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2010 OIM Problems/Problem 3

Problem

The circle $\Gamma$ inscribed in the scalene triangle $ABC$ is tangent to the sides $BC$, $CA$ and $AB$ at points $D$, $E$ and $F$, respectively. The line $EF$ cuts the line $BC$ at $G$. The circumference of diameter $GD$ cuts $\Gamma$ at $R$ ($R \ne D$). Let $P$ and $Q$ ($P \ne R$, $Q \ne R$) the intersections of $BR$ and $CR$ with $\Gamma$, respectively. The lines $BQ$ and $CP$ intersect at X. The circumscribed circle at $CDE$ cuts the $QR$ segment in $M$ and the circumscribed circle at $BDF$ cuts the segment $PR$ at $N$. Show that the lines $PM, QN$ and $RX$ are concurrent.

~translated into English by Tomas Diaz. ~orders@tomasdiaz.com

Solution

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See also

OIM Problems and Solutions

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