The operation `**` is defined by `a**b=a^(b)` on the set `Z={0,1,2,3,…}`. Show that `**` is not a binary operation.

The operation @ is defined by a@b=b^(a) on the set Z={0,1,2,3,…} . Prove that @ is not a binary opeartion on Z.

An operation ** is defined on NN as a**b=HCF(a,b) for all a,binNN . Show that ** is a binary operation on NN . Find the values of 25**15,32**56,9**11and34**38 .

Let * be a binary operation on N defined by a*b= 2^(5ab),a b inN .Discuss the commutativity if this binary operation.

A binary operation ** on QQ , the set of rational numbers, is defined by a**b=(a-b)/(3) fo rall a,binQQ . Show that the binary opearation ** is neither commutative nor associative on QQ .

An operation ** is defined on the set A={1,2,3,4} as follows: a**b,ab(mod5) for all a,binA .Prepare the compositon table for ** on A and from the table show that - (i) multiplication mod(5) is a binary operation, (ii) ** is commutative on A, (iii) is the identity element for multiplication mod(5) on A, and. (iv) every element of A is invertible.

Let M_(2) be the set of all 2xx2 singular matrices of the form {:((a,a),(a,a)):} where ainRR . On M_(2) an operation @ is defined as A@B=AB for all A,BinM_(2). Show that @ is a binary operation on M_(2) .

A binary operation ** is defined on the set S={0,1,2,3,4} as follows: a**b=a+b(mod5) Prove that 0inS is the identity element of the binary operation ** and each element ainS is invertible with 5-ainS being the inverse of the element a.

Show that the operation ** defined on RR-{0} by a**b=|ab| is a binary operation. Show also that ** is commutative and associative.

(I) Let ** be a binary operation defined by a**b=2a+b-3. Find 3**4. (ii) let ** be a binary operation on RR-{-1} , defined by a**b=(1)/(b+1) for all a,binRR-{-1} Show that ** is neither commutative nor associative. (iii) Let ** be a binary operation on the set QQ of all raional numbers, defined as a**b=(2a-b^(2)) for all a,binQQ . Find 3**5 and 5**3 . Is 3**5=5**3?

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.