Sr Examen

Otras calculadoras

6252/x^306=431 la ecuación

El profesor se sorprenderá mucho al ver tu solución correcta😉

v

Solución numérica:

Buscar la solución numérica en el intervalo [, ]

Solución

Ha introducido [src] 
6252      
---- = 431
 306      
x
$$\frac{6252}{x^{306}} = 431$$
Simplificar
Solución detallada
Tenemos la ecuación
$$\frac{6252}{x^{306}} = 431$$
Ya que la potencia en la ecuación es igual a = -306 - contiene un número par -306 en el numerador, entonces
la ecuación tendrá dos raíces reales.
Extraigamos la raíz de potencia -306 de las dos partes de la ecuación:
Obtenemos:
$$\frac{1}{\sqrt[306]{1563} \sqrt[153]{2} \sqrt[306]{\frac{1}{x^{306}}}} = \frac{1}{\sqrt[306]{431}}$$
$$\frac{1}{\sqrt[306]{1563} \sqrt[153]{2} \sqrt[306]{\frac{1}{x^{306}}}} = \frac{-1}{\sqrt[306]{431}}$$
o
$$\frac{1563^{\frac{305}{306}} \cdot 2^{\frac{152}{153}} x}{3126} = \frac{431^{\frac{305}{306}}}{431}$$
$$\frac{1563^{\frac{305}{306}} \cdot 2^{\frac{152}{153}} x}{3126} = - \frac{431^{\frac{305}{306}}}{431}$$
Abrimos los paréntesis en el miembro izquierdo de la ecuación
x*2^152/153*1563^305/306/3126 = 431^(305/306)/431

Abrimos los paréntesis en el miembro derecho de la ecuación
x*2^152/153*1563^305/306/3126 = 431^305/306/431

Dividamos ambos miembros de la ecuación en 2^(152/153)*1563^(305/306)/3126
x = 431^(305/306)/431 / (2^(152/153)*1563^(305/306)/3126)

Obtenemos la respuesta: x = 2^(1/153)*431^(305/306)*1563^(1/306)/431
Abrimos los paréntesis en el miembro izquierdo de la ecuación
x*2^152/153*1563^305/306/3126 = -431^(305/306)/431

Abrimos los paréntesis en el miembro derecho de la ecuación
x*2^152/153*1563^305/306/3126 = -431^305/306/431

Dividamos ambos miembros de la ecuación en 2^(152/153)*1563^(305/306)/3126
x = -431^(305/306)/431 / (2^(152/153)*1563^(305/306)/3126)

Obtenemos la respuesta: x = -2^(1/153)*431^(305/306)*1563^(1/306)/431
o
$$x_{1} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{431}$$
$$x_{2} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{431}$$

Las demás 304 raíces son complejas.
hacemos el cambio:
$$z = x$$
entonces la ecuación será así:
$$\frac{1}{z^{306}} = \frac{431}{6252}$$
Cualquier número complejo se puede presentar que:
$$z = r e^{i p}$$
sustituimos en la ecuación
$$\frac{e^{- 306 i p}}{r^{306}} = \frac{431}{6252}$$
donde
$$r = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{431}$$
- módulo del número complejo
Sustituyamos r:
$$e^{- 306 i p} = 1$$
Usando la fórmula de Euler hallemos las raíces para p
$$- i \sin{\left(306 p \right)} + \cos{\left(306 p \right)} = 1$$
es decir
$$\cos{\left(306 p \right)} = 1$$
y
$$- \sin{\left(306 p \right)} = 0$$
entonces
$$p = - \frac{\pi N}{153}$$
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:
$$z_{1} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{431}$$
$$z_{2} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{431}$$
$$z_{3} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{862} - \frac{\sqrt[153]{2} \cdot 3^{\frac{77}{153}} \cdot 431^{\frac{305}{306}} \sqrt[306]{521} i}{862}$$
$$z_{4} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{862} + \frac{\sqrt[153]{2} \cdot 3^{\frac{77}{153}} \cdot 431^{\frac{305}{306}} \sqrt[306]{521} i}{862}$$
$$z_{5} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{862} - \frac{\sqrt[153]{2} \cdot 3^{\frac{77}{153}} \cdot 431^{\frac{305}{306}} \sqrt[306]{521} i}{862}$$
$$z_{6} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{862} + \frac{\sqrt[153]{2} \cdot 3^{\frac{77}{153}} \cdot 431^{\frac{305}{306}} \sqrt[306]{521} i}{862}$$
$$z_{7} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{153} \right)}}{431}$$
$$z_{8} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{153} \right)}}{431}$$
$$z_{9} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{153} \right)}}{431}$$
$$z_{10} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{153} \right)}}{431}$$
$$z_{11} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{153} \right)}}{431}$$
$$z_{12} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{153} \right)}}{431}$$
$$z_{13} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{153} \right)}}{431}$$
$$z_{14} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{153} \right)}}{431}$$
$$z_{15} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{51} \right)}}{431}$$
$$z_{16} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{51} \right)}}{431}$$
$$z_{17} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{51} \right)}}{431}$$
$$z_{18} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{51} \right)}}{431}$$
$$z_{19} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{153} \right)}}{431}$$
$$z_{20} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{153} \right)}}{431}$$
$$z_{21} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{153} \right)}}{431}$$
$$z_{22} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{153} \right)}}{431}$$
$$z_{23} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{153} \right)}}{431}$$
$$z_{24} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{153} \right)}}{431}$$
$$z_{25} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{153} \right)}}{431}$$
$$z_{26} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{153} \right)}}{431}$$
$$z_{27} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{51} \right)}}{431}$$
$$z_{28} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{51} \right)}}{431}$$
$$z_{29} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{51} \right)}}{431}$$
$$z_{30} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{51} \right)}}{431}$$
$$z_{31} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{153} \right)}}{431}$$
$$z_{32} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{153} \right)}}{431}$$
$$z_{33} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{153} \right)}}{431}$$
$$z_{34} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{153} \right)}}{431}$$
$$z_{35} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{153} \right)}}{431}$$
$$z_{36} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{153} \right)}}{431}$$
$$z_{37} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{153} \right)}}{431}$$
$$z_{38} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{153} \right)}}{431}$$
$$z_{39} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{17} \right)}}{431}$$
$$z_{40} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{17} \right)}}{431}$$
$$z_{41} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{17} \right)}}{431}$$
$$z_{42} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{17} \right)}}{431}$$
$$z_{43} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{153} \right)}}{431}$$
$$z_{44} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{153} \right)}}{431}$$
$$z_{45} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{153} \right)}}{431}$$
$$z_{46} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{153} \right)}}{431}$$
$$z_{47} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{153} \right)}}{431}$$
$$z_{48} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{153} \right)}}{431}$$
$$z_{49} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{153} \right)}}{431}$$
$$z_{50} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{153} \right)}}{431}$$
$$z_{51} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{51} \right)}}{431}$$
$$z_{52} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{51} \right)}}{431}$$
$$z_{53} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{51} \right)}}{431}$$
$$z_{54} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{51} \right)}}{431}$$
$$z_{55} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{153} \right)}}{431}$$
$$z_{56} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{153} \right)}}{431}$$
$$z_{57} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{153} \right)}}{431}$$
$$z_{58} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{153} \right)}}{431}$$
$$z_{59} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{153} \right)}}{431}$$
$$z_{60} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{153} \right)}}{431}$$
$$z_{61} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{153} \right)}}{431}$$
$$z_{62} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{153} \right)}}{431}$$
$$z_{63} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{51} \right)}}{431}$$
$$z_{64} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{51} \right)}}{431}$$
$$z_{65} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{51} \right)}}{431}$$
$$z_{66} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{51} \right)}}{431}$$
$$z_{67} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{153} \right)}}{431}$$
$$z_{68} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{153} \right)}}{431}$$
$$z_{69} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{153} \right)}}{431}$$
$$z_{70} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{153} \right)}}{431}$$
$$z_{71} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{9} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{9} \right)}}{431}$$
$$z_{72} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{9} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{9} \right)}}{431}$$
$$z_{73} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{9} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{9} \right)}}{431}$$
$$z_{74} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{9} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{9} \right)}}{431}$$
$$z_{75} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{17} \right)}}{431}$$
$$z_{76} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{17} \right)}}{431}$$
$$z_{77} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{17} \right)}}{431}$$
$$z_{78} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{17} \right)}}{431}$$
$$z_{79} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{153} \right)}}{431}$$
$$z_{80} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{153} \right)}}{431}$$
$$z_{81} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{153} \right)}}{431}$$
$$z_{82} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{153} \right)}}{431}$$
$$z_{83} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{153} \right)}}{431}$$
$$z_{84} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{153} \right)}}{431}$$
$$z_{85} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{153} \right)}}{431}$$
$$z_{86} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{153} \right)}}{431}$$
$$z_{87} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{51} \right)}}{431}$$
$$z_{88} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{51} \right)}}{431}$$
$$z_{89} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{51} \right)}}{431}$$
$$z_{90} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{51} \right)}}{431}$$
$$z_{91} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{153} \right)}}{431}$$
$$z_{92} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{153} \right)}}{431}$$
$$z_{93} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{153} \right)}}{431}$$
$$z_{94} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{153} \right)}}{431}$$
$$z_{95} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{153} \right)}}{431}$$
$$z_{96} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{153} \right)}}{431}$$
$$z_{97} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{153} \right)}}{431}$$
$$z_{98} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{153} \right)}}{431}$$
$$z_{99} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{51} \right)}}{431}$$
$$z_{100} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{51} \right)}}{431}$$
$$z_{101} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{51} \right)}}{431}$$
$$z_{102} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{51} \right)}}{431}$$
$$z_{103} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{153} \right)}}{431}$$
$$z_{104} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{153} \right)}}{431}$$
$$z_{105} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{153} \right)}}{431}$$
$$z_{106} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{153} \right)}}{431}$$
$$z_{107} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{26 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{26 \pi}{153} \right)}}{431}$$
$$z_{108} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{26 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{26 \pi}{153} \right)}}{431}$$
$$z_{109} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{26 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{26 \pi}{153} \right)}}{431}$$
$$z_{110} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{26 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{26 \pi}{153} \right)}}{431}$$
$$z_{111} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{3 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{3 \pi}{17} \right)}}{431}$$
$$z_{112} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{3 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{3 \pi}{17} \right)}}{431}$$
$$z_{113} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{3 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{3 \pi}{17} \right)}}{431}$$
$$z_{114} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{3 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{3 \pi}{17} \right)}}{431}$$
$$z_{115} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{28 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{28 \pi}{153} \right)}}{431}$$
$$z_{116} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{28 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{28 \pi}{153} \right)}}{431}$$
$$z_{117} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{28 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{28 \pi}{153} \right)}}{431}$$
$$z_{118} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{28 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{28 \pi}{153} \right)}}{431}$$
$$z_{119} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{29 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{29 \pi}{153} \right)}}{431}$$
$$z_{120} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{29 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{29 \pi}{153} \right)}}{431}$$
$$z_{121} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{29 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{29 \pi}{153} \right)}}{431}$$
$$z_{122} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{29 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{29 \pi}{153} \right)}}{431}$$
$$z_{123} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{51} \right)}}{431}$$
$$z_{124} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{51} \right)}}{431}$$
$$z_{125} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{51} \right)}}{431}$$
$$z_{126} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{51} \right)}}{431}$$
$$z_{127} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{31 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{31 \pi}{153} \right)}}{431}$$
$$z_{128} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{31 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{31 \pi}{153} \right)}}{431}$$
$$z_{129} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{31 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{31 \pi}{153} \right)}}{431}$$
$$z_{130} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{31 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{31 \pi}{153} \right)}}{431}$$
$$z_{131} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{32 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{32 \pi}{153} \right)}}{431}$$
$$z_{132} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{32 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{32 \pi}{153} \right)}}{431}$$
$$z_{133} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{32 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{32 \pi}{153} \right)}}{431}$$
$$z_{134} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{32 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{32 \pi}{153} \right)}}{431}$$
$$z_{135} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{51} \right)}}{431}$$
$$z_{136} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{51} \right)}}{431}$$
$$z_{137} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{51} \right)}}{431}$$
$$z_{138} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{51} \right)}}{431}$$
$$z_{139} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{9} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{9} \right)}}{431}$$
$$z_{140} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{9} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{9} \right)}}{431}$$
$$z_{141} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{9} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{9} \right)}}{431}$$
$$z_{142} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{9} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{9} \right)}}{431}$$
$$z_{143} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{35 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{35 \pi}{153} \right)}}{431}$$
$$z_{144} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{35 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{35 \pi}{153} \right)}}{431}$$
$$z_{145} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{35 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{35 \pi}{153} \right)}}{431}$$
$$z_{146} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{35 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{35 \pi}{153} \right)}}{431}$$
$$z_{147} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{17} \right)}}{431}$$
$$z_{148} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{17} \right)}}{431}$$
$$z_{149} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{17} \right)}}{431}$$
$$z_{150} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{17} \right)}}{431}$$
$$z_{151} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{37 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{37 \pi}{153} \right)}}{431}$$
$$z_{152} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{37 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{37 \pi}{153} \right)}}{431}$$
$$z_{153} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{37 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{37 \pi}{153} \right)}}{431}$$
$$z_{154} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{37 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{37 \pi}{153} \right)}}{431}$$
$$z_{155} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{38 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{38 \pi}{153} \right)}}{431}$$
$$z_{156} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{38 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{38 \pi}{153} \right)}}{431}$$
$$z_{157} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{38 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{38 \pi}{153} \right)}}{431}$$
$$z_{158} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{38 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{38 \pi}{153} \right)}}{431}$$
$$z_{159} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{51} \right)}}{431}$$
