2024 AIME I Problem 3

Below is the professionally curated solution for Problem 3 of the 2024 AIME I, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2024 AIME I solutions, or check the answer key.

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Concepts:combinatorial gamemodular arithmeticsmall cases

Difficulty rating: 2110

3.

Alice and Bob play the following game. A stack of nn tokens lies before them. The players take turns with Alice going first. On each turn, the player removes 11 token or 44 tokens from the stack. The player who removes the last token wins. Find the number of positive integers nn less than or equal to 20242024 such that there is a strategy that guarantees that Bob wins, regardless of Alice's moves.

Solution:

Call nn a losing position if the player about to move loses with best play. We claim the losing positions are exactly n0n \equiv 0 or 2(mod5).2 \pmod 5. From such an n,n, removing 11 or 44 tokens leaves n4,1,3(mod5)n \equiv 4, 1, 3 \pmod 5 — never again 00 or 22 — while from any n1,3,4(mod5)n \equiv 1, 3, 4 \pmod 5 one move reaches a position 0\equiv 0 or 2(mod5)2 \pmod 5 (remove 1,1, 1,1, 44 tokens respectively). Since n=0n = 0 is a loss for the player to move, induction confirms the pattern.

Bob wins exactly when nn is a losing position for Alice. Among 1n20241 \le n \le 2024 there are 404404 multiples of 55 and 405405 values n2(mod5)n \equiv 2 \pmod 5 (from 22 to 20222022), for a total of 404+405=809.404 + 405 = 809.

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