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La ecuación:
Ecuación 2x=1
Ecuación 3^x=6
Ecuación x:(-6)=55
Ecuación 3+11y=203+y
Expresar {x} en función de y en la ecuación:
-17*x+6*y=14
20*x-8*y=13
4*x-1*y=12
2*x-6*y=-13
Expresiones idénticas
(x^ nueve)^ cinco *(x^ cuatro)^ ocho /(x^ cuatro)^ cuatro *(x^ quince)^ cuatro = dos mil trece
(x en el grado 9) en el grado 5 multiplicar por (x en el grado 4) en el grado 8 dividir por (x en el grado 4) en el grado 4 multiplicar por (x en el grado 15) en el grado 4 es igual a 2013
(x en el grado nueve) en el grado cinco multiplicar por (x en el grado cuatro) en el grado ocho dividir por (x en el grado cuatro) en el grado cuatro multiplicar por (x en el grado quince) en el grado cuatro es igual a dos mil trece
(x9)5*(x4)8/(x4)4*(x15)4=2013
x95*x48/x44*x154=2013
(x⁹)⁵*(x⁴)⁸/(x⁴)⁴*(x^15)⁴=2013
(x^9)^5(x^4)^8/(x^4)^4(x^15)^4=2013
(x9)5(x4)8/(x4)4(x15)4=2013
x95x48/x44x154=2013
x^9^5x^4^8/x^4^4x^15^4=2013
(x^9)^5*(x^4)^8 dividir por (x^4)^4*(x^15)^4=2013
Expresiones semejantes
22=x/20*13

(x^9)^5(x^4)^8/(x^4)^4(x^15)^4=2013 la ecuación

El profesor se sorprenderá mucho al ver tu solución correcta😉

Solución

Ha introducido [src]

    5     8              
/ 9\  / 4\       4       
\x / *\x /  / 15\        
-----------*\x  /  = 2013
       4                 
   / 4\                  
   \x /

\frac{\left(x^{4}\right)^{8} \left(x^{9}\right)^{5}}{\left(x^{4}\right)^{4}} \left(x^{15}\right)^{4} = 2013

Simplificar

Solución detallada

Tenemos la ecuación

\frac{\left(x^{4}\right)^{8} \left(x^{9}\right)^{5}}{\left(x^{4}\right)^{4}} \left(x^{15}\right)^{4} = 2013

Ya que la potencia en la ecuación es igual a = 121 - no contiene número par en el numerador, entonces
la ecuación tendrá una raíz real.
Extraigamos la raíz de potencia 121 de las dos partes de la ecuación:
Obtenemos:

\sqrt[121]{x^{121}} = \sqrt[121]{2013}

x = \sqrt[121]{2013}

Abrimos los paréntesis en el miembro derecho de la ecuación

x = 2013^1/121

Obtenemos la respuesta: x = 2013^(1/121)

Las demás 120 raíces son complejas.
hacemos el cambio:

z = x

entonces la ecuación será así:

z^{121} = 2013

Cualquier número complejo se puede presentar que:

z = r e^{i p}

sustituimos en la ecuación

r^{121} e^{121 i p} = 2013

donde

r = \sqrt[121]{2013}

- módulo del número complejo
Sustituyamos r:

e^{121 i p} = 1

Usando la fórmula de Euler hallemos las raíces para p

i \sin{\left(121 p \right)} + \cos{\left(121 p \right)} = 1

es decir

\cos{\left(121 p \right)} = 1

\sin{\left(121 p \right)} = 0

entonces

p = \frac{2 \pi N}{121}

donde N=0,1,2,3,...
Seleccionando los valores de N y sustituyendo p en la fórmula para z
Es decir, la solución será para z:

z_{1} = \sqrt[121]{2013}

z_{2} = - \sqrt[121]{2013} \cos{\left(\frac{\pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{\pi}{121} \right)}

z_{3} = - \sqrt[121]{2013} \cos{\left(\frac{\pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{\pi}{121} \right)}

z_{4} = \sqrt[121]{2013} \cos{\left(\frac{2 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{2 \pi}{121} \right)}

z_{5} = \sqrt[121]{2013} \cos{\left(\frac{2 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{2 \pi}{121} \right)}

z_{6} = - \sqrt[121]{2013} \cos{\left(\frac{3 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{3 \pi}{121} \right)}

z_{7} = - \sqrt[121]{2013} \cos{\left(\frac{3 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{3 \pi}{121} \right)}

z_{8} = \sqrt[121]{2013} \cos{\left(\frac{4 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{4 \pi}{121} \right)}

z_{9} = \sqrt[121]{2013} \cos{\left(\frac{4 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{4 \pi}{121} \right)}

z_{10} = - \sqrt[121]{2013} \cos{\left(\frac{5 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{5 \pi}{121} \right)}

z_{11} = - \sqrt[121]{2013} \cos{\left(\frac{5 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{5 \pi}{121} \right)}

z_{12} = \sqrt[121]{2013} \cos{\left(\frac{6 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{6 \pi}{121} \right)}

z_{13} = \sqrt[121]{2013} \cos{\left(\frac{6 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{6 \pi}{121} \right)}

z_{14} = - \sqrt[121]{2013} \cos{\left(\frac{7 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{7 \pi}{121} \right)}

z_{15} = - \sqrt[121]{2013} \cos{\left(\frac{7 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{7 \pi}{121} \right)}

z_{16} = \sqrt[121]{2013} \cos{\left(\frac{8 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{8 \pi}{121} \right)}

z_{17} = \sqrt[121]{2013} \cos{\left(\frac{8 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{8 \pi}{121} \right)}

z_{18} = - \sqrt[121]{2013} \cos{\left(\frac{9 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{9 \pi}{121} \right)}

z_{19} = - \sqrt[121]{2013} \cos{\left(\frac{9 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{9 \pi}{121} \right)}

z_{20} = \sqrt[121]{2013} \cos{\left(\frac{10 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{10 \pi}{121} \right)}

z_{21} = \sqrt[121]{2013} \cos{\left(\frac{10 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{10 \pi}{121} \right)}

z_{22} = - \sqrt[121]{2013} \cos{\left(\frac{\pi}{11} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{\pi}{11} \right)}

z_{23} = - \sqrt[121]{2013} \cos{\left(\frac{\pi}{11} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{\pi}{11} \right)}

z_{24} = \sqrt[121]{2013} \cos{\left(\frac{12 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{12 \pi}{121} \right)}

z_{25} = \sqrt[121]{2013} \cos{\left(\frac{12 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{12 \pi}{121} \right)}

z_{26} = - \sqrt[121]{2013} \cos{\left(\frac{13 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{13 \pi}{121} \right)}

z_{27} = - \sqrt[121]{2013} \cos{\left(\frac{13 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{13 \pi}{121} \right)}

z_{28} = \sqrt[121]{2013} \cos{\left(\frac{14 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{14 \pi}{121} \right)}

z_{29} = \sqrt[121]{2013} \cos{\left(\frac{14 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{14 \pi}{121} \right)}

z_{30} = - \sqrt[121]{2013} \cos{\left(\frac{15 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{15 \pi}{121} \right)}

z_{31} = - \sqrt[121]{2013} \cos{\left(\frac{15 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{15 \pi}{121} \right)}

z_{32} = \sqrt[121]{2013} \cos{\left(\frac{16 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{16 \pi}{121} \right)}

z_{33} = \sqrt[121]{2013} \cos{\left(\frac{16 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{16 \pi}{121} \right)}

z_{34} = - \sqrt[121]{2013} \cos{\left(\frac{17 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{17 \pi}{121} \right)}

z_{35} = - \sqrt[121]{2013} \cos{\left(\frac{17 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{17 \pi}{121} \right)}

z_{36} = \sqrt[121]{2013} \cos{\left(\frac{18 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{18 \pi}{121} \right)}

z_{37} = \sqrt[121]{2013} \cos{\left(\frac{18 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{18 \pi}{121} \right)}

z_{38} = - \sqrt[121]{2013} \cos{\left(\frac{19 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{19 \pi}{121} \right)}

z_{39} = - \sqrt[121]{2013} \cos{\left(\frac{19 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{19 \pi}{121} \right)}

z_{40} = \sqrt[121]{2013} \cos{\left(\frac{20 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{20 \pi}{121} \right)}

