    /39*pi\     678______    /39*pi\
y467 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{467} = - \sqrt[678]{5345} \cos{\left(\frac{39 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{39 \pi}{113} \right)}$$
         678______    /39*pi\     678______    /39*pi\
y468 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{468} = - \sqrt[678]{5345} \cos{\left(\frac{39 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{39 \pi}{113} \right)}$$
       678______    /39*pi\     678______    /39*pi\
y469 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{469} = \sqrt[678]{5345} \cos{\left(\frac{39 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{39 \pi}{113} \right)}$$
       678______    /39*pi\     678______    /39*pi\
y470 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{470} = \sqrt[678]{5345} \cos{\left(\frac{39 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{39 \pi}{113} \right)}$$
         678______    /118*pi\     678______    /118*pi\
y471 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{471} = - \sqrt[678]{5345} \cos{\left(\frac{118 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{118 \pi}{339} \right)}$$
         678______    /118*pi\     678______    /118*pi\
y472 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{472} = - \sqrt[678]{5345} \cos{\left(\frac{118 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{118 \pi}{339} \right)}$$
       678______    /118*pi\     678______    /118*pi\
y473 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{473} = \sqrt[678]{5345} \cos{\left(\frac{118 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{118 \pi}{339} \right)}$$
       678______    /118*pi\     678______    /118*pi\
y474 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{474} = \sqrt[678]{5345} \cos{\left(\frac{118 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{118 \pi}{339} \right)}$$
         678______    /119*pi\     678______    /119*pi\
y475 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{475} = - \sqrt[678]{5345} \cos{\left(\frac{119 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{119 \pi}{339} \right)}$$
         678______    /119*pi\     678______    /119*pi\
y476 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{476} = - \sqrt[678]{5345} \cos{\left(\frac{119 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{119 \pi}{339} \right)}$$
       678______    /119*pi\     678______    /119*pi\
y477 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{477} = \sqrt[678]{5345} \cos{\left(\frac{119 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{119 \pi}{339} \right)}$$
       678______    /119*pi\     678______    /119*pi\
y478 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{478} = \sqrt[678]{5345} \cos{\left(\frac{119 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{119 \pi}{339} \right)}$$
         678______    /40*pi\     678______    /40*pi\
y479 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{479} = - \sqrt[678]{5345} \cos{\left(\frac{40 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{40 \pi}{113} \right)}$$
         678______    /40*pi\     678______    /40*pi\
y480 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{480} = - \sqrt[678]{5345} \cos{\left(\frac{40 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{40 \pi}{113} \right)}$$
       678______    /40*pi\     678______    /40*pi\
y481 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{481} = \sqrt[678]{5345} \cos{\left(\frac{40 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{40 \pi}{113} \right)}$$
       678______    /40*pi\     678______    /40*pi\
y482 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{482} = \sqrt[678]{5345} \cos{\left(\frac{40 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{40 \pi}{113} \right)}$$
         678______    /121*pi\     678______    /121*pi\
y483 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{483} = - \sqrt[678]{5345} \cos{\left(\frac{121 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{121 \pi}{339} \right)}$$
         678______    /121*pi\     678______    /121*pi\
y484 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{484} = - \sqrt[678]{5345} \cos{\left(\frac{121 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{121 \pi}{339} \right)}$$
       678______    /121*pi\     678______    /121*pi\
y485 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{485} = \sqrt[678]{5345} \cos{\left(\frac{121 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{121 \pi}{339} \right)}$$
       678______    /121*pi\     678______    /121*pi\
y486 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{486} = \sqrt[678]{5345} \cos{\left(\frac{121 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{121 \pi}{339} \right)}$$
         678______    /122*pi\     678______    /122*pi\
y487 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{487} = - \sqrt[678]{5345} \cos{\left(\frac{122 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{122 \pi}{339} \right)}$$
         678______    /122*pi\     678______    /122*pi\
y488 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{488} = - \sqrt[678]{5345} \cos{\left(\frac{122 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{122 \pi}{339} \right)}$$
       678______    /122*pi\     678______    /122*pi\
y489 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{489} = \sqrt[678]{5345} \cos{\left(\frac{122 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{122 \pi}{339} \right)}$$
       678______    /122*pi\     678______    /122*pi\
y490 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{490} = \sqrt[678]{5345} \cos{\left(\frac{122 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{122 \pi}{339} \right)}$$
         678______    /41*pi\     678______    /41*pi\
y491 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{491} = - \sqrt[678]{5345} \cos{\left(\frac{41 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{41 \pi}{113} \right)}$$
         678______    /41*pi\     678______    /41*pi\
y492 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{492} = - \sqrt[678]{5345} \cos{\left(\frac{41 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{41 \pi}{113} \right)}$$
       678______    /41*pi\     678______    /41*pi\
y493 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{493} = \sqrt[678]{5345} \cos{\left(\frac{41 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{41 \pi}{113} \right)}$$
       678______    /41*pi\     678______    /41*pi\
y494 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{494} = \sqrt[678]{5345} \cos{\left(\frac{41 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{41 \pi}{113} \right)}$$
         678______    /124*pi\     678______    /124*pi\
y495 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{495} = - \sqrt[678]{5345} \cos{\left(\frac{124 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{124 \pi}{339} \right)}$$
         678______    /124*pi\     678______    /124*pi\
y496 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{496} = - \sqrt[678]{5345} \cos{\left(\frac{124 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{124 \pi}{339} \right)}$$
       678______    /124*pi\     678______    /124*pi\
y497 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{497} = \sqrt[678]{5345} \cos{\left(\frac{124 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{124 \pi}{339} \right)}$$
       678______    /124*pi\     678______    /124*pi\
y498 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{498} = \sqrt[678]{5345} \cos{\left(\frac{124 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{124 \pi}{339} \right)}$$
         678______    /125*pi\     678______    /125*pi\
y499 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{499} = - \sqrt[678]{5345} \cos{\left(\frac{125 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{125 \pi}{339} \right)}$$
         678______    /125*pi\     678______    /125*pi\
y500 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{500} = - \sqrt[678]{5345} \cos{\left(\frac{125 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{125 \pi}{339} \right)}$$
       678______    /125*pi\     678______    /125*pi\
y501 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{501} = \sqrt[678]{5345} \cos{\left(\frac{125 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{125 \pi}{339} \right)}$$
       678______    /125*pi\     678______    /125*pi\
y502 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{502} = \sqrt[678]{5345} \cos{\left(\frac{125 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{125 \pi}{339} \right)}$$
         678______    /42*pi\     678______    /42*pi\
y503 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{503} = - \sqrt[678]{5345} \cos{\left(\frac{42 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{42 \pi}{113} \right)}$$
         678______    /42*pi\     678______    /42*pi\
y504 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{504} = - \sqrt[678]{5345} \cos{\left(\frac{42 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{42 \pi}{113} \right)}$$
       678______    /42*pi\     678______    /42*pi\
y505 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{505} = \sqrt[678]{5345} \cos{\left(\frac{42 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{42 \pi}{113} \right)}$$
       678______    /42*pi\     678______    /42*pi\
y506 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{506} = \sqrt[678]{5345} \cos{\left(\frac{42 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{42 \pi}{113} \right)}$$
         678______    /127*pi\     678______    /127*pi\
y507 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{507} = - \sqrt[678]{5345} \cos{\left(\frac{127 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{127 \pi}{339} \right)}$$
         678______    /127*pi\     678______    /127*pi\
y508 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{508} = - \sqrt[678]{5345} \cos{\left(\frac{127 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{127 \pi}{339} \right)}$$
       678______    /127*pi\     678______    /127*pi\
y509 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{509} = \sqrt[678]{5345} \cos{\left(\frac{127 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{127 \pi}{339} \right)}$$
       678______    /127*pi\     678______    /127*pi\
