McGraw-Hill Education GRE 2019

(singke) #1
1

1

45°

45°
2√

The legs of every isosceles right triangle will have a specific ratio that you should
memorize:
leg opposite 45 : leg opposite 45 : side opposite 90
↓ ↓ ↓
1 1 √ 2
x x x√2
It is important to note that the preceding combination only specifies a ratio, and
not actual values. For example, if you are told that the leg length of an isosceles
triangle is 5, then the hypotenuse is 5√ 2. Or if the leg length is 7, then the
hypotenuse is 7√ 2. The best way to think about the relationships of the leg lengths is
that the hypotenuse will be √ 2 × the leg.
One commonly tested fact about 45-45-90 triangles is that the diagonal of a
square will form two 45-45-90 triangles. This is helpful because you can use the
diagonal of the square to solve for the side lengths of the square and vice versa.

x x^2 x

x

x


What is the area of a square with a diagonal of length 20?

x^20

x

SOLUTION: To solve for the area, you need the length of a side.
The length of the side will be the leg of an isosceles right
triangle with a hypotenuse of 20. Let x = leg length:
x√2 = 20
x =
20
√2
area = x^2 =
20
√2^2 =

400
2 = 200

CHAPTER 13 ■ GEOMETRY 383

04-GRE-Test-2018_313-462.indd 383 12/05/17 12:04 pm

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