z_{41} = \sqrt[121]{2013} \cos{\left(\frac{20 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{20 \pi}{121} \right)}

z_{42} = - \sqrt[121]{2013} \cos{\left(\frac{21 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{21 \pi}{121} \right)}

z_{43} = - \sqrt[121]{2013} \cos{\left(\frac{21 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{21 \pi}{121} \right)}

z_{44} = \sqrt[121]{2013} \cos{\left(\frac{2 \pi}{11} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{2 \pi}{11} \right)}

z_{45} = \sqrt[121]{2013} \cos{\left(\frac{2 \pi}{11} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{2 \pi}{11} \right)}

z_{46} = - \sqrt[121]{2013} \cos{\left(\frac{23 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{23 \pi}{121} \right)}

z_{47} = - \sqrt[121]{2013} \cos{\left(\frac{23 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{23 \pi}{121} \right)}

z_{48} = \sqrt[121]{2013} \cos{\left(\frac{24 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{24 \pi}{121} \right)}

z_{49} = \sqrt[121]{2013} \cos{\left(\frac{24 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{24 \pi}{121} \right)}

z_{50} = - \sqrt[121]{2013} \cos{\left(\frac{25 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{25 \pi}{121} \right)}

z_{51} = - \sqrt[121]{2013} \cos{\left(\frac{25 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{25 \pi}{121} \right)}

z_{52} = \sqrt[121]{2013} \cos{\left(\frac{26 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{26 \pi}{121} \right)}

z_{53} = \sqrt[121]{2013} \cos{\left(\frac{26 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{26 \pi}{121} \right)}

z_{54} = - \sqrt[121]{2013} \cos{\left(\frac{27 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{27 \pi}{121} \right)}

z_{55} = - \sqrt[121]{2013} \cos{\left(\frac{27 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{27 \pi}{121} \right)}

z_{56} = \sqrt[121]{2013} \cos{\left(\frac{28 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{28 \pi}{121} \right)}

z_{57} = \sqrt[121]{2013} \cos{\left(\frac{28 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{28 \pi}{121} \right)}

z_{58} = - \sqrt[121]{2013} \cos{\left(\frac{29 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{29 \pi}{121} \right)}

z_{59} = - \sqrt[121]{2013} \cos{\left(\frac{29 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{29 \pi}{121} \right)}

z_{60} = \sqrt[121]{2013} \cos{\left(\frac{30 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{30 \pi}{121} \right)}

z_{61} = \sqrt[121]{2013} \cos{\left(\frac{30 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{30 \pi}{121} \right)}

z_{62} = - \sqrt[121]{2013} \cos{\left(\frac{31 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{31 \pi}{121} \right)}

z_{63} = - \sqrt[121]{2013} \cos{\left(\frac{31 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{31 \pi}{121} \right)}

z_{64} = \sqrt[121]{2013} \cos{\left(\frac{32 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{32 \pi}{121} \right)}

z_{65} = \sqrt[121]{2013} \cos{\left(\frac{32 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{32 \pi}{121} \right)}

z_{66} = - \sqrt[121]{2013} \cos{\left(\frac{3 \pi}{11} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{3 \pi}{11} \right)}

z_{67} = - \sqrt[121]{2013} \cos{\left(\frac{3 \pi}{11} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{3 \pi}{11} \right)}

z_{68} = \sqrt[121]{2013} \cos{\left(\frac{34 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{34 \pi}{121} \right)}

z_{69} = \sqrt[121]{2013} \cos{\left(\frac{34 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{34 \pi}{121} \right)}

z_{70} = - \sqrt[121]{2013} \cos{\left(\frac{35 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{35 \pi}{121} \right)}

z_{71} = - \sqrt[121]{2013} \cos{\left(\frac{35 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{35 \pi}{121} \right)}

z_{72} = \sqrt[121]{2013} \cos{\left(\frac{36 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{36 \pi}{121} \right)}

z_{73} = \sqrt[121]{2013} \cos{\left(\frac{36 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{36 \pi}{121} \right)}

z_{74} = - \sqrt[121]{2013} \cos{\left(\frac{37 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{37 \pi}{121} \right)}

z_{75} = - \sqrt[121]{2013} \cos{\left(\frac{37 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{37 \pi}{121} \right)}

z_{76} = \sqrt[121]{2013} \cos{\left(\frac{38 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{38 \pi}{121} \right)}

z_{77} = \sqrt[121]{2013} \cos{\left(\frac{38 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{38 \pi}{121} \right)}

z_{78} = - \sqrt[121]{2013} \cos{\left(\frac{39 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{39 \pi}{121} \right)}

z_{79} = - \sqrt[121]{2013} \cos{\left(\frac{39 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{39 \pi}{121} \right)}

z_{80} = \sqrt[121]{2013} \cos{\left(\frac{40 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{40 \pi}{121} \right)}

z_{81} = \sqrt[121]{2013} \cos{\left(\frac{40 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{40 \pi}{121} \right)}

z_{82} = - \sqrt[121]{2013} \cos{\left(\frac{41 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{41 \pi}{121} \right)}

z_{83} = - \sqrt[121]{2013} \cos{\left(\frac{41 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{41 \pi}{121} \right)}

z_{84} = \sqrt[121]{2013} \cos{\left(\frac{42 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{42 \pi}{121} \right)}

z_{85} = \sqrt[121]{2013} \cos{\left(\frac{42 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{42 \pi}{121} \right)}

z_{86} = - \sqrt[121]{2013} \cos{\left(\frac{43 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{43 \pi}{121} \right)}

z_{87} = - \sqrt[121]{2013} \cos{\left(\frac{43 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{43 \pi}{121} \right)}

z_{88} = \sqrt[121]{2013} \cos{\left(\frac{4 \pi}{11} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{4 \pi}{11} \right)}

z_{89} = \sqrt[121]{2013} \cos{\left(\frac{4 \pi}{11} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{4 \pi}{11} \right)}

z_{90} = - \sqrt[121]{2013} \cos{\left(\frac{45 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{45 \pi}{121} \right)}

z_{91} = - \sqrt[121]{2013} \cos{\left(\frac{45 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{45 \pi}{121} \right)}

z_{92} = \sqrt[121]{2013} \cos{\left(\frac{46 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{46 \pi}{121} \right)}

z_{93} = \sqrt[121]{2013} \cos{\left(\frac{46 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{46 \pi}{121} \right)}

z_{94} = - \sqrt[121]{2013} \cos{\left(\frac{47 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{47 \pi}{121} \right)}

z_{95} = - \sqrt[121]{2013} \cos{\left(\frac{47 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{47 \pi}{121} \right)}

z_{96} = \sqrt[121]{2013} \cos{\left(\frac{48 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{48 \pi}{121} \right)}

z_{97} = \sqrt[121]{2013} \cos{\left(\frac{48 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{48 \pi}{121} \right)}

z_{98} = - \sqrt[121]{2013} \cos{\left(\frac{49 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{49 \pi}{121} \right)}

z_{99} = - \sqrt[121]{2013} \cos{\left(\frac{49 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{49 \pi}{121} \right)}

z_{100} = \sqrt[121]{2013} \cos{\left(\frac{50 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{50 \pi}{121} \right)}

z_{101} = \sqrt[121]{2013} \cos{\left(\frac{50 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{50 \pi}{121} \right)}

z_{102} = - \sqrt[121]{2013} \cos{\left(\frac{51 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{51 \pi}{121} \right)}

z_{103} = - \sqrt[121]{2013} \cos{\left(\frac{51 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{51 \pi}{121} \right)}

z_{104} = \sqrt[121]{2013} \cos{\left(\frac{52 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{52 \pi}{121} \right)}

z_{105} = \sqrt[121]{2013} \cos{\left(\frac{52 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{52 \pi}{121} \right)}

z_{106} = - \sqrt[121]{2013} \cos{\left(\frac{53 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{53 \pi}{121} \right)}

z_{107} = - \sqrt[121]{2013} \cos{\left(\frac{53 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{53 \pi}{121} \right)}

z_{108} = \sqrt[121]{2013} \cos{\left(\frac{54 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{54 \pi}{121} \right)}

z_{109} = \sqrt[121]{2013} \cos{\left(\frac{54 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{54 \pi}{121} \right)}

