4

Part of 2008 Romanian Master of Mathematics

Problems(1)

(n+1)^2 points inside a n x n square. Looks classical.

Source: 1st Romanian Master in Mathematics (RMIM) 2008, Bucharest, Problem 4

Consider a square of sidelength

n

and (n\plus{}1)^2 interior points. Prove that we can choose

3

of these points so that they determine a triangle (eventually degenerated) of area at most

\frac12

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