any maths geeks out there?
Sep. 11th, 2002 02:30 pm![[personal profile]](https://www.dreamwidth.org/img/silk/identity/user.png){kind=small}
ajvaErm...
I am right in thinking, am I not, that a group of order 1722 can have only one Sylow 7-subgroup? Or have I missed something?
It's just that the next bit tells me to use a counting argument to show that if it has more than one then it can have only one Sylow 41-subgroup. It seems like the second question is supposed to be theoretical but I just wanted to make sure. :o(
Any comments welcome, although I don't expect I'm going to be snowed under with responses.
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Date: 2002-09-11 06:41 am (UTC)1722 = 2 x 3 x 7 x 41, its prime factorisation.
It you're taking a basic approach (which I am), then the number of Sylow subgroups divides 1722/7 i.e. 246, and is congruent to 1 modulo 7. But there isn't a value which satisfies both of these except 1 (or is there???). So there is only one Sylow 7-subgroup.
Um... is that right?
no subject
Date: 2002-09-11 06:59 am (UTC)Yes there is: 246 = 1 (mod 7).
D'oh! (A Homer Simpson moment)
Date: 2002-09-11 07:05 am (UTC)Cheers Paul. ;o)
Also, it makes the next question a piece of piss.
A. x