A friend gave me this problem but I have no idea how to approach it.
Suppose you are given a triangle $ABC$. Pick points $P, Q$ and $R$ on $BC, CA$ and $AB$ such that the perimeter of the triangle $PQR$ ($PQ+QR+RQ$) is minimized.
A friend gave me this problem but I have no idea how to approach it.
Suppose you are given a triangle $ABC$. Pick points $P, Q$ and $R$ on $BC, CA$ and $AB$ such that the perimeter of the triangle $PQR$ ($PQ+QR+RQ$) is minimized.