$$z_{160} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{51} \right)}}{431}$$
$$z_{161} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{51} \right)}}{431}$$
$$z_{162} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{51} \right)}}{431}$$
$$z_{163} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{40 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{40 \pi}{153} \right)}}{431}$$
$$z_{164} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{40 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{40 \pi}{153} \right)}}{431}$$
$$z_{165} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{40 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{40 \pi}{153} \right)}}{431}$$
$$z_{166} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{40 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{40 \pi}{153} \right)}}{431}$$
$$z_{167} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{41 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{41 \pi}{153} \right)}}{431}$$
$$z_{168} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{41 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{41 \pi}{153} \right)}}{431}$$
$$z_{169} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{41 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{41 \pi}{153} \right)}}{431}$$
$$z_{170} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{41 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{41 \pi}{153} \right)}}{431}$$
$$z_{171} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{51} \right)}}{431}$$
$$z_{172} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{51} \right)}}{431}$$
$$z_{173} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{51} \right)}}{431}$$
$$z_{174} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{51} \right)}}{431}$$
$$z_{175} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{43 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{43 \pi}{153} \right)}}{431}$$
$$z_{176} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{43 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{43 \pi}{153} \right)}}{431}$$
$$z_{177} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{43 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{43 \pi}{153} \right)}}{431}$$
$$z_{178} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{43 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{43 \pi}{153} \right)}}{431}$$
$$z_{179} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{44 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{44 \pi}{153} \right)}}{431}$$
$$z_{180} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{44 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{44 \pi}{153} \right)}}{431}$$
$$z_{181} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{44 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{44 \pi}{153} \right)}}{431}$$
$$z_{182} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{44 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{44 \pi}{153} \right)}}{431}$$
$$z_{183} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{17} \right)}}{431}$$
$$z_{184} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{17} \right)}}{431}$$
$$z_{185} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{17} \right)}}{431}$$
$$z_{186} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{17} \right)}}{431}$$
$$z_{187} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{46 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{46 \pi}{153} \right)}}{431}$$
$$z_{188} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{46 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{46 \pi}{153} \right)}}{431}$$
$$z_{189} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{46 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{46 \pi}{153} \right)}}{431}$$
$$z_{190} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{46 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{46 \pi}{153} \right)}}{431}$$
$$z_{191} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{47 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{47 \pi}{153} \right)}}{431}$$
$$z_{192} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{47 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{47 \pi}{153} \right)}}{431}$$
$$z_{193} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{47 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{47 \pi}{153} \right)}}{431}$$
$$z_{194} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{47 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{47 \pi}{153} \right)}}{431}$$
$$z_{195} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{51} \right)}}{431}$$
$$z_{196} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{51} \right)}}{431}$$
$$z_{197} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{51} \right)}}{431}$$
$$z_{198} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{51} \right)}}{431}$$
$$z_{199} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{49 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{49 \pi}{153} \right)}}{431}$$
$$z_{200} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{49 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{49 \pi}{153} \right)}}{431}$$
$$z_{201} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{49 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{49 \pi}{153} \right)}}{431}$$
$$z_{202} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{49 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{49 \pi}{153} \right)}}{431}$$
$$z_{203} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{50 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{50 \pi}{153} \right)}}{431}$$
$$z_{204} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{50 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{50 \pi}{153} \right)}}{431}$$
$$z_{205} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{50 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{50 \pi}{153} \right)}}{431}$$
$$z_{206} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{50 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{50 \pi}{153} \right)}}{431}$$
$$z_{207} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{52 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{52 \pi}{153} \right)}}{431}$$
$$z_{208} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{52 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{52 \pi}{153} \right)}}{431}$$
$$z_{209} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{52 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{52 \pi}{153} \right)}}{431}$$
$$z_{210} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{52 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{52 \pi}{153} \right)}}{431}$$
$$z_{211} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{53 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{53 \pi}{153} \right)}}{431}$$
$$z_{212} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{53 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{53 \pi}{153} \right)}}{431}$$
$$z_{213} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{53 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{53 \pi}{153} \right)}}{431}$$
$$z_{214} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{53 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{53 \pi}{153} \right)}}{431}$$
$$z_{215} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{6 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{6 \pi}{17} \right)}}{431}$$
$$z_{216} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{6 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{6 \pi}{17} \right)}}{431}$$
$$z_{217} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{6 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{6 \pi}{17} \right)}}{431}$$
$$z_{218} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{6 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{6 \pi}{17} \right)}}{431}$$
$$z_{219} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{55 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{55 \pi}{153} \right)}}{431}$$
$$z_{220} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{55 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{55 \pi}{153} \right)}}{431}$$
$$z_{221} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{55 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{55 \pi}{153} \right)}}{431}$$
$$z_{222} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{55 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{55 \pi}{153} \right)}}{431}$$
$$z_{223} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{56 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{56 \pi}{153} \right)}}{431}$$
$$z_{224} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{56 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{56 \pi}{153} \right)}}{431}$$
$$z_{225} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{56 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{56 \pi}{153} \right)}}{431}$$
$$z_{226} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{56 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{56 \pi}{153} \right)}}{431}$$
$$z_{227} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{51} \right)}}{431}$$
$$z_{228} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{51} \right)}}{431}$$
$$z_{229} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{51} \right)}}{431}$$
$$z_{230} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{51} \right)}}{431}$$
$$z_{231} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{58 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{58 \pi}{153} \right)}}{431}$$
$$z_{232} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{58 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{58 \pi}{153} \right)}}{431}$$
$$z_{233} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{58 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{58 \pi}{153} \right)}}{431}$$
$$z_{234} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{58 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{58 \pi}{153} \right)}}{431}$$
$$z_{235} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{59 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{59 \pi}{153} \right)}}{431}$$
$$z_{236} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{59 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{59 \pi}{153} \right)}}{431}$$
$$z_{237} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{59 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{59 \pi}{153} \right)}}{431}$$
$$z_{238} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{59 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{59 \pi}{153} \right)}}{431}$$
$$z_{239} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{51} \right)}}{431}$$
$$z_{240} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{51} \right)}}{431}$$
$$z_{241} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{51} \right)}}{431}$$
$$z_{242} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{51} \right)}}{431}$$
$$z_{243} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{61 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{61 \pi}{153} \right)}}{431}$$
$$z_{244} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{61 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{61 \pi}{153} \right)}}{431}$$
$$z_{245} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{61 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{61 \pi}{153} \right)}}{431}$$
$$z_{246} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{61 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{61 \pi}{153} \right)}}{431}$$
$$z_{247} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{62 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{62 \pi}{153} \right)}}{431}$$
$$z_{248} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{62 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{62 \pi}{153} \right)}}{431}$$
$$z_{249} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{62 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{62 \pi}{153} \right)}}{431}$$
$$z_{250} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{62 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{62 \pi}{153} \right)}}{431}$$
$$z_{251} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{17} \right)}}{431}$$
$$z_{252} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{17} \right)}}{431}$$
$$z_{253} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{17} \right)}}{431}$$
$$z_{254} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{17} \right)}}{431}$$
$$z_{255} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{64 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{64 \pi}{153} \right)}}{431}$$
$$z_{256} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{64 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{64 \pi}{153} \right)}}{431}$$
$$z_{257} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{64 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{64 \pi}{153} \right)}}{431}$$
$$z_{258} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{64 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{64 \pi}{153} \right)}}{431}$$
$$z_{259} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{65 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{65 \pi}{153} \right)}}{431}$$
$$z_{260} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{65 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{65 \pi}{153} \right)}}{431}$$
$$z_{261} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{65 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{65 \pi}{153} \right)}}{431}$$
$$z_{262} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{65 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{65 \pi}{153} \right)}}{431}$$
$$z_{263} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{51} \right)}}{431}$$
$$z_{264} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{51} \right)}}{431}$$
$$z_{265} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{51} \right)}}{431}$$
$$z_{266} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{51} \right)}}{431}$$
$$z_{267} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{67 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{67 \pi}{153} \right)}}{431}$$
$$z_{268} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{67 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{67 \pi}{153} \right)}}{431}$$
$$z_{269} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{67 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{67 \pi}{153} \right)}}{431}$$
$$z_{270} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{67 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{67 \pi}{153} \right)}}{431}$$
$$z_{271} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{9} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{9} \right)}}{431}$$
$$z_{272} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{9} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{9} \right)}}{431}$$
$$z_{273} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{9} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{9} \right)}}{431}$$
$$z_{274} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{9} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{9} \right)}}{431}$$
$$z_{275} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{51} \right)}}{431}$$
$$z_{276} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{51} \right)}}{431}$$
$$z_{277} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{51} \right)}}{431}$$
$$z_{278} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{51} \right)}}{431}$$
$$z_{279} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{70 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{70 \pi}{153} \right)}}{431}$$
$$z_{280} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{70 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{70 \pi}{153} \right)}}{431}$$
$$z_{281} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{70 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{70 \pi}{153} \right)}}{431}$$
$$z_{282} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{70 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{70 \pi}{153} \right)}}{431}$$
$$z_{283} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{71 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{71 \pi}{153} \right)}}{431}$$
$$z_{284} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{71 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{71 \pi}{153} \right)}}{431}$$
$$z_{285} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{71 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{71 \pi}{153} \right)}}{431}$$
$$z_{286} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{71 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{71 \pi}{153} \right)}}{431}$$
$$z_{287} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{17} \right)}}{431}$$
$$z_{288} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{17} \right)}}{431}$$
$$z_{289} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{17} \right)}}{431}$$
$$z_{290} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{17} \right)}}{431}$$
$$z_{291} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{73 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{73 \pi}{153} \right)}}{431}$$
$$z_{292} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{73 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{73 \pi}{153} \right)}}{431}$$
$$z_{293} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{73 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{73 \pi}{153} \right)}}{431}$$
$$z_{294} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{73 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{73 \pi}{153} \right)}}{431}$$
$$z_{295} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{74 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{74 \pi}{153} \right)}}{431}$$
$$z_{296} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{74 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{74 \pi}{153} \right)}}{431}$$
$$z_{297} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{74 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{74 \pi}{153} \right)}}{431}$$
$$z_{298} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{74 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{74 \pi}{153} \right)}}{431}$$
$$z_{299} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{51} \right)}}{431}$$
$$z_{300} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{51} \right)}}{431}$$
$$z_{301} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{51} \right)}}{431}$$
$$z_{302} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{51} \right)}}{431}$$
$$z_{303} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{76 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{76 \pi}{153} \right)}}{431}$$
$$z_{304} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{76 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{76 \pi}{153} \right)}}{431}$$
$$z_{305} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{76 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{76 \pi}{153} \right)}}{431}$$
$$z_{306} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{76 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{76 \pi}{153} \right)}}{431}$$
hacemos cambio inverso
$$z = x$$
$$x = z$$

