Transversal and Parallel Lines

Vocabulary

Vocabulary Part 2

Angle Relationships

Angle Relationships Part 2

Algebra Attack/Random Tidbits

100

Any line that intersects two or more coplanar lines.

Transversal

100

If two parallel lines are cut by a transversal, these angles are on the inside of the two parallel lines and on the same side of the transversal.

Same Side Interior Angles

100

Two angles are congruent. The measure of the first angles is 42 degrees, what is the measure of the second angle

100

If a pair of adjacent angles formed by intersecting line are linear pairs, what is their relationship

supplementary

100

If a transversal cuts two parallel lines, how many angle measures do you need to know to figure out all 8 angle measures in the figure.

200

Two angles whose measures add up to 180 degrees

Supplementary angles

200

Two angles whose measures add up to 90o

Complementary Angles

200

What is the relationship between angles 4 and 5?

Alternate Interior Angles.

200

One way to prove that lines are parallel lines is through understanding that corresponding angles are

congruent

200

If a transversal cuts two non-parallel lines, at least how many angles do you need to know to figure out all 8 angles in the figure?

300

When 2 parallel lines are both intersected by a transversal, these angles occupy the same position on the top and bottom parallel lines.

Corresponding Angles

300

A pair of adjacent angles formed by intersecting lines.

Linear Pair Angles.

300

If the measure of angle 8 is 112, what is the measure of angle 6?

300

To prove that lines are parallel one must understand that same side interior angles are

supplementary

300

If the measure of <1 is 4x-6 and the measure of <8 is 122, what is the value of x?

4x-6=122 x=32

400

Congruent angles formed by two intersecting lines

Vertical Angles.

400

If two parallel lines are intersected by a transversal these angles are located on the outside of the two parallel lines and on the same side of the transversal.

Same Side Exterior Angles.

400

What is the realtionship between angles 1 and 4?

Vertical Angles.

400

If the measure of angle 2 is 30 degrees , what is the measure of angle 7?

30 degrees

400

If the measure of <3 is 150 and the measure of <6 is 3x, what is the value of x and what is the measure of <7?

<7=150; and 3x=150 x=50

500

When 2 parallel lines are both intersected by a transversal these angles are inside of the two parallel lines and on opposite sides of the transversal.

Alternate Interior Angles.

500

Coplanar lines that do not intersect.

parallel lines.

500

If the measure of anlge 1 is 37 degrees, what is the measure of angle 8? What is the angle relationship

37, Alternate Exterior

500

Given that l || m, m<1=98°, then the measures of <3 and <8 are:

82 and 98 respectively

500

If the measure of <4 is 8x+35 and the measure of <6 is 2x+5, then find the value of x and find the measure of <8?

8x+35+2x+5=180 10x+40=180 10x=140 x=14 Now plug into <4 because it is congruent (corresponding) to <8. 8(14)+35=112 so <8=112.