Given two rays, L and M, with common origin O, and a point Q inside the acute angle formed by the rays, reflect Q across L to obtain Q' and then reflect Q' across M to obtain Q''. Similarly, reflect Q across M to obtain P' and then reflect P' across L to obtain P''. Show that the line through O and Q is the perpendicular bisector of the segment joining P'' and Q''. How do you do this? It is easy to show that Q and all reflected points lie on the circle with center O that passes through Q. I thought of using reflection across the line through O and Q and then use a symmetry argument but couldn't see just how to implement this idea. I would really appreciate any help. Thanks
