Let `**` be a binary operation on `QQ_(0)` (Set of all non-zero rational numbers) defined by `a**b=(ab)/(4),a,binQQ_(0)`. The identity element in `QQ_(0)` is `e`, then the value of `e` is--

A binary operation ** is defined in QQ_(0) , the set of all non-zero rational numbers, by a**b=(ab)/(3) for all a,binQQ_(0) . Find the identity element in QQ_(0) . Also find the inverse of an element x in QQ_(0) .

A binary operation ** on QQ_(0) , the set of all non-zero rational numbers, is defined as a**b=(1)/(3)ab for all a,binQQ_(0) Prove that every element of QQ_(0) , is invertible and find the inverse of the element (3)/(5)inQQ_(0).

A binary operation ** is defined on the set RR_(0) for all non- zero real numbers as a**b=(ab)/(3) for all a,binRR_(0), find the identity element in RR_(0) .

If ** be the binary operation on the set ZZ of all integers, defined by a**b=a+3b^(2) , find 2**4.

Let @ be a binary operation on QQ , the set of rational numbers, defined by a@b=(1)/(8)ab for all a,binQQ . Prove that @ is commutive as well as associative.

Let ** be a binary operation on NN , the set of natural numbers defined by a**b=a^(b) for all a,binNN is ** associative or commutative on NN ?

A binary operation ** on QQ , the set of rational numbers, is defined by a**b=(a-b)/(3) fo rall a,binQQ . Show that the binary opearation ** is neither commutative nor associative on QQ .

Let ** be a binary operation on set QQ-{1} defined by a**b=a+b-abinQQ-{1}. e is the identity element with respect to ** on QQ . Every element of QQ-{1} is invertible, then value of e and inverse of an element a are---

An operation @ on QQ-{-1} is defined by a@b=a+b+ab for a,binQQ-{-1}. Find the identity element einQQ-{-1} .

On the set QQ^(+) of all positive rational numbers if the binary operation ** is defined by a**b=(1)/(4)ab for all a,binQQ^(+) , find the identity element in QQ^(+) . Also prove that any element in QQ^(+) is invertible.