Difference between revisions of "2021 USAMO Problems/Problem 3"

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Let <math>n \geq 2</math> be an integer. An <math>n \times n</math> board is initially empty. Each minute, you may perform one of three moves:
 
Let <math>n \geq 2</math> be an integer. An <math>n \times n</math> board is initially empty. Each minute, you may perform one of three moves:
[list]
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*If there is an L-shaped tromino region of three cells without stones on the board (see figure; rotations not allowed), you may place a stone in each of those cells.
[*] If there is an L-shaped tromino region of three cells without stones on the board (see figure; rotations not allowed), you may place a stone in each of those cells.
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*If all cells in a column have a stone, you may remove all stones from that column.
[*] If all cells in a column have a stone, you may remove all stones from that column.
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*If all cells in a row have a stone, you may remove all stones from that row.
[*] If all cells in a row have a stone, you may remove all stones from that row.
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<asy>
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[asy]
 
 
unitsize(20);
 
unitsize(20);
 
draw((0,0)--(4,0)--(4,4)--(0,4)--(0,0));
 
draw((0,0)--(4,0)--(4,4)--(0,4)--(0,0));
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draw((0,2)--(4,2));
 
draw((0,2)--(4,2));
 
draw((2,4)--(2,0));
 
draw((2,4)--(2,0));
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</asy>
 
For which <math>n</math> is it possible that, after some non-zero number of moves, the board has no stones?
 
For which <math>n</math> is it possible that, after some non-zero number of moves, the board has no stones?
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== Solution (WIP) ==

Latest revision as of 12:42, 25 December 2023

Let $n \geq 2$ be an integer. An $n \times n$ board is initially empty. Each minute, you may perform one of three moves:

  • If there is an L-shaped tromino region of three cells without stones on the board (see figure; rotations not allowed), you may place a stone in each of those cells.
  • If all cells in a column have a stone, you may remove all stones from that column.
  • If all cells in a row have a stone, you may remove all stones from that row.

[asy] unitsize(20); draw((0,0)--(4,0)--(4,4)--(0,4)--(0,0)); fill((0.2,3.8)--(1.8,3.8)--(1.8, 1.8)--(3.8, 1.8)--(3.8, 0.2)--(0.2, 0.2)--cycle, grey); draw((0.2,3.8)--(1.8,3.8)--(1.8, 1.8)--(3.8, 1.8)--(3.8, 0.2)--(0.2, 0.2)--(0.2, 3.8), linewidth(2)); draw((0,2)--(4,2)); draw((2,4)--(2,0)); [/asy] For which $n$ is it possible that, after some non-zero number of moves, the board has no stones?

Solution (WIP)