1999 AMC 12 Problem 26

Below is the professionally curated solution for Problem 26 of the 1999 AMC 12, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 1999 AMC 12 solutions, or check the answer key.

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Concepts:regular polygonDiophantine Equationperimeter

Difficulty rating: 2090

26.

Three non-overlapping regular plane polygons, at least two of which are congruent, all have sides of length 1.1. The polygons meet at a point AA in such a way that the sum of the three interior angles at AA is 360.360^\circ. Thus the three polygons form a new polygon with AA as an interior point. What is the largest possible perimeter that this polygon can have?

1212

1414

1818

2121

2424

Solution:

Let two congruent aa-gons and one bb-gon meet at A.A. Their interior angles satisfy 2180(12a)+180(12b)=360, 2 \cdot 180\left(1 - \tfrac2a\right) + 180\left(1 - \tfrac2b\right) = 360, which reduces to (a4)(b2)=8.(a - 4)(b - 2) = 8.

The solutions (a,b)(a, b) are (5,10),(6,6),(8,4),(5, 10), (6, 6), (8, 4), and (12,3).(12, 3). The new polygon's perimeter is 2a+b6,2a + b - 6, giving 14,12,14,14, 12, 14, and 21.21. The largest is 21.21.

Thus, the correct answer is D.