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Italian Mathematical Olympiad 2022 - Problem 6

Source:

May 7, 2022
geometry

Problem Statement

Let ABCABC be a non-equilateral triangle and let RR be the radius of its circumcircle. The incircle of ABCABC has II as its centre and is tangent to side CACA in point DD and to side CBCB in point EE. Let A1A_1 be the point on line EIEI such that A1I=RA_1I=R, with II being between A1A_1 and EE. Let B1B_1 be the point on line DIDI such that B1I=RB_1I=R, with II being between B1B_1 and DD. Let PP be the intersection of lines AA1AA_1 and BB1BB_1. (a) Prove that PP belongs to the circumcircle of ABCABC. (b) Let us now also suppose that AB=1AB=1 and PP coincides with CC. Determine the possible values of the perimeter of ABCABC.
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