Tangent to Cycloid is Vertical at Cusps

Theorem
The tangent to the cycloid whose locus is given by:
 * $x = a \paren {\theta - \sin \theta}$
 * $y = a \paren {1 - \cos \theta}$

is vertical at the cusps.

Proof
From Slope of Tangent to Cycloid, the slope of the tangent to $C$ at the point $\tuple {x, y}$ is given by:
 * $\dfrac {\d y} {\d x} = \cot \dfrac \theta 2$

At the cusps, $\theta = 2 n \pi$ for $n \in \Z$.

Thus at the cusps, the slope of the tangent to $C$ is $\cot n \pi$.

From Shape of Cotangent Function:
 * $\displaystyle \lim_{\theta \mathop \to n \pi} \cot \theta \to \infty$

Hence the result by definition of vertical tangent line.