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Question
In the given figure, AB is a diameter of the circle with centre O. DO is parallel to CB and ∠DCB = 120°.
Calculate:
- ∠DAB,
- ∠DBA,
- ∠DBC,
- ∠ADC.
Also, show that the ΔAOD is an equilateral triangle.
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Solution
i. ABCD is a cyclic quadrilateral
∴ ∠DCB + ∠DAB = 180°
(Pair of opposite angles in a cyclic quadrilateral are supplementary)
`=>` ∠DAB = 180° – 120° = 60°
ii. ∠ADB = 90°
(Angle in a semicircle is a right angle)
∴ ∠DBA = 90° – ∠DAB
= 90° – 60°
= 30°
iii. OD = OB
∴ ∠ODB = ∠OBD
Or ∠ABD = 30°
Also, AB || ED
∴ ∠DBC = ∠ODB = 30° (Alternate angles)
iv. ∠ABD + ∠DBC = 30° + 30° = 60°
`=>` ∠ABC = 60°
In cyclic quadrilateral ABCD,
∠ADC + ∠ABC = 180°
(Pair of opposite angles in a cyclic quadrilateral are supplementary)
`=>` ∠ADC = 180° – 60° = 120°
In ∆AOD, OA = OD (Radii of the same circle)
∠AOD = ∠DAO Or ∠DAB = 60° [Proved in (i)]
`=>` ∠AOD = 60°
∠ADO = ∠AOD =∠DAO = 60°
∴ ∆AOD is an equilateral triangle.
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