AoPS - Problem

Source: Romania TST 2013 Day 3 Problem 2

Tags: geometry unsolved, geometry

ComplexPhi

21.01.2015 22:12

Let $\gamma$ a circle and $P$ a point who lies outside the circle. Two arbitrary lines $l$ and $l'$ which pass through $P$ intersect the circle at the points $X$, $Y$ , respectively $X'$, $Y'$ , such that $X$ lies between $P$ and $Y$ and $X'$ lies between $P$ and $Y'$. Prove that the line determined by the circumcentres of the triangles $PXY'$ and $PX'Y$ passes through a fixed point.

Let $Q=\overline{XX'} \cap \overline{YY'}, R=\overline{XY'} \cap \overline{X'Y}$ and $S$ be the inverse of $Q$ in $\odot(O)$. Claim. $\odot(PXY'), \odot(PX'Y)$ pass through $S$. (Proof) By Brokard's Theorem, $S$ lies on $\overline{PR}$ and $\angle PSQ=90^{\circ}$. Also if $M$ is the Miquel point of $XX'YY'$ then $$\overline{RP} \cdot \overline{RS}=\overline{RO} \cdot \overline{RM}=\text{Pow}_R (\odot(O))$$hence $PX'YS$ and $PXSY'$ are cyclic. $\blacksquare$ Consequently, the line joining their centers is the perpendicular bisector of $\overline{PS}$, hence it always passes through the mid-point of $\overline{OP}$.