z_{110} = - \sqrt[121]{2013} \cos{\left(\frac{5 \pi}{11} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{5 \pi}{11} \right)}

z_{111} = - \sqrt[121]{2013} \cos{\left(\frac{5 \pi}{11} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{5 \pi}{11} \right)}

z_{112} = \sqrt[121]{2013} \cos{\left(\frac{56 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{56 \pi}{121} \right)}

z_{113} = \sqrt[121]{2013} \cos{\left(\frac{56 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{56 \pi}{121} \right)}

z_{114} = - \sqrt[121]{2013} \cos{\left(\frac{57 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{57 \pi}{121} \right)}

z_{115} = - \sqrt[121]{2013} \cos{\left(\frac{57 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{57 \pi}{121} \right)}

z_{116} = \sqrt[121]{2013} \cos{\left(\frac{58 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{58 \pi}{121} \right)}

z_{117} = \sqrt[121]{2013} \cos{\left(\frac{58 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{58 \pi}{121} \right)}

z_{118} = - \sqrt[121]{2013} \cos{\left(\frac{59 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{59 \pi}{121} \right)}

z_{119} = - \sqrt[121]{2013} \cos{\left(\frac{59 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{59 \pi}{121} \right)}

z_{120} = \sqrt[121]{2013} \cos{\left(\frac{60 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{60 \pi}{121} \right)}

z_{121} = \sqrt[121]{2013} \cos{\left(\frac{60 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{60 \pi}{121} \right)}

hacemos cambio inverso

z = x

x = z

Entonces la respuesta definitiva es:

x_{1} = \sqrt[121]{2013}

x_{2} = - \sqrt[121]{2013} \cos{\left(\frac{\pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{\pi}{121} \right)}

x_{3} = - \sqrt[121]{2013} \cos{\left(\frac{\pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{\pi}{121} \right)}

x_{4} = \sqrt[121]{2013} \cos{\left(\frac{2 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{2 \pi}{121} \right)}

x_{5} = \sqrt[121]{2013} \cos{\left(\frac{2 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{2 \pi}{121} \right)}

x_{6} = - \sqrt[121]{2013} \cos{\left(\frac{3 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{3 \pi}{121} \right)}

x_{7} = - \sqrt[121]{2013} \cos{\left(\frac{3 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{3 \pi}{121} \right)}

x_{8} = \sqrt[121]{2013} \cos{\left(\frac{4 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{4 \pi}{121} \right)}

x_{9} = \sqrt[121]{2013} \cos{\left(\frac{4 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{4 \pi}{121} \right)}

x_{10} = - \sqrt[121]{2013} \cos{\left(\frac{5 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{5 \pi}{121} \right)}

x_{11} = - \sqrt[121]{2013} \cos{\left(\frac{5 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{5 \pi}{121} \right)}

x_{12} = \sqrt[121]{2013} \cos{\left(\frac{6 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{6 \pi}{121} \right)}

x_{13} = \sqrt[121]{2013} \cos{\left(\frac{6 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{6 \pi}{121} \right)}

x_{14} = - \sqrt[121]{2013} \cos{\left(\frac{7 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{7 \pi}{121} \right)}

x_{15} = - \sqrt[121]{2013} \cos{\left(\frac{7 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{7 \pi}{121} \right)}

x_{16} = \sqrt[121]{2013} \cos{\left(\frac{8 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{8 \pi}{121} \right)}

x_{17} = \sqrt[121]{2013} \cos{\left(\frac{8 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{8 \pi}{121} \right)}

x_{18} = - \sqrt[121]{2013} \cos{\left(\frac{9 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{9 \pi}{121} \right)}

x_{19} = - \sqrt[121]{2013} \cos{\left(\frac{9 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{9 \pi}{121} \right)}

x_{20} = \sqrt[121]{2013} \cos{\left(\frac{10 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{10 \pi}{121} \right)}

x_{21} = \sqrt[121]{2013} \cos{\left(\frac{10 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{10 \pi}{121} \right)}

x_{22} = - \sqrt[121]{2013} \cos{\left(\frac{\pi}{11} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{\pi}{11} \right)}

x_{23} = - \sqrt[121]{2013} \cos{\left(\frac{\pi}{11} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{\pi}{11} \right)}

x_{24} = \sqrt[121]{2013} \cos{\left(\frac{12 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{12 \pi}{121} \right)}

x_{25} = \sqrt[121]{2013} \cos{\left(\frac{12 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{12 \pi}{121} \right)}

x_{26} = - \sqrt[121]{2013} \cos{\left(\frac{13 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{13 \pi}{121} \right)}

x_{27} = - \sqrt[121]{2013} \cos{\left(\frac{13 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{13 \pi}{121} \right)}

x_{28} = \sqrt[121]{2013} \cos{\left(\frac{14 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{14 \pi}{121} \right)}

x_{29} = \sqrt[121]{2013} \cos{\left(\frac{14 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{14 \pi}{121} \right)}

x_{30} = - \sqrt[121]{2013} \cos{\left(\frac{15 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{15 \pi}{121} \right)}

x_{31} = - \sqrt[121]{2013} \cos{\left(\frac{15 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{15 \pi}{121} \right)}

x_{32} = \sqrt[121]{2013} \cos{\left(\frac{16 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{16 \pi}{121} \right)}

x_{33} = \sqrt[121]{2013} \cos{\left(\frac{16 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{16 \pi}{121} \right)}

x_{34} = - \sqrt[121]{2013} \cos{\left(\frac{17 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{17 \pi}{121} \right)}

x_{35} = - \sqrt[121]{2013} \cos{\left(\frac{17 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{17 \pi}{121} \right)}

x_{36} = \sqrt[121]{2013} \cos{\left(\frac{18 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{18 \pi}{121} \right)}

x_{37} = \sqrt[121]{2013} \cos{\left(\frac{18 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{18 \pi}{121} \right)}

x_{38} = - \sqrt[121]{2013} \cos{\left(\frac{19 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{19 \pi}{121} \right)}

x_{39} = - \sqrt[121]{2013} \cos{\left(\frac{19 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{19 \pi}{121} \right)}

x_{40} = \sqrt[121]{2013} \cos{\left(\frac{20 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{20 \pi}{121} \right)}

x_{41} = \sqrt[121]{2013} \cos{\left(\frac{20 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{20 \pi}{121} \right)}

x_{42} = - \sqrt[121]{2013} \cos{\left(\frac{21 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{21 \pi}{121} \right)}

x_{43} = - \sqrt[121]{2013} \cos{\left(\frac{21 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{21 \pi}{121} \right)}

x_{44} = \sqrt[121]{2013} \cos{\left(\frac{2 \pi}{11} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{2 \pi}{11} \right)}

x_{45} = \sqrt[121]{2013} \cos{\left(\frac{2 \pi}{11} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{2 \pi}{11} \right)}

x_{46} = - \sqrt[121]{2013} \cos{\left(\frac{23 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{23 \pi}{121} \right)}

x_{47} = - \sqrt[121]{2013} \cos{\left(\frac{23 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{23 \pi}{121} \right)}

x_{48} = \sqrt[121]{2013} \cos{\left(\frac{24 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{24 \pi}{121} \right)}

x_{49} = \sqrt[121]{2013} \cos{\left(\frac{24 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{24 \pi}{121} \right)}

x_{50} = - \sqrt[121]{2013} \cos{\left(\frac{25 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{25 \pi}{121} \right)}

x_{51} = - \sqrt[121]{2013} \cos{\left(\frac{25 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{25 \pi}{121} \right)}

x_{52} = \sqrt[121]{2013} \cos{\left(\frac{26 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{26 \pi}{121} \right)}

x_{53} = \sqrt[121]{2013} \cos{\left(\frac{26 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{26 \pi}{121} \right)}

x_{54} = - \sqrt[121]{2013} \cos{\left(\frac{27 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{27 \pi}{121} \right)}

x_{55} = - \sqrt[121]{2013} \cos{\left(\frac{27 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{27 \pi}{121} \right)}

x_{56} = \sqrt[121]{2013} \cos{\left(\frac{28 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{28 \pi}{121} \right)}

x_{57} = \sqrt[121]{2013} \cos{\left(\frac{28 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{28 \pi}{121} \right)}

x_{58} = - \sqrt[121]{2013} \cos{\left(\frac{29 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{29 \pi}{121} \right)}

