How to Identify and Use Pair of Angles in Math
When two lines share a common endpoint (often called a vertex), the angles present on either side of the vertex can be called the pair of angles. Now, these are pretty important when it comes from a geometrical point of view because pairs of angles have a set of similar properties. These properties can be used to find the unknown angle among a bunch of known angles. This article explains various types of paired angles in detail.
Pair of Angles
Complementary Angles
Any two pairs of angles having a common vertex, giving a sum as 90° or a right angle (like an L), are referred to as complementary angles.
Between the 2 angles present, one is called the ‘complement’ of the other.
A Complementary Angle
Here, $\angle B O C=90^{\circ}$
Also, $\angle B O A=60^{\circ}$ and $\angle A O C=30^{\circ}$ and
$\angle B O A$ and $\angle A O C$ are complements of each other and complementary angles.
Supplementary Angles
Any two pairs of angles having a common vertex, giving a sum as $180^{\circ}$, or a straight angle are referred to as supplementary angles.
Between the 2 angles present, one is called the ‘supplement’ of the other.
A Supplementary Angle
Here, $\angle A O C=180^{\circ}$
Also, $\angle B O C=50^{\circ}$ and $\angle B O A=130^{\circ}$ and
$\angle B O A$ and $\angle B O C$ are supplements of each other and supplementary angles.
Adjacent Angles
Two angles having one common arm, one common vertex, and the other two arms lying on the opposite side of this common arm so that their interiors do not overlap are known as adjacent angles.
Adjacent Angles
Vertically Opposite Angles
When two lines intersect at a common point, 4 angles are formed surrounding the point of intersection. Opposite angles having no common arm are called vertically opposite angles. Vertically opposite angles are equal.
Vertically Opposite Angles
Here, Lines $A B$ and $C D$ intersect at point $O$, as vertically opposite angles are equal.
$\angle \mathrm{AOC}=\angle \mathrm{DOB}=35^{\circ}$
$\angle A O B=\angle D O C=145^{\circ}$
Thus, vertically opposite angles are equal.
Linear Pair
Two angles whose sum is 180° can be defined as a linear pair. These angles have a common arm and a common vertex.
A Linear Pair
Here, $\angle 1+\angle 3=180^{\circ}$
Hence, $\angle 1$ and $\angle 3$ form a linear pair.
Solved Examples
1. If angles $\angle A$ and $\angle B$ are supplementary angles, $\angle A$ is found to be $46^{\circ}$. Find $\angle B$.
Ans: Here, $\angle A$ and $\angle B$ are supplementary angles.
$\angle A+\angle B=180^{\circ}$
$46^{\circ}+\angle B=180^{\circ}$
$\angle B=180^{\circ}-46^{\circ}$
$\angle B=134^{\circ}$
Thus, we find $\angle B$ to be $134^{\circ}$.
Practice Questions
1. $\angle \mathrm{A}$ and $\angle \mathrm{B}$ are complementary angles. $\angle \mathrm{B}$ is $72^{\circ}$, find $\angle \mathrm{A}.$
Ans: $18^{\circ}$
2. $\angle \mathrm{X}$ and $\angle \mathrm{Y}$ form a linear pair. $\angle \mathrm{X}$ is $123^{\circ}$, find $\angle \mathrm{Y}.$
Ans: $57^{\circ}$
3. $\angle Q$ and $\angle R$ are supplementary angles. $\angle Q$ is $143^{\circ}$, find $\angle R.$
Ans: $37^{\circ}$
Summary
In the given article, we discussed pairs of angles, including linear pairs of angles, and vertically opposite angles. Then we talked about a pair of complementary angles and examples and then we discussed a pair of complementary angles. These pairs of angles are of various types and are an important part of geometry. Complementary angles are those angles whose sum is 90°. Supplementary angles are those angles whose sum is 180°. Adjacent angles are angles sharing a common arm and a common vertex; they also have an opposite arm which produces the non-overlapping angle. Vertically opposite angles are formed when two lines intersect producing 4 angles surrounding it. Angles that are opposite, with no common arm, fall under this category. Vertically opposite angles are equal to each other.
