1993 AIME Problems/Problem 15
Problem
Let be an altitude of . Let and be the points where the circles inscribed in the triangles and are tangent to . If , , and , then can be expressed as , where and are relatively prime integers. Find .
Solution
From the Pythagorean Theorem, , and . Subtracting those two equations yields . After simplification, we see that , or . Note that . Therefore we have that . Therefore .
Now note that , , and . Therefore we have
.
Plugging in and simplifying, we have .
Edit by GameMaster402: It can be shown that in any triangle with side lengths , if you draw an altitude from the vertex to the side of , and draw the incircles of the two right triangles, the distance between the two tangency points is simply
See also
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