Is the binary operation `**` defined on the set of integer Z by the rule `a**b=a-b+2` commutative ?

Is the binary operation ** defined on Z (set of integers) by the rule a**b=a-b+ab for all a, bin Z commutative ?

Is the binary operation ** defined on the set of rational numbers by the rule a**b=ab//4 associative ?

Let '**' be the operation defined on the set Z of integer by the rule m**n=m+n+1 for all m,n in Z , write down the identity element for the operation.

Is multiplication a binary operation on the set {0} ?

For the binary operation ** defined below, determine whether ** is commutative and associative : On Z, define a**b=ab+1

For the binary operation ** defined below, determine whether ** is commutative and associative : On N, define a**b=a^b

For the binary operation ** defined below, determine whether ** is commutative and associative : On N, define a**b=2^(ab)

For the binary operation ** defined below, determine whether ** is commutative and associative : On Q, define a**b=(ab)/2