## Numerical problems from GROUP

**Prob**. Show that the set I of all integers (…, -4, -3, -2, -1, 0, 1, 2, 3, 4,…}

Is a group with respect to the operation of addition of integers?

Solution: Click here.

**Prob**. Let ({a, b}, * ) be a semigroup where a*a = b show that-

a*b = b*a

Solution: Click here.

**Prob**. Let (A, *) be a semigroup. Show that for a, b, c ∈ A, if a*c = c*a and b*c = c*b, then (a*b)*c = c*(a*b).

Solution: Click here.

**Prob**. Suppose (A, *) be a group, show that (A, *) is an abelian group and only if a3 * b3 = (a*b)3 for all a and b in A.

Solution: Click here.

**Prob**. Prove that the set Z of all integers with binary operations defined by-

a*b = a+b+1 , ∀ a, b ∈ z. Is an abelian group.

Solution: Click here.

**Prob**. Prove that the cube roots of unity namely ( 1, w, w2) abelian under multiplication of complex numbers.

Solution: Click here.

**Prob**. Prove that the set G = {0, 1, 2, 3, 4, 5} is a finite abelian group of order 6 with respect to addition modulo 6.

Solution: Click here.

**Prob**. Prove that the set G = {1, 2, 3, 4, 5, 6} is a finite abelian group of order 6 with respect to multiplication modulo 7.

Solution: Click here.

**Related topics:**

- SET
- Mathematical Induction
- Relation
- Binary operations
- Algebraic struture
- Group
- Numerical problems on GROUP
- Subgroup
- Abelian Group or Commutative group
- Coset
- Factor or Quotient group
- Cyclic group
- Ring
- Numerical problems on RING
- Field
- POSET, Hasse diagram,Upper and Lower Bounds
- Hasse diagram
- Upper and Lower Bounds
- Lattice
- Recurrence relation numerical problems
- How to solve generating function

**A list of Video lectures**

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