In the figure below- lines AB and CD intersect at O- If - AOC - BOE -70- and - BOD -40- find 2 - BOE -A- 50-B- 30-

The correct option is ∠AOC + ∠BOE + ∠COE = 180^∘ (linear pair of angle) Given, ∠AOC + ∠BOE = 70^∘ So, ∠COE = 180^∘ – (∠AOC + ∠COE) = gt; 180^∘ – 7 ...

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Byju's Answer

Standard VIII

Mathematics

Rectangle

In the figure...

Question

In the figure below, lines AB and CD intersect at O. If $∠$ AOC + $∠$ BOE = $70^{\circ}$ and $∠$ BOD = $40^{\circ}$ , find (2 $∠$ BOE).

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Solution

$∠$ AOC + $∠$ BOE + $∠$ COE = $180^{\circ}$ (linear pair of angle)

Given, $∠$ AOC + $∠$ BOE = $70^{\circ}$

So, $∠$ COE = $180^{\circ}$ – ( $∠$ AOC + $∠$ COE) => $180^{\circ}$ – $70^{\circ}$ = $110^{\circ}$

Again, $∠$ COE + $∠$ BOE + $∠$ BOD = $180^{\circ}$ (linear pair of angle)

We know that, $∠$ COE = $110^{\circ}$ and $∠$ BOD = $40^{\circ}$

So, $∠$ BOE = $180^{\circ}$ – $∠$ COE - $∠$ BOD => $180^{\circ}$ – $110^{\circ}$ - $40^{\circ}$ = $30^{\circ}$
(2 $∠$ BOE) = $60^{\circ}$

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In the figure below, lines AB and CD intersect at O. If ∠AOC + ∠BOE = 70∘ and ∠BOD = 40∘, find (2∠BOE).

In the figure below, lines AB and CD intersect at O. If $∠$ AOC + $∠$ BOE = $70^{\circ}$ and $∠$ BOD = $40^{\circ}$ , find (2 $∠$ BOE).