The diagonals of a quadrilateral ABCD are perpendicular: AC⊥BD. Four squares, ABEF,BCGH,CDIJ,DAKL, are erected externally on its sides. The intersection points of the pairs of straight lines CL,DF,AH,BJ are denoted by P1,Q1,R1,S1, respectively (left figure), and the intersection points of the pairs of straight lines AI,BK,CEDG are denoted by P2,Q2,R2,S2, respectively (right figure). Prove that P1Q1R1S1≅P2Q2R2S2 where P1,Q1,R1,S1 and P2,Q2,R2,S2 are the two quadrilaterals.
Alternative formulation: Outside a convex quadrilateral ABCD with perpendicular diagonals, four squares AEFB,BGHC,CIJD,DKLA, are constructed (vertices are given in counterclockwise order). Prove that the quadrilaterals Q1 and Q2 formed by the lines AG,BI,CK,DE and AJ,BL,CF,DH, respectively, are congruent. geometryrotationquadrilateralperpendicularIMO Shortlist