y510 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{510} = \sqrt[678]{5345} \cos{\left(\frac{127 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{127 \pi}{339} \right)}$$
         678______    /128*pi\     678______    /128*pi\
y511 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{511} = - \sqrt[678]{5345} \cos{\left(\frac{128 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{128 \pi}{339} \right)}$$
         678______    /128*pi\     678______    /128*pi\
y512 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{512} = - \sqrt[678]{5345} \cos{\left(\frac{128 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{128 \pi}{339} \right)}$$
       678______    /128*pi\     678______    /128*pi\
y513 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{513} = \sqrt[678]{5345} \cos{\left(\frac{128 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{128 \pi}{339} \right)}$$
       678______    /128*pi\     678______    /128*pi\
y514 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{514} = \sqrt[678]{5345} \cos{\left(\frac{128 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{128 \pi}{339} \right)}$$
         678______    /43*pi\     678______    /43*pi\
y515 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{515} = - \sqrt[678]{5345} \cos{\left(\frac{43 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{43 \pi}{113} \right)}$$
         678______    /43*pi\     678______    /43*pi\
y516 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{516} = - \sqrt[678]{5345} \cos{\left(\frac{43 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{43 \pi}{113} \right)}$$
       678______    /43*pi\     678______    /43*pi\
y517 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{517} = \sqrt[678]{5345} \cos{\left(\frac{43 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{43 \pi}{113} \right)}$$
       678______    /43*pi\     678______    /43*pi\
y518 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{518} = \sqrt[678]{5345} \cos{\left(\frac{43 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{43 \pi}{113} \right)}$$
         678______    /130*pi\     678______    /130*pi\
y519 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{519} = - \sqrt[678]{5345} \cos{\left(\frac{130 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{130 \pi}{339} \right)}$$
         678______    /130*pi\     678______    /130*pi\
y520 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{520} = - \sqrt[678]{5345} \cos{\left(\frac{130 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{130 \pi}{339} \right)}$$
       678______    /130*pi\     678______    /130*pi\
y521 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{521} = \sqrt[678]{5345} \cos{\left(\frac{130 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{130 \pi}{339} \right)}$$
       678______    /130*pi\     678______    /130*pi\
y522 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{522} = \sqrt[678]{5345} \cos{\left(\frac{130 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{130 \pi}{339} \right)}$$
         678______    /131*pi\     678______    /131*pi\
y523 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{523} = - \sqrt[678]{5345} \cos{\left(\frac{131 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{131 \pi}{339} \right)}$$
         678______    /131*pi\     678______    /131*pi\
y524 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{524} = - \sqrt[678]{5345} \cos{\left(\frac{131 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{131 \pi}{339} \right)}$$
       678______    /131*pi\     678______    /131*pi\
y525 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{525} = \sqrt[678]{5345} \cos{\left(\frac{131 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{131 \pi}{339} \right)}$$
       678______    /131*pi\     678______    /131*pi\
y526 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{526} = \sqrt[678]{5345} \cos{\left(\frac{131 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{131 \pi}{339} \right)}$$
         678______    /44*pi\     678______    /44*pi\
y527 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{527} = - \sqrt[678]{5345} \cos{\left(\frac{44 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{44 \pi}{113} \right)}$$
         678______    /44*pi\     678______    /44*pi\
y528 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{528} = - \sqrt[678]{5345} \cos{\left(\frac{44 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{44 \pi}{113} \right)}$$
       678______    /44*pi\     678______    /44*pi\
y529 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{529} = \sqrt[678]{5345} \cos{\left(\frac{44 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{44 \pi}{113} \right)}$$
       678______    /44*pi\     678______    /44*pi\
y530 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{530} = \sqrt[678]{5345} \cos{\left(\frac{44 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{44 \pi}{113} \right)}$$
         678______    /133*pi\     678______    /133*pi\
y531 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{531} = - \sqrt[678]{5345} \cos{\left(\frac{133 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{133 \pi}{339} \right)}$$
         678______    /133*pi\     678______    /133*pi\
y532 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{532} = - \sqrt[678]{5345} \cos{\left(\frac{133 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{133 \pi}{339} \right)}$$
       678______    /133*pi\     678______    /133*pi\
y533 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{533} = \sqrt[678]{5345} \cos{\left(\frac{133 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{133 \pi}{339} \right)}$$
       678______    /133*pi\     678______    /133*pi\
y534 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{534} = \sqrt[678]{5345} \cos{\left(\frac{133 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{133 \pi}{339} \right)}$$
         678______    /134*pi\     678______    /134*pi\
y535 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{535} = - \sqrt[678]{5345} \cos{\left(\frac{134 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{134 \pi}{339} \right)}$$
         678______    /134*pi\     678______    /134*pi\
y536 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{536} = - \sqrt[678]{5345} \cos{\left(\frac{134 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{134 \pi}{339} \right)}$$
       678______    /134*pi\     678______    /134*pi\
y537 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{537} = \sqrt[678]{5345} \cos{\left(\frac{134 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{134 \pi}{339} \right)}$$
       678______    /134*pi\     678______    /134*pi\
y538 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{538} = \sqrt[678]{5345} \cos{\left(\frac{134 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{134 \pi}{339} \right)}$$
         678______    /45*pi\     678______    /45*pi\
y539 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{539} = - \sqrt[678]{5345} \cos{\left(\frac{45 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{45 \pi}{113} \right)}$$
         678______    /45*pi\     678______    /45*pi\
y540 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{540} = - \sqrt[678]{5345} \cos{\left(\frac{45 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{45 \pi}{113} \right)}$$
       678______    /45*pi\     678______    /45*pi\
y541 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{541} = \sqrt[678]{5345} \cos{\left(\frac{45 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{45 \pi}{113} \right)}$$
       678______    /45*pi\     678______    /45*pi\
y542 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{542} = \sqrt[678]{5345} \cos{\left(\frac{45 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{45 \pi}{113} \right)}$$
         678______    /136*pi\     678______    /136*pi\
y543 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{543} = - \sqrt[678]{5345} \cos{\left(\frac{136 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{136 \pi}{339} \right)}$$
         678______    /136*pi\     678______    /136*pi\
y544 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{544} = - \sqrt[678]{5345} \cos{\left(\frac{136 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{136 \pi}{339} \right)}$$
       678______    /136*pi\     678______    /136*pi\
y545 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{545} = \sqrt[678]{5345} \cos{\left(\frac{136 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{136 \pi}{339} \right)}$$
       678______    /136*pi\     678______    /136*pi\
y546 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{546} = \sqrt[678]{5345} \cos{\left(\frac{136 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{136 \pi}{339} \right)}$$
         678______    /137*pi\     678______    /137*pi\
y547 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{547} = - \sqrt[678]{5345} \cos{\left(\frac{137 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{137 \pi}{339} \right)}$$
         678______    /137*pi\     678______    /137*pi\
y548 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{548} = - \sqrt[678]{5345} \cos{\left(\frac{137 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{137 \pi}{339} \right)}$$
       678______    /137*pi\     678______    /137*pi\
y549 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{549} = \sqrt[678]{5345} \cos{\left(\frac{137 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{137 \pi}{339} \right)}$$
       678______    /137*pi\     678______    /137*pi\
y550 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{550} = \sqrt[678]{5345} \cos{\left(\frac{137 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{137 \pi}{339} \right)}$$
         678______    /46*pi\     678______    /46*pi\
y551 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{551} = - \sqrt[678]{5345} \cos{\left(\frac{46 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{46 \pi}{113} \right)}$$
         678______    /46*pi\     678______    /46*pi\
y552 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{552} = - \sqrt[678]{5345} \cos{\left(\frac{46 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{46 \pi}{113} \right)}$$
       678______    /46*pi\     678______    /46*pi\
y553 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{553} = \sqrt[678]{5345} \cos{\left(\frac{46 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{46 \pi}{113} \right)}$$
