The identity element of a*b = a+b+7 on Z is:

Find the identity element for the binary operation * on Z defined as a*b = a + b-5. Also find the inverse element of 100.

If a*b = 10+ a + b for all a,b in Z find the identity element and inverse of 25.

The identity element under Annmu of sets is………..

The identity element under union of sets of …..

If A = {0,1,2,3,4,5} Define a binary operation * on A as a*b = {{:(a+b, if, a+b lt 6),(a+b-6, if, a + b ge 6):} , Show that 0 is the identity and each element a ne 0 is invertible and find the inverse of a.

Show that zero is the identity for addition on R and 1 is the identity for multiplication on R. But there is no identity element for the opertions - : R xxR to R and div : R _(**) xx R_(**) to R _(**).

Let X be a non empty set. Let P(X) be the power set of X. Define *: P(X) * P(X) to P(X) by A * B =(A-B) cup (B-A), AA A, B in P(X) . Find the identity element and inverse element of A.

What is the identity element with respect to subtraction in integers ?

Let A = N x N and (a,b)*(c,d) = (a+c, b+d) on A. Show that * is commutative and associative. Find the identity element if exists.