Equazione con parte reale di un numero complesso con forme esponenziali, coniugato e parte immaginaria

0 (0)

\begin{aligned}e^{\displaystyle3/2\pi i} &= \cos\left(\frac{3}{2}\pi\right)+i\sin\left(\frac{3}{2}\pi\right)\\&= 0+i(-1)=-i\end{aligned}\\[2pt]\begin{aligned}e^{\displaystyle4\pi i} &=7\left(\cos(4\pi)+i\sin(4\pi)\right)\\&=7(1+\cancel{0i})\\&=7\end{aligned}

\text{Re}\left[\frac{i\left(z^2+\text{Im(z)}^2\right)-z}{-i\left(z\cdot\bar{z}-z\right)}\right]

\text{Re}\left[\frac{i\left(\left(x+iy\right)^{\textcolor{00ffa1}{2}}+\text{Im}(x+iy)^{\textcolor{00ffa1}{2}}\right)-(x+iy)}{-i\left((x+iy)\cdot(x-iy)-7\right)}\right]=0

\text{Re}\left[\frac{\textcolor{00ffa1}{i}\left(x^2+i^2y^2+2xyi+y^2\right)-x-iy}{\textcolor{00ffa1}{-i}\left((x+iy)\cdot(x-iy)-7\right)}\right]=0

\text{Re}\left[\frac{x^2\textcolor{00ffa1}{i}-y^2\textcolor{00ffa1}{i}\textcolor{00ffa1}{-}2xy+y^2\textcolor{00ffa1}{i}-x-iy}{\textcolor{00ffa1}{-}x^2i+(-1)y^2i+7i}\right]=0

\text{Re}\left[\frac{x^2i-y^2i-2xy+y^2i-x-yi}{-x^2i-y^2i+7i}\cdot\textcolor{00ffa1}{\frac{i}{i}}\right]=0

\text{Re}\left[\frac{x^2\textcolor{00ffa1}{i^2}-y^2\textcolor{00ffa1}{i^2}-2xy\textcolor{00ffa1}{i}+y^2\textcolor{00ffa1}{i^2}-x\textcolor{00ffa1}{i}-y\textcolor{00ffa1}{i^2}}{-x^2\textcolor{00ffa1}{i^2}-y^2\textcolor{00ffa1}{i^2}+7\textcolor{00ffa1}{i^2}}\right]=0

\text{Re}\left[\frac{\textcolor{00ffa1}{-}x^2\textcolor{00ffa1}{+}\cancel{y^2}\textcolor{00ffa1}{-}2xyi\textcolor{00ffa1}{-}\cancel{y^2}\textcolor{00ffa1}{-}xi\textcolor{00ffa1}{+}y}{\textcolor{00ffa1}{+}x^2\textcolor{00ffa1}{+}y^2\textcolor{00ffa1}{-}7}\right]=0

\text{Re}\left[\frac{-x^2+y-(2xy+x)i}{x^2+y^2-7}\right]=0

\text{Re}\left[\frac{-x^2+y}{x^2+y^2-7}-\cancel{\frac{2xy+x}{x^2+y^2-7}i}\right]=0

\frac{-x^2+y}{x^2+y^2-7}=0

x^2+y^2=7