Homework Answers
Problem 1. Let G be a finite group and f : G → G a group...
Problem 1. Let G be a finite group and f : G → G a group automorphism ( isomorphism for G to G) of order 2 (i.e. f(f(x)) = x), and f has no nontrivial fixed points (i.e. f(x) = x if and only if x = 1). Prove that G is an abelian group of odd order.
(13) The operation table for Do, the dihedral group of order 12, is given in Table 27.6 Table 27....
(13) The operation table for Do, the dihedral group of order 12, is given in Table 27.6 Table 27.6 Operation table for D (a) Find the elements of the set Ds/Z(Ds). (b) Write the operation table for the group De/Z(D6) (c) The examples of quotient groups we have seen so far have all been Abelian groups.Is it true that every quotient group is Abelian? Explain. Give a necessary condition on a group G if G/N is a non-Abelian group. Is...
problem 2 and 3 You may assume the set X = (A,B,C,D,E,F,G,H) forms a group under...
problem 2 and 3
You may assume the set X = (A,B,C,D,E,F,G,H) forms a group under the operation defined by the operation table below. This group will be used in Problems 2,3, and 4. 10 points Problem 2. Use the table to determine the finite order of the elements E, F, and G. Q * Docs 10 pm Problem 3. What is the smallest subgroup of the aroup (X.) that contains the elements Explain your strategy and
Let Ga finite abelian group. Prove that a)If pa primenumber divides G|, G has an element of order p b)If G2n with n odd...
Let Ga finite abelian group. Prove that a)If pa primenumber divides G|, G has an element of order p b)If G2n with n odd, G has exactly oneelement with order 2 Let Ga finite abelian group. Prove that a)If pa primenumber divides G|, G has an element of order p b)If G2n with n odd, G has exactly oneelement with order 2
2. Let G be an abelian group. Suppose that a and b are elements of G...
2. Let G be an abelian group. Suppose that a and b are elements of G of finite order and that the order of a is relatively prime to the order of b. Prove that <a>n<b>= <1> and <a, b> = <ab> .
(12) Where in the proof of Theorem 27.11 did we use the fact that G is an Abelian group? Why does...
(12) Where in the proof of Theorem 27.11 did we use the fact that G is an Abelian group? Why doesn't our proof apply to non-Abelian groups? (13) The operation table for D6 the dihedral group of order 12, is given in Table 27.6 FR r rR Table 27.6 Operation table for D6 (a) Find the elements of the set De/Z D6). (b) Write the operation table for the group De/Z(D6) (c) The examples of quotient groups we have seen...
Abstract algebra A. Assume G is an abelian group. Let n > 0 be an integer....
Abstract algebra
A. Assume G is an abelian group. Let n > 0 be an integer. Prove that f(x) = ?" is a homomorphism from Got G. B. Assume G is an abelian group. Prove that f(x) = 2-1 is a homomorphism from Got G. C. For the (non-abelian) group S3, is f(x) = --! a homomorphism? Why?
Only 2 and 3 1.) Let G be a finite G be a finite group of...
Only 2 and 3
1.) Let G be a finite G be a finite group of order 125, 1. e. 161-125 with the identity elemente. Assume that contains an element a with a 25 t e, Show that is cyclic 2. Solve the system of congruence.. 5x = 17 (mod 12) x = 13 mod 19) 3.) Let G be an abelian. group Let it be a subgroup o G. Show that alt -Ha for any a EG
16. Let Z(G), the center of G, be the set of elements of G that commute...
16. Let Z(G), the center of G, be the set of elements of G that commute with all elements of G. (a) Find the center of the quaternions, defined in Example 19.16. (b) Find the center of Z5. (c) Show that Z(G) is a subgroup of G. (d) If Z(G) G, what can you say about the group G? b 0 Example 19.16 d We now work inside M2(C), the ring of 2 x 2 matrices with complex entries. Consider...
5. Product groups: (a) Let G and G' be groups. Explain how one turns G ×...
5. Product groups: (a) Let G and G' be groups. Explain how one turns G × G, into a group by defining multiplication and identifying inverses and the identity element. (b) If G is an abelian group of order 30 and GZm x Zn how may possibilities are there for the whole numbers m and n? (Assume m S n for clarity and list the possibilities)
(13) The operation table for Do, the dihedral group of order 12, is given in Table 27.6 Table 27.6 Operation table for D (a) Find the elements of the set Ds/Z(Ds). (b) Write the operation table for the group De/Z(D6) (c) The examples of quotient groups we have seen so far have all been Abelian groups.Is it true that every quotient group is Abelian? Explain. Give a necessary condition on a group G if G/N is a non-Abelian group. Is...
problem 2 and 3
You may assume the set X = (A,B,C,D,E,F,G,H) forms a group under the operation defined by the operation table below. This group will be used in Problems 2,3, and 4. 10 points Problem 2. Use the table to determine the finite order of the elements E, F, and G. Q * Docs 10 pm Problem 3. What is the smallest subgroup of the aroup (X.) that contains the elements Explain your strategy and
2. Let G be an abelian group. Suppose that a and b are elements of G of finite order and that the order of a is relatively prime to the order of b. Prove that <a>n<b>= <1> and <a, b> = <ab> .
(12) Where in the proof of Theorem 27.11 did we use the fact that G is an Abelian group? Why doesn't our proof apply to non-Abelian groups? (13) The operation table for D6 the dihedral group of order 12, is given in Table 27.6 FR r rR Table 27.6 Operation table for D6 (a) Find the elements of the set De/Z D6). (b) Write the operation table for the group De/Z(D6) (c) The examples of quotient groups we have seen...
Abstract algebra
A. Assume G is an abelian group. Let n > 0 be an integer. Prove that f(x) = ?" is a homomorphism from Got G. B. Assume G is an abelian group. Prove that f(x) = 2-1 is a homomorphism from Got G. C. For the (non-abelian) group S3, is f(x) = --! a homomorphism? Why?
Only 2 and 3
1.) Let G be a finite G be a finite group of order 125, 1. e. 161-125 with the identity elemente. Assume that contains an element a with a 25 t e, Show that is cyclic 2. Solve the system of congruence.. 5x = 17 (mod 12) x = 13 mod 19) 3.) Let G be an abelian. group Let it be a subgroup o G. Show that alt -Ha for any a EG
16. Let Z(G), the center of G, be the set of elements of G that commute with all elements of G. (a) Find the center of the quaternions, defined in Example 19.16. (b) Find the center of Z5. (c) Show that Z(G) is a subgroup of G. (d) If Z(G) G, what can you say about the group G? b 0 Example 19.16 d We now work inside M2(C), the ring of 2 x 2 matrices with complex entries. Consider...
5. Product groups: (a) Let G and G' be groups. Explain how one turns G × G, into a group by defining multiplication and identifying inverses and the identity element. (b) If G is an abelian group of order 30 and GZm x Zn how may possibilities are there for the whole numbers m and n? (Assume m S n for clarity and list the possibilities)
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