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International Mathematics Competition
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IMC 2025 |
| Information | Results | Problems & Solutions |
IMC2019: Day 2, Problem 7
Problem 7.
Let \(\displaystyle C=\{4,6,8,9,10,\ldots\}\) be the set of composite positive integers. For each \(\displaystyle n\in C\) let \(\displaystyle a_n\) be the smallest positive integer \(\displaystyle k\) such that \(\displaystyle k!\) is divisible by \(\displaystyle n\). Determine whether the following series converges:
| \(\displaystyle \sum_{n\in C}\Bigl(\frac{a_n}{n}\Bigr)^n . \) | \(\displaystyle (1) \) |
Proposed by Orif Ibrogimov, ETH Zurich and National University of Uzbekistan
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