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Point with the same power to four circles.

Source: Vietnam TST 2019 Day 1 P3

March 30, 2019
geometrygeometric transformationreflection

Problem Statement

Given an acute scalene triangle ABCABC inscribed in circle (O)(O). Let HH be its orthocenter and MM be the midpoint of BCBC. Let DD lie on the opposite rays of HAHA so that BC=2DMBC=2DM. Let DD' be the reflection of DD through line BCBC and XX be the intersection of AOAO and MDMD.
a) Show that AMAM bisects DXD'X.
b) Similarly, we define the points E,FE,F like DD and Y,ZY,Z like XX. Let SS be the intersection of tangent lines from B,CB,C with respect to (O)(O). Let GG be the projection of the midpoint of ASAS to the line AOAO. Show that there exists a point with the same power to all the circles (BEY),(CFZ),(SGO)(BEY),(CFZ),(SGO) and (O)(O).
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