RELATIONS - DISCRETE MATHEMATICS

(15:36)

Check whether the Relation R in the set {1,2,3,4,5,6} as R={(a,b):b=a+1} is Reflexive, Symmetric or

(5:18)

Introduction to Relations

(7:39)

Properties of Relations in Discrete Math (Reflexive, Symmetric, Transitive, and Equivalence)

(16:46)

Relation R in the set Z defined as R={(x, y):y=x-y is an integer} Reflexive, Symmetric, Transitive

(6:36)

Prove that R is an Equivalence Relation on Z: xRy if x + 3y is even

(10:10)

Reflexive Relations and Examples

(5:24)

Discrete Math - 9.1.2 Properties of Relations

(21:40)

Relation R in the set of all natural numbers defined as R = {(x, y): y = x + 5 and x less than 4}

(3:15)

Check whether the Relation R in R defined by R={(a,b):a≤b³} is Reflexive, Symmetric or transitive|12

(6:32)

Relation R in the set A={1,2,3..13,14} defined as R={(x, y):3x-y=0} Reflexive, Symmetric, Transitive

(6:53)

What is an Equivalence Relation? | Reflexive, Symmetric, and Transitive Properties

(5:1econd)

Let R be the Relation R in set {1,2,3,4} given by R={(1,2),(2,2),(1,1)(4,4),(1,3),(3,3)(3,2)}.Choose

(3:5)

Show that the Relation R in the set A of all the books in a library R={(x,y):x \u0026 y have same number

(6:18)

Equivalence Relation

(6:29)

Show that the Relation R in the set R defined as R={(a,b):a≤b²} is neither Reflexive, Symmetric nor

(6:41)

Show that the Relation R in R defined as R={(a,b):a≤b} is Reflexive transitive but not Symmetric|12

(5:14)

Show that the Relation R in the set {1,2,3} R={(1,2),(2,1)}is symmetric neither reflexive transitive

(3:56)

Proving a Relation is an Equivalence Relation | Example 2

(11:20)