       678______    /46*pi\     678______    /46*pi\
y554 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{554} = \sqrt[678]{5345} \cos{\left(\frac{46 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{46 \pi}{113} \right)}$$
         678______    /139*pi\     678______    /139*pi\
y555 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{555} = - \sqrt[678]{5345} \cos{\left(\frac{139 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{139 \pi}{339} \right)}$$
         678______    /139*pi\     678______    /139*pi\
y556 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{556} = - \sqrt[678]{5345} \cos{\left(\frac{139 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{139 \pi}{339} \right)}$$
       678______    /139*pi\     678______    /139*pi\
y557 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{557} = \sqrt[678]{5345} \cos{\left(\frac{139 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{139 \pi}{339} \right)}$$
       678______    /139*pi\     678______    /139*pi\
y558 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{558} = \sqrt[678]{5345} \cos{\left(\frac{139 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{139 \pi}{339} \right)}$$
         678______    /140*pi\     678______    /140*pi\
y559 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{559} = - \sqrt[678]{5345} \cos{\left(\frac{140 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{140 \pi}{339} \right)}$$
         678______    /140*pi\     678______    /140*pi\
y560 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{560} = - \sqrt[678]{5345} \cos{\left(\frac{140 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{140 \pi}{339} \right)}$$
       678______    /140*pi\     678______    /140*pi\
y561 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{561} = \sqrt[678]{5345} \cos{\left(\frac{140 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{140 \pi}{339} \right)}$$
       678______    /140*pi\     678______    /140*pi\
y562 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{562} = \sqrt[678]{5345} \cos{\left(\frac{140 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{140 \pi}{339} \right)}$$
         678______    /47*pi\     678______    /47*pi\
y563 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{563} = - \sqrt[678]{5345} \cos{\left(\frac{47 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{47 \pi}{113} \right)}$$
         678______    /47*pi\     678______    /47*pi\
y564 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{564} = - \sqrt[678]{5345} \cos{\left(\frac{47 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{47 \pi}{113} \right)}$$
       678______    /47*pi\     678______    /47*pi\
y565 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{565} = \sqrt[678]{5345} \cos{\left(\frac{47 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{47 \pi}{113} \right)}$$
       678______    /47*pi\     678______    /47*pi\
y566 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{566} = \sqrt[678]{5345} \cos{\left(\frac{47 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{47 \pi}{113} \right)}$$
         678______    /142*pi\     678______    /142*pi\
y567 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{567} = - \sqrt[678]{5345} \cos{\left(\frac{142 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{142 \pi}{339} \right)}$$
         678______    /142*pi\     678______    /142*pi\
y568 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{568} = - \sqrt[678]{5345} \cos{\left(\frac{142 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{142 \pi}{339} \right)}$$
       678______    /142*pi\     678______    /142*pi\
y569 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{569} = \sqrt[678]{5345} \cos{\left(\frac{142 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{142 \pi}{339} \right)}$$
       678______    /142*pi\     678______    /142*pi\
y570 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{570} = \sqrt[678]{5345} \cos{\left(\frac{142 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{142 \pi}{339} \right)}$$
         678______    /143*pi\     678______    /143*pi\
y571 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{571} = - \sqrt[678]{5345} \cos{\left(\frac{143 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{143 \pi}{339} \right)}$$
         678______    /143*pi\     678______    /143*pi\
y572 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{572} = - \sqrt[678]{5345} \cos{\left(\frac{143 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{143 \pi}{339} \right)}$$
       678______    /143*pi\     678______    /143*pi\
y573 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{573} = \sqrt[678]{5345} \cos{\left(\frac{143 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{143 \pi}{339} \right)}$$
       678______    /143*pi\     678______    /143*pi\
y574 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{574} = \sqrt[678]{5345} \cos{\left(\frac{143 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{143 \pi}{339} \right)}$$
         678______    /48*pi\     678______    /48*pi\
y575 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{575} = - \sqrt[678]{5345} \cos{\left(\frac{48 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{48 \pi}{113} \right)}$$
         678______    /48*pi\     678______    /48*pi\
y576 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{576} = - \sqrt[678]{5345} \cos{\left(\frac{48 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{48 \pi}{113} \right)}$$
       678______    /48*pi\     678______    /48*pi\
y577 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{577} = \sqrt[678]{5345} \cos{\left(\frac{48 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{48 \pi}{113} \right)}$$
       678______    /48*pi\     678______    /48*pi\
y578 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{578} = \sqrt[678]{5345} \cos{\left(\frac{48 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{48 \pi}{113} \right)}$$
         678______    /145*pi\     678______    /145*pi\
y579 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{579} = - \sqrt[678]{5345} \cos{\left(\frac{145 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{145 \pi}{339} \right)}$$
         678______    /145*pi\     678______    /145*pi\
y580 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{580} = - \sqrt[678]{5345} \cos{\left(\frac{145 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{145 \pi}{339} \right)}$$
       678______    /145*pi\     678______    /145*pi\
y581 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{581} = \sqrt[678]{5345} \cos{\left(\frac{145 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{145 \pi}{339} \right)}$$
       678______    /145*pi\     678______    /145*pi\
y582 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{582} = \sqrt[678]{5345} \cos{\left(\frac{145 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{145 \pi}{339} \right)}$$
         678______    /146*pi\     678______    /146*pi\
y583 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{583} = - \sqrt[678]{5345} \cos{\left(\frac{146 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{146 \pi}{339} \right)}$$
         678______    /146*pi\     678______    /146*pi\
y584 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{584} = - \sqrt[678]{5345} \cos{\left(\frac{146 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{146 \pi}{339} \right)}$$
       678______    /146*pi\     678______    /146*pi\
y585 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{585} = \sqrt[678]{5345} \cos{\left(\frac{146 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{146 \pi}{339} \right)}$$
       678______    /146*pi\     678______    /146*pi\
y586 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{586} = \sqrt[678]{5345} \cos{\left(\frac{146 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{146 \pi}{339} \right)}$$
         678______    /49*pi\     678______    /49*pi\
y587 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{587} = - \sqrt[678]{5345} \cos{\left(\frac{49 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{49 \pi}{113} \right)}$$
         678______    /49*pi\     678______    /49*pi\
y588 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{588} = - \sqrt[678]{5345} \cos{\left(\frac{49 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{49 \pi}{113} \right)}$$
       678______    /49*pi\     678______    /49*pi\
y589 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{589} = \sqrt[678]{5345} \cos{\left(\frac{49 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{49 \pi}{113} \right)}$$
       678______    /49*pi\     678______    /49*pi\
y590 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{590} = \sqrt[678]{5345} \cos{\left(\frac{49 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{49 \pi}{113} \right)}$$
         678______    /148*pi\     678______    /148*pi\
y591 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{591} = - \sqrt[678]{5345} \cos{\left(\frac{148 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{148 \pi}{339} \right)}$$
         678______    /148*pi\     678______    /148*pi\
y592 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{592} = - \sqrt[678]{5345} \cos{\left(\frac{148 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{148 \pi}{339} \right)}$$
       678______    /148*pi\     678______    /148*pi\
y593 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{593} = \sqrt[678]{5345} \cos{\left(\frac{148 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{148 \pi}{339} \right)}$$
       678______    /148*pi\     678______    /148*pi\
y594 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{594} = \sqrt[678]{5345} \cos{\left(\frac{148 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{148 \pi}{339} \right)}$$
         678______    /149*pi\     678______    /149*pi\
y595 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{595} = - \sqrt[678]{5345} \cos{\left(\frac{149 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{149 \pi}{339} \right)}$$
         678______    /149*pi\     678______    /149*pi\
y596 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{596} = - \sqrt[678]{5345} \cos{\left(\frac{149 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{149 \pi}{339} \right)}$$
       678______    /149*pi\     678______    /149*pi\
