Let `A={1,omega,omega^(2)}` be the set of cube roots of unity. Prepare the composition table for multiplication `(xx)` on A. Show that multiplication on A is a binary operation and it is commutative on A. Find the identity element for multiplication and show that every element of A is invertible.

Let S={1,omega,omega^(2)} be the set of cube roots of unity. Prepare the composition table for multiplication (xx) on S, show that multiplication on S is a binary operation and it is commutative on S. Also, show that every element on S is invertible.

Let A={1,-1,I,-i} be the set of fourth roots of unity. Prepare the composition table for multiplication (xx) on A . Show that multiplication on A. Find the identity element for multiplication and show that every element of A is invertible.

An operation ** is defined on the set A={1,2,3,4} as follows: a**b,ab(mod5) for all a,binA .Prepare the compositon table for ** on A and from the table show that - (i) multiplication mod(5) is a binary operation, (ii) ** is commutative on A, (iii) is the identity element for multiplication mod(5) on A, and. (iv) every element of A is invertible.

Prepare the composition table for multiplication modulo 6 (xx_(6)) on A={0,1,2,3,4,5}.

Prepare the composition table for multiplication (xx) on the set of fourth roots of unity and discuss its important properties.

Let A={1,-1} be the set of square roots of unity. Considering multiplication (xx) as a binary operation on A, construct the composition table for multiplication on A. Determine the identity element for multiplication in A and the inverses of the elements.

Let A= {a+sqrt5b:a,binZ} . Show that usual multiplication of numbers is binary operation on A

Consider the set A={1,-1,i,-i} of four roots of unity. Constructing the composition table for multiplication on S. which of the properties are true?

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

An operation '*' is defined on a set A={1,2,3,4} as follows: a*b=ab(mod5), all a,b in A ,Prepare the composition table for '*' on A and from the table show that, '*' is a binary opration and '*' is commutative on A.