67th Romanian Mathematical Olympiad

Question

A triangle ABC has its orthocenter H distinct from its vertices and from the circumcenter O. Denote M, N, P the circumcenters of the triangles HBC, HCA, respectively HAB. Prove that the lines AM, BN, CP and OH are concurrent. Petru Braica FIGURE_0

Accepted Answer

If D is the midpoint of [BC], then OD = 12(OB + OC) = 12(OH - OA) = 12AH, hence OM = AH. It follows that AHMO is a parallelogram, hence AM passes through the midpoint of the segment [OH], the same being true for BN and CP. FIGURE_0