y597 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{597} = \sqrt[678]{5345} \cos{\left(\frac{149 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{149 \pi}{339} \right)}$$
       678______    /149*pi\     678______    /149*pi\
y598 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{598} = \sqrt[678]{5345} \cos{\left(\frac{149 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{149 \pi}{339} \right)}$$
         678______    /50*pi\     678______    /50*pi\
y599 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{599} = - \sqrt[678]{5345} \cos{\left(\frac{50 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{50 \pi}{113} \right)}$$
         678______    /50*pi\     678______    /50*pi\
y600 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{600} = - \sqrt[678]{5345} \cos{\left(\frac{50 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{50 \pi}{113} \right)}$$
       678______    /50*pi\     678______    /50*pi\
y601 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{601} = \sqrt[678]{5345} \cos{\left(\frac{50 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{50 \pi}{113} \right)}$$
       678______    /50*pi\     678______    /50*pi\
y602 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{602} = \sqrt[678]{5345} \cos{\left(\frac{50 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{50 \pi}{113} \right)}$$
         678______    /151*pi\     678______    /151*pi\
y603 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{603} = - \sqrt[678]{5345} \cos{\left(\frac{151 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{151 \pi}{339} \right)}$$
         678______    /151*pi\     678______    /151*pi\
y604 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{604} = - \sqrt[678]{5345} \cos{\left(\frac{151 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{151 \pi}{339} \right)}$$
       678______    /151*pi\     678______    /151*pi\
y605 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{605} = \sqrt[678]{5345} \cos{\left(\frac{151 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{151 \pi}{339} \right)}$$
       678______    /151*pi\     678______    /151*pi\
y606 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{606} = \sqrt[678]{5345} \cos{\left(\frac{151 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{151 \pi}{339} \right)}$$
         678______    /152*pi\     678______    /152*pi\
y607 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{607} = - \sqrt[678]{5345} \cos{\left(\frac{152 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{152 \pi}{339} \right)}$$
         678______    /152*pi\     678______    /152*pi\
y608 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{608} = - \sqrt[678]{5345} \cos{\left(\frac{152 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{152 \pi}{339} \right)}$$
       678______    /152*pi\     678______    /152*pi\
y609 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{609} = \sqrt[678]{5345} \cos{\left(\frac{152 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{152 \pi}{339} \right)}$$
       678______    /152*pi\     678______    /152*pi\
y610 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{610} = \sqrt[678]{5345} \cos{\left(\frac{152 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{152 \pi}{339} \right)}$$
         678______    /51*pi\     678______    /51*pi\
y611 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{611} = - \sqrt[678]{5345} \cos{\left(\frac{51 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{51 \pi}{113} \right)}$$
         678______    /51*pi\     678______    /51*pi\
y612 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{612} = - \sqrt[678]{5345} \cos{\left(\frac{51 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{51 \pi}{113} \right)}$$
       678______    /51*pi\     678______    /51*pi\
y613 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{613} = \sqrt[678]{5345} \cos{\left(\frac{51 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{51 \pi}{113} \right)}$$
       678______    /51*pi\     678______    /51*pi\
y614 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{614} = \sqrt[678]{5345} \cos{\left(\frac{51 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{51 \pi}{113} \right)}$$
         678______    /154*pi\     678______    /154*pi\
y615 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{615} = - \sqrt[678]{5345} \cos{\left(\frac{154 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{154 \pi}{339} \right)}$$
         678______    /154*pi\     678______    /154*pi\
y616 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{616} = - \sqrt[678]{5345} \cos{\left(\frac{154 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{154 \pi}{339} \right)}$$
       678______    /154*pi\     678______    /154*pi\
y617 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{617} = \sqrt[678]{5345} \cos{\left(\frac{154 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{154 \pi}{339} \right)}$$
       678______    /154*pi\     678______    /154*pi\
y618 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{618} = \sqrt[678]{5345} \cos{\left(\frac{154 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{154 \pi}{339} \right)}$$
         678______    /155*pi\     678______    /155*pi\
y619 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{619} = - \sqrt[678]{5345} \cos{\left(\frac{155 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{155 \pi}{339} \right)}$$
         678______    /155*pi\     678______    /155*pi\
y620 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{620} = - \sqrt[678]{5345} \cos{\left(\frac{155 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{155 \pi}{339} \right)}$$
       678______    /155*pi\     678______    /155*pi\
y621 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{621} = \sqrt[678]{5345} \cos{\left(\frac{155 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{155 \pi}{339} \right)}$$
       678______    /155*pi\     678______    /155*pi\
y622 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{622} = \sqrt[678]{5345} \cos{\left(\frac{155 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{155 \pi}{339} \right)}$$
         678______    /52*pi\     678______    /52*pi\
y623 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{623} = - \sqrt[678]{5345} \cos{\left(\frac{52 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{52 \pi}{113} \right)}$$
         678______    /52*pi\     678______    /52*pi\
y624 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{624} = - \sqrt[678]{5345} \cos{\left(\frac{52 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{52 \pi}{113} \right)}$$
       678______    /52*pi\     678______    /52*pi\
y625 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{625} = \sqrt[678]{5345} \cos{\left(\frac{52 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{52 \pi}{113} \right)}$$
       678______    /52*pi\     678______    /52*pi\
y626 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{626} = \sqrt[678]{5345} \cos{\left(\frac{52 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{52 \pi}{113} \right)}$$
         678______    /157*pi\     678______    /157*pi\
y627 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{627} = - \sqrt[678]{5345} \cos{\left(\frac{157 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{157 \pi}{339} \right)}$$
         678______    /157*pi\     678______    /157*pi\
y628 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{628} = - \sqrt[678]{5345} \cos{\left(\frac{157 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{157 \pi}{339} \right)}$$
       678______    /157*pi\     678______    /157*pi\
y629 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{629} = \sqrt[678]{5345} \cos{\left(\frac{157 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{157 \pi}{339} \right)}$$
       678______    /157*pi\     678______    /157*pi\
y630 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{630} = \sqrt[678]{5345} \cos{\left(\frac{157 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{157 \pi}{339} \right)}$$
         678______    /158*pi\     678______    /158*pi\
y631 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{631} = - \sqrt[678]{5345} \cos{\left(\frac{158 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{158 \pi}{339} \right)}$$
         678______    /158*pi\     678______    /158*pi\
y632 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{632} = - \sqrt[678]{5345} \cos{\left(\frac{158 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{158 \pi}{339} \right)}$$
       678______    /158*pi\     678______    /158*pi\
y633 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{633} = \sqrt[678]{5345} \cos{\left(\frac{158 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{158 \pi}{339} \right)}$$
       678______    /158*pi\     678______    /158*pi\
y634 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{634} = \sqrt[678]{5345} \cos{\left(\frac{158 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{158 \pi}{339} \right)}$$
         678______    /53*pi\     678______    /53*pi\
y635 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{635} = - \sqrt[678]{5345} \cos{\left(\frac{53 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{53 \pi}{113} \right)}$$
         678______    /53*pi\     678______    /53*pi\
y636 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{636} = - \sqrt[678]{5345} \cos{\left(\frac{53 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{53 \pi}{113} \right)}$$
       678______    /53*pi\     678______    /53*pi\
y637 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{637} = \sqrt[678]{5345} \cos{\left(\frac{53 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{53 \pi}{113} \right)}$$
       678______    /53*pi\     678______    /53*pi\
y638 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{638} = \sqrt[678]{5345} \cos{\left(\frac{53 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{53 \pi}{113} \right)}$$
         678______    /160*pi\     678______    /160*pi\
y639 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{639} = - \sqrt[678]{5345} \cos{\left(\frac{160 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{160 \pi}{339} \right)}$$
         678______    /160*pi\     678______    /160*pi\
y640 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{640} = - \sqrt[678]{5345} \cos{\left(\frac{160 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{160 \pi}{339} \right)}$$
