When one line intersects a pair of lines (or more), we refer to it as a transversal.
When a transversal cuts through a pair of lines, it allows us to pair up and name the angles that are formed.
We pair up the angles in this way because the following postulate and theorems tell us that they are either form supplementary or congruent pairs when the transversal cuts through two parallel lines.
For each of the following angle pairs, state the type of angle pair they are and the relationship between their measures:
\angle A and \angle C
\angle B and \angle C
\angle C and \angle D
\angle A and \angle E
The figure shows two intersecting pairs of parallel lines.
Find the value of x and explain your answer.
Find the value of y and explain your answer.
Determine if the information given is enough to justify the conclusion.
Given: a\parallel b and \angle 1 \cong \angle 3
Conclusion: \angle 2 and \angle 3 are supplementary