The number of binary operations that can be defined on the set A = {a, b, c} is : a)`3^(3)` b)`3^(4)`c)`3^(9)`d)`9^(3)`

The number of functions that can be defined from the set A = {a, b, c, d} into the set B= {1,2,3} is a)12 b)24 c)64 d)81

Number of binary operations on the set {a, b} are (A) 10 (B) 16 (C)20 (D) 8

*be a binary operation on Q,defined as a**b=(3ab)/5 .Show that * is associative.

* be a binary operation on Q,defined as a**b=(3ab)/5 .Show that *is commutative.

*be a binary operation on Q,defined as a**b=(3ab)/5 Find the identity element of *if any.

Let ast be an operation such that aastb=LCM of a and b defined on the set A={1,2,3,4,5} . Is ast a binary operation? Justify your answer.

Let * be a binary operation on N , the set of all natural numbers defined by a * b = a^b , a, b in N . Is (N,*) associative or commutative?

Consider the binary operation ast on the set R of real numbers, defined by aastb = a b / 4 Find the inverse of 5.

Let A=N xx N and let * be a binary operation on A defined by (a, b) * (c, d) = (a c, b d) show that (i) ( A ,*) is associative (ii)( A ,*) is commutative

The number of one-one function from a set containing 2 elements to a set containing 3 element is………a)2 b)3 c)6 d)8