2021 Fall AMC 12B Problems/Problem 16
Problem
Suppose , , are positive integers such that and What is the sum of all possible distinct values of ?
Solution
Let , , . WLOG, let . We can split this off into cases:
: let we can try all possibilities of and to find that is a solution.
: No solutions. By and , we know that , , and have to all be even. Therefore, cannot be equal to .
: C has to be both a multiple of and . Therefore, has to be a multiple of . The only solution for this is .
: No solutions. By and , we know that , , and have to all be even. Therefore, cannot be equal to .
: No solutions. By and , we know that , , and have to all be even. Therefore, cannot be equal to .
: No solutions. By and , we know that , , and have to all be even. Therefore, cannot be equal to .
: No solutions. As , , and have to all be divisible by , has to be divisible by . This contradicts the sum .
Putting these solutions together, we have
-ConcaveTriangle