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Found problems: 1

2013 USA TSTST, 9
Tags: rotation , invariant , niven theorem , geocombontturnedintoalg , trigonometry , geometry , inequalities
Let $r$ be a rational number in the interval $[-1,1]$ and let $\theta = \cos^{-1} r$. Call a subset $S$ of the plane [i]good[/i] if $S$ is unchanged upon rotation by $\theta$ around any point of $S$ (in both clockwise and counterclockwise directions). Determine all values of $r$ satisfying the following property: The midpoint of any two points in a good set also lies in the set.