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When angles appear in groups of two to display a certain geometrical property they are termed as pairs of angles. There is a special relationship between pairs of angles. Some of the angle pairs include complementary angles, supplementary angles, vertical angles, alternate interior angles, alternate exterior angles, corresponding angles, adjacent angles.

Linear Pair of Angles

When two lines intersect each other, the adjacent angles make a linear pair. The sum of linear pairs is ${\displaystyle 180^{\circ }}$. It should be noted that all linear pairs are supplementary because supplementary angles sum up to ${\displaystyle 180^{\circ }}$. However, all supplementary angles need not be linear pairs because in linear pairs the lines need to intersect each other to form adjacent angles. In the following figure, ${\displaystyle \angle ABD}$ and ${\displaystyle \angle CBD}$ form a linear pair and their sum is equal to ${\displaystyle 180^{\circ }}$. ${\displaystyle \angle ABD+\angle CBD=180^{\circ }}$

Fig. 1 - Linear Pair of angles

Linear Pair Axiom

Axiom 1: If a ray stands on a line, then the sum of two adjacent angles so formed is ${\displaystyle 180^{\circ }}$.

Axiom 2: If the sum of two adjacent angles is ${\displaystyle 180^{\circ }}$, then the non-common arms of the angles form a line.

In Fig.1 ${\displaystyle BD}$ is the common arm , ${\displaystyle AB}$ and ${\displaystyle BC}$ are the non-common arms.

Theorem 1

If two lines intersect each other, then the vertically opposite angles are equal.

Fig 2 - Vertically opposite angles

Proof : In the statement above, it is given that ‘two lines intersect each other’. So, let ${\displaystyle AB}$ and ${\displaystyle CD}$ be two lines intersecting at ${\displaystyle O}$ as shown in Fig. 2. They lead to two pairs of vertically opposite angles, namely, (i) ${\displaystyle \angle AOC}$ and ${\displaystyle \angle BOD}$ (ii) ${\displaystyle \angle AOD}$ and ${\displaystyle \angle BOC}$. We need to prove that ${\displaystyle \angle AOC=\angle BOD}$ and ${\displaystyle \angle AOD=\angle BOC}$

Now, ray ${\displaystyle OA}$ stands on line ${\displaystyle CD}$.

Hence ${\displaystyle \angle AOC+\angle AOD=180^{\circ }......(1)}$

ray ${\displaystyle OD}$ stands on line ${\displaystyle AB}$.

Hence ${\displaystyle \angle AOD+\angle BOD=180^{\circ }......(2)}$

From (1) and (2)

${\displaystyle \angle AOC+\angle AOD=\angle AOD+\angle BOD}$

${\displaystyle \angle AOC=\angle BOD}$

${\displaystyle OC}$ stands on line ${\displaystyle AB}$.

Hence ${\displaystyle \angle AOC+\angle BOC=180^{\circ }......(3)}$

From (1) and (3)

${\displaystyle \angle AOC+\angle AOD=\angle AOC+\angle BOC}$

${\displaystyle \angle AOD=\angle BOC}$