The relation R is defined on the set of natural numbers as {(a,b): a = 2b}, the `R^(-1)` is given by

The relation R defined on the set of natural numbers as {(a,b) : a differs from b by 3} is given by

The relation R defined on the set of natural number as {(a,b)):a differs from b by 3} is given by

The relation R, in the set of real number defined as R = {(a,b): a lt b} is:

Relation R defines on the set of natural numbers N such that R={(a,b):a is divisible by b}, than show that R is reflexive and transitive but not symmetric.

A relation R_(1) is defined on the set of real numbers as follows: (a,b) in R_(1) hArr 1 + ab gt 0 , when a, b in R (iii) (a,b) in R_(1) and (b,c) in R_(1) rarr (a,c) in R_(1) is not true when a , b, c, in R

The relation R defined on the set A = {1, 2, 3, 4, 5} by R = {(a, b): |a^(2)-b^(2)|lt16} is given by