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Question

In the given figure, $ ∆OBA ~ ∆ODC, \angle BOC = 125°$ and $ \angle CDO = 70°$. Find the value of $ \angle OAB$.

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Solution

Compute the required value:

Given: OBA~ODC

Thus, ODC=OBA=70° [ corresponding angles of similar triangles ]

From the figure, AOC is a straight line. Therefore,

AOB=180°-125°AOB=55° [ Linear pair ]

AOB=∠DOCDOC=55° [ vertically opposite angles ]

In ODC,

OCD=180°-70°-55°OCD=55° [ Sum of interior angles of a triangle is 180° ]

OAB=OCDOAB=55° [ corresponding angles of similar triangles ]

Hence, the value of OAB is 55°.


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