Unique Representation of Complex Number in Spherical Form

Theorem
Let $\mathcal P$ be the complex plane.

Let $\mathbb S$ be the unit sphere which is tangent to $\mathcal P$ at $\left({0, 0}\right)$ (that is, where $z = 0$).

Let the diameter of $\mathbb S$ perpendicular to $\mathcal P$ through $\left({0, 0}\right)$ be $NS$ where $S$ is the point $\left({0, 0}\right)$.

Let the point $N$ be referred to as the north pole of $\mathbb S$ and $S$ be referred to as the south pole of $\mathbb S$.


 * Spherical-Represenation-of-Complex-Number.png

Let $A$ be a point on $P$.

Let the line $NA$ be constructed.

Then $NA$ passes through exactly one point $A'$ on the surface of $\mathbb S$ apart from $N$.

Similarly, let $A'$ be a point on the surface of $\mathbb S$ apart from $N$.

Let the line $NA'$ be constructed.

Then $NA'$ passes through exactly one point $A$ on $P$.