8.4 The Sylow Theorems
1. Since |S4| = 23 · 3, the Sylow 3-subgroups are all cyclic of order 3, and thus have the form P = 
γ 
, γ = (i j k). Now σ(123)σ−1 = (σ(1)σ(2) σ(3)) for all σ 
S4 (Lemma 3 §2.8) so let 
where {1, 2, 3, 4} = {i, j, k, x}. Then σ(123)σ−1 = (ijk) so γ and (1 2 3) are conjugate. Hence P and (123) are conjugate.
γ , γ = (i j k). Now σ(123)σ−1 = (σ(1)σ(2) σ(3)) for all σ S4 (Lemma 3 §2.8) so let where {1, 2, 3, 4} = {i, j, k, x}. Then σ(123)σ−1 = (ijk) so γ and (1 2 3) are conjugate. Hence P and (123) are conjugate.
3. P is a Sylow p-subgroup of N(P), being a p-subgroup of maximal order. It is unique because it is normal in N(P).
5. Let |G| = 1001 = 7 · 11 · 13. We have n7 = 1, 11, 13, 143 and n7 ≡ 1 (mod 7), so n7 = 1. Similarly n11 = 1, 7, 13, 91 and n11 ≡ 1 (mod 11), so n11 = 1; and n13 = 1, 7, 11, 77 and n13 ≡ 1 (mod 13) so n13 = 1. Thus let H 
G, K G, L G have order | ...
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