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Example Questions
Example Question #1 : Angles
The angles containing the variable all reside along one line, therefore, their sum must be .
Because and are opposite angles, they must be equal.
Example Question #1 : Angles
Are and complementary angles?
Maybe
Yes
No
Not enough information
Yes
Complementary angles add up to . Therefore, these angles are complementary.
Example Question #1 : Angles
What angle is complementary to ?
Two complementary angles add up to .
Therefore, .
Example Question #2 : Angles
Which of the following angles is supplementary to ?
When two angles are supplementary, they add up to .
For this problem, we can set up an equation and solve for the supplementary angle:
Example Question #3 : Angles
What angle is supplementary to ?
Supplementary angles add up to . That means:
Example Question #1 : Angles
The angles are supplementary, therefore, the sum of the angles must equal .
Example Question #2 : Linear Functions
Are and supplementary angles?
No
Yes
Not enough information
Yes
Since supplementary angles must add up to , the given angles are indeed supplementary.
Example Question #4 : Understanding Complementary And Suplmentary Angles
Which of the following angles is complementary to ?
Two complementary angles add up to .
Example Question #5 : Angles
What angle is supplementary to ?
When two angles are supplementary, they add up to .
Solve for :
Example Question #3 : Angles
Which of the following angles is coterminal with ?
For an angle to be coterminal with , that angle must be of the form for some integer - or, equivalently, the difference of the angle measures multiplied by must be an integer. We apply this test to all five choices.
:
:
:
:
:
is the correct choice, since only that choice passes our test.
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