Let A be a non-empty set. Then a relation R on A is said to be an equivalence relation on A. If R is ______

Let A ={1,2,3} be a given set. Define a relation on A which is an equivalence relation on A

Which one of the following relations on R is an equivalence relation?

In the set of integers Z, which of the following relation R is not an equivalence relation ?

Let R and S be two non - void relations on a set A.

Consider the following relations: R = {(x, y) | x, y are real numbers and x = wy for some rational number w}; S={(m/n , p/q)"m , n , pandqa r ei n t e g e r ss u c ht h a tn ,q"!="0andq m = p n"} . Then (1) neither R nor S is an equivalence relation (2) S is an equivalence relation but R is not an equivalence relation (3) R and S both are equivalence relations (4) R is an equivalence relation but S is not an equivalence relation

Let P(A) be the power set of a non-empty set A. A relation R on P(A) is defined as follows : R={(X,Y) : X sube Y} Example (i) reflexivity, (ii)symmetry and (iii) transitivity of R on P(A).

Let R be a relation from set A do a set B, then_____

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.

Let A= {1,2,3} and R={(1,2), (2,3), (3,3), }be a relation on A. Add a (i) minimum (ii) maximum number of ordered pairs to R so that enlarged relation becomes an equivalence relation on A.

Let A={1, 2, 3} and R={(2, 2),(3, 3),(1, 2)} be a relation on A. Then the minimum number of ordered pairs to be added to R to make it an equivalence relation is -