Let S be a set of containing more than two elements and a binary operaton `@` on S be defined by
`a@b=a` for all `a,binS`.
Prove that `@` is associative but not commutative on .

Let S be any set containing more than two elements. A binary operation @ is defined on S by a@b=b for all a,binS . Discuss the commutativity and associativity of @ on S.

Let S be a set containing n elements.Then the total number of binary operations on S is

Find the identity element of the binary operation ** on ZZ defined by a**b=a+b+1 for all a,binZZ .

Prove that the binary operation ** on RR defined by a**b=a+b+ab for all a,binRR is commutative and associative.

Let S=NNxxNNand** is a binary operation on S defined by (a,b)**(c,d)=(a+c,b+d) for all a,b,c,d in NN . Prove that ** is a commutative and associative binary operation on S.

Let ** be a binary operation on NN , the set of natural numbers defined by a**b=a^(b) for all a,binNN is ** associative or commutative on NN ?

Let S be a set of two elements. How many different binary operaions can be defined on S?

Let P(A) be the power set of a non-empty set A and a binary operation @ on P(A) is defined by X@Y=XcupY for all YinP(A). Prove that, the binary operation @ is commutative as well as associative on P(A). Find the identity element w.r.t. binary operation @ on P(A). Also prove that Phi inP(A) is the only invertible element in P(A).

Let S = N xx N and ast is a binary operation on S defined by (a,b)^**(c,d) = (a+c, b+d) for all a,b,c,d in N .Prove that ** is an associate binary operation on S.

Let A be a set of 3 elements. The number of differentity binary operations can be defined A is…