Given the trapezoid $ABCD\ :\ A(0,0),B(b,0),C(b-c,d),D(c,d)$. Midpoint $M(\frac{c}{2},\frac{d}{2})$. The line $AC\ :\ y=\frac{d}{b-c} \cdot x$ intersects the line $BD\ :\ y=\frac{d}{c-b}(x-b)$ in the point $O(\frac{b}{2},\frac{bd}{2(b-c)}\ )$. The circumcircle of $\triangle BCM$ intersects the line $AD$ a second time in the point $K(\frac{bc}{2(b-c)},\frac{bd}{2(b-c)}\ )$. Because $y_{O}=y_{K}$, is $OK // AB$.

Interesting problem.Is possible an synthetical elementary solution?