Examine if the binary operation
`""^(**)R xx R toR` given by `a^(**)b=a+4b^(2)` is
commutative.

Examine if the binary operation ""^(**)R xx R toR given by a^(**)b=a+4b^(2) is associative.

The binary opertion ** R xx R to R is defined by a ** b = 2a + b. find (2 ** 3) **4.

Consider the binary operations ""^(**):RxxRtoR and o:RxxR defined by a^(**)b=|a-b| aob=a, AA a,b in R Examine, if o distributes over ""^(**) .

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

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

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

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

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

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