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

Define a binary operation on a set.

Define a commutative binary operation on a set.

On the set Z of integers a binary operation * is defined by a*b= a b+1 for all a ,\ b in Z . Prove that * is not associative on Zdot

Define an associative binary operation on a set.

Is * defined by a * b=(a+b)/2 is binary operation on Z.

Determine whether or not the definition of * On Z^+ , defined * by a*b=a b gives a binary operation. In the event that * is not a binary operation give justification of this. Here, Z^+ denotes the set of all non-negative integers.

Determine whether or not the definition of * On R , define by a*b=a b^2 gives a binary operation. In the event that * is not a binary operation give justification of this. Here, Z^+ denotes the set of all non-negative integers.

Let M be the set of all 2X2 real singular matrices . On M , let * be an operation defined by, A*B=A B for all A ,\ B in Mdot Prove that * is a binary operation on Mdot

The binary operation * is defined by a*b= (a b)/7 on the set Q of all rational numbers. Show that * is associative.

Determine whether or not the definition of * On Z^+ , defined * by a * b=a-b gives a binary operation. In the event that * is not a binary operation give justification of this. Here, Z^+ denotes the set of all non-negative integers.