Complementary angles
Complementary angles are a specific type of angle relationship in geometry
Complementary angles are a specific type of angle relationship in geometry. When two angles are complementary, the sum of their measures is equal to 90 degrees.
To better understand this concept, let’s consider an example. Let angle A be 30 degrees. To find its complementary angle, we need to determine the angle that, when added to angle A, will result in a sum of 90 degrees.
Since the sum of the two angles is 90 degrees, we can set up the equation:
Angle A + Complementary Angle = 90 degrees
Substituting the value of angle A:
30 degrees + Complementary Angle = 90 degrees
To isolate the Complementary Angle, we need to subtract 30 degrees from both sides of the equation:
Complementary Angle = 90 degrees – 30 degrees
Simplifying the equation:
Complementary Angle = 60 degrees
Therefore, if angle A is 30 degrees, its complementary angle is 60 degrees. These two angles together form a right angle, as their sum is equal to 90 degrees.
It is important to note that complementary angles do not have to be adjacent to each other or even lie on the same line. As long as the sum of their measures is 90 degrees, they are considered complementary.
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