During high school I participated in a few math contests, and in undergrad I wrote several problems for the Caltech Harvey Mudd Math Competition and USA Math Talent Search. Every two weeks I will post a recreational (non-research) math problem which I encountered during this time (and particularly enjoyed) below.

Regular Polygons Made Out Of Regular Polygons

Let $P$ be a regular polygon (i.e. an equiangular, equilateral polygon with at least three vertices). The vertices of $P$ are partitioned into a collection $\mathcal{C}$ of at least two sets $S$, with the property that the vertices in any such set $S$ can be connected to form a regular polygon. Prove that either $\mathcal{C}$ has only one set, or there exist two distinct sets in $\mathcal{C}$ of the same size.

In other words, prove that if a regular polygon can be decomposed into multiple smaller regular polygons, than at least two of the smaller regular polygons must have the same number of vertices.

A new problem will be posted here on July 8th, 2022.

Previously posted problems can be found here.