2024 USAMO Problems/Problem 6
Let be an integer and let . A collection of (not necessarily distinct) subsets of is called -large if for all . Find, in terms of and , the largest real number such that the inequality holds for all positive integers , all nonnegative real numbers , and all -large collections of subsets of . Note: For a finite set denotes the number of elements in .
See Also
See Also
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Followed by Problem 6 | |
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