In the given figure, ABCD is a quadrilateral and ∠ADC=a∘,∠BCD=b∘. AO and BO are bisectors of ∠DAB and ∠ABC respectively meeting at O. Find ∠AOB in terms of a∘ and b∘.
A
a+b
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B
(a+2b)2
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C
a+b2
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D
(a+2b)×2
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Solution
The correct option is Ca+b2 Given, ABCD is a quadrilateral. Also, OA and OB bisect ∠A and ∠B respectively.
In quadrilateral ABCD, ∠BAD+∠ABC+∠BCD+∠CDA=360∘
Since OA bisects ∠A and OB bisects ∠B, ∠DAO=∠OAB=12∠A