2 Answers

Konstantin Pelepelin · Answer 1 · 2021-01-28T06:57:22+0000

Answer: A

Explanation:

Use Pythagorean Theorem in order to solve this:

a^(2) + b^(2) = c^(2)

(c is the hypotenuse)

So that would be:

3^(2) + 6^(2) = c^(2)

If you solve this, you would find that:

c^(2) = 45

c = 3√(5)

Answer = B

Mostafa Hussein · Answer 2 · 2021-02-01T14:57:54+0000

Triangle ABC is a right triangle. The length of the legs are 3 in and 6 in, how long is the hypotenuse? (Round to the nearest tenth if necessary)

When the two legs are given, the hypotenuse is found by using the Pythagorean Theorem, which states that:

$\displaystyle a^(2) +b^(2) =c^(2)$

In the theorem, a and b are the two legs, and c is the hypotenuse. Since you are given the length of the two legs, substitute it into the equation.

$a=3\\b=6$

3^(2) +6^(2)=c^(2)

Now, you need to square both 3 and 6. When you square a number, you're basically multiplying the number by itself.

$3^(2) =3 * 3=9\\6^(2)=6 * 6=36$

Substitute the numbers into the equation.

9+36=c^(2)

Add:

45=c^(2)

You're looking for the value of c, not c squared. To remove the square, you need to square root it.

$\displaystyle √(45)=\sqrt{c^(2) }$

Using a calculator, find the square root of 45.

$\displaystyle √(45)=\sqrt{c^(2) }\\c \approx 6.7$

The answer to your question is B) 6.7 inches.

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