x_{59} = - \sqrt[121]{2013} \cos{\left(\frac{29 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{29 \pi}{121} \right)}

x_{60} = \sqrt[121]{2013} \cos{\left(\frac{30 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{30 \pi}{121} \right)}

x_{61} = \sqrt[121]{2013} \cos{\left(\frac{30 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{30 \pi}{121} \right)}

x_{62} = - \sqrt[121]{2013} \cos{\left(\frac{31 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{31 \pi}{121} \right)}

x_{63} = - \sqrt[121]{2013} \cos{\left(\frac{31 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{31 \pi}{121} \right)}

x_{64} = \sqrt[121]{2013} \cos{\left(\frac{32 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{32 \pi}{121} \right)}

x_{65} = \sqrt[121]{2013} \cos{\left(\frac{32 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{32 \pi}{121} \right)}

x_{66} = - \sqrt[121]{2013} \cos{\left(\frac{3 \pi}{11} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{3 \pi}{11} \right)}

x_{67} = - \sqrt[121]{2013} \cos{\left(\frac{3 \pi}{11} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{3 \pi}{11} \right)}

x_{68} = \sqrt[121]{2013} \cos{\left(\frac{34 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{34 \pi}{121} \right)}

x_{69} = \sqrt[121]{2013} \cos{\left(\frac{34 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{34 \pi}{121} \right)}

x_{70} = - \sqrt[121]{2013} \cos{\left(\frac{35 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{35 \pi}{121} \right)}

x_{71} = - \sqrt[121]{2013} \cos{\left(\frac{35 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{35 \pi}{121} \right)}

x_{72} = \sqrt[121]{2013} \cos{\left(\frac{36 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{36 \pi}{121} \right)}

x_{73} = \sqrt[121]{2013} \cos{\left(\frac{36 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{36 \pi}{121} \right)}

x_{74} = - \sqrt[121]{2013} \cos{\left(\frac{37 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{37 \pi}{121} \right)}

x_{75} = - \sqrt[121]{2013} \cos{\left(\frac{37 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{37 \pi}{121} \right)}

x_{76} = \sqrt[121]{2013} \cos{\left(\frac{38 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{38 \pi}{121} \right)}

x_{77} = \sqrt[121]{2013} \cos{\left(\frac{38 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{38 \pi}{121} \right)}

x_{78} = - \sqrt[121]{2013} \cos{\left(\frac{39 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{39 \pi}{121} \right)}

x_{79} = - \sqrt[121]{2013} \cos{\left(\frac{39 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{39 \pi}{121} \right)}

x_{80} = \sqrt[121]{2013} \cos{\left(\frac{40 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{40 \pi}{121} \right)}

x_{81} = \sqrt[121]{2013} \cos{\left(\frac{40 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{40 \pi}{121} \right)}

x_{82} = - \sqrt[121]{2013} \cos{\left(\frac{41 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{41 \pi}{121} \right)}

x_{83} = - \sqrt[121]{2013} \cos{\left(\frac{41 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{41 \pi}{121} \right)}

x_{84} = \sqrt[121]{2013} \cos{\left(\frac{42 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{42 \pi}{121} \right)}

x_{85} = \sqrt[121]{2013} \cos{\left(\frac{42 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{42 \pi}{121} \right)}

x_{86} = - \sqrt[121]{2013} \cos{\left(\frac{43 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{43 \pi}{121} \right)}

x_{87} = - \sqrt[121]{2013} \cos{\left(\frac{43 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{43 \pi}{121} \right)}

x_{88} = \sqrt[121]{2013} \cos{\left(\frac{4 \pi}{11} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{4 \pi}{11} \right)}

x_{89} = \sqrt[121]{2013} \cos{\left(\frac{4 \pi}{11} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{4 \pi}{11} \right)}

x_{90} = - \sqrt[121]{2013} \cos{\left(\frac{45 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{45 \pi}{121} \right)}

x_{91} = - \sqrt[121]{2013} \cos{\left(\frac{45 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{45 \pi}{121} \right)}

x_{92} = \sqrt[121]{2013} \cos{\left(\frac{46 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{46 \pi}{121} \right)}

x_{93} = \sqrt[121]{2013} \cos{\left(\frac{46 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{46 \pi}{121} \right)}

x_{94} = - \sqrt[121]{2013} \cos{\left(\frac{47 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{47 \pi}{121} \right)}

x_{95} = - \sqrt[121]{2013} \cos{\left(\frac{47 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{47 \pi}{121} \right)}

x_{96} = \sqrt[121]{2013} \cos{\left(\frac{48 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{48 \pi}{121} \right)}

x_{97} = \sqrt[121]{2013} \cos{\left(\frac{48 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{48 \pi}{121} \right)}

x_{98} = - \sqrt[121]{2013} \cos{\left(\frac{49 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{49 \pi}{121} \right)}

x_{99} = - \sqrt[121]{2013} \cos{\left(\frac{49 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{49 \pi}{121} \right)}

x_{100} = \sqrt[121]{2013} \cos{\left(\frac{50 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{50 \pi}{121} \right)}

x_{101} = \sqrt[121]{2013} \cos{\left(\frac{50 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{50 \pi}{121} \right)}

x_{102} = - \sqrt[121]{2013} \cos{\left(\frac{51 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{51 \pi}{121} \right)}

x_{103} = - \sqrt[121]{2013} \cos{\left(\frac{51 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{51 \pi}{121} \right)}

x_{104} = \sqrt[121]{2013} \cos{\left(\frac{52 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{52 \pi}{121} \right)}

x_{105} = \sqrt[121]{2013} \cos{\left(\frac{52 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{52 \pi}{121} \right)}

x_{106} = - \sqrt[121]{2013} \cos{\left(\frac{53 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{53 \pi}{121} \right)}

x_{107} = - \sqrt[121]{2013} \cos{\left(\frac{53 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{53 \pi}{121} \right)}

x_{108} = \sqrt[121]{2013} \cos{\left(\frac{54 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{54 \pi}{121} \right)}

x_{109} = \sqrt[121]{2013} \cos{\left(\frac{54 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{54 \pi}{121} \right)}

x_{110} = - \sqrt[121]{2013} \cos{\left(\frac{5 \pi}{11} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{5 \pi}{11} \right)}

x_{111} = - \sqrt[121]{2013} \cos{\left(\frac{5 \pi}{11} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{5 \pi}{11} \right)}

x_{112} = \sqrt[121]{2013} \cos{\left(\frac{56 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{56 \pi}{121} \right)}

x_{113} = \sqrt[121]{2013} \cos{\left(\frac{56 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{56 \pi}{121} \right)}

x_{114} = - \sqrt[121]{2013} \cos{\left(\frac{57 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{57 \pi}{121} \right)}

x_{115} = - \sqrt[121]{2013} \cos{\left(\frac{57 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{57 \pi}{121} \right)}

x_{116} = \sqrt[121]{2013} \cos{\left(\frac{58 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{58 \pi}{121} \right)}

x_{117} = \sqrt[121]{2013} \cos{\left(\frac{58 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{58 \pi}{121} \right)}

x_{118} = - \sqrt[121]{2013} \cos{\left(\frac{59 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{59 \pi}{121} \right)}

x_{119} = - \sqrt[121]{2013} \cos{\left(\frac{59 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{59 \pi}{121} \right)}

x_{120} = \sqrt[121]{2013} \cos{\left(\frac{60 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{60 \pi}{121} \right)}

x_{121} = \sqrt[121]{2013} \cos{\left(\frac{60 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{60 \pi}{121} \right)}

Respuesta rápida [src]

     121______
x1 =  \/ 2013

x_{1} = \sqrt[121]{2013}

       121______    / pi\     121______    / pi\
x2 = -  \/ 2013 *cos|---| - I* \/ 2013 *sin|---|
                    \121/                  \121/

x_{2} = - \sqrt[121]{2013} \cos{\left(\frac{\pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{\pi}{121} \right)}

       121______    / pi\     121______    / pi\
x3 = -  \/ 2013 *cos|---| + I* \/ 2013 *sin|---|
                    \121/                  \121/

x_{3} = - \sqrt[121]{2013} \cos{\left(\frac{\pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{\pi}{121} \right)}

