MathDB

Hard geometry problem

Source: Romania 2017 IMO TST 3, problem 4

March 18, 2018

geometry

Problem Statement

Let

ABCD

be a convex quadrilateral and let

P

and

Q

be variable points inside this quadrilateral so that

\angle APB=\angle CPD=\angle AQB=\angle CQD

. Prove that the lines

PQ

obtained in this way all pass through a fixed point , or they are all parallel.