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= e, then d is the trivial homomorphism 6. Suppose that ø : D7 -> G...
Suppose φ:G→G is a group homomorphism, φ is not the trivial map, and |G|=p,where p is...
Suppose φ:G→G is a group homomorphism, φ is not the trivial map, and |G|=p,where p is a prime number. Prove that G∼=Im(φ), where Im(φ) is the image of φ.
(20) Consider a homomorphism ф:26-A,witho(5)-Ps-(1,3,2) (in cycle form) a. Fill in the "table of values" for...
(20) Consider a homomorphism ф:26-A,witho(5)-Ps-(1,3,2) (in cycle form) a. Fill in the "table of values" for the homomorphism ф (hint: 4-5+5 in Z 2. ф(x) 4 write down the image of ф b, Determine the kernel of h c. Ker(ø)- Show that the factor group of the kernel in Z6 is isomorphic to the image of ф by finding an isomorphism mapping A: G/ker(p)-> ф[26] d. Bonus (5): Find another non-trivial homomorphism from Zs to Sa with a different image...
Question 1# (a) Let G be a connected graph and C a non-trivial circuit in G. Prove directly that if an edge e fa, b is...
Question 1# (a) Let G be a connected graph and C a non-trivial circuit in G. Prove directly that if an edge e fa, b is removed from C then the subgraph S C G that remains is still connected. "Directly' means using only the definitions of the concepts involved, in this case connected' and 'circuit'. Hint: If z and y are vertices of G connected by path that includes e, is there an alternative path connecting x to y...
(i) Determine whether φ defines a homomorphism. (ii) Find ker ф :-(g E G I ф(G)-e) and inn ф d(G). (ii) Draw Cayley...
(i) Determine whether φ defines a homomorphism. (ii) Find ker ф :-(g E G I ф(G)-e) and inn ф d(G). (ii) Draw Cayley diagrams of the domain and codomain, and arrange them so one can "visually see" the cosets of ker φ in G. Draw dotted lines around these cosets. (iv) Is the quotient G/ker ф a group? If so, what is it isomorphic to? Here is an example of Step (iii) for the map o: Z6 Z3, defined by...
Q3 (Due Wednesday 11 September—Week 7) Let (G, *) and (N,) be groups. Suppose that g...
Q3 (Due Wednesday 11 September—Week 7) Let (G, *) and (N,) be groups. Suppose that g Ha, is a homomorphism from from G to Aut(N)—that is, suppose that a, o ah = agh for all g, h E G. Let N a G denote the set N X G, and define a binary operation • on N a G by (m, g) + (a, b) = (m + ag(m), g * h). (1) Prove that (N a G, is a...
er (a) Let G be a connected graph and C a non-trivial circuit in G. Prove...
er (a) Let G be a connected graph and C a non-trivial circuit in G. Prove directly that if an edge ={a, b} is removed from then the subgraph S CG that remains is still connected. Directly' means using only the definitions of the concepts involved, in this case 'connected' and 'circuit'. Hint: If r and y are vertices of G connected by path that includes e, is there an alternative path connecting x to y that avoids e? (b)...
3. Let y: K + Aut(H) be a homomorphism. Write (k) = Ok. Let G be...
3. Let y: K + Aut(H) be a homomorphism. Write (k) = Ok. Let G be a group. A function d: K + H is called a derivation if dikk') = d(k) (d(k')). Show that d: K + H is a derivation if and only if V: K + H y K given by v(k) = (d(k), k) is a homomorphism. 4. Suppose that a: G + K is a surjective homomorphism and that 0: K + G is a...
Please solve all questions 1. Let 0 : Z/9Z+Z/12Z be the map 6(x + 9Z) =...
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....
6. Let n 5. It can be shown that the only normal subgrops of S are...
6. Let n 5. It can be shown that the only normal subgrops of S are t(1)J, An, and Sn (a) For each normal subgroup N of Sn above, describe what the quotient group Sn/N is isomorphic to. e l a be teuris ae the is or what e nagn (c) Show that a homomorphism o: Sn 25 must be the trivial one: o(o)-0 for all σ E S,
(20) Consider a homomorphism ф:26-A,witho(5)-Ps-(1,3,2) (in cycle form) a. Fill in the "table of values" for the homomorphism ф (hint: 4-5+5 in Z 2. ф(x) 4 write down the image of ф b, Determine the kernel of h c. Ker(ø)- Show that the factor group of the kernel in Z6 is isomorphic to the image of ф by finding an isomorphism mapping A: G/ker(p)-> ф[26] d. Bonus (5): Find another non-trivial homomorphism from Zs to Sa with a different image...
Question 1# (a) Let G be a connected graph and C a non-trivial circuit in G. Prove directly that if an edge e fa, b is removed from C then the subgraph S C G that remains is still connected. "Directly' means using only the definitions of the concepts involved, in this case connected' and 'circuit'. Hint: If z and y are vertices of G connected by path that includes e, is there an alternative path connecting x to y...
(i) Determine whether φ defines a homomorphism. (ii) Find ker ф :-(g E G I ф(G)-e) and inn ф d(G). (ii) Draw Cayley diagrams of the domain and codomain, and arrange them so one can "visually see" the cosets of ker φ in G. Draw dotted lines around these cosets. (iv) Is the quotient G/ker ф a group? If so, what is it isomorphic to? Here is an example of Step (iii) for the map o: Z6 Z3, defined by...
Q3 (Due Wednesday 11 September—Week 7) Let (G, *) and (N,) be groups. Suppose that g Ha, is a homomorphism from from G to Aut(N)—that is, suppose that a, o ah = agh for all g, h E G. Let N a G denote the set N X G, and define a binary operation • on N a G by (m, g) + (a, b) = (m + ag(m), g * h). (1) Prove that (N a G, is a...
er (a) Let G be a connected graph and C a non-trivial circuit in G. Prove directly that if an edge ={a, b} is removed from then the subgraph S CG that remains is still connected. Directly' means using only the definitions of the concepts involved, in this case 'connected' and 'circuit'. Hint: If r and y are vertices of G connected by path that includes e, is there an alternative path connecting x to y that avoids e? (b)...
3. Let y: K + Aut(H) be a homomorphism. Write (k) = Ok. Let G be a group. A function d: K + H is called a derivation if dikk') = d(k) (d(k')). Show that d: K + H is a derivation if and only if V: K + H y K given by v(k) = (d(k), k) is a homomorphism. 4. Suppose that a: G + K is a surjective homomorphism and that 0: K + G is a...
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....
6. Let n 5. It can be shown that the only normal subgrops of S are t(1)J, An, and Sn (a) For each normal subgroup N of Sn above, describe what the quotient group Sn/N is isomorphic to. e l a be teuris ae the is or what e nagn (c) Show that a homomorphism o: Sn 25 must be the trivial one: o(o)-0 for all σ E S,
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