     121______    /2*pi\     121______    /2*pi\
x4 =  \/ 2013 *cos|----| - I* \/ 2013 *sin|----|
                  \121 /                  \121 /

x_{4} = \sqrt[121]{2013} \cos{\left(\frac{2 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{2 \pi}{121} \right)}

     121______    /2*pi\     121______    /2*pi\
x5 =  \/ 2013 *cos|----| + I* \/ 2013 *sin|----|
                  \121 /                  \121 /

x_{5} = \sqrt[121]{2013} \cos{\left(\frac{2 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{2 \pi}{121} \right)}

       121______    /3*pi\     121______    /3*pi\
x6 = -  \/ 2013 *cos|----| - I* \/ 2013 *sin|----|
                    \121 /                  \121 /

x_{6} = - \sqrt[121]{2013} \cos{\left(\frac{3 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{3 \pi}{121} \right)}

       121______    /3*pi\     121______    /3*pi\
x7 = -  \/ 2013 *cos|----| + I* \/ 2013 *sin|----|
                    \121 /                  \121 /

x_{7} = - \sqrt[121]{2013} \cos{\left(\frac{3 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{3 \pi}{121} \right)}

     121______    /4*pi\     121______    /4*pi\
x8 =  \/ 2013 *cos|----| - I* \/ 2013 *sin|----|
                  \121 /                  \121 /

x_{8} = \sqrt[121]{2013} \cos{\left(\frac{4 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{4 \pi}{121} \right)}

     121______    /4*pi\     121______    /4*pi\
x9 =  \/ 2013 *cos|----| + I* \/ 2013 *sin|----|
                  \121 /                  \121 /

x_{9} = \sqrt[121]{2013} \cos{\left(\frac{4 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{4 \pi}{121} \right)}

        121______    /5*pi\     121______    /5*pi\
x10 = -  \/ 2013 *cos|----| - I* \/ 2013 *sin|----|
                     \121 /                  \121 /

x_{10} = - \sqrt[121]{2013} \cos{\left(\frac{5 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{5 \pi}{121} \right)}

        121______    /5*pi\     121______    /5*pi\
x11 = -  \/ 2013 *cos|----| + I* \/ 2013 *sin|----|
                     \121 /                  \121 /

x_{11} = - \sqrt[121]{2013} \cos{\left(\frac{5 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{5 \pi}{121} \right)}

      121______    /6*pi\     121______    /6*pi\
x12 =  \/ 2013 *cos|----| - I* \/ 2013 *sin|----|
                   \121 /                  \121 /

x_{12} = \sqrt[121]{2013} \cos{\left(\frac{6 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{6 \pi}{121} \right)}

      121______    /6*pi\     121______    /6*pi\
x13 =  \/ 2013 *cos|----| + I* \/ 2013 *sin|----|
                   \121 /                  \121 /

x_{13} = \sqrt[121]{2013} \cos{\left(\frac{6 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{6 \pi}{121} \right)}

        121______    /7*pi\     121______    /7*pi\
x14 = -  \/ 2013 *cos|----| - I* \/ 2013 *sin|----|
                     \121 /                  \121 /

x_{14} = - \sqrt[121]{2013} \cos{\left(\frac{7 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{7 \pi}{121} \right)}

        121______    /7*pi\     121______    /7*pi\
x15 = -  \/ 2013 *cos|----| + I* \/ 2013 *sin|----|
                     \121 /                  \121 /

x_{15} = - \sqrt[121]{2013} \cos{\left(\frac{7 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{7 \pi}{121} \right)}

      121______    /8*pi\     121______    /8*pi\
x16 =  \/ 2013 *cos|----| - I* \/ 2013 *sin|----|
                   \121 /                  \121 /

x_{16} = \sqrt[121]{2013} \cos{\left(\frac{8 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{8 \pi}{121} \right)}

      121______    /8*pi\     121______    /8*pi\
x17 =  \/ 2013 *cos|----| + I* \/ 2013 *sin|----|
                   \121 /                  \121 /

x_{17} = \sqrt[121]{2013} \cos{\left(\frac{8 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{8 \pi}{121} \right)}

        121______    /9*pi\     121______    /9*pi\
x18 = -  \/ 2013 *cos|----| - I* \/ 2013 *sin|----|
                     \121 /                  \121 /

x_{18} = - \sqrt[121]{2013} \cos{\left(\frac{9 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{9 \pi}{121} \right)}

        121______    /9*pi\     121______    /9*pi\
x19 = -  \/ 2013 *cos|----| + I* \/ 2013 *sin|----|
                     \121 /                  \121 /

x_{19} = - \sqrt[121]{2013} \cos{\left(\frac{9 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{9 \pi}{121} \right)}

      121______    /10*pi\     121______    /10*pi\
x20 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{20} = \sqrt[121]{2013} \cos{\left(\frac{10 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{10 \pi}{121} \right)}

      121______    /10*pi\     121______    /10*pi\
x21 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{21} = \sqrt[121]{2013} \cos{\left(\frac{10 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{10 \pi}{121} \right)}

        121______    /pi\     121______    /pi\
x22 = -  \/ 2013 *cos|--| - I* \/ 2013 *sin|--|
                     \11/                  \11/

x_{22} = - \sqrt[121]{2013} \cos{\left(\frac{\pi}{11} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{\pi}{11} \right)}

        121______    /pi\     121______    /pi\
x23 = -  \/ 2013 *cos|--| + I* \/ 2013 *sin|--|
                     \11/                  \11/

x_{23} = - \sqrt[121]{2013} \cos{\left(\frac{\pi}{11} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{\pi}{11} \right)}

      121______    /12*pi\     121______    /12*pi\
x24 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{24} = \sqrt[121]{2013} \cos{\left(\frac{12 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{12 \pi}{121} \right)}

      121______    /12*pi\     121______    /12*pi\
x25 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{25} = \sqrt[121]{2013} \cos{\left(\frac{12 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{12 \pi}{121} \right)}

        121______    /13*pi\     121______    /13*pi\
x26 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{26} = - \sqrt[121]{2013} \cos{\left(\frac{13 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{13 \pi}{121} \right)}

        121______    /13*pi\     121______    /13*pi\
x27 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{27} = - \sqrt[121]{2013} \cos{\left(\frac{13 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{13 \pi}{121} \right)}

      121______    /14*pi\     121______    /14*pi\
x28 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{28} = \sqrt[121]{2013} \cos{\left(\frac{14 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{14 \pi}{121} \right)}

      121______    /14*pi\     121______    /14*pi\
x29 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{29} = \sqrt[121]{2013} \cos{\left(\frac{14 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{14 \pi}{121} \right)}

        121______    /15*pi\     121______    /15*pi\
x30 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{30} = - \sqrt[121]{2013} \cos{\left(\frac{15 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{15 \pi}{121} \right)}

        121______    /15*pi\     121______    /15*pi\
x31 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{31} = - \sqrt[121]{2013} \cos{\left(\frac{15 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{15 \pi}{121} \right)}

      121______    /16*pi\     121______    /16*pi\
x32 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{32} = \sqrt[121]{2013} \cos{\left(\frac{16 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{16 \pi}{121} \right)}

      121______    /16*pi\     121______    /16*pi\
x33 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{33} = \sqrt[121]{2013} \cos{\left(\frac{16 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{16 \pi}{121} \right)}

        121______    /17*pi\     121______    /17*pi\
x34 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{34} = - \sqrt[121]{2013} \cos{\left(\frac{17 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{17 \pi}{121} \right)}

        121______    /17*pi\     121______    /17*pi\
x35 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{35} = - \sqrt[121]{2013} \cos{\left(\frac{17 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{17 \pi}{121} \right)}

      121______    /18*pi\     121______    /18*pi\
x36 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{36} = \sqrt[121]{2013} \cos{\left(\frac{18 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{18 \pi}{121} \right)}

      121______    /18*pi\     121______    /18*pi\
x37 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{37} = \sqrt[121]{2013} \cos{\left(\frac{18 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{18 \pi}{121} \right)}

        121______    /19*pi\     121______    /19*pi\
x38 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{38} = - \sqrt[121]{2013} \cos{\left(\frac{19 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{19 \pi}{121} \right)}

        121______    /19*pi\     121______    /19*pi\
x39 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{39} = - \sqrt[121]{2013} \cos{\left(\frac{19 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{19 \pi}{121} \right)}

