Let R be the relation on the set R of all real numbers, defined by `a to b` if `abs(a-b) le 1`. Then, R is

Let R be the relation on the set R of all real numbers defined by a Rb Iff |a-b|<=1 Then R is

Let R be the relation on the set of all real numbers defined by aRb iff |a-b|<=1 .Then R is Reflexive and transitive but not symmetric Reflexive symmetric and transitive Symmetric and transitive but not reflexive Reflexive symmetric but not transitive

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

Let R be a relation on the set of all real numbers defined by xRy hArr|x-y|<=(1)/(2) Then R is

Let R be a relation in a set N of natural numbers defined by R = {(a,b) = a is a mulatiple of b}. Then:

Let S be a relation on the set R of all real numbers defined by S={(a,b)epsilon RxR:a^(2)+b^(2)=1}. Prove that S is not an equivalence relation on R.

Let S be a relation on the set R of all real numbers defined by R:a^(2)+b^(2)=1}. Prove S={(a,b)in R xx R:a^(2)+b^(2)=1}. Prove that S is not an equivalence relation on R .

Let a R b the relation on the set N of all natural numbers defined by a+3b = 12. Find the obtain and range of R.