6.1: Identify Angle Pairs
Have you ever built a model of a house? Take a look at this dilemma.
In Mrs. Patterson’s World Cultures class the students have just started studying house building. Mrs. Patterson explained that house building doesn’t just pertain to the kinds of houses that we live in, but to houses around the world both past and present. The students are going to work on a project on a specific type of house.
Jaime is very excited. She has always been interested in Native Americans, so she has chosen to work on a tipi. Jaime selected one of the books that Mrs. Patterson brought in and began to leaf through the pages looking at all of the different types of tipis constructed.
“Tipis?” Mrs. Patterson asked looking over Jaime’s shoulder.
“Yes, I want to design and build one for part of my project,” Jaime explained.
“That’s wonderful. You will need to use a lot of math to accomplish that too,” Mrs. Patterson stated.
Jaime hadn’t thought about the math involved in building a tipi. But as she looked through the pages on designing and building tipis, she noticed that there were a lot of notes on different angles.
One of the types of angles mentioned was a complementary pair of angles. Another was a supplementary pair of angles. These angles were important to figure out when stitching the liner of the tipi together.
Jaime is puzzled. She can’t remember how to identify a complementary or a supplementary pair of angles.
Pay attention and this Concept will teach you all about angle pairs.
Guidance
An angle is measurement of the space created when lines intersect. Here is a diagram that shows the angles formed when two lines intersect. You can see that there are four angles created in this drawing and that they are labeled 1 – 4.
We have reviewed some lines and that angles are created when lines intersect. Sometimes, the way that the lines intersect can create an angle pair. This is when two special angles are formed and these angles have a special relationship. Let’s look at some angle pairs.
The two basic forms of angle pairs are called complementary and supplementary angles.
Complementary angles are two angles whose measurements add up to exactly \begin{align*}90^{\circ}\end{align*}
Supplementary angles are two angles whose measurements add up to exactly \begin{align*}180^{\circ}\end{align*}
Take a look at the pairs of supplementary angles below.
Once you know how to identify the angle pairs, you will be able to classify angle pairs as supplementary, complementary or neither.
Take a look at this situation.
Classify the following pairs of angles as either complementary or supplementary.
Now let’s look at how we can identify the angle pairs.
First, look at the first pair of angles labeled \begin{align*}a\end{align*}
Now look at the second angle pair labeled \begin{align*}b\end{align*}
Note: The word “supplementary” or “complementary” refers to the relationship between the two angles.
Sometimes, a pair of angles will be neither complementary nor supplementary. Take a look.
The sum of these angles is \begin{align*}70^{\circ}\end{align*}
Go back and write all of the vocabulary words from this section in your notebooks. Draw a small example of each word next to its definition.
Based on each description, define whether the angle pairs are supplementary, complementary or neither.
Example A
A pair of angles whose sum is \begin{align*}130^{\circ}\end{align*}
Solution: Neither
Example B
A pair of angles whose sum is \begin{align*}90^{\circ}\end{align*}
Solution: Complementary
Example C
A pair of angles whose sum has the same measure as a straight line.
Solution: Supplementary
Now let's go back to the dilemma from the beginning of the Concept.
Jaime needs to understand the difference between complementary and supplementary angle pairs. First, notice that the word “pair” refers to two, so we are talking about two angles.
Here are the definitions.
Complementary Angles – are two angles whose sum is \begin{align*}90^{\circ}\end{align*}
Supplementary angles – are two angles whose sum is \begin{align*}180^{\circ}\end{align*}
Complementary angles form a right angle and supplementary angles form a straight line.
Vocabulary
 Angle
 the measure of the space formed by two intersecting lines.
 Straight angle

is a straight line equal to \begin{align*}180^{\circ}\end{align*}
180∘ .
 Angle Pairs
 the relationship formed by two angles.
 Complementary Angles

two angles whose sum is \begin{align*}90^{\circ}\end{align*}
90∘ .
 Supplementary Angles

two angles whose sum is \begin{align*}180^{\circ}\end{align*}
180∘ .
Guided Practice
Here is one for you to try on your own.
Look at this diagram and identify the pairs of angles that are supplementary.
Solution
First, you must know that supplementary angles are equal to \begin{align*}180^{\circ}\end{align*}
Now let's look at the diagram.
The following angle pairs are supplementary.
1 and 2
2 and 3
1 and 4
4 and 3
These angle pairs are the solution.
Video Review
Complementary and Supplementary Angles
Practice
Directions: If the following angle pairs are complementary, then what is the measure of the missing angle?

\begin{align*}\angle{A}&=55^{\circ}\\
\angle{B}&= ?\end{align*}
∠A∠B=55∘=? 
\begin{align*}\angle{C}&=33^{\circ}\\
\angle{D}&= ?\end{align*}
∠C∠D=33∘=? 
\begin{align*}\angle{E}&=83^{\circ}\\
\angle{F}&= ?\end{align*}
∠E∠F=83∘=? 
\begin{align*}\angle{G}&=73^{\circ}\\
\angle{H}&= ?\end{align*}
∠G∠H=73∘=?
Directions: If the following angle pairs are supplementary, then what is the measure of the missing angle?

\begin{align*}\angle{A}&=10^{\circ}\\
\angle{B}&= ?\end{align*}
∠A∠B=10∘=? 
\begin{align*}\angle{A}&=80^{\circ}\\
\angle{B}&= ?\end{align*}
∠A∠B=80∘=? 
\begin{align*}\angle{C}&=30^{\circ}\\
\angle{F}&= ?\end{align*}
∠C∠F=30∘=?  \begin{align*}\angle{D}&=15^{\circ}\\ \angle{E}&= ?\end{align*}
 \begin{align*}\angle{M}&=112^{\circ}\\ \angle{N}&= ?\end{align*}
 \begin{align*}\angle{O}&=2^{\circ}\\ \angle{P}&= ?\end{align*}
Directions: Answer True or False for each of the following questions.
 Complementary angles are equal to \begin{align*}180{\circ}\end{align*}.
 Complementary angles are equal to \begin{align*}90{\circ}\end{align*}.
 Supplementary angles are equal to \begin{align*}90{\circ}\end{align*}.
 Supplementary angles angles are equal to \begin{align*}180{\circ}\end{align*}.
 Angle pairs less than 90 degrees are neither supplementary nor complementary.
Image Attributions
Here you'll identify angle pairs as complementary, supplementary or neither.