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Angles Subtended by an Arc at the Centre Is Twice the Angle Subtended at the Circumference

The number of...

Question

The number of equal angles an arc subtends in the opposite segment is two.

True

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False

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Solution

The correct option is B
False

The angles subtended by an arc in a segment are equal. It can be proved as shown below.

Let AB be the arc, O be the centre of the circle and let $∠$ ACB and $∠$ ADB be the angles subtended by arc AB in the major segment. Join OA and OB.

Now $∠$ AOB is the angle subtended by arc at the center of the circle which is equal to twice the angle subtended by the arc at any point on the circle.

So, $∠$ AOB = 2 $∠$ ACB = 2 $∠$ ADB

Therefore, $∠$ ACB = $∠$ ADB

Here C and D are any general points on the circle. So angles subtended by an arc in a segment are equal. Therefore number of equal angles subtended by an arc in the opposite segment is not 2. It is infinite.

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