Mathematics
In the figure (ii) given below, AC is a diameter of the circle with centre O. If CD || BE, ∠AOB = 130° and ∠ACE = 20°, find :
(i) ∠BEC
(ii) ∠ACB
(iii) ∠BCD
(iv) ∠CED.
Circles
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Answer
∠AOB = 130°.
∠AOB + ∠BOC = 180° (∵ these angles form linear pair.)
130° + ∠BOC = 180°
∠BOC = 180° - 130° = 50°.
(i) Arc BC subtends ∠BOC at the centre and ∠BEC at the remaining part of the circle.
∠BOC = 2∠BEC (∵ angle subtended on centre is twice the angle subtended on the remaining part of the circle).
⇒ 50° = 2∠BEC
⇒ ∠BEC =
Hence, the value of ∠BEC = 25°.
(ii) Arc AB subtends ∠AOB at the centre and ∠ACB at the remaining part of the circle.
⇒ ∠AOB = 2∠ACB (∵ angle subtended on centre is twice the angle subtended on the remaining part of the circle).
⇒ 130° = 2∠ACB
⇒ ∠ACB =
Hence, the value of ∠ACB = 65°.
(iii) Given, CD || EB,
∠ECD = ∠CEB = 25°. (∵ alternate angles are equal.)
From figure,
∠BCD = ∠ACB + ∠ACE + ∠ECD = 65° + 20° + 25° = 110°.
Hence, the value of ∠BCD = 110°.
(iv) EBCD is a cyclic quadrilateral hence the sum of opposite interior angles = 180°.
∴ ∠BED + ∠BCD = 180°
⇒ ∠BEC + ∠CED + ∠BCD = 180°
⇒ 25° + ∠CED + 110° = 180°
⇒ ∠CED + 135° = 180°
⇒ ∠CED = 180° - 135° = 45°.
Hence, the value of ∠CED = 45°.
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