A relation R on the set of natural number `N N` is defined as follows :
(x,y) `in R to` (x-y) is divisible by 5 for all x,y `in N N` Prove that R is an equivalence relation on `N N`.

A relation R is defined on the set of all natural numbers NN by : (x,y) in Rimplies (x-y) is divisible by 6 for all x,y,in NN prove that R is an equivalence relation on NN .

A relation R is defined on the set of all natural numbers IN by: (x,y)inRimplies(x-y) is divisible by 5 for all x,y inIN . Prove that R is an equivalence relation on IN.

A relation R is defined on the set of natural numbers NN as follows : (x,y)in R rArr y is divisible by x, for all x, y in NN . Show that, R is reflexive and transitive but not symmetric on NN .

A relation R on the set of integers Z is defined as follows : (x,y) in R rArr x in Z, |x| lt 4 and y=|x|

A relation R is defined on the set of all integers Z Z follows : (x,y) in "R" implies (x,y) is divisible by n Prove that R is an equivalence relation on Z Z .

A relation R is defined on the set of natural numbers NN follows : (x,y) in R implies x+y =12 for all x,y in NN Prove that R is symmetric but neither reflexive nor transitive on NN .

A relation R on the set of natural numbers NN is defined as follows: R={(x,y),x+5y=20,x,y in NN}, find the domain and range of R.

A relation R is defined on the set NN of natural number follows : (x,y) in R implies x divides y for all x,y in NN show that R is reflexive and transitive but not symmetric on NN .

A relation R is defined on the set N N of natural number follows : (x,y) in "R" implies x+2y=10, for all x,y in N N Show that R is antisymmetric on N N

A relation R is defined on the set N N of natural as follows : (x,y) in "R" implies x-y+ sqrt(3) is an iR Rational number for all x,y in N N . Show that R is reflexive on N N .