Let`**` be a binary on `NN` defined by `a**b=L.C.M. (a,b)` (for all`a,bin NN)`. `2**4=lambda` then `lambda` will be---

The binary operation * define on N by a*b = a+b+ab for all a,binN is

The binary operation ** defined on NN by a**b=a+b+ab for all a,binNN is--

Let ** a binary operation on NN given by a**b=H.C.F (a,b) for all a,binNN , write the value of 22**4

A binary @ on NN is defined by a@b=L.C.M.(a,b) for all a,binNN. (i) Examine the commutativity and associativity of @ on NN , (ii) Find the identity element in NN , (iii) Also find the invertible elements of NN .

Let * be a binary operation defined by a* b = L.C.M , (a,b) AA a,b in N . Show that the binary operation * defined on N is commutative and associative. Also find its identity element of N.

let ** be a binary on QQ , defined by a**b=(a-b)^(2) for all a,binQQ . Show that the binary operation ** on QQ is commutative but not associative.

A binary operation ** on NN is defined by a**b=L.C.M.(a,b) for all a,binNN . (i) Find 15**18 (ii) Show that ** is commutative as well as associative on NN. (iii) Find the the identity element in NN . (iv) Also find the invertible element in NN .

Let ** be an operation defined on NN , the set of natural numbers, by a**b=L.C.M.(a,b) for all a,binNN . Prove that ** is a binary operation on NN .

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 ** 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.