Question 1153294
The area of a circle is 89.42 cm2. Which of the following most nearly gives the length of the side of a regular hexagon inscribed in the circle?
A. 4.22 cm 
B. 5.33 cm
C. 5.89 cm 
D. 6.12 cm
<pre><b><u>As stated, TOTALLY IGNORE the person who claims to LOVE MATH.</b></u>
Area of THIS circle: 89.42 cm<sup>2</sup>
Area of ANY circle: πr<sup>2</sup>
We then get: πr<sup>2</sup> = 89.42 
{{{matrix(1,3, r^2, "=", 89.42/pi)}}}
r, or {{{highlight_green(matrix(1,11, radius, of, circle, "=", sqrt(89.42/pi), "=", 5.335098, "(CHOICE", B, is, "CLOSEST!!"))}}}
The RADIUS of the circle is the same length as the length of ANY one of the ISOSCELES sides of the 6 triangles of the INSCRIBED REGULAR HEXAGON!