∠OAB = 50°.
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Question
In the following, ‘O’ is the centre of the circle. If ∠ACB = 40°, then find ∠OAB.
Sum
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Solution
Given:
O is the centre, ∠ACB = 40°.
∠ACB is an angle at the circumference standing on arc AB.
So the angle at the centre standing on the same arc is:
∠AOB = 2 × ∠ACB = 2 × 40° = 80°.
In triangle AOB, OA = OB (radii of the circle), so it is isosceles.
Therefore, base angles at A and B are equal:
∠OAB = ∠OBA
∠OAB + ∠OBA + ∠AOB = 180°
2∠OAB + 80° = 180°
2∠OAB = 100°
∠OAB = 50°.
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