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4

Part of 2009 Romanian Master of Mathematics

Problems(1)

There exists at least one finite set T of positive integers

Source: Romanian Master in Mathematics 2009, Problem 4

3/7/2009
For a finite set X X of positive integers, let \Sigma(X) \equal{} \sum_{x \in X} \arctan \frac{1}{x}. Given a finite set S S of positive integers for which Σ(S)<π2, \Sigma(S) < \frac{\pi}{2}, show that there exists at least one finite set T T of positive integers for which ST S \subset T and \Sigma(S) \equal{} \frac{\pi}{2}.
Kevin Buzzard, United Kingdom
trigonometryinvariantalgebra unsolvedalgebra