Let be triangle with incenter . A point in the interior of the triangle satisfies Show that , and that equality holds if and only if .
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Let $ABC$ be triangle with incenter $I$. A point $P$ in the interior of the triangle satisfies $$\angle PBA+\angle PCA = \angle PBC+\angle PCB.$$ Show that $AP \geq AI$, and that equality holds if and only if $P=I$.
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