Question 6
In the figure, BA || ED and BC || EF. Show that $∠ A B C + ∠ D E F = 180^{\circ}$ .

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Solution

Given BA || ED and BC || EF.
To show $∠ A B C + ∠ D E F = 180^{\circ}$ ,
Construction:
Draw a ray PE opposite to ray EF.

Proof:
In the figure, BC || EF.
$∴ ∠ E P B + ∠ P B C = 180^{\circ}$ [sum of cointerior angles is $180^{\circ}$ ]…(i)
Now, AB || ED and PE is a transversal line.
$∴ ∠ E P B = ∠ D E F$ [corresponding angles] …(ii)
From equations (i) and (ii), $∠ D E F + ∠ P B C = 180^{\circ}$
$\Rightarrow ∠ A B C + ∠ D E F = 180^{\circ} [∵ ∠ A B C = ∠ P B C]$

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Similar questions

∠ A B C + ∠ D E F = 180^{\circ}

In the given figure, BA || ED and BC || EF. Show that $∠ A B C + ∠ D E F = 180^{\circ}$ .

∠ A B C = ∠ D E F

∠ A B C + ∠ D E F = 180^{\circ}

B A | | E D

B C | | E F

∠ A B C + ∠ D E F = 180^{o}

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