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IMC2021: Day 1, Problem 3Problem 3. We say that a positive real number \(\displaystyle d\) is good if there exists an infinite sequence \(\displaystyle a_1,a_2,a_3,\ldots \in (0,d)\) such that for each \(\displaystyle n\), the points \(\displaystyle a_1,\dots,a_n\) partition the interval \(\displaystyle [0,d]\) into segments of length at most \(\displaystyle 1/n\) each. Find \(\displaystyle \sup\Big\{d\ \big|\ d \text{ is good}\Big\}. \) Josef Tkadlec | |||||||||||||
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