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 _(**).`

Show that -a is the inverse of a for the addition opertion '+' on R and 1/a is the inverse of a ne 0 for the multiplication opertion 'x' on R.

Show that +: R xx R to R and × : R xx R to R are commutative binary operations , but - : R xx R to R and div : R _(**) xx R _(**) are not commutative.

Show that addition and multiplication are associative binary opertion on R. But substraction is not associative on R. Division is not associative on R _(**).

If R is the set of all real numbers, what do the cartesian products R xx R and R xx R xx R represent?

Show that **: R xxR to R given by a ** b to a + 2b is not associative.

Show that **: R xx R to R given by (a,b) to a + 4b ^(2) is a binary operation.

Show that **: R × R to R defined by a **b=a + 2b is not commutative.

Let R be the relation over the set of integers such that l R m iff l is a multiple of m. Then R is :

Show that addition, subtraction and multiplication are binary operations on R, but division is not a binary opertion on R. Further, show that division is binary opertion on the set R, of nonzero real numbers.

The identity element in the group M={((x,x),(x,x))|x in R, x ne 0|} with respect to matrix multiplication is..