![]() ![]() Together supplementary angles make what is called a straight angle. Supplementary angles are two angles that sum to 180 ° degrees. If an angle measures 50 °, then the complement of the angle measures 40 °. Supplementary AnglesĬomplementary angles are two angles that sum to 90 ° degrees. No matter where you draw the line, you have created two complementary angles. Simply draw a straight line beginning at the right angle vertex and through the triangle. To find the measure of an angle that is complementary to a 70 ° angle, you simply subtract 70 ° from 90 °.Īn easy way to create complementary angles is with a right triangle. If you have a given angle of 70 ° and told to find the complementary angle, how do you find a complementary angle? You can easily see that two angles of 27 ° are congruent. Their complementary angles are ∠ C A T and ∠ E M U, each measuring 27 °. Say you have two congruent angles, ∠ D O G and ∠ F L Y, each measuring 63 °. If two angles are complementary to two different congruent angles, then the two angles are congruent. One states, “Complements of the same angle are congruent.” This theorem, which involves three angles, can also be stated in another way: Two theorems make use of complementary angles. You cannot say all three are complementary only two angles together can be complementary. The middle angle, ∠ P O T, and ∠ T O E on the right side are complementary, too. Notice that the intersecting lines of the left-hand angle and middle angle create a right angle, so ∠ C O P and ∠ P O T are complementary. In the drawing below, which angles are complementary? Sometimes angles are drawn as touching pairs. You cannot have a right angle or obtuse angle, like the first two angles in our drawing, as one of the two complementary angles. Since the sum of ∠ A + ∠ B must measure 90 °, the two angles must be acute angles. Only one could be a partner for a complementary angle. The only two numbers that sum to 90 ° are the first and third angles, so they are complementary angles. In the drawing below, for example, three angles are placed on a plane, but only two are complementary: Supplementary Complementary Angles ExamplesĬomplementary angles do not have to be part of the same figure.
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