Cotangent is Cosine divided by Sine

Theorem
Let $\theta$ be an angle such that $\sin \theta \ne 0$.

Then:
 * $\cot \theta = \dfrac {\cos \theta} {\sin \theta}$

where $\cot$, $\sin$ and $\cos$ mean cotangent, sine and cosine respectively.

Proof
Let a point $P = \left({x, y}\right)$ be placed in a cartesian plane with origin $O$ such that $OP$ forms an angle $\theta$ with the $x$-axis.

Then:

When $\sin \theta = 0$ the expression $\dfrac {\cos \theta} {\sin \theta}$ is not defined.