1.) Mario and Hank are arguing. Mario says it is impossible to draw a right triangle with sides measuring 8 inches, 12 inches, and 18 inches. Hank says it is possible. Who is correct?

2.) Hank says it is possible to draw a right triangle with the measurements shown in the diagram below right triangle with sides of 10 in, and 26 in. What is the length of the third side of this right triangle?

Question

Mathematics

Aussie

29 November, 00:33

1.) Mario and Hank are arguing. Mario says it is impossible to draw a right triangle with sides measuring 8 inches, 12 inches, and 18 inches. Hank says it is possible. Who is correct?

2.) Hank says it is possible to draw a right triangle with the measurements shown in the diagram below right triangle with sides of 10 in, and 26 in. What is the length of the third side of this right triangle?

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Answers (1)

Know the Answer?

Terry Osborn · Answer 1

Problem One

Test it.

a^2 + b^2 = c^2

a = 8

b = 12 What will c calculate to be.

8^2 + 12^12 = c^2

c^2 = 64 + 144

c^2 = 208

If 18 is to be the hypotenuse of the triangle c^ must equal 324.

208 is nowhere's near that amount.

Mario is right.

Question Two

The only way Hank will be right is if 26 is the hypotenuse. If that is so, the third side is 24. This is how you do it.

a^2 + b^2 = c^2

c = 26

a = 10

10^2 + b^2 = 26^2

100 + b^2 = 676 Subtract 100

b^2 = 676 - 100

b^2 = 576

b = sqrt (576)

b = 24

If 26 is not the hypotenuse, the right triangle cannot be drawn.