A circle center O passes through the vertices A and C of the triangle ABC and intersects the segments AB and BC again at distinct points K and N respectively. The circumcircles of ABC and KBN intersect at exactly two distinct points B and M. Prove that angle OMB is a right angle.
Solution
The three radical axes of the three circles taken in pairs, BM, NK and AC are concurrent. Let X be the point of intersection. [They cannot all be parallel or B and M would coincide.] The first step is to show that XMNC is cyclic. The argument depends slightly on how the points are arranged. We may have: ∠XMN = 180o - ∠BMN = ∠BKN = 180o - ∠AKN = ∠ACN = 180o - ∠XCN, or we may have ∠XMN = 180o - ∠BMN = 180o - ∠BKN = ∠AKN = 180o - ∠ACN = 180o - ∠XCN.
Now XM.XB = XK.XN = XO2 - ON2. BM·BX = BN·BC = BO2 - ON2, so XM·XB - BM·BX = XO2 - BO2. But XM·XB - BM·BX = XB(XM - BM) = (XM + BM)(XM - BM) = XM2 - BM2. So XO2 - BO2 = XM2 - BM2. Hence OM is perpendicular to XB, or ∠OMB = 90o.
Solutions are also available in Murray S Klamkin, International Mathematical Olympiads 1978-1985, MAA 1986, and in István Reiman, International Mathematical Olympiad 1959-1999, ISBN 189-8855-48-X.
© John Scholes
jscholes@kalva.demon.co.uk
22 Oct 1998