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IMC2023: Day 2, Problem 9Problem 9. We say that a real number \(\displaystyle V\) is good if there exist two closed convex subsets \(\displaystyle X\), \(\displaystyle Y\) of the unit cube in \(\displaystyle \mathbb{R}^3\), with volume \(\displaystyle V\) each, such that for each of the three coordinate planes (that is, the planes spanned by any two of the three coordinate axes), the projections of \(\displaystyle X\) and \(\displaystyle Y\) onto that plane are disjoint. Find \(\displaystyle \sup\{V\mid V \text{ is good}\}\). Josef Tkadlec and Arseniy Akopyan | |||||||||||||
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