      121______    /20*pi\     121______    /20*pi\
x40 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{40} = \sqrt[121]{2013} \cos{\left(\frac{20 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{20 \pi}{121} \right)}

      121______    /20*pi\     121______    /20*pi\
x41 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{41} = \sqrt[121]{2013} \cos{\left(\frac{20 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{20 \pi}{121} \right)}

        121______    /21*pi\     121______    /21*pi\
x42 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{42} = - \sqrt[121]{2013} \cos{\left(\frac{21 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{21 \pi}{121} \right)}

        121______    /21*pi\     121______    /21*pi\
x43 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{43} = - \sqrt[121]{2013} \cos{\left(\frac{21 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{21 \pi}{121} \right)}

      121______    /2*pi\     121______    /2*pi\
x44 =  \/ 2013 *cos|----| - I* \/ 2013 *sin|----|
                   \ 11 /                  \ 11 /

x_{44} = \sqrt[121]{2013} \cos{\left(\frac{2 \pi}{11} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{2 \pi}{11} \right)}

      121______    /2*pi\     121______    /2*pi\
x45 =  \/ 2013 *cos|----| + I* \/ 2013 *sin|----|
                   \ 11 /                  \ 11 /

x_{45} = \sqrt[121]{2013} \cos{\left(\frac{2 \pi}{11} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{2 \pi}{11} \right)}

        121______    /23*pi\     121______    /23*pi\
x46 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{46} = - \sqrt[121]{2013} \cos{\left(\frac{23 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{23 \pi}{121} \right)}

        121______    /23*pi\     121______    /23*pi\
x47 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{47} = - \sqrt[121]{2013} \cos{\left(\frac{23 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{23 \pi}{121} \right)}

      121______    /24*pi\     121______    /24*pi\
x48 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{48} = \sqrt[121]{2013} \cos{\left(\frac{24 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{24 \pi}{121} \right)}

      121______    /24*pi\     121______    /24*pi\
x49 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{49} = \sqrt[121]{2013} \cos{\left(\frac{24 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{24 \pi}{121} \right)}

        121______    /25*pi\     121______    /25*pi\
x50 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{50} = - \sqrt[121]{2013} \cos{\left(\frac{25 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{25 \pi}{121} \right)}

        121______    /25*pi\     121______    /25*pi\
x51 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{51} = - \sqrt[121]{2013} \cos{\left(\frac{25 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{25 \pi}{121} \right)}

      121______    /26*pi\     121______    /26*pi\
x52 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{52} = \sqrt[121]{2013} \cos{\left(\frac{26 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{26 \pi}{121} \right)}

      121______    /26*pi\     121______    /26*pi\
x53 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{53} = \sqrt[121]{2013} \cos{\left(\frac{26 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{26 \pi}{121} \right)}

        121______    /27*pi\     121______    /27*pi\
x54 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{54} = - \sqrt[121]{2013} \cos{\left(\frac{27 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{27 \pi}{121} \right)}

        121______    /27*pi\     121______    /27*pi\
x55 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{55} = - \sqrt[121]{2013} \cos{\left(\frac{27 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{27 \pi}{121} \right)}

      121______    /28*pi\     121______    /28*pi\
x56 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{56} = \sqrt[121]{2013} \cos{\left(\frac{28 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{28 \pi}{121} \right)}

      121______    /28*pi\     121______    /28*pi\
x57 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{57} = \sqrt[121]{2013} \cos{\left(\frac{28 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{28 \pi}{121} \right)}

        121______    /29*pi\     121______    /29*pi\
x58 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{58} = - \sqrt[121]{2013} \cos{\left(\frac{29 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{29 \pi}{121} \right)}

        121______    /29*pi\     121______    /29*pi\
x59 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{59} = - \sqrt[121]{2013} \cos{\left(\frac{29 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{29 \pi}{121} \right)}

      121______    /30*pi\     121______    /30*pi\
x60 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{60} = \sqrt[121]{2013} \cos{\left(\frac{30 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{30 \pi}{121} \right)}

      121______    /30*pi\     121______    /30*pi\
x61 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{61} = \sqrt[121]{2013} \cos{\left(\frac{30 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{30 \pi}{121} \right)}

        121______    /31*pi\     121______    /31*pi\
x62 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{62} = - \sqrt[121]{2013} \cos{\left(\frac{31 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{31 \pi}{121} \right)}

        121______    /31*pi\     121______    /31*pi\
x63 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{63} = - \sqrt[121]{2013} \cos{\left(\frac{31 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{31 \pi}{121} \right)}

      121______    /32*pi\     121______    /32*pi\
x64 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{64} = \sqrt[121]{2013} \cos{\left(\frac{32 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{32 \pi}{121} \right)}

      121______    /32*pi\     121______    /32*pi\
x65 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{65} = \sqrt[121]{2013} \cos{\left(\frac{32 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{32 \pi}{121} \right)}

        121______    /3*pi\     121______    /3*pi\
x66 = -  \/ 2013 *cos|----| - I* \/ 2013 *sin|----|
                     \ 11 /                  \ 11 /

x_{66} = - \sqrt[121]{2013} \cos{\left(\frac{3 \pi}{11} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{3 \pi}{11} \right)}

        121______    /3*pi\     121______    /3*pi\
x67 = -  \/ 2013 *cos|----| + I* \/ 2013 *sin|----|
                     \ 11 /                  \ 11 /

x_{67} = - \sqrt[121]{2013} \cos{\left(\frac{3 \pi}{11} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{3 \pi}{11} \right)}

      121______    /34*pi\     121______    /34*pi\
x68 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{68} = \sqrt[121]{2013} \cos{\left(\frac{34 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{34 \pi}{121} \right)}

      121______    /34*pi\     121______    /34*pi\
x69 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{69} = \sqrt[121]{2013} \cos{\left(\frac{34 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{34 \pi}{121} \right)}

        121______    /35*pi\     121______    /35*pi\
x70 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{70} = - \sqrt[121]{2013} \cos{\left(\frac{35 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{35 \pi}{121} \right)}

        121______    /35*pi\     121______    /35*pi\
x71 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{71} = - \sqrt[121]{2013} \cos{\left(\frac{35 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{35 \pi}{121} \right)}

      121______    /36*pi\     121______    /36*pi\
x72 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{72} = \sqrt[121]{2013} \cos{\left(\frac{36 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{36 \pi}{121} \right)}

      121______    /36*pi\     121______    /36*pi\
x73 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{73} = \sqrt[121]{2013} \cos{\left(\frac{36 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{36 \pi}{121} \right)}

        121______    /37*pi\     121______    /37*pi\
x74 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{74} = - \sqrt[121]{2013} \cos{\left(\frac{37 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{37 \pi}{121} \right)}

        121______    /37*pi\     121______    /37*pi\
x75 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{75} = - \sqrt[121]{2013} \cos{\left(\frac{37 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{37 \pi}{121} \right)}

      121______    /38*pi\     121______    /38*pi\
x76 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{76} = \sqrt[121]{2013} \cos{\left(\frac{38 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{38 \pi}{121} \right)}

      121______    /38*pi\     121______    /38*pi\
x77 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{77} = \sqrt[121]{2013} \cos{\left(\frac{38 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{38 \pi}{121} \right)}

        121______    /39*pi\     121______    /39*pi\
x78 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{78} = - \sqrt[121]{2013} \cos{\left(\frac{39 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{39 \pi}{121} \right)}

        121______    /39*pi\     121______    /39*pi\
x79 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{79} = - \sqrt[121]{2013} \cos{\left(\frac{39 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{39 \pi}{121} \right)}

      121______    /40*pi\     121______    /40*pi\
x80 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{80} = \sqrt[121]{2013} \cos{\left(\frac{40 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{40 \pi}{121} \right)}

      121______    /40*pi\     121______    /40*pi\
x81 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{81} = \sqrt[121]{2013} \cos{\left(\frac{40 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{40 \pi}{121} \right)}

        121______    /41*pi\     121______    /41*pi\
x82 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{82} = - \sqrt[121]{2013} \cos{\left(\frac{41 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{41 \pi}{121} \right)}

        121______    /41*pi\     121______    /41*pi\
x83 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{83} = - \sqrt[121]{2013} \cos{\left(\frac{41 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{41 \pi}{121} \right)}

