2010 AIME I Problems/Problem 10
Contents
Problem
Let be the number of ways to write in the form , where the 's are integers, and . An example of such a representation is . Find .
Solution 1
If we choose and such that there is a unique choice of and that makes the equality hold. So is just the number of combinations of and we can pick. If or we can let be anything from to . If then or . Thus .
Solution 2
Note that and . It's easy to see that exactly 10 values in that satisfy our first congruence. Similarly, there are 10 possible values of for each choice of . Thus, there are possible choices for and . We next note that if and are chosen, then a valid value of determines , so we dive into some simple casework:
- If , there are 3 valid choices for . There are only 2 possible cases where , namely . Thus, there are possible representations in this case.
- If , can only equal 0. However, this case cannot occur, as . Thus, . However, . Thus, we have always.
- If , then there are 2 valid choices for . Since there are 100 possible choices for and , and we have already checked the other cases, it follows that choices of and fall under this case. Thus, there are possible representations in this case.
Our answer is thus .
See Also
2010 AIME I (Problems • Answer Key • Resources) | ||
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Followed by Problem 11 | |
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