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45 votes
45 votes
Calculate each value for ⊙P. Use 3.14 for π and round to the nearest tenth.

mJKL = 230


area of shaded sector =


area of unshaded sector =

User R Thatcher
by
2.9k points

1 Answer

18 votes
18 votes

Answer:

Area of the unshaded sector = 113.4 sq units

Area of the shaded sector = 200.6 sq units

Explanation:

First let us calculate the area of the circle

Area of the circle = πr²

radius r = 10units

Area of the circle = π(10)²

Area of the circle = π(100)

Area of the circle = 3.14(100)

Area of the circle = 314 sq. units

Area of a sector = theta/360 * πr²

Area of the unshaded sector = 130/360 * 314

Area of the unshaded sector = 13/36 * 314

Area of the unshaded sector = 113.389 sq units

Area of the unshaded sector = 113.4 sq units

Area of the shaded sector = Area of circle - Area of the unshaded sector

Area of the shaded sector = 314 - 113.89

Area of the shaded sector = 200.6sq. units

Calculate each value for ⊙P. Use 3.14 for π and round to the nearest tenth. mJKL = 230 area-example-1
User Maxim Palenov
by
3.1k points