Total No. of Questions : 9] [Total No. of Printed Pages: 4
Paper code: 13511
1511
B.Sc. (Computer Science) (Part 2)
Examination-2024
Paper No. 1.2
ABSTRACT ALGEBRA
Time: Three Hours]
[Maximum Marks: 50
Note: Attempt five questions in all selection at least one question from each section. All questions carry equal marks.
Section-A
1. (a) Prove that this inverse elements of a group is unique.
(b) Show that the set of invertible 2 x 2 matrices with real entries, with operation given by matrix multiplication is a group.
2. (a) Prove that the center of a group G is a subgroup of G.
(b) Find all generators of Z6, Z8, and Z20.
3. (a) Prove that a finite group is the union of proper subgroup iff the group is not cyclic.
(b) What are even and odd permutations? Prove that out of n! permutations, n/2! are even permutations and n/2! are odd permutations.
Section-B
4. (a) State and prove Lagrange’s Theorem.
(b) Let G be a group and let Z(G) be the center of G, then show that, if G/Z(G) is cyclic, G is Abelian.
5. (a) State and prove unique factorization theorem.
(b) Show that the nilpotent elements of a commutative ring a form a subring.
6. (a) Let R be a commutative ring with unity and let A be an ideal of R, then prove that R/A is a field iff A is maximal.
(b) Determine all ring isomorphisms from Zn to itself.
Section-C
7. (a) Show that if F is a field, then F[x] is a principle ideal domain.
(b) Prove that the intersection of two subspaces of a vector space is also a vector space.
8. (a) If (u, v, w) is a linearly independent subset of a vector space, show that {u, u+v, u+v+w} is also linearly independent.
(b) If f is a homomorphism of U(F) into V(F), then prove that :
(i) f(Ō) = O’, where Ō and O’ are the zero vectors of U and V respectively.
(ii) f(-α) = -f(α) : ∀ α ∈ U
9. (a) Let V = R3 and W={(a, b, c) ∈ V |a2 + b2 = c2}. Is W a subspace of V? if so, what is its dimensions?
(b) Let
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Thank you!
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