      121______    /42*pi\     121______    /42*pi\
x84 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{84} = \sqrt[121]{2013} \cos{\left(\frac{42 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{42 \pi}{121} \right)}

      121______    /42*pi\     121______    /42*pi\
x85 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{85} = \sqrt[121]{2013} \cos{\left(\frac{42 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{42 \pi}{121} \right)}

        121______    /43*pi\     121______    /43*pi\
x86 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{86} = - \sqrt[121]{2013} \cos{\left(\frac{43 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{43 \pi}{121} \right)}

        121______    /43*pi\     121______    /43*pi\
x87 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{87} = - \sqrt[121]{2013} \cos{\left(\frac{43 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{43 \pi}{121} \right)}

      121______    /4*pi\     121______    /4*pi\
x88 =  \/ 2013 *cos|----| - I* \/ 2013 *sin|----|
                   \ 11 /                  \ 11 /

x_{88} = \sqrt[121]{2013} \cos{\left(\frac{4 \pi}{11} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{4 \pi}{11} \right)}

      121______    /4*pi\     121______    /4*pi\
x89 =  \/ 2013 *cos|----| + I* \/ 2013 *sin|----|
                   \ 11 /                  \ 11 /

x_{89} = \sqrt[121]{2013} \cos{\left(\frac{4 \pi}{11} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{4 \pi}{11} \right)}

        121______    /45*pi\     121______    /45*pi\
x90 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{90} = - \sqrt[121]{2013} \cos{\left(\frac{45 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{45 \pi}{121} \right)}

        121______    /45*pi\     121______    /45*pi\
x91 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{91} = - \sqrt[121]{2013} \cos{\left(\frac{45 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{45 \pi}{121} \right)}

      121______    /46*pi\     121______    /46*pi\
x92 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{92} = \sqrt[121]{2013} \cos{\left(\frac{46 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{46 \pi}{121} \right)}

      121______    /46*pi\     121______    /46*pi\
x93 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{93} = \sqrt[121]{2013} \cos{\left(\frac{46 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{46 \pi}{121} \right)}

        121______    /47*pi\     121______    /47*pi\
x94 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{94} = - \sqrt[121]{2013} \cos{\left(\frac{47 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{47 \pi}{121} \right)}

        121______    /47*pi\     121______    /47*pi\
x95 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{95} = - \sqrt[121]{2013} \cos{\left(\frac{47 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{47 \pi}{121} \right)}

      121______    /48*pi\     121______    /48*pi\
x96 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{96} = \sqrt[121]{2013} \cos{\left(\frac{48 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{48 \pi}{121} \right)}

      121______    /48*pi\     121______    /48*pi\
x97 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                   \ 121 /                  \ 121 /

x_{97} = \sqrt[121]{2013} \cos{\left(\frac{48 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{48 \pi}{121} \right)}

        121______    /49*pi\     121______    /49*pi\
x98 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{98} = - \sqrt[121]{2013} \cos{\left(\frac{49 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{49 \pi}{121} \right)}

        121______    /49*pi\     121______    /49*pi\
x99 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                     \ 121 /                  \ 121 /

x_{99} = - \sqrt[121]{2013} \cos{\left(\frac{49 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{49 \pi}{121} \right)}

       121______    /50*pi\     121______    /50*pi\
x100 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                    \ 121 /                  \ 121 /

x_{100} = \sqrt[121]{2013} \cos{\left(\frac{50 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{50 \pi}{121} \right)}

       121______    /50*pi\     121______    /50*pi\
x101 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                    \ 121 /                  \ 121 /

x_{101} = \sqrt[121]{2013} \cos{\left(\frac{50 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{50 \pi}{121} \right)}

         121______    /51*pi\     121______    /51*pi\
x102 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                      \ 121 /                  \ 121 /

x_{102} = - \sqrt[121]{2013} \cos{\left(\frac{51 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{51 \pi}{121} \right)}

         121______    /51*pi\     121______    /51*pi\
x103 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                      \ 121 /                  \ 121 /

x_{103} = - \sqrt[121]{2013} \cos{\left(\frac{51 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{51 \pi}{121} \right)}

       121______    /52*pi\     121______    /52*pi\
x104 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                    \ 121 /                  \ 121 /

x_{104} = \sqrt[121]{2013} \cos{\left(\frac{52 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{52 \pi}{121} \right)}

       121______    /52*pi\     121______    /52*pi\
x105 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                    \ 121 /                  \ 121 /

x_{105} = \sqrt[121]{2013} \cos{\left(\frac{52 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{52 \pi}{121} \right)}

         121______    /53*pi\     121______    /53*pi\
x106 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                      \ 121 /                  \ 121 /

x_{106} = - \sqrt[121]{2013} \cos{\left(\frac{53 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{53 \pi}{121} \right)}

         121______    /53*pi\     121______    /53*pi\
x107 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                      \ 121 /                  \ 121 /

x_{107} = - \sqrt[121]{2013} \cos{\left(\frac{53 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{53 \pi}{121} \right)}

       121______    /54*pi\     121______    /54*pi\
x108 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                    \ 121 /                  \ 121 /

x_{108} = \sqrt[121]{2013} \cos{\left(\frac{54 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{54 \pi}{121} \right)}

       121______    /54*pi\     121______    /54*pi\
x109 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                    \ 121 /                  \ 121 /

x_{109} = \sqrt[121]{2013} \cos{\left(\frac{54 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{54 \pi}{121} \right)}

         121______    /5*pi\     121______    /5*pi\
x110 = -  \/ 2013 *cos|----| - I* \/ 2013 *sin|----|
                      \ 11 /                  \ 11 /

x_{110} = - \sqrt[121]{2013} \cos{\left(\frac{5 \pi}{11} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{5 \pi}{11} \right)}

         121______    /5*pi\     121______    /5*pi\
x111 = -  \/ 2013 *cos|----| + I* \/ 2013 *sin|----|
                      \ 11 /                  \ 11 /

x_{111} = - \sqrt[121]{2013} \cos{\left(\frac{5 \pi}{11} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{5 \pi}{11} \right)}

       121______    /56*pi\     121______    /56*pi\
x112 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                    \ 121 /                  \ 121 /

x_{112} = \sqrt[121]{2013} \cos{\left(\frac{56 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{56 \pi}{121} \right)}

       121______    /56*pi\     121______    /56*pi\
x113 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                    \ 121 /                  \ 121 /

x_{113} = \sqrt[121]{2013} \cos{\left(\frac{56 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{56 \pi}{121} \right)}

         121______    /57*pi\     121______    /57*pi\
x114 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                      \ 121 /                  \ 121 /

x_{114} = - \sqrt[121]{2013} \cos{\left(\frac{57 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{57 \pi}{121} \right)}

         121______    /57*pi\     121______    /57*pi\
x115 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                      \ 121 /                  \ 121 /

x_{115} = - \sqrt[121]{2013} \cos{\left(\frac{57 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{57 \pi}{121} \right)}

       121______    /58*pi\     121______    /58*pi\
x116 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                    \ 121 /                  \ 121 /

x_{116} = \sqrt[121]{2013} \cos{\left(\frac{58 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{58 \pi}{121} \right)}

       121______    /58*pi\     121______    /58*pi\
x117 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                    \ 121 /                  \ 121 /

x_{117} = \sqrt[121]{2013} \cos{\left(\frac{58 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{58 \pi}{121} \right)}

         121______    /59*pi\     121______    /59*pi\
x118 = -  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                      \ 121 /                  \ 121 /

x_{118} = - \sqrt[121]{2013} \cos{\left(\frac{59 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{59 \pi}{121} \right)}

         121______    /59*pi\     121______    /59*pi\
x119 = -  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                      \ 121 /                  \ 121 /

x_{119} = - \sqrt[121]{2013} \cos{\left(\frac{59 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{59 \pi}{121} \right)}

       121______    /60*pi\     121______    /60*pi\
x120 =  \/ 2013 *cos|-----| - I* \/ 2013 *sin|-----|
                    \ 121 /                  \ 121 /

x_{120} = \sqrt[121]{2013} \cos{\left(\frac{60 \pi}{121} \right)} - \sqrt[121]{2013} i \sin{\left(\frac{60 \pi}{121} \right)}

