Let $ABC$ be an acute, non-isosceles triangle with $H$ the orthocenter and $M$ the midpoint of $AH$. Denote $O_1$,$O_2$ as the centers of circles pass through $H$ and respectively tangent to $BC$ at $B$, $C$. Let $X$, $Y$ be the ex-centers which respect to angle $H$ in triangles $HMO_1$,$HMO_2$. Prove that $XY$ is parallel to $O_1O_2$.