{"status": "success", "data": {"description_md": "Arjun and Beth play a game in which they take turns removing one brick or two adjacent bricks from one \"wall\" among a set of several walls of bricks, with gaps possibly creating new walls. The walls are one brick tall. For example, a set of walls of sizes $4$ and $2$ can be changed into any of the following by one move: $(3,2),(2,1,2),(4),(4,1),(2,2),$ or $(1,1,2).$\n\n
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\nArjun plays first, and the player who removes the last brick wins. For which starting configuration is there a strategy that guarantees a win for Beth?\n\n$\\textbf{(A) }(6,1,1) \\qquad \\textbf{(B) }(6,2,1) \\qquad \\textbf{(C) }(6,2,2)\\qquad \\textbf{(D) }(6,3,1) \\qquad \\textbf{(E) }(6,3,2)$", "description_html": "

Arjun and Beth play a game in which they take turns removing one brick or two adjacent bricks from one “wall” among a set of several walls of bricks, with gaps possibly creating new walls. The walls are one brick tall. For example, a set of walls of sizes 4 and 2 can be changed into any of the following by one move: (3,2),(2,1,2),(4),(4,1),(2,2), or (1,1,2).

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\nArjun plays first, and the player who removes the last brick wins. For which starting configuration is there a strategy that guarantees a win for Beth?\n

\\textbf{(A) }(6,1,1) \\qquad \\textbf{(B) }(6,2,1) \\qquad \\textbf{(C) }(6,2,2)\\qquad \\textbf{(D) }(6,3,1) \\qquad \\textbf{(E) }(6,3,2)

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Full credit goes to MAA for authoring these problems. These problems were taken on the AOPS website.

", "hints_md": "", "hints_html": "", "editorial_md": "", "editorial_html": "", "flag_hint": "", "point_value": 4, "problem_name": "2021 AMC 10B Problem 24", "can_next": true, "can_prev": true, "nxt": "/problem/21_amc10B_p25", "prev": "/problem/21_amc10B_p23"}}