Entonces la respuesta definitiva es:
$$x_{1} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{431}$$
$$x_{2} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{431}$$
$$x_{3} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{862} - \frac{\sqrt[153]{2} \cdot 3^{\frac{77}{153}} \cdot 431^{\frac{305}{306}} \sqrt[306]{521} i}{862}$$
$$x_{4} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{862} + \frac{\sqrt[153]{2} \cdot 3^{\frac{77}{153}} \cdot 431^{\frac{305}{306}} \sqrt[306]{521} i}{862}$$
$$x_{5} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{862} - \frac{\sqrt[153]{2} \cdot 3^{\frac{77}{153}} \cdot 431^{\frac{305}{306}} \sqrt[306]{521} i}{862}$$
$$x_{6} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{862} + \frac{\sqrt[153]{2} \cdot 3^{\frac{77}{153}} \cdot 431^{\frac{305}{306}} \sqrt[306]{521} i}{862}$$
$$x_{7} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{153} \right)}}{431}$$
$$x_{8} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{153} \right)}}{431}$$
$$x_{9} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{153} \right)}}{431}$$
$$x_{10} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{153} \right)}}{431}$$
$$x_{11} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{153} \right)}}{431}$$
$$x_{12} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{153} \right)}}{431}$$
$$x_{13} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{153} \right)}}{431}$$
$$x_{14} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{153} \right)}}{431}$$
$$x_{15} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{51} \right)}}{431}$$
$$x_{16} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{51} \right)}}{431}$$
$$x_{17} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{51} \right)}}{431}$$
$$x_{18} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{51} \right)}}{431}$$
$$x_{19} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{153} \right)}}{431}$$
$$x_{20} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{153} \right)}}{431}$$
$$x_{21} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{153} \right)}}{431}$$
$$x_{22} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{153} \right)}}{431}$$
$$x_{23} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{153} \right)}}{431}$$
$$x_{24} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{153} \right)}}{431}$$
$$x_{25} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{153} \right)}}{431}$$
$$x_{26} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{153} \right)}}{431}$$
$$x_{27} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{51} \right)}}{431}$$
$$x_{28} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{51} \right)}}{431}$$
$$x_{29} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{51} \right)}}{431}$$
$$x_{30} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{51} \right)}}{431}$$
$$x_{31} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{153} \right)}}{431}$$
$$x_{32} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{153} \right)}}{431}$$
$$x_{33} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{153} \right)}}{431}$$
$$x_{34} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{153} \right)}}{431}$$
$$x_{35} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{153} \right)}}{431}$$
$$x_{36} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{153} \right)}}{431}$$
$$x_{37} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{153} \right)}}{431}$$
$$x_{38} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{153} \right)}}{431}$$
$$x_{39} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{17} \right)}}{431}$$
$$x_{40} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{17} \right)}}{431}$$
$$x_{41} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{17} \right)}}{431}$$
$$x_{42} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{17} \right)}}{431}$$
$$x_{43} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{153} \right)}}{431}$$
$$x_{44} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{153} \right)}}{431}$$
$$x_{45} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{153} \right)}}{431}$$
$$x_{46} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{153} \right)}}{431}$$
$$x_{47} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{153} \right)}}{431}$$
$$x_{48} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{153} \right)}}{431}$$
$$x_{49} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{153} \right)}}{431}$$
$$x_{50} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{153} \right)}}{431}$$
$$x_{51} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{51} \right)}}{431}$$
$$x_{52} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{51} \right)}}{431}$$
$$x_{53} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{51} \right)}}{431}$$
$$x_{54} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{51} \right)}}{431}$$
$$x_{55} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{153} \right)}}{431}$$
$$x_{56} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{153} \right)}}{431}$$
$$x_{57} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{153} \right)}}{431}$$
$$x_{58} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{153} \right)}}{431}$$
$$x_{59} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{153} \right)}}{431}$$
$$x_{60} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{153} \right)}}{431}$$
$$x_{61} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{153} \right)}}{431}$$
$$x_{62} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{153} \right)}}{431}$$
$$x_{63} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{51} \right)}}{431}$$
$$x_{64} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{51} \right)}}{431}$$
$$x_{65} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{51} \right)}}{431}$$
$$x_{66} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{51} \right)}}{431}$$
$$x_{67} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{153} \right)}}{431}$$
$$x_{68} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{153} \right)}}{431}$$
$$x_{69} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{153} \right)}}{431}$$
$$x_{70} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{153} \right)}}{431}$$
$$x_{71} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{9} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{9} \right)}}{431}$$
$$x_{72} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{9} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{9} \right)}}{431}$$
$$x_{73} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{9} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{9} \right)}}{431}$$
$$x_{74} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{9} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{9} \right)}}{431}$$
$$x_{75} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{17} \right)}}{431}$$
$$x_{76} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{17} \right)}}{431}$$
$$x_{77} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{17} \right)}}{431}$$
$$x_{78} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{17} \right)}}{431}$$
$$x_{79} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{153} \right)}}{431}$$
$$x_{80} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{153} \right)}}{431}$$
$$x_{81} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{153} \right)}}{431}$$
$$x_{82} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{153} \right)}}{431}$$
$$x_{83} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{153} \right)}}{431}$$
$$x_{84} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{153} \right)}}{431}$$
$$x_{85} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{153} \right)}}{431}$$
$$x_{86} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{153} \right)}}{431}$$
$$x_{87} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{51} \right)}}{431}$$
$$x_{88} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{51} \right)}}{431}$$
$$x_{89} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{51} \right)}}{431}$$
$$x_{90} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{51} \right)}}{431}$$
$$x_{91} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{153} \right)}}{431}$$
$$x_{92} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{153} \right)}}{431}$$
$$x_{93} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{153} \right)}}{431}$$
$$x_{94} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{153} \right)}}{431}$$
$$x_{95} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{153} \right)}}{431}$$
$$x_{96} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{153} \right)}}{431}$$
$$x_{97} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{153} \right)}}{431}$$
$$x_{98} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{153} \right)}}{431}$$
$$x_{99} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{51} \right)}}{431}$$
$$x_{100} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{51} \right)}}{431}$$
$$x_{101} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{51} \right)}}{431}$$
$$x_{102} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{51} \right)}}{431}$$
$$x_{103} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{153} \right)}}{431}$$
$$x_{104} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{153} \right)}}{431}$$
$$x_{105} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{153} \right)}}{431}$$
$$x_{106} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{153} \right)}}{431}$$
$$x_{107} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{26 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{26 \pi}{153} \right)}}{431}$$
$$x_{108} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{26 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{26 \pi}{153} \right)}}{431}$$
$$x_{109} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{26 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{26 \pi}{153} \right)}}{431}$$
$$x_{110} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{26 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{26 \pi}{153} \right)}}{431}$$
$$x_{111} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{3 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{3 \pi}{17} \right)}}{431}$$
$$x_{112} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{3 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{3 \pi}{17} \right)}}{431}$$
$$x_{113} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{3 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{3 \pi}{17} \right)}}{431}$$
$$x_{114} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{3 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{3 \pi}{17} \right)}}{431}$$
$$x_{115} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{28 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{28 \pi}{153} \right)}}{431}$$
$$x_{116} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{28 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{28 \pi}{153} \right)}}{431}$$
$$x_{117} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{28 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{28 \pi}{153} \right)}}{431}$$
$$x_{118} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{28 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{28 \pi}{153} \right)}}{431}$$
$$x_{119} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{29 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{29 \pi}{153} \right)}}{431}$$
$$x_{120} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{29 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{29 \pi}{153} \right)}}{431}$$
$$x_{121} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{29 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{29 \pi}{153} \right)}}{431}$$
$$x_{122} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{29 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{29 \pi}{153} \right)}}{431}$$
$$x_{123} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{51} \right)}}{431}$$
$$x_{124} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{51} \right)}}{431}$$
$$x_{125} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{51} \right)}}{431}$$
$$x_{126} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{51} \right)}}{431}$$
$$x_{127} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{31 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{31 \pi}{153} \right)}}{431}$$
$$x_{128} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{31 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{31 \pi}{153} \right)}}{431}$$
$$x_{129} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{31 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{31 \pi}{153} \right)}}{431}$$
$$x_{130} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{31 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{31 \pi}{153} \right)}}{431}$$
$$x_{131} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{32 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{32 \pi}{153} \right)}}{431}$$
$$x_{132} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{32 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{32 \pi}{153} \right)}}{431}$$
$$x_{133} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{32 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{32 \pi}{153} \right)}}{431}$$
$$x_{134} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{32 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{32 \pi}{153} \right)}}{431}$$
$$x_{135} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{51} \right)}}{431}$$
$$x_{136} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{51} \right)}}{431}$$
$$x_{137} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{51} \right)}}{431}$$
$$x_{138} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{51} \right)}}{431}$$
$$x_{139} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{9} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{9} \right)}}{431}$$
$$x_{140} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{9} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{9} \right)}}{431}$$
$$x_{141} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{9} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{9} \right)}}{431}$$
$$x_{142} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{9} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{9} \right)}}{431}$$
$$x_{143} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{35 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{35 \pi}{153} \right)}}{431}$$
$$x_{144} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{35 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{35 \pi}{153} \right)}}{431}$$
$$x_{145} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{35 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{35 \pi}{153} \right)}}{431}$$
$$x_{146} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{35 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{35 \pi}{153} \right)}}{431}$$
$$x_{147} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{17} \right)}}{431}$$
$$x_{148} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{17} \right)}}{431}$$
$$x_{149} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{17} \right)}}{431}$$
$$x_{150} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{17} \right)}}{431}$$
$$x_{151} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{37 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{37 \pi}{153} \right)}}{431}$$
$$x_{152} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{37 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{37 \pi}{153} \right)}}{431}$$
$$x_{153} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{37 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{37 \pi}{153} \right)}}{431}$$
$$x_{154} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{37 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{37 \pi}{153} \right)}}{431}$$
$$x_{155} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{38 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{38 \pi}{153} \right)}}{431}$$
$$x_{156} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{38 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{38 \pi}{153} \right)}}{431}$$
$$x_{157} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{38 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{38 \pi}{153} \right)}}{431}$$
$$x_{158} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{38 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{38 \pi}{153} \right)}}{431}$$
$$x_{159} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{51} \right)}}{431}$$
$$x_{160} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{51} \right)}}{431}$$
$$x_{161} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{51} \right)}}{431}$$
$$x_{162} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{51} \right)}}{431}$$
$$x_{163} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{40 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{40 \pi}{153} \right)}}{431}$$
$$x_{164} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{40 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{40 \pi}{153} \right)}}{431}$$
$$x_{165} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{40 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{40 \pi}{153} \right)}}{431}$$
$$x_{166} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{40 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{40 \pi}{153} \right)}}{431}$$
$$x_{167} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{41 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{41 \pi}{153} \right)}}{431}$$
$$x_{168} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{41 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{41 \pi}{153} \right)}}{431}$$
$$x_{169} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{41 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{41 \pi}{153} \right)}}{431}$$
$$x_{170} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{41 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{41 \pi}{153} \right)}}{431}$$
$$x_{171} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{51} \right)}}{431}$$
$$x_{172} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{51} \right)}}{431}$$
$$x_{173} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{51} \right)}}{431}$$
$$x_{174} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{51} \right)}}{431}$$
$$x_{175} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{43 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{43 \pi}{153} \right)}}{431}$$
$$x_{176} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{43 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{43 \pi}{153} \right)}}{431}$$
$$x_{177} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{43 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{43 \pi}{153} \right)}}{431}$$
$$x_{178} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{43 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{43 \pi}{153} \right)}}{431}$$
$$x_{179} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{44 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{44 \pi}{153} \right)}}{431}$$
$$x_{180} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{44 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{44 \pi}{153} \right)}}{431}$$
$$x_{181} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{44 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{44 \pi}{153} \right)}}{431}$$
$$x_{182} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{44 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{44 \pi}{153} \right)}}{431}$$
$$x_{183} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{17} \right)}}{431}$$
$$x_{184} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{17} \right)}}{431}$$
$$x_{185} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{17} \right)}}{431}$$
$$x_{186} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{17} \right)}}{431}$$
$$x_{187} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{46 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{46 \pi}{153} \right)}}{431}$$
$$x_{188} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{46 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{46 \pi}{153} \right)}}{431}$$
$$x_{189} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{46 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{46 \pi}{153} \right)}}{431}$$
$$x_{190} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{46 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{46 \pi}{153} \right)}}{431}$$
$$x_{191} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{47 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{47 \pi}{153} \right)}}{431}$$
$$x_{192} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{47 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{47 \pi}{153} \right)}}{431}$$
$$x_{193} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{47 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{47 \pi}{153} \right)}}{431}$$
$$x_{194} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{47 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{47 \pi}{153} \right)}}{431}$$
$$x_{195} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{51} \right)}}{431}$$
$$x_{196} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{51} \right)}}{431}$$
$$x_{197} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{51} \right)}}{431}$$
$$x_{198} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{51} \right)}}{431}$$
$$x_{199} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{49 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{49 \pi}{153} \right)}}{431}$$
$$x_{200} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{49 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{49 \pi}{153} \right)}}{431}$$
$$x_{201} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{49 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{49 \pi}{153} \right)}}{431}$$
$$x_{202} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{49 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{49 \pi}{153} \right)}}{431}$$
$$x_{203} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{50 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{50 \pi}{153} \right)}}{431}$$
$$x_{204} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{50 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{50 \pi}{153} \right)}}{431}$$
$$x_{205} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{50 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{50 \pi}{153} \right)}}{431}$$
$$x_{206} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{50 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{50 \pi}{153} \right)}}{431}$$
$$x_{207} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{52 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{52 \pi}{153} \right)}}{431}$$
$$x_{208} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{52 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{52 \pi}{153} \right)}}{431}$$
$$x_{209} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{52 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{52 \pi}{153} \right)}}{431}$$
$$x_{210} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{52 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{52 \pi}{153} \right)}}{431}$$
$$x_{211} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{53 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{53 \pi}{153} \right)}}{431}$$
$$x_{212} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{53 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{53 \pi}{153} \right)}}{431}$$
$$x_{213} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{53 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{53 \pi}{153} \right)}}{431}$$
$$x_{214} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{53 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{53 \pi}{153} \right)}}{431}$$
$$x_{215} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{6 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{6 \pi}{17} \right)}}{431}$$
$$x_{216} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{6 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{6 \pi}{17} \right)}}{431}$$
$$x_{217} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{6 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{6 \pi}{17} \right)}}{431}$$
$$x_{218} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{6 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{6 \pi}{17} \right)}}{431}$$
$$x_{219} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{55 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{55 \pi}{153} \right)}}{431}$$
$$x_{220} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{55 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{55 \pi}{153} \right)}}{431}$$
$$x_{221} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{55 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{55 \pi}{153} \right)}}{431}$$
$$x_{222} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{55 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{55 \pi}{153} \right)}}{431}$$
$$x_{223} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{56 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{56 \pi}{153} \right)}}{431}$$
$$x_{224} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{56 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{56 \pi}{153} \right)}}{431}$$
$$x_{225} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{56 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{56 \pi}{153} \right)}}{431}$$
$$x_{226} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{56 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{56 \pi}{153} \right)}}{431}$$
$$x_{227} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{51} \right)}}{431}$$
$$x_{228} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{51} \right)}}{431}$$
$$x_{229} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{51} \right)}}{431}$$
$$x_{230} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{51} \right)}}{431}$$
$$x_{231} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{58 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{58 \pi}{153} \right)}}{431}$$
$$x_{232} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{58 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{58 \pi}{153} \right)}}{431}$$
$$x_{233} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{58 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{58 \pi}{153} \right)}}{431}$$
$$x_{234} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{58 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{58 \pi}{153} \right)}}{431}$$
$$x_{235} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{59 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{59 \pi}{153} \right)}}{431}$$
$$x_{236} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{59 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{59 \pi}{153} \right)}}{431}$$
$$x_{237} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{59 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{59 \pi}{153} \right)}}{431}$$
$$x_{238} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{59 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{59 \pi}{153} \right)}}{431}$$
$$x_{239} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{51} \right)}}{431}$$
$$x_{240} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{51} \right)}}{431}$$
$$x_{241} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{51} \right)}}{431}$$
$$x_{242} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{51} \right)}}{431}$$
$$x_{243} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{61 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{61 \pi}{153} \right)}}{431}$$
$$x_{244} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{61 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{61 \pi}{153} \right)}}{431}$$
$$x_{245} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{61 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{61 \pi}{153} \right)}}{431}$$
$$x_{246} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{61 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{61 \pi}{153} \right)}}{431}$$
$$x_{247} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{62 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{62 \pi}{153} \right)}}{431}$$
$$x_{248} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{62 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{62 \pi}{153} \right)}}{431}$$
$$x_{249} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{62 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{62 \pi}{153} \right)}}{431}$$
$$x_{250} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{62 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{62 \pi}{153} \right)}}{431}$$
$$x_{251} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{17} \right)}}{431}$$
$$x_{252} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{17} \right)}}{431}$$
$$x_{253} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{17} \right)}}{431}$$
$$x_{254} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{17} \right)}}{431}$$
$$x_{255} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{64 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{64 \pi}{153} \right)}}{431}$$
$$x_{256} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{64 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{64 \pi}{153} \right)}}{431}$$
$$x_{257} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{64 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{64 \pi}{153} \right)}}{431}$$
$$x_{258} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{64 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{64 \pi}{153} \right)}}{431}$$
$$x_{259} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{65 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{65 \pi}{153} \right)}}{431}$$
$$x_{260} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{65 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{65 \pi}{153} \right)}}{431}$$
$$x_{261} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{65 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{65 \pi}{153} \right)}}{431}$$
$$x_{262} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{65 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{65 \pi}{153} \right)}}{431}$$
$$x_{263} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{51} \right)}}{431}$$
$$x_{264} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{51} \right)}}{431}$$
$$x_{265} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{51} \right)}}{431}$$
$$x_{266} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{51} \right)}}{431}$$
$$x_{267} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{67 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{67 \pi}{153} \right)}}{431}$$
