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प्रश्न
Area of a segment of a circle of radius ‘r’ and central angle 60° is ______.
पर्याय
`(πr^2)/2 - 1/2 r^2`
`(2πr)/4 - sqrt(3)/4 r^2`
`(πr^2)/6 - sqrt(3)/4 r^2`
`(2πr)/4 - r^2 sin 60^circ`
MCQ
रिकाम्या जागा भरा
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उत्तर
Area of a segment of a circle of radius ‘r’ and central angle 60° is `underlinebb((πr^2)/6 - sqrt(3)/4 r^2)`.
Explanation:
Given:
Radius = r
Central angle (θ) = 60°
Area of segment = Area of sector – Area of triangle
Area of sector = `θ/360^circ xx πr^2`
Area of sector = `60^circ/360^circ xx πr^2 = (πr^2)/6`
Since the central angle is 60° and the two sides are radii, the triangle is equilateral.
Area of equilateral triangle = `sqrt(3)/4 r^2`
Area of segment = `(πr^2)/6 - sqrt(3)/4 r^2`
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