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2023 WSMO Team Round Problems/Problem 10

Problem

Let square $ABCD$ be a square with side length $4$. Define ellipse $\omega$ as the ellipse that is able to be inscribed inside $ABCD$ such that 2 of its vertices on its minor axis and 1 of its vertices on its major axis form an equilateral triangle. The largest possible area of $\omega$ is $m\pi\sqrt{n},$ for squarefree $n.$ Find $m+n.$

Solution

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