$$x_{268} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{67 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{67 \pi}{153} \right)}}{431}$$
$$x_{269} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{67 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{67 \pi}{153} \right)}}{431}$$
$$x_{270} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{67 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{67 \pi}{153} \right)}}{431}$$
$$x_{271} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{9} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{9} \right)}}{431}$$
$$x_{272} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{9} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{9} \right)}}{431}$$
$$x_{273} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{9} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{9} \right)}}{431}$$
$$x_{274} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{9} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{9} \right)}}{431}$$
$$x_{275} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{51} \right)}}{431}$$
$$x_{276} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{51} \right)}}{431}$$
$$x_{277} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{51} \right)}}{431}$$
$$x_{278} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{51} \right)}}{431}$$
$$x_{279} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{70 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{70 \pi}{153} \right)}}{431}$$
$$x_{280} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{70 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{70 \pi}{153} \right)}}{431}$$
$$x_{281} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{70 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{70 \pi}{153} \right)}}{431}$$
$$x_{282} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{70 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{70 \pi}{153} \right)}}{431}$$
$$x_{283} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{71 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{71 \pi}{153} \right)}}{431}$$
$$x_{284} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{71 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{71 \pi}{153} \right)}}{431}$$
$$x_{285} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{71 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{71 \pi}{153} \right)}}{431}$$
$$x_{286} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{71 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{71 \pi}{153} \right)}}{431}$$
$$x_{287} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{17} \right)}}{431}$$
$$x_{288} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{17} \right)}}{431}$$
$$x_{289} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{17} \right)}}{431}$$
$$x_{290} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{17} \right)}}{431}$$
$$x_{291} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{73 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{73 \pi}{153} \right)}}{431}$$
$$x_{292} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{73 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{73 \pi}{153} \right)}}{431}$$
$$x_{293} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{73 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{73 \pi}{153} \right)}}{431}$$
$$x_{294} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{73 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{73 \pi}{153} \right)}}{431}$$
$$x_{295} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{74 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{74 \pi}{153} \right)}}{431}$$
$$x_{296} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{74 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{74 \pi}{153} \right)}}{431}$$
$$x_{297} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{74 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{74 \pi}{153} \right)}}{431}$$
$$x_{298} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{74 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{74 \pi}{153} \right)}}{431}$$
$$x_{299} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{51} \right)}}{431}$$
$$x_{300} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{51} \right)}}{431}$$
$$x_{301} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{51} \right)}}{431}$$
$$x_{302} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{51} \right)}}{431}$$
$$x_{303} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{76 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{76 \pi}{153} \right)}}{431}$$
$$x_{304} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{76 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{76 \pi}{153} \right)}}{431}$$
$$x_{305} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{76 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{76 \pi}{153} \right)}}{431}$$
$$x_{306} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{76 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{76 \pi}{153} \right)}}{431}$$
Respuesta rápida [src] 
                305           
                ---           
      153___    306 306______ 
     - \/ 2 *431   * \/ 1563  
x1 = -------------------------
                431
$$x_{1} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{431}$$ 
               305          
               ---          
     153___    306 306______
      \/ 2 *431   * \/ 1563 
x2 = -----------------------
               431
$$x_{2} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{431}$$ 
                 305                        77    305         
                 ---                       ---    ---         
       153___    306 306______     153___  153    306 306_____
        \/ 2 *431   * \/ 1563    I* \/ 2 *3   *431   * \/ 521 
x3 = - ----------------------- - -----------------------------
                 862                          862
$$x_{3} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{862} - \frac{\sqrt[153]{2} \cdot 3^{\frac{77}{153}} \cdot 431^{\frac{305}{306}} \sqrt[306]{521} i}{862}$$ 
                 305                        77    305         
                 ---                       ---    ---         
       153___    306 306______     153___  153    306 306_____
        \/ 2 *431   * \/ 1563    I* \/ 2 *3   *431   * \/ 521 
x4 = - ----------------------- + -----------------------------
                 862                          862
$$x_{4} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{862} + \frac{\sqrt[153]{2} \cdot 3^{\frac{77}{153}} \cdot 431^{\frac{305}{306}} \sqrt[306]{521} i}{862}$$ 
               305                        77    305         
               ---                       ---    ---         
     153___    306 306______     153___  153    306 306_____
      \/ 2 *431   * \/ 1563    I* \/ 2 *3   *431   * \/ 521 
x5 = ----------------------- - -----------------------------
               862                          862
$$x_{5} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{862} - \frac{\sqrt[153]{2} \cdot 3^{\frac{77}{153}} \cdot 431^{\frac{305}{306}} \sqrt[306]{521} i}{862}$$ 
               305                        77    305         
               ---                       ---    ---         
     153___    306 306______     153___  153    306 306_____
      \/ 2 *431   * \/ 1563    I* \/ 2 *3   *431   * \/ 521 
x6 = ----------------------- + -----------------------------
               862                          862
$$x_{6} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}}}{862} + \frac{\sqrt[153]{2} \cdot 3^{\frac{77}{153}} \cdot 431^{\frac{305}{306}} \sqrt[306]{521} i}{862}$$ 
                 305                                  305                   
                 ---                                  ---                   
       153___    306 306______    / pi\     153___    306 306______    / pi\
        \/ 2 *431   * \/ 1563 *cos|---|   I* \/ 2 *431   * \/ 1563 *sin|---|
                                  \153/                                \153/
x7 = - -------------------------------- - ----------------------------------
                     431                                 431
$$x_{7} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{153} \right)}}{431}$$ 
                 305                                  305                   
                 ---                                  ---                   
       153___    306 306______    / pi\     153___    306 306______    / pi\
        \/ 2 *431   * \/ 1563 *cos|---|   I* \/ 2 *431   * \/ 1563 *sin|---|
                                  \153/                                \153/
x8 = - -------------------------------- + ----------------------------------
                     431                                 431
$$x_{8} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{153} \right)}}{431}$$ 
               305                                  305                   
               ---                                  ---                   
     153___    306 306______    / pi\     153___    306 306______    / pi\
      \/ 2 *431   * \/ 1563 *cos|---|   I* \/ 2 *431   * \/ 1563 *sin|---|
                                \153/                                \153/
x9 = -------------------------------- - ----------------------------------
                   431                                 431
$$x_{9} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{153} \right)}}{431}$$ 
                305                                  305                   
                ---                                  ---                   
      153___    306 306______    / pi\     153___    306 306______    / pi\
       \/ 2 *431   * \/ 1563 *cos|---|   I* \/ 2 *431   * \/ 1563 *sin|---|
                                 \153/                                \153/
x10 = -------------------------------- + ----------------------------------
                    431                                 431
$$x_{10} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{153} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /2*pi\     153___    306 306______    /2*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \153 /                                \153 /
x11 = - --------------------------------- - -----------------------------------
                       431                                  431
$$x_{11} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{153} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /2*pi\     153___    306 306______    /2*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \153 /                                \153 /
x12 = - --------------------------------- + -----------------------------------
                       431                                  431
$$x_{12} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{153} \right)}}{431}$$ 
                305                                   305                    
                ---                                   ---                    
      153___    306 306______    /2*pi\     153___    306 306______    /2*pi\
       \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                 \153 /                                \153 /
x13 = --------------------------------- - -----------------------------------
                     431                                  431
$$x_{13} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{153} \right)}}{431}$$ 
                305                                   305                    
                ---                                   ---                    
      153___    306 306______    /2*pi\     153___    306 306______    /2*pi\
       \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                 \153 /                                \153 /
x14 = --------------------------------- + -----------------------------------
                     431                                  431
$$x_{14} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{153} \right)}}{431}$$ 
                  305                                 305                  
                  ---                                 ---                  
        153___    306 306______    /pi\     153___    306 306______    /pi\
         \/ 2 *431   * \/ 1563 *cos|--|   I* \/ 2 *431   * \/ 1563 *sin|--|
                                   \51/                                \51/
x15 = - ------------------------------- - ---------------------------------
                      431                                431
$$x_{15} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{51} \right)}}{431}$$ 
                  305                                 305                  
                  ---                                 ---                  
        153___    306 306______    /pi\     153___    306 306______    /pi\
         \/ 2 *431   * \/ 1563 *cos|--|   I* \/ 2 *431   * \/ 1563 *sin|--|
                                   \51/                                \51/
x16 = - ------------------------------- + ---------------------------------
                      431                                431
$$x_{16} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{51} \right)}}{431}$$ 
                305                                 305                  
                ---                                 ---                  
      153___    306 306______    /pi\     153___    306 306______    /pi\
       \/ 2 *431   * \/ 1563 *cos|--|   I* \/ 2 *431   * \/ 1563 *sin|--|
                                 \51/                                \51/
x17 = ------------------------------- - ---------------------------------
                    431                                431
$$x_{17} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{51} \right)}}{431}$$ 
                305                                 305                  
                ---                                 ---                  
      153___    306 306______    /pi\     153___    306 306______    /pi\
       \/ 2 *431   * \/ 1563 *cos|--|   I* \/ 2 *431   * \/ 1563 *sin|--|
                                 \51/                                \51/
x18 = ------------------------------- + ---------------------------------
                    431                                431
$$x_{18} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{51} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /4*pi\     153___    306 306______    /4*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \153 /                                \153 /
x19 = - --------------------------------- - -----------------------------------
                       431                                  431
$$x_{19} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{153} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /4*pi\     153___    306 306______    /4*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \153 /                                \153 /
x20 = - --------------------------------- + -----------------------------------
                       431                                  431
$$x_{20} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{153} \right)}}{431}$$ 
                305                                   305                    
                ---                                   ---                    
      153___    306 306______    /4*pi\     153___    306 306______    /4*pi\
       \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                 \153 /                                \153 /
x21 = --------------------------------- - -----------------------------------
                     431                                  431
$$x_{21} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{153} \right)}}{431}$$ 
                305                                   305                    
                ---                                   ---                    
      153___    306 306______    /4*pi\     153___    306 306______    /4*pi\
       \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                 \153 /                                \153 /
x22 = --------------------------------- + -----------------------------------
                     431                                  431
$$x_{22} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{153} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /5*pi\     153___    306 306______    /5*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \153 /                                \153 /
x23 = - --------------------------------- - -----------------------------------
                       431                                  431
$$x_{23} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{153} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /5*pi\     153___    306 306______    /5*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \153 /                                \153 /
x24 = - --------------------------------- + -----------------------------------
                       431                                  431
$$x_{24} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{153} \right)}}{431}$$ 
                305                                   305                    
                ---                                   ---                    
      153___    306 306______    /5*pi\     153___    306 306______    /5*pi\
       \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                 \153 /                                \153 /
x25 = --------------------------------- - -----------------------------------
                     431                                  431
$$x_{25} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{153} \right)}}{431}$$ 
                305                                   305                    
                ---                                   ---                    
      153___    306 306______    /5*pi\     153___    306 306______    /5*pi\
       \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                 \153 /                                \153 /
x26 = --------------------------------- + -----------------------------------
                     431                                  431
$$x_{26} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{153} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /2*pi\     153___    306 306______    /2*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \ 51 /                                \ 51 /
x27 = - --------------------------------- - -----------------------------------
                       431                                  431
$$x_{27} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{51} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /2*pi\     153___    306 306______    /2*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \ 51 /                                \ 51 /
x28 = - --------------------------------- + -----------------------------------
                       431                                  431
$$x_{28} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{51} \right)}}{431}$$ 
                305                                   305                    
                ---                                   ---                    
      153___    306 306______    /2*pi\     153___    306 306______    /2*pi\
       \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                 \ 51 /                                \ 51 /
x29 = --------------------------------- - -----------------------------------
                     431                                  431
$$x_{29} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{51} \right)}}{431}$$ 
                305                                   305                    
                ---                                   ---                    
      153___    306 306______    /2*pi\     153___    306 306______    /2*pi\
       \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                 \ 51 /                                \ 51 /
x30 = --------------------------------- + -----------------------------------
                     431                                  431
$$x_{30} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{51} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /7*pi\     153___    306 306______    /7*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \153 /                                \153 /
x31 = - --------------------------------- - -----------------------------------
                       431                                  431
$$x_{31} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{153} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /7*pi\     153___    306 306______    /7*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \153 /                                \153 /
x32 = - --------------------------------- + -----------------------------------
                       431                                  431
$$x_{32} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{153} \right)}}{431}$$ 
                305                                   305                    
                ---                                   ---                    
      153___    306 306______    /7*pi\     153___    306 306______    /7*pi\
       \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                 \153 /                                \153 /
x33 = --------------------------------- - -----------------------------------
                     431                                  431
$$x_{33} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{153} \right)}}{431}$$ 
                305                                   305                    
                ---                                   ---                    
      153___    306 306______    /7*pi\     153___    306 306______    /7*pi\
       \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                 \153 /                                \153 /
x34 = --------------------------------- + -----------------------------------
                     431                                  431
$$x_{34} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{153} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /8*pi\     153___    306 306______    /8*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \153 /                                \153 /
x35 = - --------------------------------- - -----------------------------------
                       431                                  431
$$x_{35} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{153} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /8*pi\     153___    306 306______    /8*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \153 /                                \153 /
x36 = - --------------------------------- + -----------------------------------
                       431                                  431
$$x_{36} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{153} \right)}}{431}$$ 
                305                                   305                    
                ---                                   ---                    
      153___    306 306______    /8*pi\     153___    306 306______    /8*pi\
       \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                 \153 /                                \153 /
x37 = --------------------------------- - -----------------------------------
                     431                                  431
$$x_{37} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{153} \right)}}{431}$$ 
                305                                   305                    
                ---                                   ---                    
      153___    306 306______    /8*pi\     153___    306 306______    /8*pi\
       \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                 \153 /                                \153 /
x38 = --------------------------------- + -----------------------------------
                     431                                  431
$$x_{38} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{153} \right)}}{431}$$ 
                  305                                 305                  
                  ---                                 ---                  
        153___    306 306______    /pi\     153___    306 306______    /pi\
         \/ 2 *431   * \/ 1563 *cos|--|   I* \/ 2 *431   * \/ 1563 *sin|--|
                                   \17/                                \17/
x39 = - ------------------------------- - ---------------------------------
                      431                                431
$$x_{39} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{17} \right)}}{431}$$ 
                  305                                 305                  
                  ---                                 ---                  
        153___    306 306______    /pi\     153___    306 306______    /pi\
         \/ 2 *431   * \/ 1563 *cos|--|   I* \/ 2 *431   * \/ 1563 *sin|--|
                                   \17/                                \17/
x40 = - ------------------------------- + ---------------------------------
                      431                                431
$$x_{40} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{17} \right)}}{431}$$ 
                305                                 305                  
                ---                                 ---                  
      153___    306 306______    /pi\     153___    306 306______    /pi\
       \/ 2 *431   * \/ 1563 *cos|--|   I* \/ 2 *431   * \/ 1563 *sin|--|
                                 \17/                                \17/
x41 = ------------------------------- - ---------------------------------
                    431                                431
$$x_{41} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{17} \right)}}{431}$$ 
                305                                 305                  
                ---                                 ---                  
      153___    306 306______    /pi\     153___    306 306______    /pi\
       \/ 2 *431   * \/ 1563 *cos|--|   I* \/ 2 *431   * \/ 1563 *sin|--|
                                 \17/                                \17/
x42 = ------------------------------- + ---------------------------------
                    431                                431
$$x_{42} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{17} \right)}}{431}$$ 
                  305                                    305                     
                  ---                                    ---                     
        153___    306 306______    /10*pi\     153___    306 306______    /10*pi\
         \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                   \ 153 /                                \ 153 /
x43 = - ---------------------------------- - ------------------------------------
                       431                                   431
$$x_{43} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{153} \right)}}{431}$$ 
                  305                                    305                     
                  ---                                    ---                     
        153___    306 306______    /10*pi\     153___    306 306______    /10*pi\
         \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                   \ 153 /                                \ 153 /
x44 = - ---------------------------------- + ------------------------------------
                       431                                   431
$$x_{44} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{153} \right)}}{431}$$ 
                305                                    305                     
                ---                                    ---                     
      153___    306 306______    /10*pi\     153___    306 306______    /10*pi\
       \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                 \ 153 /                                \ 153 /
x45 = ---------------------------------- - ------------------------------------
                     431                                   431
$$x_{45} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{153} \right)}}{431}$$ 
                305                                    305                     
                ---                                    ---                     
      153___    306 306______    /10*pi\     153___    306 306______    /10*pi\
       \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                 \ 153 /                                \ 153 /
x46 = ---------------------------------- + ------------------------------------
                     431                                   431
$$x_{46} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{153} \right)}}{431}$$ 
                  305                                    305                     
                  ---                                    ---                     
        153___    306 306______    /11*pi\     153___    306 306______    /11*pi\
         \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                   \ 153 /                                \ 153 /
x47 = - ---------------------------------- - ------------------------------------
                       431                                   431
$$x_{47} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{153} \right)}}{431}$$ 
                  305                                    305                     
                  ---                                    ---                     
        153___    306 306______    /11*pi\     153___    306 306______    /11*pi\
         \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                   \ 153 /                                \ 153 /
x48 = - ---------------------------------- + ------------------------------------
                       431                                   431
$$x_{48} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{153} \right)}}{431}$$ 
                305                                    305                     
                ---                                    ---                     
      153___    306 306______    /11*pi\     153___    306 306______    /11*pi\
       \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                 \ 153 /                                \ 153 /
