RMO 2014 Questions, Solutions, Discussions
(RMO 2014a P4, AoPS) Is it possible to write the numbers \(17, 18, 19, \dots, 32\) in a \(4\times 4\) grid of unit squares with one number in each square such that if the grid is divided into four \(2\times 2\) subgrids of unit squares, then the product of numbers in each of the subgrids divisible by \(16\)?
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- Show that the product of the entries in some subgrid is divisible by \(32\).
- Conclude that the product of all the \(16\) entries is divisible by \(16 \times 16 \times 16 \times 32\).
- Is the product of the integers \(17, 18, \dots, 32\) divisible by \(16 \times 16 \times 16 \times 32\)?
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The highest exponents of \(2\) dividing \(32!\) and \(16!\) are given by \[ v_2 (32!) = 16 + 8 + 4 + 2+ 1, \quad v_2(16!) = 8 + 4+ 2+ 1. \] So the highest power of \(2\) dividing the product of the integers \(17, 18, 19, \dots, 32\) is \(2^{16}\). Now if it were possible to write these numbers in a \(4\times 4\) grid in the above-mentioned manner, then the product of the numbers in each of the \(2 \times 2\) subgrids with blue boundary (see Fig. 1) would be divisible by \(2^4\). Note that one such subgrid would contain \(32\), which implies that the product of \(17, 18, \dots, 32\) is divisible by \(2^4\cdot 2^4\cdot 2^4 \cdot 32 = 2^{17}\), which is impossible. Hence it is not possible to write the integers \(17, 18, \dots, 32\) in a \(4\times 4\) grid satisfying the given conditions.
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