Shortlist 2000
Source: IMO Shortlist 2000, Problem G1
August 16, 2003
geometrytrapezoidcombinatorial geometrycirclesIMO Shortlist
Problem Statement
In the plane we are given two circles intersecting at and . Prove that there exist four points with the following property:
(P) For every circle touching the two given circles at and , and meeting the line at and , each of the lines , , , passes through one of these points.