* be a binary operation on Q,defined as `a**b=(3ab)/5` .Show that *is commutative.

*be a binary operation on Q,defined as a**b=(3ab)/5 .Show that * is associative.

*be a binary operation on Q,defined as a**b=(3ab)/5 Find the identity element of *if any.

ast ' be a binary operation on NxxN defined as (a,b)ast(c,d)=(ac,bd) Show that ast is commutative.

ast ' is a binary operation on R defined as aastb=2ab Determine whether ast is commutative and associative

Let A=NxN and '*' be a binary operation on A defined by (a,b)*(c,d)=(a+c,b+d) .Prove that '*' is commutative.

Let ast be a binary operation on N defined by aastb=HCF of a and b Is ast commutative?

Consider a binary operation ** on N defined as a**b=a^3+b^3 . Choose the correct answer. a) both associative and commutative b)commutative but not associative c) associative but not commutative d) neither commutative nor associative

Let A=N xx N and let * be a binary operation on A defined by (a, b) * (c, d) = (a c, b d) show that (i) ( A ,*) is associative (ii)( A ,*) is commutative

Let * be a binary operation on N,defined bya*b= a^b,a,binN .is * associative or commutative?

Let A=NtimesN , N-set of natural numbers and ' ast ' be a binary operation on A defined by (a,b)ast(c,d)=(ac-bd,ad+bc) . Show that ' ast ' is commutative on A.