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.

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

Show that the total number of binary operation from set A to A is n^(n^(2)).

Let A = {1, 2, 3}. Find the number of binary operations on A.

If A = {1, b}, then the number of binary operations that can be defined on A is

Consider the binary operation * and o defined by the following tables on set S={a,b,c,d}.( FIGURE) Show that both the binnary operations are commutative and associative.Write down the identities and list the inverse of elements.

Q^+ denote the set of all positive rational numbers. If the binary operation o. on Q^+ is defined as a o.b=(a b)/2, then the inverse of 3 is 4/3 (b) 2 (c) 1/3 (d) 2/3

Let * be an associative binary operation on a set S with the identity element e in S. Then. the inverse of an invertible element is unique.

Show that a is the inverse of a for the addition operation + on R and 1/a is the inverse of a!=0 for the multiplication operation xx on R.

Show that -a is not the inverse of a in N for the addition operation + on N and (1)/(a) is not the inverse of a in N for multiplication operation xx on N, for a!=1

Let * be an associative binary operation on a set S and a be an invertible element of S. Then; inverse of a^(^^)-1 is a.