If N denotes the set of all natural numbers and R be the relation on `N xx N` defined by (a, b) R (c, d) if `ad(b+ c)=bc(a+d)`. Show that R is an equivalence relation.

If Z is the set of all integers and R is the relation on Z defined as R={(a, b): a, b in Z and a-b is divisible by 3. Prove that R is an equivalence relation.

If A = {1,2,3,…,9} and R is the relation in A xx A defined by (a, b) R (c, d), if a+d=b+c for (a, b), (c, d) in A xx A . Prove that R is an equivalence relation.

Let R be the relation on Z defined by aRb iff a-b is an even integer. Show that R is an equivalence relation.

Let R={(m,n):2 divides m+n} on Z. Show that R is an equivalence relation on Z.

Let A={1,2,3,...,9) and R be the relation on A xx A defined by (a, b) R (c,d), if a+d=b+c for (a, b), (c,d) in A xx A. Prove that R is an equivalence relation and also obtain the equivalence class (2,5).

Let N be the set of all positive integers and R be a relation on N, defined by R = {(a,b): a is a factor of b), show that R is reflexive and transitive.

If f:X to Y is a function. Define a relation R on X given by R={(a, b): f(a)=f(b)}. Show that R is an equivalence relation on X.

Let ~ be defined by (m,n)~(p,q) if mq=np where m, n, p, qinZ -{0}. Show that it is an equivalence relation.

Show that the relation S defined on set N xx N by (a, b) S(c,d) rArr a+d=b+c is an equivalence relation.

Let R be a relation on the set A of ordered pairs of positive integers defined by (x, y) R (u, v), if and only if xv = yu. Show that R is an equivalence relation.