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Question
In the given figure, ΔODC ~ ΔOBA. If ∠BOC = 110°, ∠ODC = 45° and AB = 2CD, then find (i) m∠OAB (ii) OB : OD.
Sum
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Solution
Given, ∠BOC = 110°, ∠ODC = 45° and AB = 2CD
(i) To find m∠OAB
∵ ΔODC ~ ΔOBA
So, ∠D = ∠B
45° = ∠B
Now, In ΔOAB,
∠1 + ∠A + ∠B = 180°
70° + ∠A + 45° = 180°
2A = 180° – 115°
∠A = 65°
(ii) OB : OD
∵ ΔODC ~ ΔOBA
`(OD)/(OB) = (DC)/(BA) = (OC)/(OA)`
So, `(OD)/(OB) = (DC)/(BA)`
And `(OB)/(OD) = (BA)/(DC)` ...(By reversing)
`(OB)/(OD) = (AB)/(CD)`
`(OB)/(OD) = 2/1`
OB : OD = 2 : 1
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