2014 AMC 10A Problem 17

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Concepts:dice (probability)casework

Difficulty rating: 1540

17.

Three fair six-sided dice are rolled. What is the probability that the values shown on two of the dice sum to the value shown on the remaining die?

16\dfrac16

1372\dfrac{13}{72}

736\dfrac7{36}

524\dfrac5{24}

29\dfrac29

Solution:

Note that if one die is the sum of the other two dice, then it is strictly greater than the other two dice.

There are 33 ways to choose which of the dice is the sum of the other two, which makes it the greatest.

This die cannot be 1,1, since there is no way to sum two positive integers to get 1.1.

There is a 16\dfrac{1}{6} chance that this die is any of the other numbers.

There is 11 way to get a sum of 2,2, 22 ways for 3,3, 33 for 4,4, 44 for 5,5, and 55 for 6.6.

We have take these numbers of ways out of a total of 62=366^2 = 36 possibilities. The desired probability is then 3161+2+3+4+536=524. 3 \cdot \dfrac{1}{6} \cdot \dfrac{1 + 2 + 3 + 4 + 5}{36} = \dfrac{5}{24}.

Thus, D is the correct answer.

Problem 17 in Other Years