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A sector of a circle with radius 8 cm has a central angle of 45°. What is the area of the corresponding segment?

A(8∏-16√2) cm²

B(8∏-32) cm²

C(16∏-32) cm²

D(16∏-64) cm²

Answer:

A. (8∏-16√2) cm²

Read Explanation:

The area of a segment is:

Area of segment=Area of sectorArea of triangle.\text{Area of segment}=\text{Area of sector}-\text{Area of triangle}.

Step 1: Area of the sector

Area=45360×π×82\text{Area}=\frac{45^\circ}{360^\circ}\times \pi \times 8^2
=18×64π=\frac{1}{8}\times 64\pi
=8π cm2.=8\pi\ \text{cm}^2.

Step 2: Area of the triangle

The triangle formed by the two radii has sides (8) cm and included angle (45^\circ).

Area\text{Area}
=12r2sinθ=\frac12 r^2\sin\theta
=12(8)2sin45=\frac12(8)^2\sin45^\circ
=3222=32\cdot\frac{\sqrt2}{2}
=162 cm2.=16\sqrt2\ \text{cm}^2.

Area of the segment

8π162 cm2\boxed{8\pi-16\sqrt2\ \text{cm}^2}



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