MathOverflow will be down for maintenance for approximately 3 hours, starting Monday evening (06/24/2013) at approximately 9:00 PM Eastern time (UTC-4).
1

1

Let $G$ be a finite group. Let $\pi(G)={2,3,5}$ be the set of prime divisors of its order of $G$. If 6 divide the number of Sylow 5-subgroups of $G$ and 10 divide the number of Sylow 3-subgroups of $G$, then whether the group $G$ group with those properties is unsolvable? Thank you so much.

flag
In particular if the number of Sylow $5$-subgroups of $G$ is 6 and the number of Sylow $3$-subgroups of $G$ is 10, then by the Hall's theorem $G$ is unsolvable group. Because if $G$ is solvable, then $2\equiv 1$ (mod $5$), a contradiction. – Niki Jun 16 2012 at 13:36
1 
 How did you come upon this question? – S. Carnahan Jun 16 2012 at 15:53
1 
 homework 3 exercise 4? – Anthony Quas Jun 16 2012 at 16:14
@Anthony Quas: I'm sure you do not know what the answer. – Niki Jun 16 2012 at 19:05
@Niki, I am sure Anthony could work it out easily. Please read mathoverflow.net/faq#whatnot – Yemon Choi Jun 16 2012 at 21:17
show 2 more comments

closed as too localized by Felipe Voloch, Chandan Singh Dalawat, Andres Caicedo, Anthony Quas, Chris Godsil Jun 16 2012 at 17:23

Browse other questions tagged or ask your own question.