Let R be the relation on Z defined by R= {(a,b): a, b in Z, a-b is an integer}. Find the domain and range of R.

Let A={1,2,3,4,6}. Let R be the relation on A defined by {{a,b): a, b in A , b is exactly divisible by a}. (i) Write R in roster form, (ii) Find the domain of R, (iii) Find the range of R.

Let A= {1, 2, 3, 4, 6}. Let R be the relation on A defined by {(a,b) a, b in A,b is exactly divisible by a} (i) Write R in roster form (ii) Find the domain of R (iii) Find the range of R.

Let R be a relation from Q to Q defined by R={(a,b): a,b in Q and a-b in Z} . Show that (i) (a,a) in R" for all " a in Q (ii) (a,b) in R implies that (b,a) inR (iii) (a,b) in R and (b,c) in R implies that (a,c) in R

Let R be a relation defined by R = {(a, b) : a ge b }, where a and b are real numbers, then R is

Relation R on Z defined as R = {(x ,y): x - y "is an integer"} . Show that R is an equivalence relation.

Let R be a relation from N to N defined by R={(a,b): a, b in N and a=b^(2)}. Are the following true? (i) (a,a) in R," for all " a in N (ii) (a,b) in R," implies "(b,a) in R (iii) (a,b) in R, (b,c) in R" implies "(a,c) in R . Justify your answer in each case.

Let R:ZrarrZ be a relation defined by R = {(a,b):a,b,inZ, a -b in z) . Show that (i) AAa inZ, (a,a) inR (ii) (a,b) inR implies (b,a)inR (iii) (a,b) inR implies (b,c)inRimplies(a,c)inR

Let R be the equivalence relation on z defined by R = {(a,b):2 "divides" a - b} . Write the equivalence class [0].

Let R be the relation in the set N given by R={(a,b), a=b -2, b gt 6}. Choose the correct answer.

Prove that the relation R in the set of integers z defined by R = { ( x , y) : x-y is an integer } is an equivalence relation.