Question 185
In the following figure, $A B ∥ D C$ and $A D = B C$ . Find the value of x.

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Solution

Given, an isosceles trapezium, where $A B ∥ D C$ , AD = BC and $∠ A = 60^{\circ}$ .
Then, $∠ B = 60^{\circ}$ .
Draw a line parallel to BC through D which intersects the line AB at E (say).

Then, DEBC is a parallelogram, where
BE = CD = 20 cm and DE = BC = 10 cm
Now, $∠ D E B + ∠ C B E = 180^{\circ}$
[adjacent angles are supplementary in parallelogram]
$\Rightarrow ∠ D E B = 180^{\circ} - 60^{\circ} = 120^{\circ}$
$∴ I n Δ A D E, ∠ A D E = 60^{\circ}$ [exterior angle]
Also, $∠ D E A = 60^{\circ}$ [ $∵$ AD = DE = 10cm and $∠ D A E = 60^{\circ}$ ]
Then, $Δ A D E$ is an equilateral triangle.
$∴ A E = 10 c m$
$\Rightarrow A B = A E + E B = 10 + 20 = 30 c m$
Hence, x = 30 cm.

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Question 185 In the following figure, AB∥DC and AD=BC. Find the value of x.

Question 185
In the following figure, $A B ∥ D C$ and $A D = B C$ . Find the value of x.