For the binary operation defined below, determine whether `**` is commutative or associative On Q, define a*b = ab+1 .

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

For binary operation ** defined below, determine whether ** is commutative or associative ? On Z^(+) define a**b = 2^(ab)

For binary operation ** defined below, determine whether ** is commutative or associative ? On Z, define a**b = a - b

For operation ∗ defined below, determine whether ∗ is binary, commutative or associative: On Q , define a*b=ab+1

For operation ∗ defined below, determine whether ∗ is binary, commutative or associative: On Q , define a*b=ab/2

For operation ∗ defined below, determine whether ∗ is binary, commutative or associative: On Z , define a*b=a-b

For operation ∗ defined below, determine whether ∗ is binary, commutative or associative: On Z^+ , define a*b=a^b

For operation ∗ defined below, determine whether ∗ is binary, commutative or associative: On Z^+ , define a*b=2^(ab)

For each operation * defiend below, determine whether* is binary, commutative or associative. On Q, define a * b = (ab)/2

For each binary operation '*' defined below, determine whether '*' is commutative and whether '*' is associative. On Q, define * by a * b = ab +1