FAQs on Pair of Angles: Definition, Types & Examples
1. What is meant by a 'pair of angles' in geometry?
In geometry, a pair of angles refers to two angles that are grouped together or related to each other based on a specific geometric property. This relationship could be based on their sum (like complementary or supplementary angles) or their position relative to each other (like adjacent or vertically opposite angles). Understanding these pairs is fundamental to solving problems involving lines and shapes.
2. What are the main types of angle pairs? Provide examples.
The main types of angle pairs are defined by their specific properties and relationships:
Complementary Angles: Two angles whose sum is 90°. For example, 30° and 60°.
Supplementary Angles: Two angles whose sum is 180°. For example, 110° and 70°.
Adjacent Angles: Two angles that share a common vertex and a common arm, but have no common interior points. The corners of a floor tile are adjacent.
Linear Pair: A pair of adjacent angles whose non-common sides are opposite rays, forming a straight line. Their sum is always 180°.
Vertically Opposite Angles: A pair of angles formed when two lines intersect. They are opposite to each other and are always equal. For example, the angles formed by the blades of an open pair of scissors.
3. Where can we find examples of pairs of angles in daily life?
Pairs of angles are all around us. For instance, the hands of a clock form different angle pairs throughout the day; at 3:00, they form complementary angles (90°). An open pair of scissors demonstrates vertically opposite angles. The intersection of roads can create various angle pairs. A partially opened book sitting on a table forms a supplementary angle (linear pair) with the table surface.
4. How do you find the measure of a complementary or supplementary angle if one angle is given?
To find the measure of an unknown angle in a pair, you use the property of that pair.
For complementary angles, if one angle is 'x', its complement is (90° - x). For example, the complement of 40° is 90° - 40° = 50°.
For supplementary angles, if one angle is 'y', its supplement is (180° - y). For example, the supplement of 120° is 180° - 120° = 60°.
5. What are the different angle pairs formed when a transversal intersects two parallel lines?
When a transversal line cuts across two parallel lines, several important and equal angle pairs are formed:
Corresponding Angles: Angles in the same relative position at each intersection. They are equal.
Alternate Interior Angles: Angles on opposite sides of the transversal and between the parallel lines. They are equal.
Alternate Exterior Angles: Angles on opposite sides of the transversal and outside the parallel lines. They are also equal.
Consecutive Interior Angles (or Co-interior Angles): Angles on the same side of the transversal and between the parallel lines. They are supplementary (add up to 180°).
6. Why is it important to learn about the properties of angle pairs?
Understanding the properties of angle pairs is a critical skill in geometry. It forms the basis for logical reasoning and proofs. For example, if you know two angles form a linear pair, you can deduce the measure of one if the other is known. These properties are essential tools for finding unknown angles in complex figures, proving that lines are parallel, and are foundational concepts for trigonometry and higher-level mathematics.
7. What is the key difference between adjacent angles and a linear pair?
While all linear pairs are adjacent angles, not all adjacent angles form a linear pair. The key difference lies in the sum of the angles. Adjacent angles simply share a common vertex and a common side. Their sum can be any value. However, a linear pair is a specific type of adjacent angle pair whose non-common sides form a straight line, meaning their sum must always be exactly 180°.
8. Can two obtuse angles form a supplementary pair? Explain your reasoning.
No, two obtuse angles can never form a supplementary pair. By definition, an obtuse angle is an angle greater than 90° but less than 180°. If you add two such angles, their sum will always be greater than 180° (e.g., 91° + 91° = 182°). A supplementary pair must add up to exactly 180°. Therefore, it is impossible for two obtuse angles to be supplementary.
9. How are vertically opposite angles and linear pairs related when two lines intersect?
When two lines intersect, they create a relationship between both vertically opposite angles and linear pairs. The intersection forms four angles. Any two angles opposite each other are vertically opposite angles and are equal. Any two adjacent angles form a linear pair and are supplementary (add up to 180°). This means if you know just one of the four angles, you can find the other three using these two properties.
