the radius of a circle is 10 centimeters. what is the area of a sector bounded by a 90° arc? give the exact answer in simplest form

I hope this isn't too late! You can find the answer to this by first finding the area of the circle, A=πr². So since the radius is 10, we input that into the equation to get π100. Now, there is 360° in a circle and a sector of 90° is 1/4 of it. So to answer the question all you have to do is find 1/4 of the area of the circle.

The answer is π25.

To solve the other questions on your assignment just think about how much the sector is of the full 360° of the circle, for example 180° is 1/2 of the circle or 270° is 3/4 of the circle, and multiply the fraction by the area of the circle.

Hope this helped, good luck! :)

williamwu309 williamwu309 · Answer 2 · 2017-02-26T06:31:15+01:00

williamwu309 williamwu309

26-02-2017

If the radius of the circle is 10 centimeters, the formula to get the area would be [tex]\pi r^2[/tex], and that would give us the area of [tex]100 \pi[/tex] square centimeters. [tex]\frac{360}{90}[/tex] would give us 4, so [tex]\frac{100}{4}[/tex] would give us the answer of 25 square centimeters.

I hope this helped!!! ^^

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