2024 AMC 12B Problems/Problem 22
Problem 22
Let be a triangle with integer side lengths and the property that . What is the least possible perimeter of such a triangle?
Solution 1
Let , , . According to the law of sines,
According to the law of cosines,
Hence,
This simplifies to . We want to find the positive integer solution to this equation such that forms a triangle, and is minimized. We proceed by casework on the value of . Remember that .
Clearly, this case yields no valid solutions.
For this case, we must have and . However, does not form a triangle. Hence this case yields no valid solutions.
For this case, we must have and . However, does not form a triangle. Hence this case yields no valid solutions.
For this case, and , or and . As one can check, this case also yields no valid solutions
For this case, we must have . There are no valid solutions
For this case, and , or and , or and . The only valid solution for this case is $(4, 6, 5).
It is safe to assume that$ (Error compiling LaTeX. Unknown error_msg)(4, 5, 6)$ will be the solution with least perimeter. Hence, the answer is