Mathematics
In the given figure, O is the center of the circle. PT and PQ are tangents to the circle from an exterior point P. If angle TPQ = 70°, find the angle TRQ.
Circles
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Answer
Join OT and OQ.
Since, line from the center to the point of contact of tangent are perpendicular.
OT and OQ are perpendicular to PT and PQ.
∴ ∠OQP = 90° and ∠OTP = 90°
In quadrilateral OTPQ,
⇒ ∠OTP + ∠TPQ + ∠OQP + ∠TOQ = 360°
⇒ 90° + 70° + 90° + ∠TOQ = 360°
⇒ ∠TOQ = 360° - 90° - 90° - 70°
⇒ ∠TOQ = 360° - 250° = 110°.
We know that,
Angle subtended by an arc on the center is twice the angle subtended by it on any other point on the circumference.
⇒ ∠TOQ = 2∠TRQ
⇒ 2∠TRQ = 110°
⇒ ∠TRQ = = 55°.
Hence, ∠TRQ = 55°.
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