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.

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.

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

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.

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?

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

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.

Let ** be the binary defined on the set S={1,2,3,4,5,6} by a**b=r where r is the least non-negative remainder when ab is divided by 7. Prepare the composition table ** on S. Observing the composition table show that 1 is the identity element for ** and every element of S is invertible.

Construct the composition table for the binary operation multiplication modulo 5(xx_(5)) on the set A={0,1,2,3,4} .

A binary operation @ is defined on RR-{-1} by a@b=a+b+ab for all a,binRR-{-1}. (i) Discuss the commutativity and associativity of @ on RR-{-1} . Find the identity element, if exists. (iii) Prove that every element of RR-{-1} is invertible.