Massimiliano Apr 30, 2015 In this way: \displaystyle\frac{{z}^{{\frac{{1}}{{4}}}}}{{z}^{{\frac{{1}}{{2}}}}}={z}^{{\frac{{1}}{{4}}-\frac{{1}}{{2}}}}={z}^{{-\frac{{1}}{{4}}}}=\frac{{1}}{{z}^{{\frac{{1}}{{4}}}}} ...

\frac{z^4-z+z}{(z^3-1)}= z+\frac{z}{(z^3-1)} and \frac{z}{(z^3-1)}=\frac{z}{(z-1)(z^2+z+1)}=\frac{A}{(z-1)}+\frac{Bz+C}{(z^2+z+1)}= and \frac{1}{z(z+1)^2(z+2)^3}=\frac{A}{z}+\frac{B}{(z+1)}+\frac{C}{(z+1)^2}+\frac{D}{(z+2)}+\frac{E}{(z+2)^2}+\frac{F}{(z+2)^3}

Concerning the square root see What are the branches of square root function? So let us consider the function z^{1/2}. Although 0^{1/2} is of course well-defined, we must exclude z = 0 because ...

It seems you are looking for something different that is z^{3} +1 = 0 \iff z^3=-1 and the suggestion by your professor is simply to evaluate w^3=1 and then obtain the solution from here using ...

By direct calculation, we see that \begin{align} f(z^{-1}) =&\ \frac{1}{z}+a_2\frac{1}{z^2}+a_3\frac{1}{z^3}+\ldots=\ \frac{1}{z}\left(1+a_2\frac{1}{z}+a_3\frac{1}{z^2}+\ldots \right) \end{align} ...

Your proof is fine. Here is an easier way to prove the required inequality: By the reverse triangle inequality, we have |z^2-1| \geq |z^2| -1 = |z|^2 -1 for any z \in \mathbb{C}. As z=\gamma(\theta) ...