Prove that there are no simple groups of order pm where p is
Prove that there are no simple groups of order pm, where p is a prime and m with 1
Solution
Solution :
pr m = 1 m ... pi ... ... pj m ... pr m
p-sylow x
p divides everything beyond m, and m cannot equal 1 mod p because 1 < m < p, therefore there is only one possible p-sylow subgroup.
