Answer: A = (27/4)√3 in²
Explanation:
You are required to calculate the area, A, of an equilateral triangle, when you know its radius is 3 inches.
The radius of an equilateral triangle is the radius of the cirscumscribed circle.
The equilateral triangle has several characteristics which can be geometrically deduced:
- Three congruent sides (by definition)
- Three 60° internal angles
- If you call the length of the sides x, and the radius of the circumscribed circle r, then:
r = x √3 / 3 ⇒ x = r√3
Area = [√3 / 4] x²
- Combining the two previous relations, you deduce:
Area = [3 √3 / 4] r²
By substituting the given radius, you find the area of the equilateral triangle:
Area = [3 √3 / 4] x² = [3 √3 / 4] (3 in)² = 27√3 / 4 in²
