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

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

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

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.

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

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 R be the relation in the set Z of all integers defined by R= {(x,y):x-y is an integer}. Then R is

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