x49 = ---------------------------------- - ------------------------------------
                     431                                   431
$$x_{49} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{153} \right)}}{431}$$ 
                305                                    305                     
                ---                                    ---                     
      153___    306 306______    /11*pi\     153___    306 306______    /11*pi\
       \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                 \ 153 /                                \ 153 /
x50 = ---------------------------------- + ------------------------------------
                     431                                   431
$$x_{50} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{153} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /4*pi\     153___    306 306______    /4*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \ 51 /                                \ 51 /
x51 = - --------------------------------- - -----------------------------------
                       431                                  431
$$x_{51} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{51} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /4*pi\     153___    306 306______    /4*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \ 51 /                                \ 51 /
x52 = - --------------------------------- + -----------------------------------
                       431                                  431
$$x_{52} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{51} \right)}}{431}$$ 
                305                                   305                    
                ---                                   ---                    
      153___    306 306______    /4*pi\     153___    306 306______    /4*pi\
       \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                 \ 51 /                                \ 51 /
x53 = --------------------------------- - -----------------------------------
                     431                                  431
$$x_{53} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{51} \right)}}{431}$$ 
                305                                   305                    
                ---                                   ---                    
      153___    306 306______    /4*pi\     153___    306 306______    /4*pi\
       \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                 \ 51 /                                \ 51 /
x54 = --------------------------------- + -----------------------------------
                     431                                  431
$$x_{54} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{51} \right)}}{431}$$ 
                  305                                    305                     
                  ---                                    ---                     
        153___    306 306______    /13*pi\     153___    306 306______    /13*pi\
         \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                   \ 153 /                                \ 153 /
x55 = - ---------------------------------- - ------------------------------------
                       431                                   431
$$x_{55} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{153} \right)}}{431}$$ 
                  305                                    305                     
                  ---                                    ---                     
        153___    306 306______    /13*pi\     153___    306 306______    /13*pi\
         \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                   \ 153 /                                \ 153 /
x56 = - ---------------------------------- + ------------------------------------
                       431                                   431
$$x_{56} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{153} \right)}}{431}$$ 
                305                                    305                     
                ---                                    ---                     
      153___    306 306______    /13*pi\     153___    306 306______    /13*pi\
       \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                 \ 153 /                                \ 153 /
x57 = ---------------------------------- - ------------------------------------
                     431                                   431
$$x_{57} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{153} \right)}}{431}$$ 
                305                                    305                     
                ---                                    ---                     
      153___    306 306______    /13*pi\     153___    306 306______    /13*pi\
       \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                 \ 153 /                                \ 153 /
x58 = ---------------------------------- + ------------------------------------
                     431                                   431
$$x_{58} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{153} \right)}}{431}$$ 
                  305                                    305                     
                  ---                                    ---                     
        153___    306 306______    /14*pi\     153___    306 306______    /14*pi\
         \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                   \ 153 /                                \ 153 /
x59 = - ---------------------------------- - ------------------------------------
                       431                                   431
$$x_{59} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{153} \right)}}{431}$$ 
                  305                                    305                     
                  ---                                    ---                     
        153___    306 306______    /14*pi\     153___    306 306______    /14*pi\
         \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                   \ 153 /                                \ 153 /
x60 = - ---------------------------------- + ------------------------------------
                       431                                   431
$$x_{60} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{153} \right)}}{431}$$ 
                305                                    305                     
                ---                                    ---                     
      153___    306 306______    /14*pi\     153___    306 306______    /14*pi\
       \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                 \ 153 /                                \ 153 /
x61 = ---------------------------------- - ------------------------------------
                     431                                   431
$$x_{61} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{153} \right)}}{431}$$ 
                305                                    305                     
                ---                                    ---                     
      153___    306 306______    /14*pi\     153___    306 306______    /14*pi\
       \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                 \ 153 /                                \ 153 /
x62 = ---------------------------------- + ------------------------------------
                     431                                   431
$$x_{62} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{153} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /5*pi\     153___    306 306______    /5*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \ 51 /                                \ 51 /
x63 = - --------------------------------- - -----------------------------------
                       431                                  431
$$x_{63} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{51} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /5*pi\     153___    306 306______    /5*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \ 51 /                                \ 51 /
x64 = - --------------------------------- + -----------------------------------
                       431                                  431
$$x_{64} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{51} \right)}}{431}$$ 
                305                                   305                    
                ---                                   ---                    
      153___    306 306______    /5*pi\     153___    306 306______    /5*pi\
       \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                 \ 51 /                                \ 51 /
x65 = --------------------------------- - -----------------------------------
                     431                                  431
$$x_{65} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{51} \right)}}{431}$$ 
                305                                   305                    
                ---                                   ---                    
      153___    306 306______    /5*pi\     153___    306 306______    /5*pi\
       \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                 \ 51 /                                \ 51 /
x66 = --------------------------------- + -----------------------------------
                     431                                  431
$$x_{66} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{51} \right)}}{431}$$ 
                  305                                    305                     
                  ---                                    ---                     
        153___    306 306______    /16*pi\     153___    306 306______    /16*pi\
         \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                   \ 153 /                                \ 153 /
x67 = - ---------------------------------- - ------------------------------------
                       431                                   431
$$x_{67} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{153} \right)}}{431}$$ 
                  305                                    305                     
                  ---                                    ---                     
        153___    306 306______    /16*pi\     153___    306 306______    /16*pi\
         \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                   \ 153 /                                \ 153 /
x68 = - ---------------------------------- + ------------------------------------
                       431                                   431
$$x_{68} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{153} \right)}}{431}$$ 
                305                                    305                     
                ---                                    ---                     
      153___    306 306______    /16*pi\     153___    306 306______    /16*pi\
       \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                 \ 153 /                                \ 153 /
x69 = ---------------------------------- - ------------------------------------
                     431                                   431
$$x_{69} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{153} \right)}}{431}$$ 
                305                                    305                     
                ---                                    ---                     
      153___    306 306______    /16*pi\     153___    306 306______    /16*pi\
       \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                 \ 153 /                                \ 153 /
x70 = ---------------------------------- + ------------------------------------
                     431                                   431
$$x_{70} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{153} \right)}}{431}$$ 
                  305                                 305                  
                  ---                                 ---                  
        153___    306 306______    /pi\     153___    306 306______    /pi\
         \/ 2 *431   * \/ 1563 *cos|--|   I* \/ 2 *431   * \/ 1563 *sin|--|
                                   \9 /                                \9 /
x71 = - ------------------------------- - ---------------------------------
                      431                                431
$$x_{71} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{9} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{9} \right)}}{431}$$ 
                  305                                 305                  
                  ---                                 ---                  
        153___    306 306______    /pi\     153___    306 306______    /pi\
         \/ 2 *431   * \/ 1563 *cos|--|   I* \/ 2 *431   * \/ 1563 *sin|--|
                                   \9 /                                \9 /
x72 = - ------------------------------- + ---------------------------------
                      431                                431
$$x_{72} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{9} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{9} \right)}}{431}$$ 
                305                                 305                  
                ---                                 ---                  
      153___    306 306______    /pi\     153___    306 306______    /pi\
       \/ 2 *431   * \/ 1563 *cos|--|   I* \/ 2 *431   * \/ 1563 *sin|--|
                                 \9 /                                \9 /
x73 = ------------------------------- - ---------------------------------
                    431                                431
$$x_{73} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{9} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{9} \right)}}{431}$$ 
                305                                 305                  
                ---                                 ---                  
      153___    306 306______    /pi\     153___    306 306______    /pi\
       \/ 2 *431   * \/ 1563 *cos|--|   I* \/ 2 *431   * \/ 1563 *sin|--|
                                 \9 /                                \9 /
x74 = ------------------------------- + ---------------------------------
                    431                                431
$$x_{74} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{\pi}{9} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{\pi}{9} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /2*pi\     153___    306 306______    /2*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \ 17 /                                \ 17 /
x75 = - --------------------------------- - -----------------------------------
                       431                                  431
$$x_{75} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{17} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /2*pi\     153___    306 306______    /2*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \ 17 /                                \ 17 /
x76 = - --------------------------------- + -----------------------------------
                       431                                  431
$$x_{76} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{17} \right)}}{431}$$ 
                305                                   305                    
                ---                                   ---                    
      153___    306 306______    /2*pi\     153___    306 306______    /2*pi\
       \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                 \ 17 /                                \ 17 /
x77 = --------------------------------- - -----------------------------------
                     431                                  431
$$x_{77} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{17} \right)}}{431}$$ 
                305                                   305                    
                ---                                   ---                    
      153___    306 306______    /2*pi\     153___    306 306______    /2*pi\
       \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                 \ 17 /                                \ 17 /
x78 = --------------------------------- + -----------------------------------
                     431                                  431
$$x_{78} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{17} \right)}}{431}$$ 
                  305                                    305                     
                  ---                                    ---                     
        153___    306 306______    /19*pi\     153___    306 306______    /19*pi\
         \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                   \ 153 /                                \ 153 /
x79 = - ---------------------------------- - ------------------------------------
                       431                                   431
$$x_{79} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{153} \right)}}{431}$$ 
                  305                                    305                     
                  ---                                    ---                     
        153___    306 306______    /19*pi\     153___    306 306______    /19*pi\
         \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                   \ 153 /                                \ 153 /
x80 = - ---------------------------------- + ------------------------------------
                       431                                   431
$$x_{80} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{153} \right)}}{431}$$ 
                305                                    305                     
                ---                                    ---                     
      153___    306 306______    /19*pi\     153___    306 306______    /19*pi\
       \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                 \ 153 /                                \ 153 /
x81 = ---------------------------------- - ------------------------------------
                     431                                   431
$$x_{81} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{153} \right)}}{431}$$ 
                305                                    305                     
                ---                                    ---                     
      153___    306 306______    /19*pi\     153___    306 306______    /19*pi\
       \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                 \ 153 /                                \ 153 /
x82 = ---------------------------------- + ------------------------------------
                     431                                   431
$$x_{82} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{153} \right)}}{431}$$ 
                  305                                    305                     
                  ---                                    ---                     
        153___    306 306______    /20*pi\     153___    306 306______    /20*pi\
         \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                   \ 153 /                                \ 153 /
x83 = - ---------------------------------- - ------------------------------------
                       431                                   431
$$x_{83} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{153} \right)}}{431}$$ 
                  305                                    305                     
                  ---                                    ---                     
        153___    306 306______    /20*pi\     153___    306 306______    /20*pi\
         \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                   \ 153 /                                \ 153 /
x84 = - ---------------------------------- + ------------------------------------
                       431                                   431
$$x_{84} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{153} \right)}}{431}$$ 
                305                                    305                     
                ---                                    ---                     
      153___    306 306______    /20*pi\     153___    306 306______    /20*pi\
       \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                 \ 153 /                                \ 153 /
x85 = ---------------------------------- - ------------------------------------
                     431                                   431
$$x_{85} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{153} \right)}}{431}$$ 
                305                                    305                     
                ---                                    ---                     
      153___    306 306______    /20*pi\     153___    306 306______    /20*pi\
       \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                 \ 153 /                                \ 153 /
x86 = ---------------------------------- + ------------------------------------
                     431                                   431
$$x_{86} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{153} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /7*pi\     153___    306 306______    /7*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \ 51 /                                \ 51 /
x87 = - --------------------------------- - -----------------------------------
                       431                                  431
$$x_{87} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{51} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /7*pi\     153___    306 306______    /7*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \ 51 /                                \ 51 /
x88 = - --------------------------------- + -----------------------------------
                       431                                  431
$$x_{88} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{51} \right)}}{431}$$ 
                305                                   305                    
                ---                                   ---                    
      153___    306 306______    /7*pi\     153___    306 306______    /7*pi\
       \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                 \ 51 /                                \ 51 /
x89 = --------------------------------- - -----------------------------------
                     431                                  431
$$x_{89} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{51} \right)}}{431}$$ 
                305                                   305                    
                ---                                   ---                    
      153___    306 306______    /7*pi\     153___    306 306______    /7*pi\
       \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                 \ 51 /                                \ 51 /
x90 = --------------------------------- + -----------------------------------
                     431                                  431
$$x_{90} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{51} \right)}}{431}$$ 
                  305                                    305                     
                  ---                                    ---                     
        153___    306 306______    /22*pi\     153___    306 306______    /22*pi\
         \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                   \ 153 /                                \ 153 /
x91 = - ---------------------------------- - ------------------------------------
                       431                                   431
$$x_{91} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{153} \right)}}{431}$$ 
                  305                                    305                     
                  ---                                    ---                     
        153___    306 306______    /22*pi\     153___    306 306______    /22*pi\
         \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                   \ 153 /                                \ 153 /
x92 = - ---------------------------------- + ------------------------------------
                       431                                   431
$$x_{92} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{153} \right)}}{431}$$ 
                305                                    305                     
                ---                                    ---                     
      153___    306 306______    /22*pi\     153___    306 306______    /22*pi\
       \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                 \ 153 /                                \ 153 /
x93 = ---------------------------------- - ------------------------------------
                     431                                   431
$$x_{93} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{153} \right)}}{431}$$ 
                305                                    305                     
                ---                                    ---                     
      153___    306 306______    /22*pi\     153___    306 306______    /22*pi\
       \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                 \ 153 /                                \ 153 /
x94 = ---------------------------------- + ------------------------------------
                     431                                   431
$$x_{94} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{153} \right)}}{431}$$ 
                  305                                    305                     
                  ---                                    ---                     
        153___    306 306______    /23*pi\     153___    306 306______    /23*pi\
         \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                   \ 153 /                                \ 153 /
x95 = - ---------------------------------- - ------------------------------------
                       431                                   431
$$x_{95} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{153} \right)}}{431}$$ 
                  305                                    305                     
                  ---                                    ---                     
        153___    306 306______    /23*pi\     153___    306 306______    /23*pi\
         \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                   \ 153 /                                \ 153 /
x96 = - ---------------------------------- + ------------------------------------
                       431                                   431
$$x_{96} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{153} \right)}}{431}$$ 
                305                                    305                     
                ---                                    ---                     
      153___    306 306______    /23*pi\     153___    306 306______    /23*pi\
       \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                 \ 153 /                                \ 153 /
x97 = ---------------------------------- - ------------------------------------
                     431                                   431
$$x_{97} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{153} \right)}}{431}$$ 
                305                                    305                     
                ---                                    ---                     
      153___    306 306______    /23*pi\     153___    306 306______    /23*pi\
       \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                 \ 153 /                                \ 153 /
x98 = ---------------------------------- + ------------------------------------
                     431                                   431
$$x_{98} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{153} \right)}}{431}$$ 
                  305                                   305                    
                  ---                                   ---                    
        153___    306 306______    /8*pi\     153___    306 306______    /8*pi\
         \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                   \ 51 /                                \ 51 /
x99 = - --------------------------------- - -----------------------------------
                       431                                  431
$$x_{99} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{51} \right)}}{431}$$ 
                   305                                   305                    
                   ---                                   ---                    
         153___    306 306______    /8*pi\     153___    306 306______    /8*pi\
          \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                    \ 51 /                                \ 51 /
x100 = - --------------------------------- + -----------------------------------
                        431                                  431
$$x_{100} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{51} \right)}}{431}$$ 
                 305                                   305                    
                 ---                                   ---                    
       153___    306 306______    /8*pi\     153___    306 306______    /8*pi\
        \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                  \ 51 /                                \ 51 /
x101 = --------------------------------- - -----------------------------------
                      431                                  431
$$x_{101} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{51} \right)}}{431}$$ 
                 305                                   305                    
                 ---                                   ---                    
       153___    306 306______    /8*pi\     153___    306 306______    /8*pi\
        \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                  \ 51 /                                \ 51 /
x102 = --------------------------------- + -----------------------------------
                      431                                  431
