IMO 1982 LL POL39

Let S be the unit circle with center O and let P1, P2, . . . , Pn

imolonglistmathematicsolympiad

IMO 1982 LL POL39

Origin: POL

Problem

Let S be the unit circle with center O and let P1, P2, . . . , Pn be points of S such that the sum of vectors vi = −−\to OPi is the zero vector. Prove that the inequality n i=1 XPi \geqn holds for every point X.