A right triangle has sides A, B, and C. Side A is the hypotenuse and side B is also a side of a rectangle. Sides A, C, and the side of the rectangle adjacent to side B have lengths of 13 , 9 , and 3 , respectively. What is the rectangle's area?

1 Answer
Dean R.
Apr 25, 2018

6 sqrt{22}

Explanation:

As is my practice, I'm converting to standard notation where triangle sides are small letters a,b,c. While we're naming things, let's call the other side of the rectangle d.

A right triangle has hypotenuse a and sides b, c. Side b forms a rectangle with another length d. Given a=13, c=9, d=3 what is the area of the rectangle?

The area we seek is bd so we have to find b, so this is all a long windup to a Pythagorean Theorem question:

a^2 = b^2 + c^2

a is the hypotenuse so it's the one all by itself.

b^2= a^2 - c^2 = 13^2-9^2 = 169-81 = 88

b = sqrt{88} = 2 sqrt{22}

text{area} = bd = 6 sqrt{22}

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