Mathematics
In the figure (ii) given below, O is the center of the circle and PT is the tangent to the circle at P. Given ∠QPT = 30°, calculate
(i) ∠PRQ
(ii) ∠POQ.
Circles
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Answer
From figure,
OP ⊥ PT (∵ tangent at a point and radius through the point are perpendicular to each other.)
∴ ∠OPT = 90°.
Given, ∠QPT = 30°.
From figure,
∠OPT = 90°
∠OPQ + ∠QPT = 90°
∠OPQ + 30° = 90°
∠OPQ = 90° - 30° = 60°.
In △OPQ,
OP = OQ (∵ both are equal to radius of the circle.)
So, the triangle is isosceles. So,
∠OQP = OPQ = 60°.
Since sum of angles in a triangle = 180°.
In △OPQ,
⇒ ∠OQP + ∠OPQ + ∠POQ = 180°
⇒ 60 + 60 + ∠POQ = 180°
⇒ 120 + ∠POQ = 180°
⇒ ∠POQ = 180° - 120°
⇒ ∠POQ = 60°
Reflex ∠POQ = 360° - ∠POQ = 360° - 60° = 300°.
Arc PQ subtends Reflex ∠POQ at the centre and ∠PRQ at the remaining part of the circle.
∴ Reflex ∠POQ = 2∠PRQ (∵ angle subtended at centre by an arc is double the angle subtended at remaining part of circle)
300° = 2° × ∠PRQ
∠PRQ = = 150°.
(i) Hence, the value of ∠PRQ = 150°.
(ii) Hence, the value of ∠POQ = 60°.
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