What is the area of a regular 15-gon with a perimeter of 90 m?

To find the area of a regular polygon, we can use the formula:

Area = (perimeter * apothem) / 2

Since the perimeter of the 15-gon is given as 90 m, the length of each side is 90/15 = 6 m.

To find the apothem, we can use the formula:

Apothem = side length / (2 * tan(180° / n))

where n is the number of sides (in this case, n=15).

Plugging in the values, we get:

Apothem = 6 / (2 * tan(180° / 15))
Apothem ≈ 6 / (2 * tan(12°))

Using a calculator, we find that tan(12°) ≈ 0.21255656167, so:

Apothem ≈ 6 / (2 * 0.21255656167)
Apothem ≈ 6 / 0.42511312334
Apothem ≈ 14.115 m

Now we can calculate the area:

Area = (90 * 14.115) / 2
Area ≈ 635.1 m²

Therefore, the area of the regular 15-gon with a perimeter of 90 m is approximately 635.1 m².

The correct answer is B. 635.1m ^ 2.