The relation R is defined on the set of natural numbers as {(a, b) : a = 2b}. Then, `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

Check whether the relation-R defined in the set of all real numbers as R={(a,b): a le b^(3)} is reflexive, symmetric or transitive.

Prove that the relation R defined on the set Z of integers as R= {(a, b) : 4 divides abs(a-b)} is an equivalence relation.

Prove that the relation R defined on the set Z of integers as R= {(a, b) : 5 divides abs(a-b)} is an equivalence relation.

Prove that the relation R defined on the set Z of integers as R= {(a, b) : 3 divides abs(a-b)} is an equivalence relation.

The given relation is defined on the set of real numbers. a R b iff |a| = |b| . Find whether these relations are reflexive, symmetric or transitive.

Show that the relation R in the set R of real numbers defined as R = {(a, b) : a le b} , is reflexive and transitive but not symmetric.

Let R be the relation on the set N of natural numbers given by R= {(a, b): a-bgt2,b gt 3} .then (a) (4,1) in R (b) (5,8) in R (c) (8,7) inR (d) (10,6) inR

Prove that the relation R defined on the set N of natural numbers by xRy iff 2x^(2) - 3xy + y^(2) = 0 is not symmetric but it is reflexive.

Show that the relation R in the set R of real numbers defined as R = ((a, b) : a le b} , is reflexive and transitive but not symmetric.