#3 J. Properties of Divisors of Zero Prove that each of the following is true in...
Please solve all questions 1. Let 0 : Z/9Z+Z/12Z be the map 6(x + 9Z) = 4.+ 12Z (a) Prove that o is a ring homomorphism. Note: You must first show that o is well-defined (b) Is o injective? explain (c) Is o surjective? explain 2. In Z, let I = (3) and J = (18). Show that the group I/J is isomorphic to the group Z6 but that the ring I/J is not ring-isomorphic to the ring Z6. 3....
Test W2: Rings, Integral Domains, ldeals Mark each of the following True (T) or False (F). points each 1. Every integral domain is also a ring 2. Every ring with unity has at most two units. 3. Addition in a ring is commutative. 4. Every finite integral domain is a field. 5. Every element in a ring has an additive inverse. Test W2: Rings, Integral Domains, ldeals Mark each of the following True (T) or False (F). points each 1....
Consider the ring Q[x]/(x^3 − 2x). (a) Prove that the set Ω := {a + bx + cx^2 : a, b, c ∈ Q} contains exactly one element of each coset of (x^3 − 2x) in Q[x]. (b) Show how to add and multiply elements in Ω. Make sure to reduce the answers so that the answers are elements in Ω. (c) Find a zero divisor in Q[x]/(x^3 − 2x). (d) Describe all the zero divisors in Q[x]/(x^3 − 2x)....
1- (2,5+2,5 mark) Consider in GL(2, Q), the subset (a=1 or a=-1),bez Prove that H, with multiplication, is a subgroup of GL(2,Q) a) Is the function b) an homomorphism of groups? Justify your answer 2 (3 marks) Let G be a group and a E G an element of order 12. Find the orders of each of the elements of (a) 3- (1+1,5 marks) Let G be a group such that any non-identity element has order 2. Prove that a)...
Help me with the C) please! Only the third one 1. Let R be a commutative ring of characteristic p, a prime a) Prove that (y)y. [3] b) Deduce that the map фр: R-+ R, фр(x)-z", is a ring homomorphism. 1] c) Compute Op in the case R is the ring Zp. [2] d) Prove that фр is injective if R has no zero-divisors. [2] e) Give an example of a commutative ring of characteristic p such that фр is...
Please solve from a) to e), thank you. 1. Let R be a com ive ring of charact a) Prove that (x+y)P-y. [3] b) Deduce that the map фр: R R, фр(x)-x", is a ring homomorphism. [1] c) Compute Op in the case R is the ring Zp. [2] d) Prove that φp is injective if R has no zero-divisors. [2] e) Give an example of a commutative ring of characteristic p such that фр is not surjective. [3]
(3 points each) Determine whether each statement below is True or False. Give a counter-example for each false statement. (a) Every abelian group is cyclic. (b) Any two finite groups of the same order are isomorphic. (c) A permutation can be uniquely expressed as a product of transpositions. (d) Any ring with a unity must be commutative.
4. True or False. Label each of the following statements as true or false. If true, give a proof, if false, give a counterexample. (a) Every nontrivial subgroup of Q* contains some positive and some negative numbers (b) Let G be a finite group. Let a E G. If o(a) 5, then o(a1) 5. (c) Let G be a group and H a normal subgroup of G. If G is cyclic, then G/H is also cyclic. (d) Le t R...
18. Let o: R+ S be a ring homomorphism. Prove each of the following statements. (a) If R is a commutative ring, then (R) is a commutative ring. (b) (0)=0. (c) Let 18 and 1s be the identities for R and S, respectively. If o is onto, then (1r) = 1s. (d) If R is a field and $(R) +0, then (R) is a field.
1) 2) Select all statements below which are true for all invertible n x n matrices A and B A. APB9 is invertible B. (A + A-1)4 = A4 + A-4 C. (In – A)(In + A) = In – A2 D. (A + B)(A – B) = A2 – B2 E. AB= BA F. A + In is invertible (1 point) Are the vectors ū = [1 0 2], ū = [3 -2 3] and ū = [10 -4...