       678______    /160*pi\     678______    /160*pi\
y641 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{641} = \sqrt[678]{5345} \cos{\left(\frac{160 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{160 \pi}{339} \right)}$$
       678______    /160*pi\     678______    /160*pi\
y642 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{642} = \sqrt[678]{5345} \cos{\left(\frac{160 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{160 \pi}{339} \right)}$$
         678______    /161*pi\     678______    /161*pi\
y643 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{643} = - \sqrt[678]{5345} \cos{\left(\frac{161 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{161 \pi}{339} \right)}$$
         678______    /161*pi\     678______    /161*pi\
y644 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{644} = - \sqrt[678]{5345} \cos{\left(\frac{161 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{161 \pi}{339} \right)}$$
       678______    /161*pi\     678______    /161*pi\
y645 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{645} = \sqrt[678]{5345} \cos{\left(\frac{161 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{161 \pi}{339} \right)}$$
       678______    /161*pi\     678______    /161*pi\
y646 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{646} = \sqrt[678]{5345} \cos{\left(\frac{161 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{161 \pi}{339} \right)}$$
         678______    /54*pi\     678______    /54*pi\
y647 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{647} = - \sqrt[678]{5345} \cos{\left(\frac{54 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{54 \pi}{113} \right)}$$
         678______    /54*pi\     678______    /54*pi\
y648 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{648} = - \sqrt[678]{5345} \cos{\left(\frac{54 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{54 \pi}{113} \right)}$$
       678______    /54*pi\     678______    /54*pi\
y649 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{649} = \sqrt[678]{5345} \cos{\left(\frac{54 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{54 \pi}{113} \right)}$$
       678______    /54*pi\     678______    /54*pi\
y650 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{650} = \sqrt[678]{5345} \cos{\left(\frac{54 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{54 \pi}{113} \right)}$$
         678______    /163*pi\     678______    /163*pi\
y651 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{651} = - \sqrt[678]{5345} \cos{\left(\frac{163 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{163 \pi}{339} \right)}$$
         678______    /163*pi\     678______    /163*pi\
y652 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{652} = - \sqrt[678]{5345} \cos{\left(\frac{163 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{163 \pi}{339} \right)}$$
       678______    /163*pi\     678______    /163*pi\
y653 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{653} = \sqrt[678]{5345} \cos{\left(\frac{163 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{163 \pi}{339} \right)}$$
       678______    /163*pi\     678______    /163*pi\
y654 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{654} = \sqrt[678]{5345} \cos{\left(\frac{163 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{163 \pi}{339} \right)}$$
         678______    /164*pi\     678______    /164*pi\
y655 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{655} = - \sqrt[678]{5345} \cos{\left(\frac{164 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{164 \pi}{339} \right)}$$
         678______    /164*pi\     678______    /164*pi\
y656 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{656} = - \sqrt[678]{5345} \cos{\left(\frac{164 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{164 \pi}{339} \right)}$$
       678______    /164*pi\     678______    /164*pi\
y657 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{657} = \sqrt[678]{5345} \cos{\left(\frac{164 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{164 \pi}{339} \right)}$$
       678______    /164*pi\     678______    /164*pi\
y658 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{658} = \sqrt[678]{5345} \cos{\left(\frac{164 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{164 \pi}{339} \right)}$$
         678______    /55*pi\     678______    /55*pi\
y659 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{659} = - \sqrt[678]{5345} \cos{\left(\frac{55 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{55 \pi}{113} \right)}$$
         678______    /55*pi\     678______    /55*pi\
y660 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{660} = - \sqrt[678]{5345} \cos{\left(\frac{55 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{55 \pi}{113} \right)}$$
       678______    /55*pi\     678______    /55*pi\
y661 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{661} = \sqrt[678]{5345} \cos{\left(\frac{55 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{55 \pi}{113} \right)}$$
       678______    /55*pi\     678______    /55*pi\
y662 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{662} = \sqrt[678]{5345} \cos{\left(\frac{55 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{55 \pi}{113} \right)}$$
         678______    /166*pi\     678______    /166*pi\
y663 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{663} = - \sqrt[678]{5345} \cos{\left(\frac{166 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{166 \pi}{339} \right)}$$
         678______    /166*pi\     678______    /166*pi\
y664 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{664} = - \sqrt[678]{5345} \cos{\left(\frac{166 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{166 \pi}{339} \right)}$$
       678______    /166*pi\     678______    /166*pi\
y665 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{665} = \sqrt[678]{5345} \cos{\left(\frac{166 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{166 \pi}{339} \right)}$$
       678______    /166*pi\     678______    /166*pi\
y666 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{666} = \sqrt[678]{5345} \cos{\left(\frac{166 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{166 \pi}{339} \right)}$$
         678______    /167*pi\     678______    /167*pi\
y667 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{667} = - \sqrt[678]{5345} \cos{\left(\frac{167 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{167 \pi}{339} \right)}$$
         678______    /167*pi\     678______    /167*pi\
y668 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{668} = - \sqrt[678]{5345} \cos{\left(\frac{167 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{167 \pi}{339} \right)}$$
       678______    /167*pi\     678______    /167*pi\
y669 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{669} = \sqrt[678]{5345} \cos{\left(\frac{167 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{167 \pi}{339} \right)}$$
       678______    /167*pi\     678______    /167*pi\
y670 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{670} = \sqrt[678]{5345} \cos{\left(\frac{167 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{167 \pi}{339} \right)}$$
         678______    /56*pi\     678______    /56*pi\
y671 = -  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{671} = - \sqrt[678]{5345} \cos{\left(\frac{56 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{56 \pi}{113} \right)}$$
         678______    /56*pi\     678______    /56*pi\
y672 = -  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                      \ 113 /                  \ 113 /
$$y_{672} = - \sqrt[678]{5345} \cos{\left(\frac{56 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{56 \pi}{113} \right)}$$
       678______    /56*pi\     678______    /56*pi\
y673 =  \/ 5345 *cos|-----| - I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{673} = \sqrt[678]{5345} \cos{\left(\frac{56 \pi}{113} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{56 \pi}{113} \right)}$$
       678______    /56*pi\     678______    /56*pi\
y674 =  \/ 5345 *cos|-----| + I* \/ 5345 *sin|-----|
                    \ 113 /                  \ 113 /
$$y_{674} = \sqrt[678]{5345} \cos{\left(\frac{56 \pi}{113} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{56 \pi}{113} \right)}$$
         678______    /169*pi\     678______    /169*pi\
y675 = -  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{675} = - \sqrt[678]{5345} \cos{\left(\frac{169 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{169 \pi}{339} \right)}$$
         678______    /169*pi\     678______    /169*pi\
y676 = -  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                      \ 339  /                  \ 339  /
$$y_{676} = - \sqrt[678]{5345} \cos{\left(\frac{169 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{169 \pi}{339} \right)}$$
       678______    /169*pi\     678______    /169*pi\
y677 =  \/ 5345 *cos|------| - I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{677} = \sqrt[678]{5345} \cos{\left(\frac{169 \pi}{339} \right)} - \sqrt[678]{5345} i \sin{\left(\frac{169 \pi}{339} \right)}$$
       678______    /169*pi\     678______    /169*pi\
y678 =  \/ 5345 *cos|------| + I* \/ 5345 *sin|------|
                    \ 339  /                  \ 339  /
$$y_{678} = \sqrt[678]{5345} \cos{\left(\frac{169 \pi}{339} \right)} + \sqrt[678]{5345} i \sin{\left(\frac{169 \pi}{339} \right)}$$
y678 = 5345^(1/678)*cos(169*pi/339) + 5345^(1/678)*i*sin(169*pi/339)
Respuesta numérica [src]
y1 = -0.481794272049716 - 0.890796764078913*i
y2 = -0.929708575602561 + 0.401604979954725*i
y3 = 0.66642257134282 + 0.76257822672707*i
y4 = -0.514476621509812 - 0.872329296420353*i
y5 = 0.914186227853246 + 0.435784506696638*i
y6 = -0.947312873191576 + 0.358110200579235*i
y7 = 0.74056528560697 + 0.6908021809659*i
y8 = 1.00162859992241 - 0.149615317701237*i
y9 = -0.577676793884557 + 0.831825773392864*i
y10 = 1.00019908901717 - 0.158891087863964*i
y11 = 0.98348523624848 + 0.241663786187855*i
y12 = 0.962883614992201 + 0.313846681443231*i
y13 = 0.694226249051362 - 0.73735643389168*i
y14 = -0.362495825983449 + 0.945643363862907*i
y15 = 0.7656579765356 - 0.66288193401298*i
y16 = -0.753241006519381 - 0.676958330749425*i
y17 = 0.989822975536512 + 0.214231352918809*i
y18 = 0.701029596137653 - 0.730891305744196*i
