Mathematical and Physical Journal
for High Schools
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Problem A. 614. (April 2014)

A. 614. In the triangle \(\displaystyle A_1A_2A_3\), denote by \(\displaystyle k_i\) the excircle opposite to \(\displaystyle A_i\), and let \(\displaystyle P_i\) be the point of \(\displaystyle k_i\) for which the circle \(\displaystyle A_{i+1}A_{i+2}P_i\) is tangent to \(\displaystyle k_i\). (\(\displaystyle i=1,2,3\); the indices are considered modulo \(\displaystyle 3\).) Show that the line segments \(\displaystyle A_1P_1\), \(\displaystyle A_2P_2\) and \(\displaystyle A_3P_3\) are concurrent.

(5 pont)

Deadline expired on May 12, 2014.


1 student sent a solution.
3 points:1 student.

Problems in Mathematics of KöMaL, April 2014