2000.4

Part of Champions Tournament Seniors - geometry

Problems(1)

AG + BG + CG <= A_1C + B_1C + C_1C, centroid , circumcircle

Source: Champions Tournament (Ukraine) - Турнір чемпіонів - 2000 Seniors p4

G

be the point of intersection of the medians in the triangle

ABC

. Let us denote

A_1, B_1, C_1

the second points of intersection of lines

AG, BG, CG

with the circle circumscribed around the triangle. Prove that

AG + BG + CG \le A_1C + B_1C + C_1C

.
(Yasinsky V.A.)

geometryCentroidgeometric inequalitycircumcircleChampions Tournament