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 R be the relation on Z defined by R = {(a,b),a, b in Z,a^2 =b^2} Find R

Let R be the relation on Z defined by R = {(a,b),a, b in Z,a^2 =b^2} Find Range of R.

Let R be the relation on Z defined by R = {(a,b),a, b in Z,a^2 =b^2} Find Domain 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.

If R is a relation defined as R={(x,y):x,yinN " and "x+3y=12} , then find the domain and range of R.

Let A={1,3,5,7} and B={p,q,r} .Let R be a relation define by R={(1,p),(3,r),(5,q),(7,p),(7,q)} , find the domain and range of R .

If R is a relation defined as R ={ (x,y):x,y in N and x+3y =12}. Then find the domain and range of R.

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.

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