3. Let R be the set of all matrices with rational entries, M3(Q), of the forma b c0 a b00 aShow that(i) R is a commutative ring.(ii) the setis an ideal of R.(iii) A is a maximal ideal of R.-{[0 b c00 b000Jiraca}

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Answered: 3. Let R be the set of all matrices…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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3) Let Z, be ring integers mode 5 and f(x) € Zs(x) such that f(x) = x² + 2x + 1 then a) f(x) has only one root. b) f(x) has only two roots. c) f(x) irreducible polynomials.. d) No one of above. 4) Let R be a ring and F-M₂(R) be ring of 2 x 2 matrices over R under standard addition and multiplication of matrices then: a) F is a commutative ring but not field. b) F is a division ring and not field. (c) If F an integral domain and F is not field. d) No one of above.
Show that the set of all matrices of order 2×2 of the form [10], where a, b, c are integers is a subring of the ring M of all matrices of order 2 × 2 with integral elements.
6. Let S be the set of 2 × 2 matrices over Z of the form (?). Show that (a) S is a ring. (b) (a b)* = (a* .*). 0 0 where denotes some integer. Also find the idempotents and nilpotent elements of S. Show that nilpotent elements form a subring.
2. Define = {(9₂2) = 0,²€c} : a, Bec}; (i) Prove MH is a subring of Mat2 (C) with usual matrix addition and multiplication. (ii) Prove it is a division ring. (iii) Prove it is non-commutative. (iv) Prove that the matrix product in MH reflects the product of quaternions described in class. (v) Find a linearly independent set of generators of MH as an R-vector space. MH
من ع مروه ميثم علي إسماعيل اليوم عند ۱0:۱۳م (8) In the ring (Z6, +66), we get n {(a): a prime element in Z} = ... (а) ф (b) ((0), +6, -6) (c) (Z6, +66) (d) No Choice (a) (b) (c) (d) D O O ...
(5) The ring (Z6,+6,6) has that rad Z6 (a) ((0), +6.-6 ) (b) (2), +6, 6 ) (c) (3), +6»6 ) (d) No Choice O (a) O (b) (c) O (d)
D E (ii), (iv) (v) (iv) (ii), (iii) (i) Which of the following are true ? (i): (Z7, +,-) is a field. (ii): (Z8, +,-) is a field. (iii): (Z7 x Z7, +,-) is a field. (iv): (Z2 x Z5, +, ) is an integral domain. (v): (2Z, +,-) is a field. ...
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Let d≥ 1 and let F be a field, and define a group of matrices G ≤ GLd+1(F) by A = {(^ ;) Prove that G is isomorphic to the group G A 1 € GL₁(F), v € Fª}. Affa(F) = {TA,v: A = GLd(F), v € Fd} considered in the previous question. (You do not need to prove that G is a group.)
Let M2x2 (R) be the set of all matrices with dimension 2 × 2, whose entries are all real numbers. Prove that (M2x2(R), +, x) is a ring, if + and x are the addition and multiplication operations on (2×2)-dimension matrices, respectively.

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3. Let R be the set of all matrices with rational entries, M3(Q), of the form a b c 0 a b 00 a Show that (i) R is a commutative ring. (ii) the set is an ideal of R. (iii) A is a maximal ideal of R. ^-{[ 0 b c 00 b 000 foreca}