Let `**` be a binary operation on `A=NNxxNN`, defined by, `(a,b)**(c,d)=(ad+bc,bd)` for all `(a,b)(c,d)inA`. Prove that `A=NNxxNN` has no identity element.

** on ZZxxZZ defined by (a,b)**(c,d)=(a-c,b-d) for all (a,b),(c,d)inZZxxZZ.

Let A=NNxxNN , a binary operation ** is defined on A by (a,b)**(c,d)=(ad+bc,bd) for all (a,b),(c,d)inA. Show that ** possesses no identity element in A.

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 A=Ncup{0}xxNNcup{0}, a binary operation ** is defined on A by. (a,b)**(c,d)=(a+c,b+d) for all (a,b),(c,d)inA. Prove that ** is commutative as well as associative on A. Show also that (0,0) is the identity element In 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=NNxxNNand@ be a binary operation on A defined by (a,b)@(c,d)=(ac,bd) for all a,b,c,dinNN . Discuss the commutativity and associativity of @ on A.

Let A=N x N and *be a binary operation on A defined by (a,b)*(c,d) =(a+c,b+d).Show(A*) has on identity element.

Let A=RR_(0)xxRR where RR_(0) denote the set of all non-zero real numbers. A binary operation ** is defined on A as follows: (a,b)**(c,d)=(ac,bc+d) for all (a,b),(c,d)inRR_(0)xxRR. Binary operation ** is--Identity element in A is--

Let N N be the set of natural numbers and R be a relation on N NxxN N defined by, (a,b) R (c,d) to a+d=b+c, for all (a,b) and (c,d) iN N NxxN N . prove that R is an equivalence relation on N NxxN N .

Let N N be the set of natural numbers and R be a relation on N NxxN N defined by, (a,b) R (c,d) to ad =bc , for all (a,b) and (c,d) iN N NxxN N . Show that R is an equivalence relation on N NxxN N .