y19 = 1.00922064822314 + 0.0843698919843412*i
y20 = 0.630384965885758 + 0.792628153839232*i
y21 = -0.914186227853246 + 0.435784506696638*i
y22 = 0.218815497737835 + 0.988819687012309*i
y23 = 0.922105781114568 + 0.418766670006665*i
y24 = 0.879396449352068 - 0.502301184888462*i
y25 = 0.448449961849348 - 0.908040322447575*i
y26 = 0.777811930218549 - 0.648577826234503*i
y27 = 0.7656579765356 + 0.66288193401298*i
y28 = -0.200451714884808 - 0.992705246018735*i
y29 = -0.962883614992201 - 0.313846681443231*i
y30 = 0.680441281683054 + 0.750096165604718*i
y31 = 0.0983903160732976 - 1.00795036642504*i
y32 = -0.172778908741095 + 0.997893804053124*i
y33 = 0.344907569277459 + 0.952199225019897*i
y34 = 1.00995917619081 - 0.0750137180878756*i
y35 = 0.172778908741095 + 0.997893804053124*i
y36 = -0.50637056477282 - 0.877059545643871*i
y37 = -0.879396449352068 - 0.502301184888462*i
y38 = 0.0609676292669508 + 1.01090431973305*i
y39 = -0.371243634036656 - 0.942243471540469*i
y40 = -0.652174933692356 - 0.77479832946177*i
y41 = 0.172778908741095 - 0.997893804053124*i
y42 = 0.237104113804069 + 0.984594451888982*i
y43 = 0.721076095325207 + 0.711121550948874*i
y44 = 0.182019073511839 + 0.99624979415369*i
y45 = -0.783788967651746 + 0.641341913226314*i
y46 = 0.16352390553983 - 0.999452113805548*i
y47 = -0.405908567145188 - 0.92783771781035*i
y48 = 0.978837460692177 - 0.259849612312718*i
y49 = 0.850122098357627 + 0.550397141487311*i
y50 = -0.759482104079901 - 0.669948900331767*i
y51 = -0.987795168161027 + 0.223394944506601*i
y52 = 0.530555491276454 + 0.862644461032341*i
y53 = 0.309381693853458 + 0.964327518523527*i
y54 = -0.16352390553983 + 0.999452113805548*i
y55 = 0.95993381896471 - 0.322756345686968*i
y56 = -0.50637056477282 + 0.877059545643871*i
y57 = 0.264382364919737 + 0.977622913291636*i
y58 = -0.300431887060782 - 0.967153181616271*i
y59 = 0.514476621509812 - 0.872329296420353*i
y60 = 0.82371546504127 + 0.589183696418377*i
y61 = -0.0515968575195356 - 1.01142590423989*i
y62 = -0.117054172874149 - 1.00595373456543*i
y63 = -0.309381693853458 - 0.964327518523527*i
y64 = -0.379959559304457 + 0.938762658378858*i
y65 = 0.0796926605516648 + 1.0096007504591*i
y66 = 0.630384965885758 - 0.792628153839232*i
y67 = -0.608107782987935 + 0.809845367797382*i
y68 = -0.397292770155717 - 0.931559472205277*i
y69 = -0.600576750640546 - 0.815445989666649*i
y70 = 0.371243634036656 + 0.942243471540469*i
y71 = -1.01234976332617 - 0.0281523030465717*i
y72 = -0.70777273808067 - 0.724363407899081*i
y73 = -0.530555491276454 + 0.862644461032341*i
y74 = -0.860176817980288 - 0.534546945817376*i
y75 = 0.309381693853458 - 0.964327518523527*i
y76 = -0.0796926605516648 + 1.0096007504591*i
y77 = 0.448449961849348 + 0.908040322447575*i
y78 = 0.673460845268224 - 0.756369675069002*i
y79 = -1.00019908901717 + 0.158891087863964*i
y80 = -1.01269764192034 - 0.00938517567051244*i
y81 = 0.126371422694474 - 1.00482578539743*i
y82 = -0.687363281100245 - 0.74375823710967*i
y83 = 0.783788967651746 - 0.641341913226314*i
y84 = -0.514476621509812 + 0.872329296420353*i
y85 = -0.291456278868415 - 0.969895784598302*i
y86 = 0.456845607755411 + 0.903845499047247*i
y87 = 0.860176817980288 + 0.534546945817376*i
y88 = 0.922105781114568 - 0.418766670006665*i
y89 = 0.615586590413004 + 0.804175195574366*i
y90 = 0.600576750640546 - 0.815445989666649*i
y91 = -0.73413175085904 + 0.697635411840611*i
y92 = -0.933390367879058 + 0.392972030332917*i
y93 = 0.237104113804069 - 0.984594451888982*i
y94 = -0.344907569277459 + 0.952199225019897*i
y95 = 0.701029596137653 + 0.730891305744196*i
y96 = 0.318304930627825 + 0.961419037990924*i
y97 = 0.623012530628075 + 0.798435959957829*i
y98 = 0.405908567145188 + 0.92783771781035*i
y99 = -0.850122098357627 - 0.550397141487311*i
y100 = 0.933390367879058 - 0.392972030332917*i
y101 = -0.865093582786425 + 0.526552645511467*i
y102 = 0.490028688314186 - 0.886293675991461*i
y103 = -0.943953551218903 - 0.366873668467226*i
y104 = -0.22796959490268 + 0.986749440979465*i
y105 = -0.246218269960116 - 0.982354904813543*i
y106 = -0.577676793884557 - 0.831825773392864*i
y107 = -0.985682527919776 + 0.232539350706622*i
y108 = -0.971235864663108 + 0.286959040048371*i
y109 = 0.414489504289117 - 0.924036279757208*i
y110 = -1.01234976332617 + 0.0281523030465717*i
y111 = 0.910108512613398 + 0.444237651198102*i
y112 = 0.869936052465245 + 0.518513124322389*i
y113 = -0.812654402728412 + 0.604348754610701*i
y114 = 1.01204540223348 - 0.0375326430119028*i
y115 = 0.0328428256030882 + 1.01220844902608*i
y116 = -0.600576750640546 + 0.815445989666649*i
y117 = 0.88401356409145 + 0.49413015894166*i
y118 = -0.7656579765356 - 0.66288193401298*i
y119 = -0.936991999630036 - 0.384305331868665*i
y120 = 0.818220068675681 - 0.596791852063801*i
y121 = 0.608107782987935 + 0.809845367797382*i
y122 = 0.530555491276454 - 0.862644461032341*i
y123 = -0.74693521984592 - 0.683909623288856*i
y124 = 0.971235864663108 - 0.286959040048371*i
y125 = -0.318304930627825 + 0.961419037990924*i
y126 = 0.20964260847282 - 0.990805012192656*i
y127 = 0.965750717583755 + 0.304910063723454*i
y128 = 0.144972564368617 + 1.0023111049239*i
y129 = -0.905952636317725 + 0.452652644112835*i
y130 = -0.0515968575195356 + 1.01142590423989*i
y131 = -0.144972564368617 - 1.0023111049239*i
y132 = 0.154254858737244 + 1.00092458958172*i
y133 = 0.771768093496194 + 0.655758038711405*i
y134 = -1.01061096782489 - 0.0656511019360902*i
y135 = -0.82371546504127 + 0.589183696418377*i
y136 = 0.414489504289117 + 0.924036279757208*i
y137 = 0.00469263821160158 + 1.01273025758096*i
y138 = -0.66642257134282 + 0.76257822672707*i
y139 = 0.950590838959644 + 0.34931597781862*i
y140 = 0.71445509577244 + 0.717773300978918*i
y141 = -1.00540055314365 + 0.121714104407895*i
y142 = -0.569943373591827 - 0.837143444322504*i
y143 = -0.777811930218549 + 0.648577826234503*i
y144 = -0.74056528560697 - 0.6908021809659*i
y145 = -0.936991999630036 + 0.384305331868665*i
y146 = 0.973853438080831 + 0.277946175745456*i
y147 = 0.95993381896471 + 0.322756345686968*i
y148 = -0.00469263821160158 - 1.01273025758096*i
y149 = -0.344907569277459 - 0.952199225019897*i
y150 = -0.910108512613398 + 0.444237651198102*i
y151 = -0.630384965885758 + 0.792628153839232*i
y152 = -0.20964260847282 + 0.990805012192656*i
y153 = 0.936991999630036 + 0.384305331868665*i
y154 = -0.264382364919737 - 0.977622913291636*i
y155 = 0.953787167008033 - 0.340491755442285*i
y156 = 1.00540055314365 + 0.121714104407895*i
y157 = -0.414489504289117 - 0.924036279757208*i
y158 = -0.860176817980288 + 0.534546945817376*i
y159 = 1.00748364443276 + 0.10305969956221*i
y160 = -0.538526923436219 - 0.85769070661148*i
y161 = 0.291456278868415 + 0.969895784598302*i
y162 = -0.9569015828328 + 0.33163829128353*i
y163 = 0.0515968575195356 + 1.01142590423989*i
y164 = -1.00162859992241 + 0.149615317701237*i
y165 = -0.673460845268224 + 0.756369675069002*i
y166 = -0.997082502969816 - 0.177400895558128*i
y167 = 0.135677819606945 + 1.00361154075672*i
y168 = -1.01165412563996 + 0.0469097596352203*i
y169 = 0.423034844647789 + 0.920155484517263*i
y170 = -0.182019073511839 + 0.99624979415369*i
y171 = -0.874703811140467 + 0.510429072692495*i
y172 = 0.66642257134282 - 0.76257822672707*i
y173 = -0.962883614992201 + 0.313846681443231*i
y174 = -0.327200831047122 + 0.958427989801764*i
y175 = 0.473518478797258 + 0.895223349623382*i
y176 = -0.336068631122266 - 0.955354630830345*i
y177 = -1.00748364443276 + 0.10305969956221*i
y178 = 0.777811930218549 + 0.648577826234503*i
y179 = 1.01117596714885 - 0.0562828476000967*i
y180 = -0.318304930627825 - 0.961419037990924*i
y181 = 1.01256718277919 + 0.0187695453324783*i
y182 = 0.869936052465245 - 0.518513124322389*i
y183 = -0.154254858737244 - 1.00092458958172*i
y184 = 0.117054172874149 - 1.00595373456543*i
y185 = 0.353716886415595 - 0.94896204335992*i
y186 = -0.0796926605516648 - 1.0096007504591*i
y187 = 0.925946938996657 - 0.410203439327487*i
y188 = -0.255311280637711 - 0.980030992087755*i
y189 = 0.73413175085904 + 0.697635411840611*i
y190 = -1.00019908901717 - 0.158891087863964*i
y191 = 0.991765775896049 + 0.205049362921922*i
y192 = -0.530555491276454 - 0.862644461032341*i
y193 = 1.01165412563996 - 0.0469097596352203*i
y194 = 0.897407834884543 + 0.469365287767656*i
y195 = 1.01061096782489 - 0.0656511019360902*i
y196 = -0.680441281683054 - 0.750096165604718*i
y197 = -0.66642257134282 - 0.76257822672707*i
y198 = 0.795540597175037 + 0.626705476056946*i
y199 = -0.43154385433858 - 0.916195665377206*i
y200 = 0.592994140143648 - 0.820976580194998*i
y201 = -0.933390367879058 - 0.392972030332917*i
y202 = -0.727635168120714 + 0.704408729068087*i
y203 = -1.00995917619081 + 0.0750137180878756*i
y204 = 0.379959559304457 - 0.938762658378858*i
y205 = 0.0703331650516116 - 1.01029591772272*i
y206 = -1.01204540223348 - 0.0375326430119028*i
y207 = 0.0234611760496203 + 1.01246934209967*i
y208 = -0.291456278868415 + 0.969895784598302*i
y209 = 0.978837460692177 + 0.259849612312718*i
y210 = -0.7656579765356 + 0.66288193401298*i
y211 = 0.998683679984678 - 0.16815321229652*i
y212 = -0.998683679984678 - 0.16815321229652*i
y213 = 0.255311280637711 - 0.980030992087755*i
y214 = -0.795540597175037 - 0.626705476056946*i
y215 = 0.327200831047122 - 0.958427989801764*i
y216 = -0.135677819606945 + 1.00361154075672*i
y217 = -0.481794272049716 + 0.890796764078913*i
y218 = 0.801314180023091 + 0.619306208888058*i
y219 = -0.172778908741095 - 0.997893804053124*i
y220 = 0.727635168120714 + 0.704408729068087*i
y221 = 0.839775347561786 - 0.566058266524621*i
y222 = 1.00995917619081 + 0.0750137180878756*i
y223 = 1.01117596714885 + 0.0562828476000967*i
y224 = -0.897407834884543 + 0.469365287767656*i
y225 = 0.943953551218903 + 0.366873668467226*i
y226 = 0.0890453119640034 - 1.00881887764386*i
y227 = 0.318304930627825 - 0.961419037990924*i
y228 = -0.839775347561786 - 0.566058266524621*i
y229 = -0.117054172874149 + 1.00595373456543*i
y230 = -0.362495825983449 - 0.945643363862907*i
y231 = 0.362495825983449 - 0.945643363862907*i
y232 = -0.353716886415595 - 0.94896204335992*i
y233 = 0.834493567301581 + 0.573816243762461*i
y234 = 0.818220068675681 + 0.596791852063801*i
y235 = 0.953787167008033 + 0.340491755442285*i
y236 = -0.918185431838887 + 0.427293936573191*i
y237 = 0.989822975536512 - 0.214231352918809*i
y238 = 0.154254858737244 - 1.00092458958172*i
y239 = -0.0140775116262051 - 1.01264328326405*i
