On a circle with diameter AC, let B be an arbitrary point distinct from A and C. Points M,N are the midpoints of chords AB,BC, and points P,Q are the midpoints of smaller arcs restricted by these chords. Lines AQ and BC meet at point K, and lines CP and AB meet at point L. Prove that lines MQ,NP and KL concur.
geometryChordsmidpointsarc midpointarcconcurrencyconcurrent