Consider an epicycloid in which the path is traced around the circumference of a wheel, but the wheel is not slipping on the outside of another wheel.

The angles  $\theta ,\varphi$are related to each other.

Let $A{A}^{\text{'}}$d denote the arc length.

The arc length is equal to $r\theta .$

$A{A}^{\text{'}}=r\theta$ while $A^{\text{'}}p=k(\theta +\varphi )$

We can conclude that $\varphi =\left(\frac{r}{k}+1\right)\theta$

The coordinates of $p$ with respect to origin are.

$$\begin{gathered} x=(r+k)\cos \theta -k\cos \left(\frac{r}{k}+1\right)\theta \\ y=(r+k)\sin \theta -r\sin \left(\frac{r}{k}+1\right)\theta \end{gathered}$$

The minus sign in the second component of the $x$-coordinate equation comes from the fact that the rolling circle's rotation and its center's motion are in the same direction.