Let `""^(**)` be a binary operation on Q, defined by `a^(**)b=(3ab)/(5)`. Show that `""^(**)` is commutative, if it exists.

Let ** be a binary operatiion defined by a**b=3a+4b-2 .Find 4**5 ?

Let A=NxxN and let ** be a binary operation on A defined by (a,b)**(c,d)=(a+c,b+d) . Show that ** is commutative and associative.

Let * be a binary operation defined by a*b = 3a+4b-2 find 4*5

Let ""^(**):QxxQtoQ is defined by a^(**)b=1+ab,AA a,b in Q . Show that ""^(**) is commutative, but not associative.

Consider a binary operation ""^(**) on N defined by a^(**)b=a^(3)+b^(3),a,b in N , Examine, if ""^(**) is commutative

Is the binary operation ** defined by Q by a**b=(a+b)/2 for all a,b in Q commutative and associative?

Consider the binary operation ""^(**) on N defined by a^(**)b="LCM" of a and b. Examine, if ""^(**) is commutative

Consider the ninary operation ""^(**) on N defined by a^(**)b="HCF" of a and b. Examine, if ""^(**) is commutative