Binary operation * on R - {-1} defined by `a * b= (a)/(b+a)`

Binary operation * on R -{-1} defined by a ** b = (a)/(b+1) is

Let * be a binary operation on the set R defined by a ** b = (a + b)/2 . Show that * is commulative but not associative.

Let * be a binary operation on Q, defined by a * b =(ab)/(2), AA a,b in Q . Determine whether * is commutative or associative.

On the set of positive rationals, a binary operation ** is defined by a ** b = (2ab)/(5) If 2 ** x= 3^(-1) , then x =

A binary operation * on N defined as a ** b = a^(3) + b^(3) , show that * is commutative but not associative.

A binary operation * on N defined as a ** b = sqrt(a^(2) + b^(2)) , show that * is both cummutative and associative.

Consider a binary operation ** on N defined as a **b=a ^(3) +b ^(3). Choose the correct answer.

Let * be a binary operation on Q defind by a*b= (ab)/(2), AA a,b in Q Determine whether * is associative or not.

A binary operation ^ on the set {1,2,3,4,5} defined by a^b=min(a,b), write the operation table for operations ^.

Show that the binary operation * defined on R by a ** b = (a + b)/2 is not associative by giving a counter example.