A binary operation on a set has always the identity element.

Define a binary operation on a set.

Write the total number of binary operations on a set consisting of two elements.

A binary operation is chosen at random from the set of all binary operations on a set A containing n elements. The probability that the binary operation is commutative, is

For the binary operation * on Z defined by a*b= a+b+1 the identity element is

Determine the total number of binary operations on the set S={1,\ 2} having 1 as the identity element.

Show that the number of binary operations on {1," "2} having 1 as identity and having 2 as the inverse of 2 is exactly one.

The number of commutative binary operations that can be defined on a set of 2 elements is

The number of binary operations that can be defined on a set of 2 elements is (a) 8 (b) 4 (c) 16 (d) 64

Let X be a non-empty set and let * be a binary operation on P\ (X) (the power set of set X ) defined by A*B=(A-B)uu(B-A) for all A ,\ B in P(X)dot Show that varphi is the identity element for * on P\ (X) .

Let X be a non-empty set and let * be a binary operation on P\ (X) (the power set of set X ) defined by A*B=(A-B)uu(B-A) for all A ,\ B in P(X)dot Show that varphi is the identity element for * on P\ (X) .