Answer to Question #291292 in Abstract Algebra for Jph

Question #291292

Let G be a group of order 11 2 :13 2 how many 11sylow subgroups and 13 sylow subgroups are there in G

Expert's answer

"O(G)=11^{2} 13^{2}"

The number of 11 Sylow subgroups are of the form t=1+11 k

since t divides O(G)

"\\Rightarrow t\\ divides\\ 11^{2} 13^{2}\n\n\\\\\\Rightarrow 1+11 k\\ divides\\ 13^{2}\n\n\\\\\\Rightarrow 1+11 k=1\n\n\\\\\\Rightarrow k=0"

Number of 11- Sylow subgroup =1

Since all 11-Sylow subgroups are conjugate and there is only one 11-Sylow subgroup implies the 11-Sylow subgroup is normal.

With the similar argument we can show that there is one 13-Sylow subgroup which is normal.

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