In the figure, ABC is an isosceles triangle in which AB=AC. If D and E are the mid-points of sides AB and BC respectively and $∠$ DOE = 120º, find
$∠$ ODE.

30º

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45º

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60º

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75º

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Solution

The correct option is A
30º

In $△ B D C$ and $△ C E B$

$D B = C E (A B = A C; \frac{A B}{2} = \frac{A C}{2}$ )

$∠ D B C = ∠ E C B (A B C i s a n i s o s c e l e s t r i a n g l e)$

$B C = C B (C o m m o n)$

By SAS congruence condition, $△ B D C ≅ △ C E B$

so, $∠ B D C = ∠ B E C (C o r r e s p o n d i n g p a r t o f c o n g r u e n t t r i a n g l e s)$

In ADE, AD = AE. So,
$∠ A D E = ∠ A E D$
This means that $∠ B D E = ∠ C E D$

Since
$∠ B D E = ∠ C E D a n d ∠ B D C = ∠ B E C, ∠ O D E = ∠ O E D = x (L e t)$

In $△ O D E, x + x + ∠ D O E = 180^{\circ}$ (Angle sum property of a triangle)

$2 x + 120^{\circ} = 180^{\circ}$

$x = 30^{\circ} = ∠ O D E$

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