1.Let G be a simple group of order 168. (1) How many Sylow 7-subgroups of G? (2) Let P be a Sylow 7-subgroup. Show that │N(P)│= 21, where N(P) is the normalizer of P in G, ie N(P)={g in G│gPg^-1=P} (3) Prove or disprove that G has a subgroup of order 14. 第一小题我有算，我算1个或8个 第二小题我的想法是，如果只有1个7-Sylow subgroup，那麽P normal in G 所以应该是有8个 7-Sylow subgroup 2. Show that a group of order 72 is not simple. 这题我有做，在一个小地方卡住，想请高手指点一下 (pf.) 72=2^3 * 3^2 Consider 3-sylow subgroups (1) If 3-sylow subgroups is normal ,then done. (2) Otherwise, there exist 4 3-sylow subgroups Let H,K be two of them => │H∩K│=(│H││K│)/│HK│= 9*9/72 =1.... & │H∩K│││K│=9 => │H∩K│= 3 ∵ H、K are abelian => H∩K is normal in H & H∩K is normal in K. i.e N_G(H∩K)＞H and N_G(H∩K)＞K => 9 =│H│││N_G(H∩K)│││G│=72 =>│N_G(H∩K)│= 18 or 36 or 72 (i) │N_G(H∩K)│= 18 (这个情况我不知该如何讨论???) (ii) │N_G(H∩K)│= 36 [G:N_G(H∩K)]= 72/36 = 2 => N_G(H∩K) is normal in G => G is not simple (iii) │N_G(H∩K)│= 72 =>│N_G(H∩K)│= │G│= 72 => N_G(H∩K)=G => H∩K is normal in G # 麻烦个位大大了!!! 感谢 --

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