y240 = -1.00922064822314 - 0.0843698919843412*i
y241 = 0.538526923436219 - 0.85769070661148*i
y242 = 0.644966793569084 + 0.7808088310634*i
y243 = 0.985682527919776 - 0.232539350706622*i
y244 = -0.965750717583755 + 0.304910063723454*i
y245 = 0.96853488050965 - 0.295947260013564*i
y246 = 0.43154385433858 - 0.916195665377206*i
y247 = -0.694226249051362 - 0.73735643389168*i
y248 = 0.850122098357627 - 0.550397141487311*i
y249 = -0.585360602699634 + 0.82643666440962*i
y250 = -0.644966793569084 - 0.7808088310634*i
y251 = 0.860176817980288 - 0.534546945817376*i
y252 = -0.498221020410525 - 0.881714472090865*i
y253 = 0.423034844647789 - 0.920155484517263*i
y254 = 0.43154385433858 + 0.916195665377206*i
y255 = -0.608107782987935 - 0.809845367797382*i
y256 = 0.905952636317725 + 0.452652644112835*i
y257 = -0.925946938996657 - 0.410203439327487*i
y258 = -0.950590838959644 - 0.34931597781862*i
y259 = 0.264382364919737 - 0.977622913291636*i
y260 = 0.807018945184584 + 0.611853755064508*i
y261 = 0.255311280637711 + 0.980030992087755*i
y262 = 0.615586590413004 - 0.804175195574366*i
y263 = -0.43154385433858 + 0.916195665377206*i
y264 = -0.73413175085904 - 0.697635411840611*i
y265 = -0.569943373591827 + 0.837143444322504*i
y266 = -0.74056528560697 + 0.6908021809659*i
y267 = -0.0328428256030882 + 1.01220844902608*i
y268 = 0.218815497737835 - 0.988819687012309*i
y269 = 0.440015802598978 + 0.912157162410379*i
y270 = 0.940513161543654 - 0.375605628866951*i
y271 = -0.135677819606945 - 1.00361154075672*i
y272 = 0.947312873191576 - 0.358110200579235*i
y273 = -0.88401356409145 - 0.49413015894166*i
y274 = -0.154254858737244 + 1.00092458958172*i
y275 = -0.759482104079901 + 0.669948900331767*i
y276 = -0.273430743772138 - 0.97513087523347*i
y277 = -0.998683679984678 + 0.16815321229652*i
y278 = 0.829140119874884 - 0.581524941070666*i
y279 = -0.801314180023091 + 0.619306208888058*i
y280 = 0.554330359393434 + 0.84756265144715*i
y281 = 0.652174933692356 - 0.77479832946177*i
y282 = 0.379959559304457 + 0.938762658378858*i
y283 = -0.834493567301581 - 0.573816243762461*i
y284 = -1.00162859992241 - 0.149615317701237*i
y285 = -0.914186227853246 - 0.435784506696638*i
y286 = -0.95993381896471 - 0.322756345686968*i
y287 = -1.00648531778573 - 0.1123917281437*i
y288 = -0.801314180023091 - 0.619306208888058*i
y289 = -0.976387375962918 - 0.268909441138882*i
y290 = -0.855186180303655 + 0.542495338681378*i
y291 = -0.96853488050965 - 0.295947260013564*i
y292 = 0.0515968575195356 - 1.01142590423989*i
y293 = 0.585360602699634 + 0.82643666440962*i
y294 = 0.9569015828328 + 0.33163829128353*i
y295 = -0.144972564368617 + 1.0023111049239*i
y296 = -0.727635168120714 - 0.704408729068087*i
y297 = 0.273430743772138 + 0.97513087523347*i
y298 = -0.490028688314186 - 0.886293675991461*i
y299 = -0.546452106349501 - 0.852663292829926*i
y300 = -0.16352390553983 - 0.999452113805548*i
y301 = 0.291456278868415 - 0.969895784598302*i
y302 = 0.652174933692356 + 0.77479832946177*i
y303 = 0.971235864663108 + 0.286959040048371*i
y304 = -0.947312873191576 - 0.358110200579235*i
y305 = 0.950590838959644 - 0.34931597781862*i
y306 = -0.562161005975539 - 0.842389220511485*i
y307 = -0.353716886415595 + 0.94896204335992*i
y308 = 0.0983903160732976 + 1.00795036642504*i
y309 = 1.00648531778573 - 0.1123917281437*i
y310 = 0.397292770155717 - 0.931559472205277*i
y311 = 0.98348523624848 - 0.241663786187855*i
y312 = 0.336068631122266 + 0.955354630830345*i
y313 = -0.423034844647789 + 0.920155484517263*i
y314 = 0.353716886415595 + 0.94896204335992*i
y315 = -0.615586590413004 - 0.804175195574366*i
y316 = 1.01234976332617 - 0.0281523030465717*i
y317 = -0.855186180303655 - 0.542495338681378*i
y318 = 0.608107782987935 - 0.809845367797382*i
y319 = 1.01269764192034 + 0.00938517567051244*i
y320 = 0.0422216545808886 - 1.01186062644903*i
y321 = -0.456845607755411 - 0.903845499047247*i
y322 = 0.965750717583755 - 0.304910063723454*i
y323 = -0.440015802598978 - 0.912157162410379*i
y324 = -1.00422944366722 - 0.131026027739525*i
y325 = -0.107726870320976 + 1.00699529139129*i
y326 = 0.865093582786425 + 0.526552645511467*i
y327 = -0.981203481852808 + 0.250767467334389*i
y328 = -0.812654402728412 - 0.604348754610701*i
y329 = -0.978837460692177 + 0.259849612312718*i
y330 = -0.893019643583376 - 0.477661503208704*i
y331 = -0.901718955877163 + 0.461028762752583*i
y332 = 0.585360602699634 - 0.82643666440962*i
y333 = 0.865093582786425 - 0.526552645511467*i
y334 = -1.00995917619081 - 0.0750137180878756*i
y335 = 0.0140775116262051 + 1.01264328326405*i
y336 = -0.00469263821160158 + 1.01273025758096*i
y337 = 0.976387375962918 + 0.268909441138882*i
y338 = 0.107726870320976 + 1.00699529139129*i
y339 = -0.687363281100245 + 0.74375823710967*i
y340 = 0.795540597175037 - 0.626705476056946*i
y341 = -0.777811930218549 - 0.648577826234503*i
y342 = 0.995395695483316 + 0.186633343448228*i
y343 = 0.897407834884543 - 0.469365287767656*i
y344 = 0.569943373591827 - 0.837143444322504*i
y345 = 0.577676793884557 + 0.831825773392864*i
y346 = -0.96853488050965 + 0.295947260013564*i
y347 = -0.995395695483316 + 0.186633343448228*i
y348 = 0.96853488050965 + 0.295947260013564*i
y349 = -0.585360602699634 - 0.82643666440962*i
y350 = -0.218815497737835 - 0.988819687012309*i
y351 = 1.00839544734742 + 0.0937188201076425*i
y352 = -0.498221020410525 + 0.881714472090865*i
y353 = 0.901718955877163 + 0.461028762752583*i
y354 = -1.01274112954564
y355 = -0.818220068675681 + 0.596791852063801*i
y356 = 0.0703331650516116 + 1.01029591772272*i
y357 = -0.721076095325207 + 0.711121550948874*i
y358 = -0.789698692481659 + 0.634050921114492*i
y359 = 0.498221020410525 + 0.881714472090865*i
y360 = 0.905952636317725 - 0.452652644112835*i
y361 = 0.637703263033725 + 0.786752275998944*i
y362 = -0.637703263033725 + 0.786752275998944*i
y363 = 1.00748364443276 - 0.10305969956221*i
y364 = 0.680441281683054 - 0.750096165604718*i
y365 = 1.00540055314365 - 0.121714104407895*i
y366 = -0.701029596137653 - 0.730891305744196*i
y367 = 0.481794272049716 - 0.890796764078913*i
y368 = -0.71445509577244 - 0.717773300978918*i
y369 = -0.95993381896471 + 0.322756345686968*i
y370 = 0.976387375962918 - 0.268909441138882*i
y371 = -0.879396449352068 + 0.502301184888462*i
y372 = 0.936991999630036 - 0.384305331868665*i
y373 = -0.237104113804069 - 0.984594451888982*i
y374 = 0.490028688314186 + 0.886293675991461*i
y375 = 0.888554758836045 - 0.485916696588207*i
y376 = 0.910108512613398 - 0.444237651198102*i
y377 = -1.00540055314365 - 0.121714104407895*i
y378 = 0.753241006519381 + 0.676958330749425*i
y379 = -0.993623402389942 + 0.195849763074694*i
y380 = -0.448449961849348 - 0.908040322447575*i
y381 = -0.9569015828328 - 0.33163829128353*i
y382 = 0.1912436062972 - 0.994520225296509*i
y383 = -0.865093582786425 - 0.526552645511467*i
y384 = -0.869936052465245 + 0.518513124322389*i
y385 = -0.0140775116262051 + 1.01264328326405*i
y386 = 0.918185431838887 - 0.427293936573191*i
y387 = -0.978837460692177 - 0.259849612312718*i
y388 = -0.829140119874884 - 0.581524941070666*i
y389 = 0.0422216545808886 + 1.01186062644903*i
y390 = 0.637703263033725 - 0.786752275998944*i
y391 = -0.771768093496194 + 0.655758038711405*i
y392 = 0.888554758836045 + 0.485916696588207*i
y393 = 0.759482104079901 - 0.669948900331767*i
y394 = 0.546452106349501 - 0.852663292829926*i
y395 = 1.00297208993253 + 0.140326698421029*i
y396 = -0.989822975536512 + 0.214231352918809*i
y397 = -0.888554758836045 + 0.485916696588207*i
y398 = 0.991765775896049 - 0.205049362921922*i
y399 = -0.0422216545808886 - 1.01186062644903*i
y400 = 0.981203481852808 - 0.250767467334389*i
y401 = -0.918185431838887 - 0.427293936573191*i
y402 = -0.844985007050775 - 0.558251675620217*i
y403 = 0.50637056477282 - 0.877059545643871*i
y404 = 0.918185431838887 + 0.427293936573191*i
y405 = 0.481794272049716 + 0.890796764078913*i
y406 = -0.0609676292669508 + 1.01090431973305*i
y407 = -0.0234611760496203 + 1.01246934209967*i
y408 = -0.522538494465006 + 0.867524130658982*i
y409 = 1.01204540223348 + 0.0375326430119028*i
y410 = 0.893019643583376 - 0.477661503208704*i
y411 = 0.807018945184584 - 0.611853755064508*i
y412 = -0.637703263033725 - 0.786752275998944*i
y413 = -0.701029596137653 + 0.730891305744196*i
y414 = 1.00839544734742 - 0.0937188201076425*i
y415 = -0.0983903160732976 + 1.00795036642504*i
y416 = -0.200451714884808 + 0.992705246018735*i
y417 = -0.950590838959644 + 0.34931597781862*i
y418 = -0.623012530628075 - 0.798435959957829*i
y419 = -0.0890453119640034 + 1.00881887764386*i
y420 = 0.22796959490268 - 0.986749440979465*i
y421 = -0.71445509577244 + 0.717773300978918*i
y422 = -0.971235864663108 - 0.286959040048371*i
y423 = -0.993623402389942 - 0.195849763074694*i
y424 = 1.00162859992241 + 0.149615317701237*i
y425 = -0.546452106349501 + 0.852663292829926*i
y426 = -1.00648531778573 + 0.1123917281437*i
y427 = -0.126371422694474 + 1.00482578539743*i
y428 = -0.423034844647789 - 0.920155484517263*i
y429 = 1.00297208993253 - 0.140326698421029*i
y430 = 0.0609676292669508 - 1.01090431973305*i
y431 = 0.644966793569084 - 0.7808088310634*i
y432 = 0.844985007050775 - 0.558251675620217*i
y433 = -0.925946938996657 + 0.410203439327487*i
y434 = 0.569943373591827 + 0.837143444322504*i
y435 = 0.562161005975539 - 0.842389220511485*i
y436 = -0.991765775896049 + 0.205049362921922*i
y437 = 0.901718955877163 - 0.461028762752583*i
y438 = -1.00748364443276 - 0.10305969956221*i
y439 = -0.0890453119640034 - 1.00881887764386*i
y440 = 0.71445509577244 - 0.717773300978918*i
y441 = -0.327200831047122 - 0.958427989801764*i
y442 = 0.246218269960116 + 0.982354904813543*i
y443 = -0.237104113804069 + 0.984594451888982*i
y444 = 0.993623402389942 - 0.195849763074694*i
y445 = -0.943953551218903 + 0.366873668467226*i
y446 = -0.850122098357627 + 0.550397141487311*i
y447 = 0.300431887060782 - 0.967153181616271*i
y448 = -1.00297208993253 - 0.140326698421029*i
y449 = 0.592994140143648 + 0.820976580194998*i
y450 = -0.309381693853458 + 0.964327518523527*i
y451 = 1.01165412563996 + 0.0469097596352203*i
y452 = -1.01269764192034 + 0.00938517567051244*i
y453 = 0.126371422694474 + 1.00482578539743*i
y454 = 0.246218269960116 - 0.982354904813543*i
y455 = 0.20964260847282 + 0.990805012192656*i
y456 = 0.687363281100245 + 0.74375823710967*i
y457 = 1.00922064822314 - 0.0843698919843412*i
y458 = -0.953787167008033 + 0.340491755442285*i
y459 = 0.687363281100245 - 0.74375823710967*i
