Complex Arithmetic/Examples/(Conjugate of z 3)^4

Example of Complex Arithmetic
Let $z^3 = -\dfrac 1 2 + \dfrac {\sqrt 3} 2 i$.

Then:
 * $\paren {\overline {z_3} }^4 = -\dfrac 1 2 - \dfrac {\sqrt 3} 2 i$

Proof
But from Cube Roots of Unity:
 * $\paren {-\dfrac 1 2 - \dfrac {\sqrt 3} 2 i}^3 = 1$

Hence the result.