4. Find a subgroup H of S3 and elements o, t of S3 such that oH = TH but o’H #72H.
5) Leth-{ơes,lo(4) 4) That is, H is the set of permutation in S4 that leave the element 4 in its place. (i) Prove that H is a subgroup of S4. (ii) Prove that S is isomorphic to H. Explicitly give an isomorphism f: S3 → H listing the 6 elements of S, and giving the permutation in H to which it is sent under f. (ii) 1S "Spot check" the homomorphism property by showing that 5) Leth-{ơes,lo(4) 4) That is,...
answer fully 16. Up to isomorphism, the only infinite eyelic group is Z, under the usual addition. What are the subgroups of Z? Establish the isomorphism between Z and 22. Establish the isomorphism between Z and 3Z. In general, between Z and nz for n a positive integer. 17. According to the Fundamental Theorem of Finite Abelian Groups, up to isomorphism, a finite abelian group of order n is isomorphic to a direct product of cyclic groups of prime power...
Let Hi be a subgroup of G that is not normal in G. Let H-ф-1H1ф be a cong gate subgroup. (i) ф is an automorphism of F. Show that its restricts to an isomorphism ф : FH2-> FHI. (iüi) Show that if a e Fla but not in Flh n Fta, and if f is the irreducible polynomial for a, then f does not split over FHa (thus Fs is not a normal extension). Let Hi be a subgroup of...
(6) Prove that if H is a subgroup of Z, then there is a unique nonnegative integer m such that H = mZ. (7) Prove that every strictly increasing sequence of subgroups of Z is finite.
For each group and subgroup, what is G/H isomorphic to? (a) G = Z × Z and H = {(a, a) la Z). (b) G = [R"; j and H = {1,-1). (c) G = Z25 and H-〈(1, 1, 1, 1, 1)). 4.
(h) Show that the affine group AGL(1,q) is isomorphic to a subgroup of GL(2,9), the general linear group of non-singular matrices over GF(q), by using the mapping ax + b (Why is this an isomorphism?) [10] (8 h
1. Let G - Z. Let H - {0,3,5,9) be a subgroup of (you do not need to prove this is a subgroup of G). Prove that G/l is a valid quotient group. Explain what the elements of G/H are and what the group operation is. 2. Let G be a group and H a normal subgroup in G. I E H for all IEG, then prove that G/H is abelian
= (3) Consider the transposition Ti (2,3) in the symmetric group S3. (a) Prove that H = {e, Ti} is a subgroup of S3. (b) Compute the index of H in S3. (c) Compute the set of left cosets S3/H. (d) Compute the set of rightcosets H\S3.
thanks 9. (10 ) Suppose that H and K are distinct subgroups of G of index 2. Prove that HnK is a normal subgroup of G of index 4 and that G/(Hn K) is not cyclic. (Hint. Use the 2nd Isomorphism Theorem) 9. (10 ) Suppose that H and K are distinct subgroups of G of index 2. Prove that HnK is a normal subgroup of G of index 4 and that G/(Hn K) is not cyclic. (Hint. Use the...