The number of equivalence relation that can be defined on (a, b, c) is

Define an equivalence relation.

Let A = {1,2,3}. Then number of equivalence relations containing (1,2) is

Let n(A) = m and n(B) = n. Then the total number of non-empty relations that can be defined from A to B is

Let A={1,2,3} . The total number of distinct relations which can be defined over A is :

If the set A has 3 elements and the set B has 4 elements, then the number of injections (one - one ) that can be defined from A to B is

The number of functions that can be formed from the set A={a, b, c, d} into the set B={1,2,3} is equal to

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

Show that number of equivalence relation in the set {1,2,2} containing (1,2) and (2,1) is two.

If n gt= 2 then the number of onto mappings (surjections) that can be defined from the set A = {1, 2, 3…, n}onto B = {a, b} is