Question

① If a transversal intersects two lines such that the bisectors of a pair of alternate interior angles

are parallel, then prove that the two lines are parallel.

② In Figure 2, find the values of x and y and then show that AB ∥ CD.
plz answer both questions plz ​​

Answer 1

Answer:

Step-by-step explanation:

The transversal AD intersects the two lines PQ and RS at points B and C respectively. BE is the bisector of ∠ABQ and CF is the bisector of ∠BCS.

As, BE is the bisector of ∠ABQ, then,

∠ABE= 21 ∠ABQ

In the same way,

∠BCF= 21 ∠BCS

Since BE and CF are parallel and AD is the transversal, therefore, by corresponding angle axiom,

∠ABE=∠BCF

21 ∠ABQ= 21 ∠BCS∠ABQ=∠BCS

Therefore, by the converse of corresponding angle axiom,

PQ∥RS.

Step-by-step explanation:

2.x =y

y = 130...vertically opposite angles

so x is also 130 alternative interior angles