2026 AMC 8 Problem 25
Below is the video solution and professionally curated solution for Problem 25 of the 2026 AMC 8, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2026 AMC 8 solutions, or check the answer key.
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Difficulty rating: 2000
25.
In an equiangular hexagon, all interior angles measure An example of such a hexagon with side lengths of and is shown below, inscribed in equilateral triangle Consider all equiangular hexagons with positive integer side lengths that can be inscribed in with all six vertices on the sides of the triangle. What is the total number of such hexagons? Hexagons that differ only by a rotation or a reflection are considered the same.
Video solution:
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Written solution:
The example shows that each side of has length . Let be the small corner lengths cut off at , respectively. Then the other three side lengths of the hexagon are , , and . All six side lengths are positive integers exactly when are positive integers and each pair sum is less than . Up to rotation and reflection, this means counting unordered triples with : , , , , , , , and . There are such hexagons.
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