Show that the relations `R` on the set `R` of all real numbers, defined as `R={(a ,\ b): alt=b^2}` is neither reflexive nor symmetric nor transitive.

Show that the relation S in the set R of real numbers defined as S={(a,b): a, b in R and a le b^(3) } is neither reflexive, nor symmetric, nor transitive.

Prove that the relation R defined on the set of real numbers R as R = {(a,b) : a le b^(2) AA a, b in R} is neither reflexive nor symmetric nor transitive.

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

Check whether the relation R in IR of real numbers defined by R={(a,b): a lt b^(3)} is reflexive, symmetric or transitive.

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

Let R be the relation on the set R of all real numbers defined by a R b Iff |a-b| le1. Then R is

Show that the relation R in the set of all integers Z defined by R ={(a,b):2 divides a-b} is an equivalence relation.

Show that the relation R in the set of all natural number, N defined by is an R = {(a , b) : |a - b| "is even"} in an equivalence relation.

Show thaT the relation R in the set of all integers Z defined by R{(a,b) : 2 divides a-b} is an equivalence relation.

Show that the relation R in the set of all integers, Z defined by R = {(a, b) : 2 "divides" a - b} is an equivalence relation.