Partition of Non-Regular Prime Stellated Cyclic Polygons into Rotation Classes

Theorem
Let $p$ be an odd prime.

Let $C$ be a circle whose center is $O$.

Consider the set $P$ of $p$ points on the circumference of $C$ dividing it into $p$ equal arcs.

Let $S$ be the set of all non-regular stellated $p$-gons whose vertices are the elements of $P$.

Let $\sim$ denote the equivalence relation on $S$ defined as:
 * $\forall \tuple {a, b} \in S \times S: a \sim b \iff$ there exists a plane rotation about $O$ transforming $a$ to $b$.

Then the $\sim$-equivalence classes of $S$ into which $S$ can thereby be partitioned all have cardinality $p$.