Question 3
AP an BQ are the bisectors of the two alternate interior angles formed by the intersection of a transversal t with parallel lines l and m (in the given figure). Show that AP || BQ.

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Solution

Given, l || m, AP and BQ are the bisectors of $∠ E A B a n d ∠ A B H$ , respectively.
To prove AP || BQ.

Proof:
Since, l || m and t is transversal.
$∠ E A B = ∠ A B H$ [alternate interior angles]

$\Rightarrow \frac{1}{2} ∠ E A B = \frac{1}{2} ∠ A B H$ [divided both sides by 2]
$\Rightarrow ∠ P A B = ∠ A B Q$
[AP and BQ are the bisectors of $∠ E A B a n d ∠ A B H$ ]
Since, $∠ P A B a n d ∠ A B Q$ are alternate interior angles angles with two lines AP and BQ and transversal AB.
Hence, AP || BQ.

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Question 3 AP an BQ are the bisectors of the two alternate interior angles formed by the intersection of a transversal t with parallel lines l and m (in the given figure). Show that AP || BQ.

Question 3
AP an BQ are the bisectors of the two alternate interior angles formed by the intersection of a transversal t with parallel lines l and m (in the given figure). Show that AP || BQ.