The given complex number is $(i-\sqrt{3})(1+i\sqrt{3})$

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

Let the given complex number be$(i-\sqrt{3})(1+i\sqrt{3})$ .

Let $z_1$and $z_2$be $i-\sqrt{3}$ and $i-\sqrt{3}$ respectively.

The polar form of $z_1$ is $z_1=r_1\exp \left(i{\theta }_1\right)$.

The polar form of $z_2$ is $z_2=r_2\exp \left(i{\theta }_2\right)$.

Calculate the value of $r_1$, and ${\theta }_1$.

 $\begin{array}{l}{r}_1=\sqrt{1+3}\\ r_1=2\end{array}$

 $\begin{array}{c}{\theta }_1=-\arctan \left(\frac{1}{\sqrt{3}}\right)\\ {\theta }_1=-\frac{\pi }{6}\\ {\theta }_1=\pi -\frac{\pi }{6}\text{\hspace{0.17em}\hspace{0.17em}\hspace{0.17em}\hspace{0.17em}\hspace{0.17em}\hspace{0.17em}\hspace{0.17em}\hspace{0.17em}\hspace{0.17em}\hspace{0.17em}\hspace{0.17em} }\left\{\because {\theta }_1\text{ lies \hspace{0.17em}in\hspace{0.17em} I\hspace{0.17em} quadrant}\right\}\\ {\theta }_1=\frac{5\pi }{6}\end{array}$

Calculate the value of $r_2$and ${\theta }_2$as:

$\begin{array}{l}{r}_2=\sqrt{1+3}\\ r_2=2\\ {\theta }_2=-\arctan \left(\sqrt{3}\right)\\ {\theta }_2=\frac{\pi }{3}\end{array}$

The value of $z_1$ and $z_2$ are $2e^{(5\pi i/6)},2e^{(\pi i/3)}$ respectively.

Calculate the value of z as:

$z=z_1{z}_2$

 $\begin{array}{l}z=\left(2e^{(5\pi i/6)}\right)\left(2e^{(\pi i/3)}\right)\\ z=4e^{(7\pi /6)}\\ z=4\left[\cos \left(\frac{7\pi }{6}\right)+i\sin \left(\frac{7\pi }{6}\right)\right]\\ z=-2\sqrt{3}-2i\end{array}$

Thus, the general form is $z=-2\sqrt{3}-2i$.

Plot the complex number $z=-2\sqrt{3}-2i$

Therefore, the general form is $z=-2\sqrt{3}-2i$