IMO 1986 LL GRE41

Let M, N, P be the midpoints of the sides BC, CA, AB of a

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IMO 1986 LL GRE41

Origin: GRE

Problem

Let M, N, P be the midpoints of the sides BC, CA, AB of a triangle ABC. The lines AM, BN, CP intersect the circumcircle of ABC at points A′, B′, C′, respectively. Show that if A′B′C′ is an equilateral triangle, then so is ABC.