Let $ABCD$ be a convex quadrilateral such that $\angle A, \angle B, \angle C$ are acute. $AB$ and $CD$ meet at $E$ and $BC,DA$ meet at $F$. Let $K,L,M,N$ be the midpoints of $AB,BC,CD,DA$ repectively. $KM$ meets $BC,DA$ at $X$ and $Y$, and $LN$ meets $AB,CD$ at $Z$ and $W$. Prove that the line passing $E$ and the midpoint of $ZW$ is parallel to the line passing $F$ and the midpoint of $XY$.