In a given rectangle ABCD, diagonals AD and BC intersect at O. If ∠COD=120∘, what is the value of ∠OBA?
A
90∘
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B
60∘
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C
45∘
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D
none of these
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Solution
The correct option is D none of these Given that ∠COD=120∘. Since ABCD is a rectangle, diagonals bisect each other and are equal. i.e., AO = OC = DO = OB. In ΔODC,∠DOC+∠OCD+∠ODC=180∘ [Angle sum property of Δ] 120∘+2∠OCD=180∘ [equal sides subtend equal angles] 2∠OCD=180∘−120∘=60∘ ∠OCD=30∘=∠ODC ∠OCD=∠OBA (Alternate interior angle) ∴∠OBA=30∘.