The Given complex number is ${\left(\frac{\sqrt{2}}{i-1}\right)}^{10}$.

The numbers that are presented in the form of $a+ib$ , where, a,b are real numbers and 'i' is an imaginary number called complex numbers.

Let the given complex number be ${\left(\frac{\sqrt{2}}{i-1}\right)}^{10}$.

Let z be a complex number ${\left(\frac{\sqrt{2}}{i-1}\right)}^{10}$.

Polar form of z is $z=r{e}^{\left(i\theta \right)}$.

Calculate the value of r , and $\theta$.

 $\begin{array}{c}r=\sqrt{1+1}\\ r=\sqrt{2}\\ \theta =\arctan \left(\frac{-1}{1}\right)\\ \theta =-\frac{\pi }{4}\end{array}$

Solve further,

$\begin{array}{l}\theta =\pi -\frac{\pi }{4}\left\{\because \theta \text{\hspace{0.17em} lies \hspace{0.17em}in \hspace{0.17em}II \hspace{0.17em}quadrant}\right\}\\ \theta =\frac{3}{4}\pi \end{array}$

Put the value of r and $\theta$ in z.

$\begin{array}{l}z={\left(\frac{\sqrt{2}}{\sqrt{2}{e}^{(3\pi /4)}}\right)}^{10}\\ z= {\left[e^{(-3\mathrm{\pi i}/4)}\right]}^{10}\\ \\ z=\left[e^{(-7\pi i)}\right]\left[e^{(-\pi i/2)}\right]\\ z=\left[\cos \right(-7\pi )+i\sin (-7\pi \left)\right]\left[\cos \right(-\pi /2)+i\sin (-\pi /2\left)\right]\end{array}$

Solve further,

 $\begin{array}{l}z=[-1][-i]\\ z=i\end{array}$

The general form is $z=i$.

Plot the complex number $z=i$.

Therefore, the general form is $z=i$.