<meta http-equiv="refresh" content="1; url=/nojavascript/"> Identify Adjacent and Vertical Angles | CK-12 Foundation
Skip Navigation
You are reading an older version of this FlexBook® textbook: CK-12 Middle School Math Concepts - Grade 8 Go to the latest version.

6.2: Identify Adjacent and Vertical Angles

Difficulty Level: Basic Created by: CK-12
Practice Linear Pairs
Practice Now

Do you know about adjacent and vertical angles? Take a look at this illustration.

If you were asked to name all of the vertical angles and adjacent angles would you know what to identify? This Concept will teach you how to identify these special angle relationships.


When lines intersect, they create special relationships between the angles that they form. Once we understand these relationships, we can use them to find the measure of angles formed by the intersecting lines.

Adjacent angles are angles that share the same vertex and one common side. If they combine to make a straight line, adjacent angles must add up to 180^{\circ} . The word “adjacent” means “next to” that can help you to remember adjacent angles.

Below, angles 1 and 2 are adjacent. Angles 3 and 4 are also adjacent.

Can you see that angles 1 and 2, whatever their measurements are, will add up to 180^{\circ} ? This is true for angles 3 and 4, because they also form a line. But that’s not all. Angles 1 and 4 also form a line. So do angles 2 and 3. These are also pairs of adjacent angles. Because the adjacent angle pairs form lines, we can also say that they are supplementary. They must add up to 180^{\circ} .

We can find the sums in this way.

\angle{1} + \angle{2} = 180^{\circ}\\\angle{3} + \angle{4} = 180^{\circ}\\

As you work through this lesson, you will find that some information leads you to other information. Here is the first example of that. Whenever adjacent angles form a straight line, they are also supplementary. The sum of their angles will be 180^{\circ} .

Notice that when there are two angles next to each other, there are also two angles diagonally across from each other. These are called vertical angles. Vertical angles are angles that are diagonally across from each other and have the same measure.

These relationships always exist whenever any two lines intersect. Look carefully at the figures below. Understanding the four angles formed by intersecting lines is a very important concept in geometry.

Identify the vertical angles and the adjacent angles in the diagram below.

First, think back to the definition of adjacent and vertical angles.

Adjacent angles are next to each other. When they form a straight line they are supplementary angles. We can see from the diagram that angles 1 and 3 are adjacent. Angles 2 and 4 are also adjacent.

Vertical angles are diagonal from each other and have the same measure. In this case, angles 1 and 4 are vertical. Angles 2 and 3 are also vertical angles.

Example A

True or false. Adjacent angles are across from each other.

Solution: False. Adjacent angles are next to each other.

Example B

True or false. Pairs of vertical angles have the same measure.

Solution: True.

Example C

True or false. Adjacent angles can also be vertical angles.

Solution: False.

Now let's go back to the dilemma from the beginning of the Concept. Here is the illustration once again.

First identify the vertical angles.

Angles 1 and 3 are vertical angles. Angles 2 and 4 are also vertical angles.

Next, identify the adjacent angles. Remember that adjacent angles have a sum of 180^{\circ}.

Angles 1 and 2, angles 1 and 4, angles 4 and 3, and angles 2 and 3 are all adjacent angles.

Guided Practice

Here is one for you to try on your own.

Find m\angle 1 .


First, let's think about what we know about the angles identified.

\angle 1 is vertical angles with 18^\circ , so m\angle 1 = 18^\circ .

This is our answer.

Video Review

Khan Academy Proving Vertical Angles are Equal

Explore More

Directions: Identify whether each angle pair can be classified as adjacent angles or vertical angles or neither.

1. \angle INK and \angle MNL

2. \angle INJ and \angle NJK

3. \angle MNL and \angle LNK

4. \angle JNL and \angle INM

5. \angle INM and \angle KNL

6. If m\angle INJ = 63^\circ , find m\angle MNL .

Directions: Use this diagram to answer the following questions.

7. True or false. \angle1 and \angle2 are adjacent angles.

8. What is the measure of \angle1 ?

9. What is the measure of \angle2 ?

10. What is the relationship between \angle2 and the angle opposite it?

11. True or false. Adjacent angles 1 and 2 form a straight line with a value of 180^{\circ} .

Directions: Answer true or false for each question.

12. Supplementary angles are also vertical angles.

13. Vertical angles have the same measure.

14. Adjacent angles always have a sum of 180^{\circ} .

15. Adjacent angles are also vertical angles.

16. Adjacent angles are formed when lines intersect.

Image Attributions


Difficulty Level:




Date Created:

Jan 23, 2013

Last Modified:

Feb 26, 2015
Files can only be attached to the latest version of Modality


Please wait...
Please wait...
Image Detail
Sizes: Medium | Original

Original text