For the proof here kindly check the attachment.
We are given that[tex] r\parallel s [/tex]. Also, the transversal is shown. Let us take the first case, that of [tex] \angle 1 [/tex] and [tex] \angle 5 [/tex]. Please note that all other proofs will follow in a similar manner.
Let us begin, please have a nice look at the diagram. We will see that [tex] \angle 1 [/tex] and [tex] \angle 3 [/tex] are vertically opposite angles. We know that vertically opposite angles are congruent. Thus, [tex] \angle 1 [/tex] and [tex] \angle 3 [/tex] are congruent angles.
[tex] \angle 1 [/tex] = [tex] \angle 3 [/tex]
Now, we know that [tex] \angle 3 [/tex] and [tex] \angle 5 [/tex] are alternate interior angles. We also, know that alternate interior angles are equal too. Thus, we have:
[tex] \angle 3 [/tex] = [tex] \angle 5 [/tex]
From the above arguments it is clear that:
[tex] \angle 1 [/tex] = [tex] \angle 3 [/tex] = [tex] \angle 3 [/tex].
Thus, [tex] \angle 1 [/tex] = [tex] \angle 3 [/tex]
We have proven the first instance. Please note that all other instances can be proved in a similar fashion.
For example, for [tex] \angle 2 [/tex] and [tex] \angle 6 [/tex] we can take [tex] \angle 2 [/tex] and [tex] \angle 4 [/tex] as vertically opposite angles thus making [tex] \angle 2 [/tex] = [tex] \angle 4 [/tex]. Now, [tex] \angle 4 [/tex] and [tex] \angle 6 [/tex] are alternate interior angles and thus [tex] \angle 4 [/tex] and [tex] \angle 6 [/tex] are equal. Thus, we have [tex] \angle 2 [/tex] and [tex] \angle 6 [/tex] .
