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Question
The given figure shows a circle with centre O such that chord RS is parallel to chord QT, angle PRT = 20° and angle POQ = 100°. Calculate:
- angle QTR
- angle QRP
- angle QRS
- angle STR
Solution
Join PQ, RQ and ST.
i. ∠POQ + ∠QOR = 180°
`=>` 100° + ∠QOR = 180°
`=>` ∠QOR = 80°
Arc RQ subtends ∠QOR at the centre and ∠QTR at the remaining part of the circle.
∴ `∠QTR = 1/2 ∠QOR`
`=> ∠QTR = 1/2 xx 80^circ = 40^circ`
ii. Arc QP subtends ∠QOP at the centre and ∠QRP at the remaining part of the circle.
∴ `∠QRP = 1/2 ∠QOP`
`=> ∠QRP = 1/2 xx 100^circ = 50^circ`
iii. RS || QT
∴ ∠SRT = ∠QTR ...(Alternate angles)
But ∠QTR = 40°
∴ ∠SRT = 40°
Now,
∠QRS = ∠QRP + ∠PRT + ∠SRT
`=>` ∠QRS = 50° + 20° + 40° = 110°
iv. Since RSTQ is a cyclic quadrilateral
∴ ∠QRS + ∠QTS = 180° ...(Sum of opposite angles)
`=>` ∠QRS + ∠QTS + ∠STR = 180°
`=>` 110° + 40° + ∠STR = 180°
`=>` ∠STR = 30°
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