Let `S` be the set of all real numbers. Then the relation `R= `
`{(a,b):1+abgt0}` on `S` is

Let S be the set of all real numbers. Then the relation R:- {(a ,b):1+a b >0} on S is: (a)an equivalence relation (b)Reflexive but not symmetric (c)Reflexive and transitive (d) Reflexive and symmetric but not transitive

Let S be the set of all real numbers sjow that the relation R={(a,b):a^(2)+b^(2)=1} is symmetric but neither reflextive nor transitive .

Let S be the set of all real numbers and let R be a relation in s, defined by R={(a,b):aleb}. Show that R is reflexive and transitive but not symmetric .

Let S be the set of all real numbers and let R be relation in S, defied by R={(a,b):aleb^(3)}. Show that R satisfies none reflexivity , symmetry and transitivity .

Let S be the set of all real numbers and let R be a relation in s,defined by R={(a,b):aleB^(2)}. show that R satisfies none of reflexivity , symmetry and transitivity .

Let N be the set of all natural numbers and let R be relation in N. Defined by R={(a,b):"a is a multiple of b"}. show that R is reflexive transitive but not symmetric .

Let S be the set of all real numbers and Let R be a relations on s defined by a R B hArr |a|le b. then ,R is

Let S be the set of all rest numbers and lets R={(a,b):a,bin S and a=+-b}. Show that R is an equivalence relation on S.

Let Z be the set of all integers and R be the relation on Z defined as R={(a,b);a,b in Z, and (a-b) is divisible by 5.}. Prove that R is an equivalence relation.