Let A,B,C,A′,B′,C′ be six pairs of different points. Prove that the Circles BCA′, CAB′ and ABC′ have a common point, then the Circles B′C′A,C′A′B and A′B′C also share a common point.Note: For three pairs of different points X,Y and Z we define the Circle XYZ as the circumcircle of the triangle XYZ, or - in the case when the points X,Y and Z lie on a straight line - this straight line. concurrencyconcurrentgeometry