Chords $AC$ and $BD$ of a circle $w$ intersect at $E$. A circle that is internally tangent to $w$ at a point $F$ also touches the segments $DE$ and $EC$. Prove that the bisector of $\angle AFB$ passes through the incenter of $\triangle AEB$.
Source: Mongolia MO 2001 Teachers P5
Tags: geometry
Chords $AC$ and $BD$ of a circle $w$ intersect at $E$. A circle that is internally tangent to $w$ at a point $F$ also touches the segments $DE$ and $EC$. Prove that the bisector of $\angle AFB$ passes through the incenter of $\triangle AEB$.