We consider uniform convex planar regions and lines through their center of mass and lying in the same plane as the region; each line is parametrized by an angle $\alpha$ it makes with some reference direction in that same plane. 

Are there uniformly dense convex planar regions other than the circular disk with the property: the region has equal moment of inertia about every line through the center of mass and lying within a *finite range* of values of $\alpha$? For the circular disk, this range is obviously, the full [0,2$\pi$].

Further question: And what could be said about other moments?

**Note added on 16th November 2023:** The question has been answered below for the case of moment of inertia; I guess there could be issues regarding *other moments* - defined in terms of powers other than quadratic of distance from an axis.