The given complex number is $\frac{1}{{(1+i)}^3}$.

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 $\frac{1}{{(1+i)}^3}$.

Let z be a complex number $\frac{1}{{(1+i)}^3}$.

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

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

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

Put the value of r and $\theta$ in z.

$\begin{array}{l}z=\frac{1}{{\left(2e^{(\pi i/4)}\right)}^3}\\ z=\frac{1}{2\left(\sqrt{2}{e}^{i.(3\pi /4)}\right)}\\ z=\frac{1}{2\left(-1+i\right)}\end{array}$

Multiply z by its conjugate.

width="0" style="max-width: none;" $\begin{array}{l}z=\frac{1}{2(-1+i)}\times \frac{(-1-i)}{(-1-i)}\\ z=\frac{-1-i}{2\left(2\right)}\\ z=\frac{-(1+i)}{4}\end{array}$$\begin{array}{l}z=\frac{1}{{\left(2e^{(\pi i/4)}\right)}^3}\\ z=\frac{1}{2\left(\sqrt{2}{e}^{i.(3\pi /4)}\right)}\\ z=\frac{1}{2\left(-1+i\right)}\end{array}$

Thus, the general form is $z=\frac{-(1+i)}{4}$.

Plot the complex number z$=\frac{-(1+i)}{4}$.

Therefore, the general form is $z=\frac{-(1+i)}{4}$.