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A sector has area of 314.16 cm² and a central angle of 90°. What is its radius?

A20

B20.14

C20.28

D20.42

Answer:

A. 20

Read Explanation:

The correct answer is Option A (20 cm).

To find the radius, we use the formula for the area of a sector, which represents a "slice" of a full circle.

Step-by-Step Solution

  1. Use the Sector Area Formula:
    Area=θ360×πr2\text{Area} = \frac{\theta}{360} \times \pi r^2

    • Where θ\theta is the central angle (9090^\circ).

    • Area=314.16 cm2\text{Area} = 314.16 \text{ cm}^2.

  2. Substitute the Given Values:
    314.16=90360×πr2314.16 = \frac{90}{360} \times \pi r^2

  3. Simplify the fraction: 90/360=1/490/360 = 1/4.
    314.16=14×πr2314.16 = \frac{1}{4} \times \pi r^2

  4. Solve for r2r^2:
    Multiply both sides by 4:
    1256.64=πr21256.64 = \pi r^2
    r2=1256.643.1416=400r^2 = \frac{1256.64}{3.1416} = 400

  5. Find the Radius:
    r=400=20 cmr = \sqrt{400} = \mathbf{20 \text{ cm}}


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