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Diagonals of Parallelogram Bisect Each Other

In the given ...

Question

In the given figure, ABCD is a quadrilateral and $∠ A D C = a^{\circ}, ∠ B C D = b^{\circ} .$ AO and BO are bisectors of $∠ D A B$ and $∠ A B C$ respectively meeting at O. Find $∠ A O B$ in terms of $a^{\circ}$ and $b^{\circ}$ .

a + b

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\frac{(a + 2 b)}{2}

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\frac{a + b}{2}

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(a + 2 b) \times 2

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Solution

The correct option is C $\frac{a + b}{2}$
Given, ABCD is a quadrilateral.
Also, OA and OB bisect $∠ A$ and $∠ B$ respectively.

In quadrilateral ABCD,
$∠ B A D + ∠ A B C + ∠ B C D + ∠ C D A = 360^{\circ}$

Since OA bisects $∠ A$ and OB bisects $∠ B$ ,
$∠ D A O = ∠ O A B = \frac{1}{2} ∠ A$

and,

$∠ C B O = ∠ O B A = \frac{1}{2} ∠ B$

$\Rightarrow ∠ A = 2 ∠ O A B$ and
$∠ B = 2 ∠ O B A$

Let $∠ O A B = x$ and $∠ O B A = y$

$∠ A = 2 x$ and $∠ B = 2 y$

$∴ 2 x + 2 y + a + b = 360^{\circ}$
$\Rightarrow x + y = \frac{360 - (a + b)}{2}$
$\Rightarrow ∠ A O B = 180^{\circ} - (\frac{360 - (a + b)}{2})$ [Angle]
Hence, $∠ A O B = \frac{360 - 360 + (a + b)}{2} = \frac{a + b}{2}$

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