       121______    /60*pi\     121______    /60*pi\
x121 =  \/ 2013 *cos|-----| + I* \/ 2013 *sin|-----|
                    \ 121 /                  \ 121 /

x_{121} = \sqrt[121]{2013} \cos{\left(\frac{60 \pi}{121} \right)} + \sqrt[121]{2013} i \sin{\left(\frac{60 \pi}{121} \right)}

x121 = 2013^(1/121)*cos(60*pi/121) + 2013^(1/121)*i*sin(60*pi/121)

Respuesta numérica [src]

x1 = 0.718012075881279 - 0.786414674749877*i

x2 = -1.00480476701449 + 0.352642541333636*i

x3 = 0.286724907194455 - 1.02556238687251*i

x4 = -0.313252546062437 - 1.01777316930576*i

x5 = 0.44237103371439 - 0.968657447348525*i

x6 = 0.0690723135505613 + 1.06264688268214*i

x7 = 0.974318431716692 - 0.429759206289316*i

x8 = 0.54040603497999 - 0.917578715495572*i

x9 = -0.417074953931073 + 0.979815219608622*i

x10 = 0.924516637710933 - 0.528449021542259*i

x11 = 0.676226334819938 - 0.822622225489496*i

x12 = -1.04735041636776 + 0.192474640167403*i

x13 = -0.91048615883335 - 0.552271976788782*i

x14 = 0.895841949103371 - 0.575722662399155*i

x15 = -0.848327675222927 + 0.643684345952395*i

x16 = 0.286724907194455 + 1.02556238687251*i

x17 = 1.05915173791858 + 0.110394645872624*i

x18 = 0.339569030976848 + 1.0092979019966*i

x19 = -1.02175387334307 + 0.300014006475918*i

x20 = -0.985146884681166 - 0.40432041424629*i

x21 = 0.391497736686734 + 0.990312528418409*i

x22 = 0.0138237796406424 + 1.0647996454215*i

x23 = 0.178862322834724 - 1.04976075905106*i

x24 = -1.04735041636776 - 0.192474640167403*i

x25 = -1.06453047070135 - 0.0276452296364464*i

x26 = 0.864752228983775 - 0.621444256744634*i

x27 = -0.0414620207351761 - 1.06408189657087*i

x28 = -0.962833220518387 - 0.454908310805034*i

x29 = -0.880593879734558 - 0.598785270983962*i

x30 = 0.0138237796406424 - 1.0647996454215*i

x31 = -0.564044847267338 + 0.903240162993466*i

x32 = 0.676226334819938 + 0.822622225489496*i

x33 = 1.06488937536877

x34 = -0.467368924723542 - 0.956846732750893*i

x35 = 0.632617607115148 - 0.856612132146868*i

x36 = 0.587303454186879 - 0.88829276394298*i

x37 = 0.587303454186879 + 0.88829276394298*i

x38 = 0.12413464071497 + 1.05762941182054*i

x39 = 0.864752228983775 + 0.621444256744634*i

x40 = -0.937923928219738 + 0.504269854984566*i

x41 = -0.151549559234547 - 1.05405033697121*i

x42 = 0.178862322834724 + 1.04976075905106*i

x43 = 1.01362094560654 + 0.326438294936433*i

x44 = 1.0420006544946 + 0.219599676243188*i

x45 = -0.880593879734558 + 0.598785270983962*i

x46 = -0.313252546062437 + 1.01777316930576*i

x47 = 0.757862183328888 + 0.748087089083396*i

x48 = 0.974318431716692 + 0.429759206289316*i

x49 = -0.365656622800675 + 1.00014229786331*i

x50 = 0.233107823754553 + 1.03906213687042*i

x51 = -0.0966360468334801 - 1.06049557105426*i

x52 = 1.06345399862574 + 0.0552718244697332*i

x53 = -0.610166177823563 - 0.872746593928319*i

x54 = 1.05199419138153 - 0.165219862827757*i

x55 = 1.05199419138153 + 0.165219862827757*i

x56 = 1.05915173791858 - 0.110394645872624*i

x57 = 0.995311280283091 + 0.378609082187066*i

x58 = 0.233107823754553 - 1.03906213687042*i

x59 = -0.81377452928123 - 0.686848161726018*i

x60 = 0.995311280283091 - 0.378609082187066*i

x61 = -1.02175387334307 - 0.300014006475918*i

x62 = 1.01362094560654 - 0.326438294936433*i

x63 = 0.339569030976848 - 1.0092979019966*i

x64 = -0.260003995842328 + 1.03266030422367*i

x65 = -0.610166177823563 + 0.872746593928319*i

x66 = -0.365656622800675 - 1.00014229786331*i

x67 = -0.206054520817522 + 1.0447635695333*i

x68 = 0.49205177664531 + 0.944391037056945*i

x69 = -0.697354237924532 - 0.804789692169323*i

x70 = -0.937923928219738 - 0.504269854984566*i

x71 = 0.0690723135505613 - 1.06264688268214*i

x72 = 0.950698992915591 + 0.479750775551827*i

x73 = 0.718012075881279 + 0.786414674749877*i

x74 = -1.06166068475882 + 0.082861162257851*i

x75 = -1.0559288493093 + 0.137853715835467*i

x76 = 0.831331289740997 + 0.665490547243812*i

x77 = 0.950698992915591 - 0.479750775551827*i

x78 = -0.962833220518387 + 0.454908310805034*i

x79 = -0.417074953931073 - 0.979815219608622*i

x80 = 1.0420006544946 - 0.219599676243188*i

x81 = -1.00480476701449 - 0.352642541333636*i

x82 = -0.654642608240319 + 0.839900254345485*i

x83 = -1.03594851187279 - 0.24657668689851*i

x84 = 0.44237103371439 + 0.968657447348525*i

x85 = 1.02919806806643 - 0.273387487756173*i

x86 = 0.12413464071497 - 1.05762941182054*i

x87 = -1.0559288493093 - 0.137853715835467*i

x88 = -0.777027591082013 - 0.728160356288766*i

x89 = -0.777027591082013 + 0.728160356288766*i

x90 = -1.06453047070135 + 0.0276452296364464*i

x91 = -0.848327675222927 - 0.643684345952395*i

x92 = -1.06166068475882 - 0.082861162257851*i

x93 = 0.54040603497999 + 0.917578715495572*i

x94 = 0.391497736686734 - 0.990312528418409*i

x95 = 0.831331289740997 - 0.665490547243812*i

x96 = -0.260003995842328 - 1.03266030422367*i

x97 = -0.0414620207351761 + 1.06408189657087*i

x98 = 0.795669228318492 - 0.707742792884783*i

x99 = -0.738185923873887 - 0.767509559267996*i

x100 = 0.895841949103371 + 0.575722662399155*i

x101 = 1.02919806806643 + 0.273387487756173*i

x102 = -0.564044847267338 - 0.903240162993466*i

x103 = -0.654642608240319 - 0.839900254345485*i

x104 = -0.516402951524682 - 0.931298756269917*i

x105 = 0.49205177664531 - 0.944391037056945*i

x106 = 1.06345399862574 - 0.0552718244697332*i

x107 = 0.924516637710933 + 0.528449021542259*i

x108 = -0.516402951524682 + 0.931298756269917*i

x109 = -1.03594851187279 + 0.24657668689851*i

x110 = -0.151549559234547 + 1.05405033697121*i

x111 = 0.632617607115148 + 0.856612132146868*i

x112 = -0.81377452928123 + 0.686848161726018*i

x113 = -0.206054520817522 - 1.0447635695333*i

x114 = -0.985146884681166 + 0.40432041424629*i

x115 = 0.757862183328888 - 0.748087089083396*i

x116 = -0.467368924723542 + 0.956846732750893*i

x117 = -0.697354237924532 + 0.804789692169323*i

x118 = -0.91048615883335 + 0.552271976788782*i

x119 = -0.738185923873887 + 0.767509559267996*i

x120 = -0.0966360468334801 + 1.06049557105426*i

x121 = 0.795669228318492 + 0.707742792884783*i

x121 = 0.795669228318492 + 0.707742792884783*i

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(x^9)^5*(x^4)^8/(x^4)^4*(x^15)^4=2013 la ecuación

Solución numérica:

Solución

(x^9)^5(x^4)^8/(x^4)^4(x^15)^4=2013 la ecuación