y460 = 0.997082502969816 - 0.177400895558128*i
y461 = 0.727635168120714 - 0.704408729068087*i
y462 = 0.200451714884808 + 0.992705246018735*i
y463 = -0.1912436062972 - 0.994520225296509*i
y464 = -0.300431887060782 + 0.967153181616271*i
y465 = -0.888554758836045 - 0.485916696588207*i
y466 = 0.327200831047122 + 0.958427989801764*i
y467 = 1.01234976332617 + 0.0281523030465717*i
y468 = -0.414489504289117 + 0.924036279757208*i
y469 = 0.82371546504127 - 0.589183696418377*i
y470 = 0.74693521984592 - 0.683909623288856*i
y471 = 0.600576750640546 + 0.815445989666649*i
y472 = -0.644966793569084 + 0.7808088310634*i
y473 = -0.0609676292669508 - 1.01090431973305*i
y474 = 0.673460845268224 + 0.756369675069002*i
y475 = 0.465202019290455 + 0.899573052465146*i
y476 = -0.753241006519381 + 0.676958330749425*i
y477 = 0.623012530628075 - 0.798435959957829*i
y478 = 0.962883614992201 - 0.313846681443231*i
y479 = -0.405908567145188 + 0.92783771781035*i
y480 = 0.789698692481659 + 0.634050921114492*i
y481 = -1.00839544734742 - 0.0937188201076425*i
y482 = 1.01256718277919 - 0.0187695453324783*i
y483 = 0.200451714884808 - 0.992705246018735*i
y484 = -0.264382364919737 + 0.977622913291636*i
y485 = 0.440015802598978 - 0.912157162410379*i
y486 = -0.953787167008033 - 0.340491755442285*i
y487 = -1.00839544734742 + 0.0937188201076425*i
y488 = 0.812654402728412 + 0.604348754610701*i
y489 = -0.126371422694474 - 1.00482578539743*i
y490 = 0.22796959490268 + 0.986749440979465*i
y491 = -0.897407834884543 - 0.469365287767656*i
y492 = -0.538526923436219 + 0.85769070661148*i
y493 = -0.615586590413004 + 0.804175195574366*i
y494 = -0.371243634036656 + 0.942243471540469*i
y495 = 0.16352390553983 + 0.999452113805548*i
y496 = -1.01165412563996 - 0.0469097596352203*i
y497 = -0.985682527919776 - 0.232539350706622*i
y498 = -1.00422944366722 + 0.131026027739525*i
y499 = -0.490028688314186 + 0.886293675991461*i
y500 = 0.694226249051362 + 0.73735643389168*i
y501 = 0.659327064361049 - 0.768721287382117*i
y502 = 0.70777273808067 - 0.724363407899081*i
y503 = -0.630384965885758 - 0.792628153839232*i
y504 = 0.117054172874149 + 1.00595373456543*i
y505 = 0.839775347561786 + 0.566058266524621*i
y506 = 0.300431887060782 + 0.967153181616271*i
y507 = -0.807018945184584 - 0.611853755064508*i
y508 = -0.98348523624848 + 0.241663786187855*i
y509 = 0.0796926605516648 - 1.0096007504591*i
y510 = -0.456845607755411 + 0.903845499047247*i
y511 = 0.995395695483316 - 0.186633343448228*i
y512 = 0.522538494465006 + 0.867524130658982*i
y513 = 0.0140775116262051 - 1.01264328326405*i
y514 = -0.0328428256030882 - 1.01220844902608*i
y515 = -0.721076095325207 - 0.711121550948874*i
y516 = 0.759482104079901 + 0.669948900331767*i
y517 = -1.00297208993253 + 0.140326698421029*i
y518 = -0.218815497737835 + 0.988819687012309*i
y519 = 0.753241006519381 - 0.676958330749425*i
y520 = 0.940513161543654 + 0.375605628866951*i
y521 = -0.623012530628075 + 0.798435959957829*i
y522 = 0.0328428256030882 - 1.01220844902608*i
y523 = 0.336068631122266 - 0.955354630830345*i
y524 = 0.74056528560697 - 0.6908021809659*i
y525 = -0.74693521984592 + 0.683909623288856*i
y526 = -0.592994140143648 - 0.820976580194998*i
y527 = -0.0703331650516116 - 1.01029591772272*i
y528 = -0.844985007050775 + 0.558251675620217*i
y529 = 0.812654402728412 - 0.604348754610701*i
y530 = 0.135677819606945 - 1.00361154075672*i
y531 = -0.976387375962918 + 0.268909441138882*i
y532 = -1.00922064822314 + 0.0843698919843412*i
y533 = 0.987795168161027 + 0.223394944506601*i
y534 = 0.577676793884557 - 0.831825773392864*i
y535 = 0.943953551218903 - 0.366873668467226*i
y536 = -0.874703811140467 - 0.510429072692495*i
y537 = -0.940513161543654 - 0.375605628866951*i
y538 = -0.554330359393434 + 0.84756265144715*i
y539 = 0.9569015828328 - 0.33163829128353*i
y540 = 0.107726870320976 - 1.00699529139129*i
y541 = 0.829140119874884 + 0.581524941070666*i
y542 = 0.00469263821160158 - 1.01273025758096*i
y543 = -0.388642853254218 - 0.935201223313891*i
y544 = 0.282455640110827 + 0.972555091932052*i
y545 = -0.554330359393434 - 0.84756265144715*i
y546 = 0.933390367879058 + 0.392972030332917*i
y547 = -0.522538494465006 - 0.867524130658982*i
y548 = 1.00019908901717 + 0.158891087863964*i
y549 = 0.562161005975539 + 0.842389220511485*i
y550 = -0.893019643583376 + 0.477661503208704*i
y551 = -0.973853438080831 + 0.277946175745456*i
y552 = -0.783788967651746 - 0.641341913226314*i
y553 = 0.465202019290455 - 0.899573052465146*i
y554 = 0.514476621509812 + 0.872329296420353*i
y555 = 0.388642853254218 - 0.935201223313891*i
y556 = -0.869936052465245 - 0.518513124322389*i
y557 = 0.362495825983449 + 0.945643363862907*i
y558 = -1.01061096782489 + 0.0656511019360902*i
y559 = 0.834493567301581 - 0.573816243762461*i
y560 = -0.0234611760496203 - 1.01246934209967*i
y561 = 0.659327064361049 + 0.768721287382117*i
y562 = -0.88401356409145 + 0.49413015894166*i
y563 = 0.344907569277459 - 0.952199225019897*i
y564 = 0.50637056477282 + 0.877059545643871*i
y565 = 0.973853438080831 - 0.277946175745456*i
y566 = -0.0983903160732976 - 1.00795036642504*i
y567 = 0.74693521984592 + 0.683909623288856*i
y568 = 0.929708575602561 + 0.401604979954725*i
y569 = -0.255311280637711 + 0.980030992087755*i
y570 = 0.855186180303655 - 0.542495338681378*i
y571 = -0.465202019290455 + 0.899573052465146*i
y572 = 0.273430743772138 - 0.97513087523347*i
y573 = 0.771768093496194 - 0.655758038711405*i
y574 = -0.995395695483316 - 0.186633343448228*i
y575 = -0.989822975536512 - 0.214231352918809*i
y576 = -0.940513161543654 + 0.375605628866951*i
y577 = 0.874703811140467 - 0.510429072692495*i
y578 = -0.694226249051362 + 0.73735643389168*i
y579 = -0.397292770155717 + 0.931559472205277*i
y580 = -0.659327064361049 + 0.768721287382117*i
y581 = -0.592994140143648 + 0.820976580194998*i
y582 = -0.473518478797258 - 0.895223349623382*i
y583 = 1.00648531778573 + 0.1123917281437*i
y584 = 0.371243634036656 - 0.942243471540469*i
y585 = -0.0703331650516116 + 1.01029591772272*i
y586 = 0.844985007050775 + 0.558251675620217*i
y587 = 0.88401356409145 - 0.49413015894166*i
y588 = -0.388642853254218 + 0.935201223313891*i
y589 = -0.839775347561786 + 0.566058266524621*i
y590 = 0.987795168161027 - 0.223394944506601*i
y591 = 0.981203481852808 + 0.250767467334389*i
y592 = 0.985682527919776 + 0.232539350706622*i
y593 = -0.246218269960116 + 0.982354904813543*i
y594 = -0.659327064361049 - 0.768721287382117*i
y595 = -0.0422216545808886 + 1.01186062644903*i
y596 = -0.965750717583755 - 0.304910063723454*i
y597 = 0.538526923436219 + 0.85769070661148*i
y598 = -0.922105781114568 + 0.418766670006665*i
y599 = 1.01274112954564
y600 = -0.771768093496194 - 0.655758038711405*i
y601 = -0.20964260847282 - 0.990805012192656*i
y602 = -1.01117596714885 - 0.0562828476000967*i
y603 = 0.456845607755411 - 0.903845499047247*i
y604 = -0.987795168161027 - 0.223394944506601*i
y605 = 0.73413175085904 - 0.697635411840611*i
y606 = 0.998683679984678 + 0.16815321229652*i
y607 = -0.922105781114568 - 0.418766670006665*i
y608 = 0.783788967651746 + 0.641341913226314*i
y609 = -0.905952636317725 - 0.452652644112835*i
y610 = 0.498221020410525 - 0.881714472090865*i
y611 = 0.522538494465006 - 0.867524130658982*i
y612 = 0.993623402389942 + 0.195849763074694*i
y613 = 0.879396449352068 + 0.502301184888462*i
y614 = 0.397292770155717 + 0.931559472205277*i
y615 = 0.874703811140467 + 0.510429072692495*i
y616 = 0.70777273808067 + 0.724363407899081*i
y617 = -0.807018945184584 + 0.611853755064508*i
y618 = -0.818220068675681 - 0.596791852063801*i
y619 = -0.834493567301581 + 0.573816243762461*i
y620 = -1.01117596714885 + 0.0562828476000967*i
y621 = -0.465202019290455 - 0.899573052465146*i
y622 = 0.721076095325207 - 0.711121550948874*i
y623 = 0.929708575602561 - 0.401604979954725*i
y624 = 0.914186227853246 - 0.435784506696638*i
y625 = -0.282455640110827 + 0.972555091932052*i
y626 = -0.336068631122266 + 0.955354630830345*i
y627 = -0.981203481852808 - 0.250767467334389*i
y628 = -0.473518478797258 + 0.895223349623382*i
y629 = 0.388642853254218 + 0.935201223313891*i
y630 = 1.01269764192034 - 0.00938517567051244*i
y631 = -0.901718955877163 - 0.461028762752583*i
y632 = 0.546452106349501 + 0.852663292829926*i
y633 = -0.282455640110827 - 0.972555091932052*i
y634 = 1.00422944366722 + 0.131026027739525*i
y635 = -0.673460845268224 - 0.756369675069002*i
y636 = -0.70777273808067 + 0.724363407899081*i
y637 = 0.947312873191576 + 0.358110200579235*i
y638 = -0.182019073511839 - 0.99624979415369*i
y639 = -0.910108512613398 - 0.444237651198102*i
y640 = -0.652174933692356 + 0.77479832946177*i
y641 = -0.789698692481659 - 0.634050921114492*i
y642 = -1.01256718277919 + 0.0187695453324783*i
y643 = -0.440015802598978 + 0.912157162410379*i
y644 = 0.554330359393434 - 0.84756265144715*i
y645 = -0.929708575602561 - 0.401604979954725*i
y646 = 1.00422944366722 - 0.131026027739525*i
y647 = 0.1912436062972 + 0.994520225296509*i
y648 = -0.448449961849348 + 0.908040322447575*i
y649 = 0.789698692481659 - 0.634050921114492*i
y650 = -0.82371546504127 - 0.589183696418377*i
y651 = -0.273430743772138 + 0.97513087523347*i
y652 = 0.855186180303655 + 0.542495338681378*i
y653 = -0.997082502969816 + 0.177400895558128*i
y654 = -1.01204540223348 + 0.0375326430119028*i
y655 = -0.562161005975539 + 0.842389220511485*i
y656 = -0.98348523624848 - 0.241663786187855*i
y657 = 0.997082502969816 + 0.177400895558128*i
y658 = -0.680441281683054 + 0.750096165604718*i
y659 = 0.282455640110827 - 0.972555091932052*i
y660 = -1.01256718277919 - 0.0187695453324783*i
y661 = 0.0234611760496203 - 1.01246934209967*i
y662 = 0.182019073511839 - 0.99624979415369*i
y663 = 0.473518478797258 - 0.895223349623382*i
y664 = 0.925946938996657 + 0.410203439327487*i
y665 = 0.893019643583376 + 0.477661503208704*i
y666 = 0.0890453119640034 + 1.00881887764386*i
y667 = -0.829140119874884 + 0.581524941070666*i
y668 = -0.22796959490268 - 0.986749440979465*i
y669 = 0.405908567145188 - 0.92783771781035*i
y670 = -0.795540597175037 + 0.626705476056946*i
y671 = 1.01061096782489 + 0.0656511019360902*i
y672 = 0.144972564368617 - 1.0023111049239*i
y673 = -0.973853438080831 - 0.277946175745456*i
y674 = -0.379959559304457 - 0.938762658378858*i
y675 = -0.107726870320976 - 1.00699529139129*i
y676 = -0.991765775896049 - 0.205049362921922*i
y677 = 0.801314180023091 - 0.619306208888058*i
y678 = -0.1912436062972 + 0.994520225296509*i
y678 = -0.1912436062972 + 0.994520225296509*i