(a) Let be given 2n distinct points on a circumference, n of which are red and n are blue. Prove that one can join these points pairwise by n segments so that no two segments intersect and the endpoints of each segments have different colors.
(b) Show that the statement from (a) remains valid if the points are in an arbitrary position in the plane so that no three of them are collinear. Coloringcombinatoricscombinatorial geometry