Given a set of 9 points, no 3
collinear, prove there must be a subset of 5 that forms a convex pentagon.
This problem, along with 8 points no convex pentagon and 5 points to convex quad are parts of the Happy Ending problem and its generalization, see http://en.wikipedia.org/wiki/Happy_Ending_problem
(I think this particular problem is a little too ambitious for Perplexus members)
Happy Ending
