Let '`ast`' be a binary operation on `Q^+` defined by '`aastb=frac(ab)(6)`'. Find the inverse of 9 with respect to '`ast`'.

Let Q be the set of Rational numbers and ' ast ' be the binary operation on Q defined by ' aastb=frac(ab)(4) ' for all a,b in Q. Find the inverse element of ' ast ' on Q.

ast ' is a binary operation on R defined as aastb=2ab Find the inverse element, if exists

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

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

ast ' is a binary operation on R defined as aastb=2ab Find the identity element if exists.

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

Let Q be the set of Rational numbers and ' ast ' be the binary operation on Q defined by ' aastb=frac(ab)(4) ' for all a,b in Q. What is the identity element of ' ast ' on Q?

ast ' be a binary operation on NxxN defined as (a,b)ast(c,d)=(ac,bd) Find the identity element of ast if any

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

Let ast be a binary operation on the set Q of rational numbers defined by aastb=frac(ab)(3) . Check whether ast is commutative and associative?