$$x_{102} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{51} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /25*pi\     153___    306 306______    /25*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x103 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{103} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /25*pi\     153___    306 306______    /25*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x104 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{104} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /25*pi\     153___    306 306______    /25*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x105 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{105} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /25*pi\     153___    306 306______    /25*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x106 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{106} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /26*pi\     153___    306 306______    /26*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x107 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{107} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{26 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{26 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /26*pi\     153___    306 306______    /26*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x108 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{108} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{26 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{26 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /26*pi\     153___    306 306______    /26*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x109 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{109} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{26 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{26 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /26*pi\     153___    306 306______    /26*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x110 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{110} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{26 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{26 \pi}{153} \right)}}{431}$$ 
                   305                                   305                    
                   ---                                   ---                    
         153___    306 306______    /3*pi\     153___    306 306______    /3*pi\
          \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                    \ 17 /                                \ 17 /
x111 = - --------------------------------- - -----------------------------------
                        431                                  431
$$x_{111} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{3 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{3 \pi}{17} \right)}}{431}$$ 
                   305                                   305                    
                   ---                                   ---                    
         153___    306 306______    /3*pi\     153___    306 306______    /3*pi\
          \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                    \ 17 /                                \ 17 /
x112 = - --------------------------------- + -----------------------------------
                        431                                  431
$$x_{112} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{3 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{3 \pi}{17} \right)}}{431}$$ 
                 305                                   305                    
                 ---                                   ---                    
       153___    306 306______    /3*pi\     153___    306 306______    /3*pi\
        \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                  \ 17 /                                \ 17 /
x113 = --------------------------------- - -----------------------------------
                      431                                  431
$$x_{113} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{3 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{3 \pi}{17} \right)}}{431}$$ 
                 305                                   305                    
                 ---                                   ---                    
       153___    306 306______    /3*pi\     153___    306 306______    /3*pi\
        \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                  \ 17 /                                \ 17 /
x114 = --------------------------------- + -----------------------------------
                      431                                  431
$$x_{114} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{3 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{3 \pi}{17} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /28*pi\     153___    306 306______    /28*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x115 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{115} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{28 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{28 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /28*pi\     153___    306 306______    /28*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x116 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{116} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{28 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{28 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /28*pi\     153___    306 306______    /28*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x117 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{117} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{28 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{28 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /28*pi\     153___    306 306______    /28*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x118 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{118} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{28 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{28 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /29*pi\     153___    306 306______    /29*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x119 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{119} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{29 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{29 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /29*pi\     153___    306 306______    /29*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x120 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{120} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{29 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{29 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /29*pi\     153___    306 306______    /29*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x121 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{121} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{29 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{29 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /29*pi\     153___    306 306______    /29*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x122 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{122} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{29 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{29 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /10*pi\     153___    306 306______    /10*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \  51 /                                \  51 /
x123 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{123} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{51} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /10*pi\     153___    306 306______    /10*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \  51 /                                \  51 /
x124 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{124} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{51} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /10*pi\     153___    306 306______    /10*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \  51 /                                \  51 /
x125 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{125} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{51} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /10*pi\     153___    306 306______    /10*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \  51 /                                \  51 /
x126 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{126} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{10 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{10 \pi}{51} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /31*pi\     153___    306 306______    /31*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x127 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{127} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{31 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{31 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /31*pi\     153___    306 306______    /31*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x128 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{128} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{31 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{31 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /31*pi\     153___    306 306______    /31*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x129 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{129} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{31 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{31 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /31*pi\     153___    306 306______    /31*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x130 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{130} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{31 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{31 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /32*pi\     153___    306 306______    /32*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x131 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{131} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{32 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{32 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /32*pi\     153___    306 306______    /32*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x132 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{132} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{32 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{32 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /32*pi\     153___    306 306______    /32*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x133 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{133} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{32 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{32 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /32*pi\     153___    306 306______    /32*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x134 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{134} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{32 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{32 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /11*pi\     153___    306 306______    /11*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \  51 /                                \  51 /
x135 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{135} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{51} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /11*pi\     153___    306 306______    /11*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \  51 /                                \  51 /
x136 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{136} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{51} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /11*pi\     153___    306 306______    /11*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \  51 /                                \  51 /
x137 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{137} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{51} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /11*pi\     153___    306 306______    /11*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \  51 /                                \  51 /
x138 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{138} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{11 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{11 \pi}{51} \right)}}{431}$$ 
                   305                                   305                    
                   ---                                   ---                    
         153___    306 306______    /2*pi\     153___    306 306______    /2*pi\
          \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                    \ 9  /                                \ 9  /
x139 = - --------------------------------- - -----------------------------------
                        431                                  431
$$x_{139} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{9} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{9} \right)}}{431}$$ 
                   305                                   305                    
                   ---                                   ---                    
         153___    306 306______    /2*pi\     153___    306 306______    /2*pi\
          \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                    \ 9  /                                \ 9  /
x140 = - --------------------------------- + -----------------------------------
                        431                                  431
$$x_{140} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{9} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{9} \right)}}{431}$$ 
                 305                                   305                    
                 ---                                   ---                    
       153___    306 306______    /2*pi\     153___    306 306______    /2*pi\
        \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                  \ 9  /                                \ 9  /
x141 = --------------------------------- - -----------------------------------
                      431                                  431
$$x_{141} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{9} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{9} \right)}}{431}$$ 
                 305                                   305                    
                 ---                                   ---                    
       153___    306 306______    /2*pi\     153___    306 306______    /2*pi\
        \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                  \ 9  /                                \ 9  /
x142 = --------------------------------- + -----------------------------------
                      431                                  431
$$x_{142} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{2 \pi}{9} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{2 \pi}{9} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /35*pi\     153___    306 306______    /35*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x143 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{143} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{35 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{35 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /35*pi\     153___    306 306______    /35*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x144 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{144} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{35 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{35 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /35*pi\     153___    306 306______    /35*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x145 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{145} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{35 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{35 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /35*pi\     153___    306 306______    /35*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x146 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{146} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{35 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{35 \pi}{153} \right)}}{431}$$ 
                   305                                   305                    
                   ---                                   ---                    
         153___    306 306______    /4*pi\     153___    306 306______    /4*pi\
          \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                    \ 17 /                                \ 17 /
x147 = - --------------------------------- - -----------------------------------
                        431                                  431
$$x_{147} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{17} \right)}}{431}$$ 
                   305                                   305                    
                   ---                                   ---                    
         153___    306 306______    /4*pi\     153___    306 306______    /4*pi\
          \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                    \ 17 /                                \ 17 /
x148 = - --------------------------------- + -----------------------------------
                        431                                  431
$$x_{148} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{17} \right)}}{431}$$ 
                 305                                   305                    
                 ---                                   ---                    
       153___    306 306______    /4*pi\     153___    306 306______    /4*pi\
        \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                  \ 17 /                                \ 17 /
x149 = --------------------------------- - -----------------------------------
                      431                                  431
$$x_{149} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{17} \right)}}{431}$$ 
                 305                                   305                    
                 ---                                   ---                    
       153___    306 306______    /4*pi\     153___    306 306______    /4*pi\
        \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                  \ 17 /                                \ 17 /
x150 = --------------------------------- + -----------------------------------
                      431                                  431
$$x_{150} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{17} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /37*pi\     153___    306 306______    /37*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x151 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{151} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{37 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{37 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /37*pi\     153___    306 306______    /37*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x152 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{152} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{37 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{37 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /37*pi\     153___    306 306______    /37*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x153 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{153} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{37 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{37 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /37*pi\     153___    306 306______    /37*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x154 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{154} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{37 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{37 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /38*pi\     153___    306 306______    /38*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x155 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{155} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{38 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{38 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /38*pi\     153___    306 306______    /38*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x156 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{156} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{38 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{38 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /38*pi\     153___    306 306______    /38*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x157 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{157} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{38 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{38 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /38*pi\     153___    306 306______    /38*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x158 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{158} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{38 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{38 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /13*pi\     153___    306 306______    /13*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \  51 /                                \  51 /
x159 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{159} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{51} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /13*pi\     153___    306 306______    /13*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \  51 /                                \  51 /
x160 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{160} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{51} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /13*pi\     153___    306 306______    /13*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \  51 /                                \  51 /
x161 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{161} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{51} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /13*pi\     153___    306 306______    /13*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \  51 /                                \  51 /
x162 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{162} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{13 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{13 \pi}{51} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /40*pi\     153___    306 306______    /40*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x163 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{163} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{40 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{40 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /40*pi\     153___    306 306______    /40*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x164 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{164} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{40 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{40 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /40*pi\     153___    306 306______    /40*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x165 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{165} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{40 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{40 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /40*pi\     153___    306 306______    /40*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x166 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{166} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{40 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{40 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /41*pi\     153___    306 306______    /41*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x167 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{167} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{41 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{41 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /41*pi\     153___    306 306______    /41*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x168 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{168} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{41 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{41 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /41*pi\     153___    306 306______    /41*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x169 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{169} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{41 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{41 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /41*pi\     153___    306 306______    /41*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x170 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{170} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{41 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{41 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /14*pi\     153___    306 306______    /14*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \  51 /                                \  51 /
x171 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{171} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{51} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /14*pi\     153___    306 306______    /14*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \  51 /                                \  51 /
x172 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{172} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{51} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /14*pi\     153___    306 306______    /14*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \  51 /                                \  51 /
x173 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{173} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{51} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /14*pi\     153___    306 306______    /14*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \  51 /                                \  51 /
x174 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{174} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{14 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{14 \pi}{51} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /43*pi\     153___    306 306______    /43*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x175 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{175} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{43 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{43 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /43*pi\     153___    306 306______    /43*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x176 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{176} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{43 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{43 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /43*pi\     153___    306 306______    /43*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x177 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{177} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{43 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{43 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /43*pi\     153___    306 306______    /43*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x178 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{178} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{43 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{43 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /44*pi\     153___    306 306______    /44*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x179 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{179} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{44 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{44 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /44*pi\     153___    306 306______    /44*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x180 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{180} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{44 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{44 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /44*pi\     153___    306 306______    /44*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x181 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{181} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{44 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{44 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /44*pi\     153___    306 306______    /44*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x182 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{182} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{44 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{44 \pi}{153} \right)}}{431}$$ 
                   305                                   305                    
                   ---                                   ---                    
         153___    306 306______    /5*pi\     153___    306 306______    /5*pi\
          \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                    \ 17 /                                \ 17 /
x183 = - --------------------------------- - -----------------------------------
                        431                                  431
$$x_{183} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{17} \right)}}{431}$$ 
                   305                                   305                    
                   ---                                   ---                    
         153___    306 306______    /5*pi\     153___    306 306______    /5*pi\
          \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                    \ 17 /                                \ 17 /
x184 = - --------------------------------- + -----------------------------------
                        431                                  431
$$x_{184} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{17} \right)}}{431}$$ 
