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International Mathematics Competition
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IMC 2025 |
| Information | Results | Problems & Solutions |
IMC2019: Day 1, Problem 5
Problem 5. Determine whether there exist an odd positive integer \(\displaystyle n\) and \(\displaystyle n\times n\) matrices \(\displaystyle A\) and \(\displaystyle B\) with integer entries, that satisfy the following conditions:
(1) \(\displaystyle \det(B)=1\);
(2) \(\displaystyle AB=BA\);
(3) \(\displaystyle A^4+4A^2B^2+16B^4=2019I\).
(Here \(\displaystyle I\) denotes the \(\displaystyle n\times n\) identity matrix.)
Proposed by Orif Ibrogimov, ETH Zurich and National University of Uzbekistan
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