a regular hexagon has a radius of 20 in. what is the approximate area of the hexagon?\n600 in.²\n1,038…

a regular hexagon has a radius of 20 in. what is the approximate area of the hexagon?\n600 in.²\n1,038 in.²\n1,200 in.²\n2,076 in.²
Answer
Explanation:
Step1: Divide hexagon into triangles
A regular hexagon can be divided into 6 equilateral triangles with side - length equal to the radius of the hexagon. Here, the radius (r = 20) in, so the side - length of each equilateral triangle (a=20) in.
Step2: Find area of one equilateral triangle
The area formula for an equilateral triangle is (A_{\triangle}=\frac{\sqrt{3}}{4}a^{2}). Substitute (a = 20) in, we get (A_{\triangle}=\frac{\sqrt{3}}{4}\times20^{2}=\frac{\sqrt{3}}{4}\times400 = 100\sqrt{3}\text{ in}^2).
Step3: Find area of hexagon
Since the hexagon is composed of 6 such equilateral triangles, the area of the hexagon (A = 6\times A_{\triangle}). Substitute (A_{\triangle}=100\sqrt{3}\text{ in}^2) into the formula, we have (A = 6\times100\sqrt{3}=600\sqrt{3}\text{ in}^2\approx600\times1.732 = 1039.2\text{ in}^2\approx1038\text{ in}^2).
Answer:
1,038 in.²