                 305                                   305                    
                 ---                                   ---                    
       153___    306 306______    /5*pi\     153___    306 306______    /5*pi\
        \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                  \ 17 /                                \ 17 /
x185 = --------------------------------- - -----------------------------------
                      431                                  431
$$x_{185} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{17} \right)}}{431}$$ 
                 305                                   305                    
                 ---                                   ---                    
       153___    306 306______    /5*pi\     153___    306 306______    /5*pi\
        \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                  \ 17 /                                \ 17 /
x186 = --------------------------------- + -----------------------------------
                      431                                  431
$$x_{186} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{5 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{5 \pi}{17} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /46*pi\     153___    306 306______    /46*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x187 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{187} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{46 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{46 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /46*pi\     153___    306 306______    /46*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x188 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{188} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{46 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{46 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /46*pi\     153___    306 306______    /46*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x189 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{189} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{46 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{46 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /46*pi\     153___    306 306______    /46*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x190 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{190} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{46 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{46 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /47*pi\     153___    306 306______    /47*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x191 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{191} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{47 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{47 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /47*pi\     153___    306 306______    /47*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x192 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{192} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{47 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{47 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /47*pi\     153___    306 306______    /47*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x193 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{193} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{47 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{47 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /47*pi\     153___    306 306______    /47*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x194 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{194} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{47 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{47 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /16*pi\     153___    306 306______    /16*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \  51 /                                \  51 /
x195 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{195} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{51} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /16*pi\     153___    306 306______    /16*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \  51 /                                \  51 /
x196 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{196} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{51} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /16*pi\     153___    306 306______    /16*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \  51 /                                \  51 /
x197 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{197} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{51} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /16*pi\     153___    306 306______    /16*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \  51 /                                \  51 /
x198 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{198} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{16 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{16 \pi}{51} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /49*pi\     153___    306 306______    /49*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x199 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{199} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{49 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{49 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /49*pi\     153___    306 306______    /49*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x200 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{200} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{49 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{49 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /49*pi\     153___    306 306______    /49*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x201 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{201} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{49 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{49 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /49*pi\     153___    306 306______    /49*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x202 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{202} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{49 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{49 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /50*pi\     153___    306 306______    /50*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x203 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{203} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{50 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{50 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /50*pi\     153___    306 306______    /50*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x204 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{204} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{50 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{50 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /50*pi\     153___    306 306______    /50*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x205 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{205} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{50 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{50 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /50*pi\     153___    306 306______    /50*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x206 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{206} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{50 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{50 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /52*pi\     153___    306 306______    /52*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x207 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{207} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{52 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{52 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /52*pi\     153___    306 306______    /52*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x208 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{208} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{52 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{52 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /52*pi\     153___    306 306______    /52*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x209 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{209} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{52 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{52 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /52*pi\     153___    306 306______    /52*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x210 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{210} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{52 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{52 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /53*pi\     153___    306 306______    /53*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x211 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{211} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{53 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{53 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /53*pi\     153___    306 306______    /53*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x212 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{212} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{53 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{53 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /53*pi\     153___    306 306______    /53*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x213 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{213} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{53 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{53 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /53*pi\     153___    306 306______    /53*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x214 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{214} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{53 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{53 \pi}{153} \right)}}{431}$$ 
                   305                                   305                    
                   ---                                   ---                    
         153___    306 306______    /6*pi\     153___    306 306______    /6*pi\
          \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                    \ 17 /                                \ 17 /
x215 = - --------------------------------- - -----------------------------------
                        431                                  431
$$x_{215} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{6 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{6 \pi}{17} \right)}}{431}$$ 
                   305                                   305                    
                   ---                                   ---                    
         153___    306 306______    /6*pi\     153___    306 306______    /6*pi\
          \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                    \ 17 /                                \ 17 /
x216 = - --------------------------------- + -----------------------------------
                        431                                  431
$$x_{216} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{6 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{6 \pi}{17} \right)}}{431}$$ 
                 305                                   305                    
                 ---                                   ---                    
       153___    306 306______    /6*pi\     153___    306 306______    /6*pi\
        \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                  \ 17 /                                \ 17 /
x217 = --------------------------------- - -----------------------------------
                      431                                  431
$$x_{217} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{6 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{6 \pi}{17} \right)}}{431}$$ 
                 305                                   305                    
                 ---                                   ---                    
       153___    306 306______    /6*pi\     153___    306 306______    /6*pi\
        \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                  \ 17 /                                \ 17 /
x218 = --------------------------------- + -----------------------------------
                      431                                  431
$$x_{218} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{6 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{6 \pi}{17} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /55*pi\     153___    306 306______    /55*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x219 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{219} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{55 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{55 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /55*pi\     153___    306 306______    /55*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x220 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{220} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{55 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{55 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /55*pi\     153___    306 306______    /55*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x221 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{221} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{55 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{55 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /55*pi\     153___    306 306______    /55*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x222 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{222} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{55 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{55 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /56*pi\     153___    306 306______    /56*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x223 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{223} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{56 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{56 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /56*pi\     153___    306 306______    /56*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x224 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{224} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{56 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{56 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /56*pi\     153___    306 306______    /56*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x225 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{225} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{56 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{56 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /56*pi\     153___    306 306______    /56*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x226 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{226} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{56 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{56 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /19*pi\     153___    306 306______    /19*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \  51 /                                \  51 /
x227 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{227} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{51} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /19*pi\     153___    306 306______    /19*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \  51 /                                \  51 /
x228 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{228} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{51} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /19*pi\     153___    306 306______    /19*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \  51 /                                \  51 /
x229 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{229} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{51} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /19*pi\     153___    306 306______    /19*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \  51 /                                \  51 /
x230 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{230} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{19 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{19 \pi}{51} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /58*pi\     153___    306 306______    /58*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x231 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{231} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{58 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{58 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /58*pi\     153___    306 306______    /58*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x232 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{232} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{58 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{58 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /58*pi\     153___    306 306______    /58*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x233 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{233} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{58 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{58 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /58*pi\     153___    306 306______    /58*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x234 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{234} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{58 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{58 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /59*pi\     153___    306 306______    /59*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x235 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{235} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{59 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{59 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /59*pi\     153___    306 306______    /59*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x236 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{236} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{59 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{59 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /59*pi\     153___    306 306______    /59*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x237 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{237} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{59 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{59 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /59*pi\     153___    306 306______    /59*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x238 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{238} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{59 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{59 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /20*pi\     153___    306 306______    /20*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \  51 /                                \  51 /
x239 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{239} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{51} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /20*pi\     153___    306 306______    /20*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \  51 /                                \  51 /
x240 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{240} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{51} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /20*pi\     153___    306 306______    /20*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \  51 /                                \  51 /
x241 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{241} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{51} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /20*pi\     153___    306 306______    /20*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \  51 /                                \  51 /
x242 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{242} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{20 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{20 \pi}{51} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /61*pi\     153___    306 306______    /61*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x243 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{243} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{61 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{61 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /61*pi\     153___    306 306______    /61*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x244 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{244} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{61 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{61 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /61*pi\     153___    306 306______    /61*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x245 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{245} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{61 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{61 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /61*pi\     153___    306 306______    /61*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x246 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{246} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{61 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{61 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /62*pi\     153___    306 306______    /62*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x247 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{247} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{62 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{62 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /62*pi\     153___    306 306______    /62*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x248 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{248} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{62 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{62 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /62*pi\     153___    306 306______    /62*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x249 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{249} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{62 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{62 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /62*pi\     153___    306 306______    /62*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x250 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{250} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{62 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{62 \pi}{153} \right)}}{431}$$ 
                   305                                   305                    
                   ---                                   ---                    
         153___    306 306______    /7*pi\     153___    306 306______    /7*pi\
          \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                    \ 17 /                                \ 17 /
x251 = - --------------------------------- - -----------------------------------
                        431                                  431
$$x_{251} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{17} \right)}}{431}$$ 
                   305                                   305                    
                   ---                                   ---                    
         153___    306 306______    /7*pi\     153___    306 306______    /7*pi\
          \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                    \ 17 /                                \ 17 /
x252 = - --------------------------------- + -----------------------------------
                        431                                  431
$$x_{252} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{17} \right)}}{431}$$ 
                 305                                   305                    
                 ---                                   ---                    
       153___    306 306______    /7*pi\     153___    306 306______    /7*pi\
        \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                  \ 17 /                                \ 17 /
x253 = --------------------------------- - -----------------------------------
                      431                                  431
$$x_{253} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{17} \right)}}{431}$$ 
                 305                                   305                    
                 ---                                   ---                    
       153___    306 306______    /7*pi\     153___    306 306______    /7*pi\
        \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                  \ 17 /                                \ 17 /
x254 = --------------------------------- + -----------------------------------
                      431                                  431
$$x_{254} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{7 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{7 \pi}{17} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /64*pi\     153___    306 306______    /64*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x255 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{255} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{64 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{64 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /64*pi\     153___    306 306______    /64*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x256 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{256} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{64 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{64 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /64*pi\     153___    306 306______    /64*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x257 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{257} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{64 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{64 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /64*pi\     153___    306 306______    /64*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x258 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{258} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{64 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{64 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /65*pi\     153___    306 306______    /65*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x259 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{259} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{65 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{65 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /65*pi\     153___    306 306______    /65*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x260 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{260} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{65 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{65 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /65*pi\     153___    306 306______    /65*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x261 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{261} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{65 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{65 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /65*pi\     153___    306 306______    /65*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x262 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{262} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{65 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{65 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /22*pi\     153___    306 306______    /22*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \  51 /                                \  51 /
x263 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{263} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{51} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /22*pi\     153___    306 306______    /22*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \  51 /                                \  51 /
x264 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{264} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{51} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /22*pi\     153___    306 306______    /22*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \  51 /                                \  51 /
x265 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{265} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{51} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /22*pi\     153___    306 306______    /22*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \  51 /                                \  51 /
x266 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{266} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{22 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{22 \pi}{51} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /67*pi\     153___    306 306______    /67*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x267 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{267} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{67 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{67 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /67*pi\     153___    306 306______    /67*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x268 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{268} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{67 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{67 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /67*pi\     153___    306 306______    /67*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x269 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{269} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{67 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{67 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /67*pi\     153___    306 306______    /67*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x270 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{270} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{67 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{67 \pi}{153} \right)}}{431}$$ 
