A chord of a circle of radius 14 cm subtends an angle of 60° at the

Q) AB is a chord of a circle centred at O such that ∠AOB=60˚. If OA = 14 cm then find the area of the minor segment. (take √3 =1.73)

Ans:

Let the chord AB cut the circle in 2 parts. Sector APB is minor segment and AQB is major one.

Now in △AOB, radius OA=OB=14 cm

Therefore, ∠OAB = ∠OBA [identity: angles opposite to equal side]

Given that ∠AOB=60°

Therefore, ∠AOB + ∠OAB + ∠OBA = 180°

or 60° + 2 ∠OAB = 180°

or 2 ∠OAB = 120°

∠OAB = 60° and ∠OBA = 60°

Since All angles are 60°, therefore △OAB is an equilateral triangle

Now, area of minor segment APB = Area of sector OAPB – Area of △OAB

= π OA² $\frac{60°}{360°} - \frac{\sqrt3}{4}$ OA²

= OA² $[\pi (\frac{1}{6}) - (\frac{\sqrt3}{4})]$

= ( 14 x 14) $[(\frac{22}{7}) (\frac{1}{6}) - (\frac{1.73}{4})]$

= 196 x (0.5238 – 0.4325)

= 196 x 0.0913 = 17.897 cm²

Hence, the area of minor segment is 17.897 cm²

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