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Linear Pair

In the given ...

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: $∆ O B A ~ ∆ O D C$
Thus, $∠ O D C = ∠ O B A = 70 °$ [ corresponding angles of similar triangles ]
From the figure, $A O C$ is a straight line. Therefore,
$\begin{array}{rcl} ∠ AOB & = & 180 ° - 125 ° \\ \Rightarrow & ∠ AOB = 55 ° \end{array}$ [ Linear pair ]
$\begin{array}{rcl} ∠ AOB =∠ DOC \\ \Rightarrow ∠ DOC =55° \end{array}$ [ vertically opposite angles ]
In $∆ O D C$ ,
$\begin{array}{rcl} ∠ OCD & = & 180 ° - 70 ° - 55 ° \\ ∠ OCD & = & 55 ° \end{array}$ [ Sum of interior angles of a triangle is $180 °$ ]
$\begin{array}{rcl} ∠ OAB & = & ∠ OCD \\ ∠ OAB & = & 55 ° \end{array}$ [ corresponding angles of similar triangles ]
Hence, the value of $∠ O A B$ is $55 °$ .

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Similar questions

In the following figure, ΔODC ∼ ΔOBA, ∠BOC = 125° and ∠CDO = 70°. Find ∠DOC, ∠DCO and ∠OAB

△ O D C \sim △ O B A, ∠ B O C = 125^{o}

∠ C D O = 70^{o}

∠ D O C, ∠ D C O

∠ O A B

.

In the given figure, $Δ O D C \sim Δ O B A, ∠ B O C = 115^{o} a n d ∠ C D O = 70^{o}$ .

Find (i) $∠ D O C$

(ii) $∠ D C O$

(iii) $∠ O A B$

(iv) $∠ O B A$ .

Q. In the given figure

∆ O D C ~ ∆ O B A, ∠ B O C = 115 ° and ∠ C D O = 70 ° .

(i) ∠DOC
(ii) ∠DCO
(iii) ∠OAB
(iv) ∠OBA.

△ O D C \sim △ O B A

∠ B O C = 125^{o}

∠ C D O = 70^{o}

∠ D O C, ∠ D C O

∠ O A B

.

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