Show that the relation R, on the set
A={x`in ZZ : 0 le x le 12}` given by R = {(a,b) : |a-b| is a multiple of 4 and a,b `in` A } is an equivalance relation on A.

Show that the relation R on the set A={1,2,3,4,5} given by R={(a,b):|a-b| is even} is an equivalence relation.

Show that the relation R in the set Z of intergers given by R ={(a,b):2 divides a-b } is an equivalence relation.

Prove that the relation R in set A = {1, 2, 3, 4, 5} given by R = {(a,b): |a-b| is even} is an equivalence relation .

Show that the relation R in the set A = {1,2,3,4,5} given by R = {(a,b) : |a-b| is even}, is an equivalence relation. Show that all the elements of {1,3,5} are related to each other and all the elements of {2,4} are related to each other. But no element of {1,3,5} is related to any element of {2,4}.

Show that the realtion R in the set A of all the books in a library of a collage, given by R = {(x,y):x and y have same number of pages} is an equivalence relation.

Prove that the relation R on the set A={a in ZZ:1 |x-y| is a multiple of 4} is an equivalence relation. Find also the elements of set A which are related to 2.

Show that the relation R in the set A of points in a plane given by R = {(P,Q): distance of the point P from the origin is same as the distance of the point Q from the origin}, is an equivalence relation. Further, show that the set of all points related to a point P ne (0,0) is the circle passing through P with origin as centre.

A relation R is defined on the set of integers Z Z as follows R= {(x,y) :x,y inZ Z and (x-y) is even } show that R is an equivalence relation on Z Z .

A relation S is defined on the set of real numbers R R a follows: S={(x,y) : s,y in R R and and x= +-y} Show that S is an equivalence relation on R R .