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| − | == Problem ==
| + | #REDIRECT [[2006 AIME I Problems/Problem 5]] |
| − | When rolling a certain unfair six-sided die with faces numbered 1, 2, 3, 4, 5, and 6, the probability of obtaining face <math> F </math> is greater than 1/6, the probability of obtaining the face opposite is less than 1/6, the probability of obtaining any one of the other four faces is 1/6, and the sum of the numbers on opposite faces is 7. When two such dice are rolled, the probability of obtaining a sum of 7 is 47/288. Given that the probability of obtaining face <math> F </math> is <math> m/n, </math> where <math> m </math> and <math> n </math> are relatively prime positive integers, find <math> m+n. </math>
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| − | == Solution ==
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| − | For now, assume that face F has a 6 on it and that the face opposite F has a 1 on it. Let A(n) be the probability of rolling a number n on one die and let B(n) be the probability of rolling a number n on the other die. One way of getting a 7 is to get a 2 on die A and a 5 on die B. The probability of this happening is A(2)*B(5)=1/6*1/6=1/36=8/288. Conversely, one can get a 7 by getting a 2 on die B and a 5 on die A, the probability of which is also 8/288. Getting 7 with a 3 on die A and a 4 on die B also has a probability of 8/288, as does getting a 7 with a 4 on die A and a 3 on die B. Subtracting all these probabilities from 47/288 leaves a 15/288=5/96 chance of getting a 1 on die A and a 6 on die B or a 6 on die A and a 1 on die B:
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| − | A(6)*B(1)+B(6)*A(1)=5/96
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| − | Since both die are the same, this reduces to:
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| − | 2*A(6)*A(1)=5/96
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| − | A(6)*A(1)=5/192
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| − | But we know that A(2)=A(3)=A(4)=A(5)=1/6, so:
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| − | A(6)+A(1)=1/3
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| − | Now, combine the two equations:
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| − | A(1)=1/3-A(6)
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| − | A(6)*(1/3-A(6))=5/192
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| − | Solving the above equation gives A(6)=5/24, so the answer is 29.
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| − | == See also ==
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| − | *[[2006 AIME II Problems]]
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| − | [[Category:Intermediate Combinatorics Problems]]
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