A regular octagon has an apothem measuring 10 in. and a perimeter of 66.3 in.

What is the area of the octagon, rounded to the nearest square inch?

A. 88 in.2

B. 175 in.2

C. 332 in.2

D. 700 in.2

Solving for an area of a regular octagon, we can make use of the formula shown below:

Area = 1/2 * apothem*perimeter

In this problem, the following values were given such as:
Apothem = 10 inches
Perimeter = 66.3 inches

Solving for the area:
Area = 1/2*10*66.3
Area = 331.5 inches²

The answer is letter "C" 332.

Answer Link

MrRoyal MrRoyal · Answer 2 · 2022-01-31T17:30:06+01:00

The area of the octagon is 332 square inches

The given parameters are:

Perimeter (p) = 66.3 inches

Apothem (a) = 10 inches

The area of the octagon is then calculated as:

[tex]Area = 0.5 * a * p[/tex]

So, we have:

[tex]Area = 0.5 * 10 * 66.3[/tex]

Evaluate the products

[tex]Area = 331.5[/tex]

Approximate

[tex]Area = 332[/tex]

Hence, the area of the octagon is 332 square inches

Read more about regular polygons at:

https://brainly.com/question/1601601

A regular octagon has an apothem measuring 10 in. and a perimeter of 66.3 in. What is the area of the octagon, rounded to the nearest square inch? A. 88 in.2 B. 175 in.2 C. 332 in.2 D. 700 in.2

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A regular octagon has an apothem measuring 10 in. and a perimeter of 66.3 in.

What is the area of the octagon, rounded to the nearest square inch?

A. 88 in.2

B. 175 in.2

C. 332 in.2

D. 700 in.2