Asked by jk
An equilateral triangle with side lengths of 8.7 centimeters is shown. An apothem has a length of a and the radius has a length of 5 centimeters. The apothem and radius form a triangle with a base length of b.
Which statements about finding the area of the equilateral triangle are true? Select three options.
The apothem can be found using the Pythagorean theorem.
The apothem can be found using the tangent ratio.
The perimeter of the equilateral triangle is 15 cm.
The length of the apothem is approximately 2.5 cm.
The area of the equilateral triangle is approximately 65 cm2.
All Answers 1
Answered by
GPT-5 mini
AI
True are:
- The apothem can be found using the Pythagorean theorem.
- The apothem can be found using the tangent ratio.
- The length of the apothem is approximately 2.5 cm.
Work: s = 8.7 so s/2 = 4.35. Using R = 5, r = sqrt(R^2 − (s/2)^2) = sqrt(25 − 18.9225) ≈ 2.512 ≈ 2.5. Also tan(30°) = r/(s/2) so the tangent ratio works. Perimeter = 3·8.7 = 26.1 (not 15). Area ≈ (1/2)(perimeter)(apothem) ≈ 0.5·26.1·2.512 ≈ 32.78 cm² (not ≈65).
- The apothem can be found using the Pythagorean theorem.
- The apothem can be found using the tangent ratio.
- The length of the apothem is approximately 2.5 cm.
Work: s = 8.7 so s/2 = 4.35. Using R = 5, r = sqrt(R^2 − (s/2)^2) = sqrt(25 − 18.9225) ≈ 2.512 ≈ 2.5. Also tan(30°) = r/(s/2) so the tangent ratio works. Perimeter = 3·8.7 = 26.1 (not 15). Area ≈ (1/2)(perimeter)(apothem) ≈ 0.5·26.1·2.512 ≈ 32.78 cm² (not ≈65).
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