Let $ABC$ be a acute triangle in which $O$ and $H$ are the center of the circumscribed circle, respectively the orthocenter. Let $M$ be a point on the small arc $BC$ of the circumscribed circle (different from $B$ and $C$) and be $D, E, F$ be the symmetrical of the point $M$ to the lines $OA, OB, OC$. We note with $K$ the intersection of $BF$ and $CE$ and $I$ is the center of the circle inscribed in the triangle $DEF$. a) Show that the segment bisectors of the segments $EF$ and $IK$ intersect on the circle circumscribed to triangle $ABC$. a) Prove that points $H, K, I$ are collinear.