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Canadian Students Math Olympiad 2011 Problem 4

Source:

July 19, 2011
geometrygeometric transformationreflectionrotationdilationperpendicular bisectorgeometry proposed

Problem Statement

Circles Γ1\Gamma_1 and Γ2\Gamma_2 have centers O1O_1 and O2O_2 and intersect at PP and QQ. A line through PP intersects Γ1\Gamma_1 and Γ2\Gamma_2 at AA and BB, respectively, such that ABAB is not perpendicular to PQPQ. Let XX be the point on PQPQ such that XA=XBXA=XB and let YY be the point within AO1O2BAO_1 O_2 B such that AYO1AYO_1 and BYO2BYO_2 are similar. Prove that 2O1AY=AXB2\angle{O_1 AY}=\angle{AXB}.
Author: Matthew Brennan
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