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Math Clip Art: Parallel Lines Cut by a Transversal 18

Math Clip Art: Parallel Lines Cut by a Transversal 18

Same Side Interior Angles: Supplementary

Topic

Geometry

Description

This math clip art image is part of a series illustrating the properties of parallel lines cut by a transversal. It focuses on another pair of same side interior angles, reinforcing the concept that these angles are supplementary when parallel lines are cut by a transversal. The image uses distinct color coding to identify this second pair of same side interior angles, providing students with a clear visual representation of this geometric relationship.

Using math clip art like this in geometry lessons can significantly enhance students' understanding of spatial relationships. The visual representation of same side interior angles helps students internalize this concept more effectively than verbal explanations alone. This image can be easily integrated into lessons on geometry, serving as a valuable tool for reinforcing the concept of same side interior angles and their supplementary nature.

Teacher's Script: "Now, let's look at the other pair of same side interior angles in this diagram. Can you see how they're highlighted in a different color? Just like the pair we saw before, these angles are also supplementary, adding up to 180°. Remember, same side interior angles are always on the same side of the transversal and between the parallel lines. This property holds true for both pairs of same side interior angles. Can you think of any real-world situations where understanding this relationship might be useful, perhaps in construction or design?"

For a complete collection of math clip art related to Geometry click on this link: Parallel Lines Cut by a Transversal Collection.


Parallel Lines Cut by a Transversal

Parallel lines are on the same plane and do not intersect. Here are two lines, L and M, that are on plane P and parallel.

Parallel Lines

Parallel lines are are always the same distance from each other. In this illustration the dashed segment indicates the distance between the two lines. That distance doesn't change.

Parallel Lines

A line that intersects the parallel lines is called a transversal. In the illustration below you can see transveral N that insersects lines L and M.

Parallel Lines

When parallel lines are cut by a transversal, there are number of set of angles whose properties are important to remember. The categories of angles include:

  • Alternate interior angles
  • Alternate exterior angles
  • Same side interior angles
  • Same side exterior angles
  • Supplementary angles
  • Vertical angles

Let's start with the alternate interior angles, which are shown here. There are two sets of alternate interior angles. These pairs of angles are congruent. The word "alternate" means "opposite" In each case the one angle is on the opposite side of the transversal from the other angle.

Parallel Lines Parallel Lines

The next set of angles are called alternate exterior angles. There are two sets. Each set of angles is congruent. Each angle is on one side of the transversal from the other angle it is congruent to.

Parallel Lines Parallel Lines

The next set of angles are called corresponding angles. There are four sets. Each set of angles is congruent. Each set of angles is on the same side of the transversal.

Parallel Lines Parallel Lines Parallel Lines Parallel Lines

The next set of angles are called vertical angles. There are two sets. Each set of angles is congruent. (By definition all vertical angles are congruent.) Each angle is on on the opposite side of the transversal from the other angle it is congruent to.

Parallel Lines Parallel Lines

The next set of angles are called vertical angles. There are two sets. Each set of angles is congruent. (By definition all vertical angles are congruent.) Each angle is on on the opposite side of the transversal from the other angle it is congruent to.

Parallel Lines Parallel Lines

The next set of angles are supplementary angles. There are eight sets. By definition the supplementary angles add up to 180°. Some pairs of supplementary angles are on opposite sides of the transversal and some are on the same side.

Parallel Lines Parallel Lines
Parallel Lines Parallel Lines
Parallel Lines Parallel Lines
Parallel Lines Parallel Lines
Common Core Standards CCSS.MATH.CONTENT.4.G.A.2, CCSS.MATH.CONTENT.8.G.A.5
Grade Range 4 - 8
Curriculum Nodes Geometry
    • Points and Lines
        • Parallel Lines
Copyright Year 2020
Keywords Parallel Lines Cut by a Transversal, parallel lines, transversal, vertical angles, supplementary angles, alternate interior angles, alternate exterior angles