IMO 1986 LL ROM63

Let AA′, BB′, CC′ be the bisectors of the angles of a triangle

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IMO 1986 LL ROM63

Origin: ROM

Problem

Let AA′, BB′, CC′ be the bisectors of the angles of a triangle ABC (A′ \inBC, B′ \inCA, C′ \inAB). Prove that each of the lines A′B′, B′C′, C′A′ intersects the incircle in two points.