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How do I find the radius/x of a shaded region with it's area and/or angle measurement?



How do I find the radius/x of a shaded region with it's area and/or angle measurement-example-1
User Scragz
by
3.0k points

2 Answers

8 votes
8 votes

Answer:

r ≈ 9.8 feet

Explanation:

Formula of A Sector

  • Area (Sector) = πr² × θ/360°

Substitute the given values in the formula to find r.

  • 128 = 3.14 × r² × 152/360
  • 40.76 = r² × 19/45
  • r² = 1834.2/19
  • r² = 96.54
  • r ≈ 9.8 feet
User Harthoo
by
2.5k points
20 votes
20 votes

Answer:


x \approx 9.823\ ft

Explanation:

Remember that the area of a sector is defined as:


A = (\theta)/(360^\circ)* \pi r^2

In this problem, we are given the area
A, and the angle
\theta. We can set up an equation to solve for the radius, which is x:


A = (\theta)/(360^\circ)* \pi r^2\\128 = (152)/(360)* \pi r^2\\128 * (360)/(152) = \pi r^2\\(5760)/(19) = \pi r^2\\r = \sqrt{(5760)/(19 \pi)}\\r \approx 9.823

User Fyllepo
by
2.8k points