If the binary operation `**` on the set `ZZ` is defined by `a**b=a+b-5`, then the identity element with respect to `**` is `K`. Find the value of `K`.

Let * be a binary operation on Zdefined by a*b=a+b- 15 for a,binZ . Find the identity element in (Z,*)

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---

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

If the binary operation on ZZ is defined by a**b=a^(2)-b^(2)+ab+4, then the value of (2**3)**4 is --

Let * be a binary operations on Z and is defined by , a * b = a + b + 1, a, bin Z . Find the identity element.

Let be binary operation on the set R defined by a*b = a+b+ab, a, binR . solve equation :2*(2*x)=7

Let * be a binary operation on Zdefined by a*b=a+b- 15 for a,binZ Find the inverse of an element in (Z ,*).

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.

The total number of binary operations on the set S={1,2} having 1 as the identity element is n . Find n .