Supplementary and Complementary Angles

Are you familiar with the phrase ‘do a [latex]180[/latex]?’ It means to make a full turn so that you face the opposite direction. It comes from the fact that the measure of an angle that makes a straight line is [latex]180[/latex] degrees.

We learned earlier in this section the basics of an angle. An angle is formed by two rays that share a common endpoint. Each ray is called a side of the angle and the common endpoint is called the vertex. An angle is named by its vertex. In the image below, [latex]\angle A[/latex] is the angle with vertex at point [latex]A[/latex]. We measure angles in degrees, and use the symbol [latex]^ \circ[/latex] to represent degrees.

 

The measure of [latex]\angle A[/latex] is written [latex]m\angle A[/latex]. So if [latex]\angle A[/latex] is [latex]\text{27}^ \circ[/latex], we would write the measure as [latex]m\angle A=\text{27}^ \circ[/latex]. The measures of two angles can be added together. There are two special cases that occur when we add two angle measures: supplementary and complementary angles. If the sum of the measures of two angles is [latex]\text{180}^ \circ[/latex], then they are called supplementary angles. In the images below, each pair of angles is supplementary because their measures add to [latex]\text{180}^ \circ[/latex]. Each angle is the supplement of the other.

If the sum of the measures of two angles is [latex]\text{90}^ \circ[/latex], then the angles are complementary angles. In the images below, each pair of angles is complementary, because their measures add to [latex]\text{90}^ \circ[/latex]. Each angle is the complement of the other.

The next example will show how you can use the Problem-Solving Strategy for Geometry Applications to answer questions about supplementary and complementary angles.

An angle measures [latex]\text{40}^ \circ[/latex].

1. Find its supplement
2. Find its complement

Show Solution

1.
Step 1. Read the problem. Draw the figure and label it with the given information.
Step 2. Identify what you are looking for.	The supplement of a [latex]40°[/latex]angle.
Step 3. Name. Choose a variable to represent it.	Let [latex]s=[/latex]the measure of the supplement.
Step 4. Translate. Write the appropriate formula for the situation and substitute in the given information.	[latex]m\angle A+m\angle B=180[/latex] [latex]s+40=180[/latex]
Step 5. Solve the equation.	[latex]s=140[/latex]
Step 6. Check: [latex]140+40\stackrel{?}{=}180[/latex] [latex]180=180\checkmark[/latex]
Step 7. Answer the question.	The supplement of the [latex]40°[/latex]angle is [latex]140°[/latex].

2.
Step 1. Read the problem. Draw the figure and label it with the given information.
Step 2. Identify what you are looking for.	The complement of a [latex]40°[/latex]angle.
Step 3. Name. Choose a variable to represent it.	Let [latex]c=[/latex]the measure of the complement.
Step 4. Translate. Write the appropriate formula for the situation and substitute in the given information.	[latex]m\angle A+m\angle B=90[/latex]
Step 5. Solve the equation.	[latex]c+40=90[/latex] [latex]c=50[/latex]
Step 6. Check: [latex]50+40\stackrel{?}{=}90[/latex] [latex]90=90\quad\checkmark[/latex]
Step 7. Answer the question.	The complement of the [latex]40°[/latex]angle is [latex]50°[/latex].

Two angles are supplementary. The larger angle is [latex]\text{30}^ \circ[/latex] more than the smaller angle. Find the measure of both angles.

Show Solution

Step 1. Read the problem. Draw the figure and label it with the given information.
Step 2. Identify what you are looking for.	The measures of both angles.
Step 3. Name. Choose a variable to represent it. The larger angle is 30° more than the smaller angle.	Let [latex]a=[/latex] measure of smaller angle [latex]a+30=[/latex] measure of larger angle
Step 4. Translate. Write the appropriate formula and substitute.	[latex]m\angle A+m\angle B=180[/latex]
Step 5. Solve the equation.	[latex](a+30)+a=180[/latex] [latex]2a+30=180[/latex] [latex]2a=150[/latex] [latex]a=75=[/latex] measure of smaller angle. [latex]a+30=[/latex] measure of larger angle. [latex]75+30[/latex] [latex]105[/latex]
Step 6. Check: [latex]m\angle A+m\angle B=180[/latex] [latex]75+105\stackrel{?}{=}180[/latex] [latex]180=180\quad\checkmark[/latex]
Step 7. Answer the question.	The measures of the angle are [latex]75°[/latex]and [latex]105°[/latex].

 

You live on the corner of First Avenue and Linton Street. You want to plant a garden in the far corner of your property (see image below) and fence off the area. However, the corner of your property does not form the traditional right angle. You learned from the city that the streets cross at an angle equal to [latex]150^\circ[/latex]. What is the measure of the angle that will border your garden?

 

Show Solution

As the angle between Linton Street and First Avenue is [latex]150^\circ[/latex], the supplementary angle is [latex]30^\circ[/latex]. Therefore, the garden will form a [latex]30^\circ[/latex] angle at the corner of your property.