Relation & Its Types | Engineering Mathematics - Civil Engineering (CE) PDF Download

Relations Definition

  • A relation in mathematics defines the relationship between two different sets of information. If two sets are considered, the relation between them will be established if there is a connection between the elements of two or more non-empty sets.
  • In the morning assembly at schools, students are supposed to stand in a queue in ascending order of the heights of all the students. This defines an ordered relation between the students and their heights.
  • Therefore, we can say,
    ‘A set of ordered pairs is defined as a relation.’

Relation & Its Types | Engineering Mathematics - Civil Engineering (CE)

This mapping depicts a relation from set A into set B. A relation from A to B is a subset of A x B. The ordered pairs are (1,c),(2,n),(5,a),(7,n). For defining a relation, we use the notation where,

  • set {1, 2, 5, 7} represents the domain.
  • set {a, c, n} represents the range.

Sets and Relations

  • Sets and relation are interconnected with each other. The relation defines the relation between two given sets.
  • If there are two sets available, then to check if there is any connection between the two sets, we use relations.
  • For example, an empty relation denotes none of the elements in the two sets is same.

Relations in Mathematics

  • In Maths, the relation is the relationship between two or more set of values.
  • Suppose, x and y are two sets of ordered pairs. And set x has relation with set y, then the values of set x are called domain whereas the values of set y are called range.
  • Example: For ordered pairs={(1,2),(-3,4),(5,6),(-7,8),(9,2)}
  • The domain is = {-7,-3,1,5,9}
  • And range is = {2,4,6,8}

Types of Relations

There are 8 main types of relations which include:

1. Empty Relation

  • An empty relation (or void relation) is one in which there is no relation between any elements of a set. For example, if set A = {1, 2, 3} then, one of the void relations can be R = {x, y} where, |x – y| = 8. For empty relation,
    R = φ ⊂ A × A

2. Universal Relation

  • A universal (or full relation) is a type of relation in which every element of a set is related to each other. Consider set A = {a, b, c}. Now one of the universal relations will be R = {x, y} where, |x – y| ≥ 0. For universal relation,
    R = A × A

3. Identity Relation

  • In an identity relation, every element of a set is related to itself only. For example, in a set A = {a, b, c}, the identity relation will be I = {a, a}, {b, b}, {c, c}. For identity relation,
    I = {(a, a), a ∈ A}

4. Inverse Relation

  • Inverse relation is seen when a set has elements which are inverse pairs of another set. For example if set A = {(a, b), (c, d)}, then inverse relation will be R-1 = {(b, a), (d, c)}. So, for an inverse relation,
    R-1 = {(b, a): (a, b) ∈ R}

5. Reflexive Relation

  • In a reflexive relation, every element maps to itself. For example, consider a set A = {1, 2,}. Now an example of reflexive relation will be R = {(1, 1), (2, 2), (1, 2), (2, 1)}. The reflexive relation is given by-
    (a, a) ∈ R

6. Symmetric Relation

  • In a symmetric relation, if a=b is true then b=a is also true. In other words, a relation R is symmetric only if (b, a) ∈ R is true when (a,b) ∈ R. An example of symmetric relation will be R = {(1, 2), (2, 1)} for a set A = {1, 2}. So, for a symmetric relation,
    aRb ⇒ bRa, ∀ a, b ∈ A

7. Transitive Relation

  • For transitive relation, if (x, y) ∈ R, (y, z) ∈ R, then (x, z) ∈ R. For a transitive relation,
    aRb and bRc ⇒ aRc ∀ a, b, c ∈ A

8. Equivalence Relation

  • If a relation is reflexive, symmetric and transitive at the same time, it is known as an equivalence relation.
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