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We will now study properties of some angles which occur in pairs. These properties are used to prove many of the theorems in plane geometry. Next chapter 22.17 represents these angles graphically.
Vertically Opposite Angles
When 2 lines intersect, they form two pairs of angles which are opposite to each other. Each pair is called a pair of Vertically Opposite angles. We can also intuitively see that in such a pair, each angle is equal to the other. This can be visualized easily by the movement of the arms of a scissor.
When one of the angles increases or decreases, the vertically opposite angle also increases or decreases such that both are always equal.
Adjacent Angles
Two angles are said to adjacent when the following conditions are met.
They have the same vertex
One of their arms coincide with each other and
The other 2 arms are on either side of the common arm Or the interiors of both the angles do not overlap.
When 2 straight lines intersect, 2 pairs of Adjacent angles are formed. But these are a special case of adjacent angles which also add up to a straight angle.
Supplementary Angles
When the sum of any 2 angles is a Straight Angle (180 degrees), they are called Supplementary Angles.
We saw in the previous paragraph that when 2 straight lines intersect, 2 pairs of Adjacent angles are formed which are also supplementary.
Supplementary Angles need not be adjacent angles. In a complex figure, two angles which are situated physically apart can be called supplementary if their angle measures total to 180 degrees.
Linear Pair
If 2 angles are Supplementary as well as adjacent, they are also called a Linear Pair.
This is because it can be visualized as a straight line resting on another straight line forming 2 adjacent angles whose sum is a straight angle!
When 2 straight lines intersect, 4 angles are formed. If we know one of the angles all the other three angles can be found.
Complementary Angles
When the sum of any 2 angles is a Right Angle (90 degrees), they are called Complementary Angles.
Complementary Angles need not be adjacent angles. In a complex figure, two angles which are situated physically apart can be called complementary if their angle measures total to 90 degrees.
Identifying 2 physically separated angles as complementary or supplementary may help us logically prove certain geometrical statements.
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