2021 AMC 10B Fall Problem 23

Below is the professionally curated solution for Problem 23 of the 2021 AMC 10B Fall, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2021 AMC 10B Fall solutions, or check the answer key.

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Concepts:graph theorycomplementary probability

Difficulty rating: 2300

23.

Each of the 55 sides and the 55 diagonals of a regular pentagon are randomly and independently colored red or blue with equal probability. What is the probability that there will be a triangle whose vertices are among the vertices of the pentagon such that all of its sides have the same color?

23 \dfrac 23

105128 \dfrac{105}{128}

125128 \dfrac{125}{128}

253256 \dfrac{253}{256}

1 1

Solution:

Count the complement: colorings of the 1010 edges of K5K_5 with no monochromatic triangle.

At any vertex, if 33 incident edges had the same color, then the edges among their other endpoints would all have to be the other color, making a monochromatic triangle. Thus each vertex has exactly 22 red and 22 blue incident edges.

So the red edges form a 22-regular graph on 55 vertices, which must be a 55-cycle. The number of labeled 55-cycles is (51)!2=12\frac{(5-1)!}{2}=12.

There are 210=10242^{10}=1024 total colorings, so the desired probability is 1121024=253256.1-\frac{12}{1024}=\frac{253}{256}.

Thus, the answer is D .

Problem 23 in Other Years