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?

Consider the binary operation ast on the set R of real numbers, defined by aastb=a b /4 Show that ast is commutative and associative.

Let ** be a binary operation on the set Q of rational numbers as follows a**b=a-b . Check whether * is commutative and associative

Let ' ast ' is a binary operation on the set Q of rational numbers as follows, aastb=a+ab Check whether the binary operation are commutative and associative. Also find the identify element if exists.

Let ' ast ' is a binary operation on the set Q of rational numbers as follows, aastb=(a-b)^2 Check whether the binary operation are commutative and associative. Also find the identify element if exists.

Let ' ast ' is a binary operation on the set Q of rational numbers as follows, aastb=a-b Check whether the binary operation are commutative and associative. Also find the identify element if exists.

Let ' ast ' is a binary operation on the set Q of rational numbers as follows, aastb=a^2+b^2 Check whether the binary operation are commutative and associative. Also find the identify element if exists.

Let ** be a binary operation on the set Q of rational numbers as follows a**b=a+ab . Is the binary operation commutative and associative ?

Let ** be a binary operation on the set Q of rational numbers as follows a**b=(a-b)^2 . Is the binary operation commutative and associative ?

Let ** be a binary operation on the set Q of rational numbers as follows a**b=a^2+b^2 . Is the binary operation commutative and associative ?

Let ast be a binary operation on the set Q of rational numbers by aastb=2a+b . Find 2ast(3ast4) and (2ast3)ast4 .