In a triangle ABC let A1 be the midpoint of side BC. Draw circles with centers A,A1 and radii AA1,BC respectively and let A′A′′ be their common chord. Similarly denote the segments B′B′′ and C′C′′. Show that lines A′A′′,B′B′′′ and C′C′′ are concurrent. geometryChordsmidpointcirclesconcurrencyconcurrent