Question: "The top view of a circular table shown..."

College
Algebra
Linear algebra
Vectors and spaces

Answered question

2022-01-10

The top view of a circular table shown on the right has a radius of 120cm.find the area of the smaller segment of the table (shaded region) determined by 60° arc

Answer & Explanation

star233

Skilled2022-02-09Added 403 answers

Area of segment (the shaded region) = Area of sector - area of triangle

Where:

Area of sector $= (\frac{θ π}{360}) r^{2}$

Area of segment $= (\frac{\sin θ}{2}) r^{2}$

Derive the equation:

Area of segment $= (\frac{θ π}{360}) r^{2}$ - $(\frac{\sin θ}{2}) r^{2}$

Area of segment $= r^{2} (\frac{θ π}{360} - \frac{\sin θ}{2})$

Given:

Central angle, $θ = 60 °$

Radius, $r = 120$ cm

pi, $π \approx 3.14$

Solve for the area of segment or shaded region:

Area of segment $= r^{2} (\frac{θ π}{360} - \frac{\sin θ}{2})$

Area = ( $120$ cm) $^{2}$ $[60 \times \frac{3.14}{360} - \frac{\sin 60}{2}]$

Area = $14, 400$ cm $^{2}$ $[0.523 - \frac{0.866}{2}]$

Area = $14, 400$ cm $^{2}$ $[0.523 - 0.433]$

Area = $14, 400$ cm $^{2}$ $(0.09)$

Area of segment or shaded region = $1, 296$ cm $^{2}$

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