                   305                                   305                    
                   ---                                   ---                    
         153___    306 306______    /4*pi\     153___    306 306______    /4*pi\
          \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                    \ 9  /                                \ 9  /
x271 = - --------------------------------- - -----------------------------------
                        431                                  431
$$x_{271} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{9} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{9} \right)}}{431}$$ 
                   305                                   305                    
                   ---                                   ---                    
         153___    306 306______    /4*pi\     153___    306 306______    /4*pi\
          \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                    \ 9  /                                \ 9  /
x272 = - --------------------------------- + -----------------------------------
                        431                                  431
$$x_{272} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{9} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{9} \right)}}{431}$$ 
                 305                                   305                    
                 ---                                   ---                    
       153___    306 306______    /4*pi\     153___    306 306______    /4*pi\
        \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                  \ 9  /                                \ 9  /
x273 = --------------------------------- - -----------------------------------
                      431                                  431
$$x_{273} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{9} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{9} \right)}}{431}$$ 
                 305                                   305                    
                 ---                                   ---                    
       153___    306 306______    /4*pi\     153___    306 306______    /4*pi\
        \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                  \ 9  /                                \ 9  /
x274 = --------------------------------- + -----------------------------------
                      431                                  431
$$x_{274} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{4 \pi}{9} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{4 \pi}{9} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /23*pi\     153___    306 306______    /23*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \  51 /                                \  51 /
x275 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{275} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{51} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /23*pi\     153___    306 306______    /23*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \  51 /                                \  51 /
x276 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{276} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{51} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /23*pi\     153___    306 306______    /23*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \  51 /                                \  51 /
x277 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{277} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{51} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /23*pi\     153___    306 306______    /23*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \  51 /                                \  51 /
x278 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{278} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{23 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{23 \pi}{51} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /70*pi\     153___    306 306______    /70*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x279 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{279} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{70 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{70 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /70*pi\     153___    306 306______    /70*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x280 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{280} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{70 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{70 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /70*pi\     153___    306 306______    /70*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x281 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{281} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{70 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{70 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /70*pi\     153___    306 306______    /70*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x282 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{282} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{70 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{70 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /71*pi\     153___    306 306______    /71*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x283 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{283} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{71 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{71 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /71*pi\     153___    306 306______    /71*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x284 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{284} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{71 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{71 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /71*pi\     153___    306 306______    /71*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x285 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{285} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{71 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{71 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /71*pi\     153___    306 306______    /71*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x286 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{286} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{71 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{71 \pi}{153} \right)}}{431}$$ 
                   305                                   305                    
                   ---                                   ---                    
         153___    306 306______    /8*pi\     153___    306 306______    /8*pi\
          \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                    \ 17 /                                \ 17 /
x287 = - --------------------------------- - -----------------------------------
                        431                                  431
$$x_{287} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{17} \right)}}{431}$$ 
                   305                                   305                    
                   ---                                   ---                    
         153___    306 306______    /8*pi\     153___    306 306______    /8*pi\
          \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                    \ 17 /                                \ 17 /
x288 = - --------------------------------- + -----------------------------------
                        431                                  431
$$x_{288} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{17} \right)}}{431}$$ 
                 305                                   305                    
                 ---                                   ---                    
       153___    306 306______    /8*pi\     153___    306 306______    /8*pi\
        \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                  \ 17 /                                \ 17 /
x289 = --------------------------------- - -----------------------------------
                      431                                  431
$$x_{289} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{17} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{17} \right)}}{431}$$ 
                 305                                   305                    
                 ---                                   ---                    
       153___    306 306______    /8*pi\     153___    306 306______    /8*pi\
        \/ 2 *431   * \/ 1563 *cos|----|   I* \/ 2 *431   * \/ 1563 *sin|----|
                                  \ 17 /                                \ 17 /
x290 = --------------------------------- + -----------------------------------
                      431                                  431
$$x_{290} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{8 \pi}{17} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{8 \pi}{17} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /73*pi\     153___    306 306______    /73*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x291 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{291} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{73 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{73 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /73*pi\     153___    306 306______    /73*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x292 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{292} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{73 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{73 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /73*pi\     153___    306 306______    /73*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x293 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{293} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{73 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{73 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /73*pi\     153___    306 306______    /73*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x294 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{294} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{73 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{73 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /74*pi\     153___    306 306______    /74*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x295 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{295} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{74 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{74 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /74*pi\     153___    306 306______    /74*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x296 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{296} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{74 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{74 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /74*pi\     153___    306 306______    /74*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x297 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{297} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{74 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{74 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /74*pi\     153___    306 306______    /74*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x298 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{298} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{74 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{74 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /25*pi\     153___    306 306______    /25*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \  51 /                                \  51 /
x299 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{299} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{51} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /25*pi\     153___    306 306______    /25*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \  51 /                                \  51 /
x300 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{300} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{51} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /25*pi\     153___    306 306______    /25*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \  51 /                                \  51 /
x301 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{301} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{51} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{51} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /25*pi\     153___    306 306______    /25*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \  51 /                                \  51 /
x302 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{302} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{25 \pi}{51} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{25 \pi}{51} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /76*pi\     153___    306 306______    /76*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x303 = - ---------------------------------- - ------------------------------------
                        431                                   431
$$x_{303} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{76 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{76 \pi}{153} \right)}}{431}$$ 
                   305                                    305                     
                   ---                                    ---                     
         153___    306 306______    /76*pi\     153___    306 306______    /76*pi\
          \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                    \ 153 /                                \ 153 /
x304 = - ---------------------------------- + ------------------------------------
                        431                                   431
$$x_{304} = - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{76 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{76 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /76*pi\     153___    306 306______    /76*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x305 = ---------------------------------- - ------------------------------------
                      431                                   431
$$x_{305} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{76 \pi}{153} \right)}}{431} - \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{76 \pi}{153} \right)}}{431}$$ 
                 305                                    305                     
                 ---                                    ---                     
       153___    306 306______    /76*pi\     153___    306 306______    /76*pi\
        \/ 2 *431   * \/ 1563 *cos|-----|   I* \/ 2 *431   * \/ 1563 *sin|-----|
                                  \ 153 /                                \ 153 /
x306 = ---------------------------------- + ------------------------------------
                      431                                   431
$$x_{306} = \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} \cos{\left(\frac{76 \pi}{153} \right)}}{431} + \frac{\sqrt[306]{1563} \sqrt[153]{2} \cdot 431^{\frac{305}{306}} i \sin{\left(\frac{76 \pi}{153} \right)}}{431}$$ 
x306 = 1563^(1/306)*2^(1/153)*431^(305/306)*cos(76*pi/153)/431 + 1563^(1/306)*2^(1/153)*431^(305/306)*i*sin(76*pi/153)/431
Respuesta numérica [src] 
x1 = -1.00877866333703
x2 = 1.00877866333703
x3 = -0.504389331668513 - 0.873627949245574*i
x4 = -0.504389331668513 + 0.873627949245574*i
x5 = 0.504389331668513 - 0.873627949245574*i
x6 = 0.504389331668513 + 0.873627949245574*i
x7 = -1.00856601229403 - 0.0207120846212848*i
x8 = -1.00856601229403 + 0.0207120846212848*i
x9 = 1.00856601229403 - 0.0207120846212848*i
x10 = 1.00856601229403 + 0.0207120846212848*i
x11 = -1.00792814881892 - 0.04141543700713*i
x12 = -1.00792814881892 + 0.04141543700713*i
x13 = 1.00792814881892 - 0.04141543700713*i
x14 = 1.00792814881892 + 0.04141543700713*i
x15 = -1.00686534183559 - 0.0621013286036149*i
x16 = -1.00686534183559 + 0.0621013286036149*i
x17 = 1.00686534183559 - 0.0621013286036149*i
x18 = 1.00686534183559 + 0.0621013286036149*i
x19 = -1.00537803942451 - 0.0827610382183054*i
x20 = -1.00537803942451 + 0.0827610382183054*i
x21 = 1.00537803942451 - 0.0827610382183054*i
x22 = 1.00537803942451 + 0.0827610382183054*i
x23 = -1.00346686863384 - 0.103385855697116*i
x24 = -1.00346686863384 + 0.103385855697116*i
x25 = 1.00346686863384 - 0.103385855697116*i
x26 = 1.00346686863384 + 0.103385855697116*i
x27 = -1.0011326352151 - 0.123967085596522*i
x28 = -1.0011326352151 + 0.123967085596522*i
x29 = 1.0011326352151 - 0.123967085596522*i
x30 = 1.0011326352151 + 0.123967085596522*i
x31 = -0.998376323283418 - 0.144496050849564*i
x32 = -0.998376323283418 + 0.144496050849564*i
x33 = 0.998376323283418 - 0.144496050849564*i
x34 = 0.998376323283418 + 0.144496050849564*i
x35 = -0.995199094902629 - 0.164964096424109*i
x36 = -0.995199094902629 + 0.164964096424109*i
x37 = 0.995199094902629 - 0.164964096424109*i
x38 = 0.995199094902629 + 0.164964096424109*i
x39 = -0.991602289595379 - 0.185362592971823*i
x40 = -0.991602289595379 + 0.185362592971823*i
x41 = 0.991602289595379 - 0.185362592971823*i
x42 = 0.991602289595379 + 0.185362592971823*i
x43 = -0.987587423778355 - 0.205682940466308*i
x44 = -0.987587423778355 + 0.205682940466308*i
x45 = 0.987587423778355 - 0.205682940466308*i
x46 = 0.987587423778355 + 0.205682940466308*i
x47 = -0.983156190122973 - 0.225916571828888*i
x48 = -0.983156190122973 + 0.225916571828888*i
x49 = 0.983156190122973 - 0.225916571828888*i
x50 = 0.983156190122973 + 0.225916571828888*i
x51 = -0.97831045684174 - 0.24605495654049*i
x52 = -0.97831045684174 + 0.24605495654049*i
x53 = 0.97831045684174 - 0.24605495654049*i
x54 = 0.97831045684174 + 0.24605495654049*i
x55 = -0.973052266900619 - 0.266089604238127*i
x56 = -0.973052266900619 + 0.266089604238127*i
x57 = 0.973052266900619 - 0.266089604238127*i
x58 = 0.973052266900619 + 0.266089604238127*i
x59 = -0.967383837157709 - 0.286012068294439*i
x60 = -0.967383837157709 + 0.286012068294439*i
x61 = 0.967383837157709 - 0.286012068294439*i
x62 = 0.967383837157709 + 0.286012068294439*i
x63 = -0.961307557428618 - 0.305813949378801*i
x64 = -0.961307557428618 + 0.305813949378801*i
x65 = 0.961307557428618 - 0.305813949378801*i
x66 = 0.961307557428618 + 0.305813949378801*i
x67 = -0.954825989478913 - 0.325486898998487*i
x68 = -0.954825989478913 + 0.325486898998487*i
x69 = 0.954825989478913 - 0.325486898998487*i
x70 = 0.954825989478913 + 0.325486898998487*i
x71 = -0.947941865944075 - 0.345022623018406*i
x72 = -0.947941865944075 + 0.345022623018406*i
x73 = 0.947941865944075 - 0.345022623018406*i
x74 = 0.947941865944075 + 0.345022623018406*i
x75 = -0.940658089177422 - 0.364412885157916*i
x76 = -0.940658089177422 + 0.364412885157916*i
x77 = 0.940658089177422 - 0.364412885157916*i
x78 = 0.940658089177422 + 0.364412885157916*i
x79 = -0.932977730026471 - 0.383649510463248*i
x80 = -0.932977730026471 + 0.383649510463248*i
x81 = 0.932977730026471 - 0.383649510463248*i
x82 = 0.932977730026471 + 0.383649510463248*i
x83 = -0.924904026538263 - 0.402724388754075*i
x84 = -0.924904026538263 + 0.402724388754075*i
x85 = 0.924904026538263 - 0.402724388754075*i
x86 = 0.924904026538263 + 0.402724388754075*i
x87 = -0.916440382594207 - 0.421629478042772*i
x88 = -0.916440382594207 + 0.421629478042772*i
x89 = 0.916440382594207 - 0.421629478042772*i
x90 = 0.916440382594207 + 0.421629478042772*i
x91 = -0.90759036647499 - 0.440356807924924*i
x92 = -0.90759036647499 + 0.440356807924924*i
x93 = 0.90759036647499 - 0.440356807924924*i
x94 = 0.90759036647499 + 0.440356807924924*i
x95 = -0.898357709356197 - 0.458898482939662*i
x96 = -0.898357709356197 + 0.458898482939662*i
x97 = 0.898357709356197 - 0.458898482939662*i
x98 = 0.898357709356197 + 0.458898482939662*i
x99 = -0.888746303735233 - 0.477246685898389*i
x100 = -0.888746303735233 + 0.477246685898389*i
x101 = 0.888746303735233 - 0.477246685898389*i
x102 = 0.888746303735233 + 0.477246685898389*i
x103 = -0.878760201790253 - 0.495393681180524*i
x104 = -0.878760201790253 + 0.495393681180524*i
x105 = 0.878760201790253 - 0.495393681180524*i
x106 = 0.878760201790253 + 0.495393681180524*i
x107 = -0.868403613671749 - 0.513331817994837*i
x108 = -0.868403613671749 + 0.513331817994837*i
x109 = 0.868403613671749 - 0.513331817994837*i
x110 = 0.868403613671749 + 0.513331817994837*i
x111 = -0.857680905727555 - 0.531053533605038*i
x112 = -0.857680905727555 + 0.531053533605038*i
x113 = 0.857680905727555 - 0.531053533605038*i
x114 = 0.857680905727555 + 0.531053533605038*i
x115 = -0.846596598661985 - 0.548551356518233*i
x116 = -0.846596598661985 + 0.548551356518233*i
x117 = 0.846596598661985 - 0.548551356518233*i
x118 = 0.846596598661985 + 0.548551356518233*i
x119 = -0.835155365629904 - 0.565817909634908*i
x120 = -0.835155365629904 + 0.565817909634908*i
x121 = 0.835155365629904 - 0.565817909634908*i
x122 = 0.835155365629904 + 0.565817909634908*i
x123 = -0.823362030266517 - 0.582845913359127*i
x124 = -0.823362030266517 + 0.582845913359127*i
x125 = 0.823362030266517 - 0.582845913359127*i
x126 = 0.823362030266517 + 0.582845913359127*i
x127 = -0.811221564653721 - 0.599628188667615*i
x128 = -0.811221564653721 + 0.599628188667615*i
x129 = 0.811221564653721 - 0.599628188667615*i
x130 = 0.811221564653721 + 0.599628188667615*i
x131 = -0.798739087223872 - 0.616157660136439*i
x132 = -0.798739087223872 + 0.616157660136439*i
x133 = 0.798739087223872 - 0.616157660136439*i
x134 = 0.798739087223872 + 0.616157660136439*i
x135 = -0.785919860601848 - 0.632427358924017*i
x136 = -0.785919860601848 + 0.632427358924017*i
x137 = 0.785919860601848 - 0.632427358924017*i
x138 = 0.785919860601848 + 0.632427358924017*i
x139 = -0.772769289386319 - 0.648430425709189*i
x140 = -0.772769289386319 + 0.648430425709189*i
x141 = 0.772769289386319 - 0.648430425709189*i
x142 = 0.772769289386319 + 0.648430425709189*i
x143 = -0.759292917871166 - 0.664160113583108*i
x144 = -0.759292917871166 + 0.664160113583108*i
x145 = 0.759292917871166 - 0.664160113583108*i
x146 = 0.759292917871166 + 0.664160113583108*i
x147 = -0.745496427707999 - 0.679609790893751*i
x148 = -0.745496427707999 + 0.679609790893751*i
x149 = 0.745496427707999 - 0.679609790893751*i
x150 = 0.745496427707999 + 0.679609790893751*i
x151 = -0.731385635510769 - 0.694772944041825*i
x152 = -0.731385635510769 + 0.694772944041825*i
x153 = 0.731385635510769 - 0.694772944041825*i
x154 = 0.731385635510769 + 0.694772944041825*i
x155 = -0.716966490403475 - 0.709643180226908*i
x156 = -0.716966490403475 + 0.709643180226908*i
x157 = 0.716966490403475 - 0.709643180226908*i
x158 = 0.716966490403475 + 0.709643180226908*i
x159 = -0.70224507151201 - 0.724214230142661*i
x160 = -0.70224507151201 + 0.724214230142661*i
x161 = 0.70224507151201 - 0.724214230142661*i
x162 = 0.70224507151201 + 0.724214230142661*i
x163 = -0.687227585401195 - 0.738479950619974*i
x164 = -0.687227585401195 + 0.738479950619974*i
x165 = 0.687227585401195 - 0.738479950619974*i
x166 = 0.687227585401195 + 0.738479950619974*i
x167 = -0.671920363458083 - 0.752434327216929*i
x168 = -0.671920363458083 + 0.752434327216929*i
x169 = 0.671920363458083 - 0.752434327216929*i
x170 = 0.671920363458083 + 0.752434327216929*i
x171 = -0.656329859222643 - 0.766071476754501*i
x172 = -0.656329859222643 + 0.766071476754501*i
x173 = 0.656329859222643 - 0.766071476754501*i
x174 = 0.656329859222643 + 0.766071476754501*i
x175 = -0.640462645666939 - 0.779385649796903*i
x176 = -0.640462645666939 + 0.779385649796903*i
x177 = 0.640462645666939 - 0.779385649796903*i
x178 = 0.640462645666939 + 0.779385649796903*i
x179 = -0.624325412423959 - 0.792371233075563*i
x180 = -0.624325412423959 + 0.792371233075563*i
x181 = 0.624325412423959 - 0.792371233075563*i
x182 = 0.624325412423959 + 0.792371233075563*i
x183 = -0.607924962967261 - 0.805022751855679*i
x184 = -0.607924962967261 + 0.805022751855679*i
x185 = 0.607924962967261 - 0.805022751855679*i
x186 = 0.607924962967261 + 0.805022751855679*i
x187 = -0.591268211742616 - 0.817334872244372*i
x188 = -0.591268211742616 + 0.817334872244372*i
x189 = 0.591268211742616 - 0.817334872244372*i
x190 = 0.591268211742616 + 0.817334872244372*i
x191 = -0.57436218125288 - 0.829302403439463*i
x192 = -0.57436218125288 + 0.829302403439463*i
x193 = 0.57436218125288 - 0.829302403439463*i
x194 = 0.57436218125288 + 0.829302403439463*i
x195 = -0.557213999097291 - 0.840920299917917*i
x196 = -0.557213999097291 + 0.840920299917917*i
x197 = 0.557213999097291 - 0.840920299917917*i
x198 = 0.557213999097291 + 0.840920299917917*i
x199 = -0.539830894966471 - 0.852183663563046*i
x200 = -0.539830894966471 + 0.852183663563046*i
x201 = 0.539830894966471 - 0.852183663563046*i
x202 = 0.539830894966471 + 0.852183663563046*i
x203 = -0.522220197594379 - 0.863087745729554*i
x204 = -0.522220197594379 + 0.863087745729554*i
x205 = 0.522220197594379 - 0.863087745729554*i
x206 = 0.522220197594379 + 0.863087745729554*i
x207 = -0.486345814699648 - 0.883799830350839*i
x208 = -0.486345814699648 + 0.883799830350839*i
x209 = 0.486345814699648 - 0.883799830350839*i
x210 = 0.486345814699648 + 0.883799830350839*i
x211 = -0.468097253852454 - 0.893599100570176*i
x212 = -0.468097253852454 + 0.893599100570176*i
x213 = 0.468097253852454 - 0.893599100570176*i
x214 = 0.468097253852454 + 0.893599100570176*i
x215 = -0.4496513427383 - 0.903021628521532*i
x216 = -0.4496513427383 + 0.903021628521532*i
x217 = 0.4496513427383 - 0.903021628521532*i
x218 = 0.4496513427383 + 0.903021628521532*i
x219 = -0.431015858171626 - 0.912063441657768*i
x220 = -0.431015858171626 + 0.912063441657768*i
x221 = 0.431015858171626 - 0.912063441657768*i
x222 = 0.431015858171626 + 0.912063441657768*i
x223 = -0.412198656891227 - 0.920720727941489*i
x224 = -0.412198656891227 + 0.920720727941489*i
x225 = 0.412198656891227 - 0.920720727941489*i
x226 = 0.412198656891227 + 0.920720727941489*i
x227 = -0.393207672247844 - 0.928989837452201*i
x228 = -0.393207672247844 + 0.928989837452201*i
x229 = 0.393207672247844 - 0.928989837452201*i
x230 = 0.393207672247844 + 0.928989837452201*i
x231 = -0.374050910859459 - 0.936867283925127*i
x232 = -0.374050910859459 + 0.936867283925127*i
x233 = 0.374050910859459 - 0.936867283925127*i
x234 = 0.374050910859459 + 0.936867283925127*i
x235 = -0.354736449235691 - 0.944349746221012*i
x236 = -0.354736449235691 + 0.944349746221012*i
x237 = 0.354736449235691 - 0.944349746221012*i
x238 = 0.354736449235691 + 0.944349746221012*i
x239 = -0.335272430372736 - 0.951434069726323*i
x240 = -0.335272430372736 + 0.951434069726323*i
x241 = 0.335272430372736 - 0.951434069726323*i
x242 = 0.335272430372736 + 0.951434069726323*i
x243 = -0.315667060320272 - 0.958117267683238*i
x244 = -0.315667060320272 + 0.958117267683238*i
x245 = 0.315667060320272 - 0.958117267683238*i
x246 = 0.315667060320272 + 0.958117267683238*i
x247 = -0.295928604721778 - 0.964396522448862*i
x248 = -0.295928604721778 + 0.964396522448862*i
x249 = 0.295928604721778 - 0.964396522448862*i
x250 = 0.295928604721778 + 0.964396522448862*i
x251 = -0.276065385329729 - 0.970269186683151*i
x252 = -0.276065385329729 + 0.970269186683151*i
x253 = 0.276065385329729 - 0.970269186683151*i
x254 = 0.276065385329729 + 0.970269186683151*i
x255 = -0.256085776497144 - 0.975732784465035*i
x256 = -0.256085776497144 + 0.975732784465035*i
x257 = 0.256085776497144 - 0.975732784465035*i
x258 = 0.256085776497144 + 0.975732784465035*i
x259 = -0.23599820164694 - 0.980785012336264*i
x260 = -0.23599820164694 + 0.980785012336264*i
x261 = 0.23599820164694 - 0.980785012336264*i
x262 = 0.23599820164694 + 0.980785012336264*i
x263 = -0.215811129720619 - 0.985423740272552*i
x264 = -0.215811129720619 + 0.985423740272552*i
x265 = 0.215811129720619 - 0.985423740272552*i
x266 = 0.215811129720619 + 0.985423740272552*i
x267 = -0.195533071607747 - 0.989647012581595*i
x268 = -0.195533071607747 + 0.989647012581595*i
x269 = 0.195533071607747 - 0.989647012581595*i
x270 = 0.195533071607747 + 0.989647012581595*i
x271 = -0.175172576557756 - 0.993453048727595*i
x272 = -0.175172576557756 + 0.993453048727595*i
x273 = 0.175172576557756 - 0.993453048727595*i
x274 = 0.175172576557756 + 0.993453048727595*i
x275 = -0.154738228575575 - 0.996840244081934*i
x276 = -0.154738228575575 + 0.996840244081934*i
x277 = 0.154738228575575 - 0.996840244081934*i
x278 = 0.154738228575575 + 0.996840244081934*i
x279 = -0.134238642802599 - 0.999807170599687*i
x280 = -0.134238642802599 + 0.999807170599687*i
x281 = 0.134238642802599 - 0.999807170599687*i
x282 = 0.134238642802599 + 0.999807170599687*i
x283 = -0.113682461884542 - 1.00235257742169*i
x284 = -0.113682461884542 + 1.00235257742169*i
x285 = 0.113682461884542 - 1.00235257742169*i
x286 = 0.113682461884542 + 1.00235257742169*i
x287 = -0.09307835232769 - 1.0044753914019*i
x288 = -0.09307835232769 + 1.0044753914019*i
x289 = 0.09307835232769 - 1.0044753914019*i
x290 = 0.09307835232769 + 1.0044753914019*i
x291 = -0.0724350008450863 - 1.00617471755983*i
x292 = -0.0724350008450863 + 1.00617471755983*i
x293 = 0.0724350008450863 - 1.00617471755983*i
x294 = 0.0724350008450863 + 1.00617471755983*i
x295 = -0.0517611106942116 - 1.00744983945789*i
x296 = -0.0517611106942116 + 1.00744983945789*i
x297 = 0.0517611106942116 - 1.00744983945789*i
x298 = 0.0517611106942116 + 1.00744983945789*i
x299 = -0.031065398007679 - 1.00830021950343*i
x300 = -0.031065398007679 + 1.00830021950343*i
x301 = 0.031065398007679 - 1.00830021950343*i
x302 = 0.031065398007679 + 1.00830021950343*i
x303 = -0.010356588118504 - 1.00872549917536*i
x304 = -0.010356588118504 + 1.00872549917536*i
x305 = 0.010356588118504 - 1.00872549917536*i
x306 = 0.010356588118504 + 1.00872549917536*i
x306 = 0.010356588118504 + 1.00872549917536*i
    © Sr Examen – Калькулятор