SOLUTION: A circle is inscribed into a right triangle. The point of tangency divides the hypotenuse in two segments with lengths 2 and 3. Find the radius of the circle
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Question 1155987: A circle is inscribed into a right triangle. The point of tangency divides the hypotenuse in two segments with lengths 2 and 3. Find the radius of the circle
Answer by greenestamps(13203) (Show Source): You can put this solution on YOUR website!
Let the triangle be ABC, with right angle at C.
Let P, Q, and R be the points of tangency of the circle with sides AB, BC, and CA, respectively.
We are given that AP=2 and PB=3.
Two tangents from an external point to a circle are congruent, so RC=2 and QB=3.
If r is the radius of the circle, then AC = 2+r and BC = 3+r.
Then in triangle ABC,
That equation is easily solved to find the radius.
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