Divisibility by 7

JaneFairfax · 2009-08-09 04:56:01

bobbym · 2009-08-09 05:46:09

Hi Jane;

There are no solutions:
You only have to try n=0,1,2,3,4,5,6 to get the repetitive cycle
5,3,3,1,3,1,1... mod 7.

Last edited by bobbym (2009-08-09 05:48:14)

JaneFairfax · 2009-08-09 06:03:17

Thats one way to do it.

But there is an even better solution which does not involve being repetitive.

mathsyperson · 2009-08-09 06:14:37

Fermat's Little Theorem could be useful, as it shows that n^6 = 1 for all n ≠ 0 (mod 7).
I'm thinking there's probably a nice way of showing that a^2 = 1 ⇒ a = ± 1 (mod 7), which would then show that n^3 = 1 or 6.
Group theory isn't my best subject though, so I don't know what that nice way is.

bobbym · 2009-08-09 07:57:44

1) 0 is not a solution by inspection.

Using fermat we can prove:

Now for the n^3.

So;

So

We needed a modulo of 0 for divisibility and it doesn't exist so the 4n^6 + n^3 +5 is not divisible by 7.

Last edited by bobbym (2009-08-09 08:50:19)

JaneFairfax · 2009-08-09 09:06:02

Fermats little theorem is also an excellent way to solve the problem.

But the very short solution I have in mind doesnt even need Fermat.

bobbym · 2009-08-09 09:09:36

Hi Jane;

Okay time to look at the hidden text. I'm not following that idea. Can you show your solution?

JaneFairfax · 2009-08-09 13:29:27

Aw, dont give up so early.

bobbym · 2009-08-09 17:51:29

Hi Jane;

I did solve it in two ways already but your way remains a mystery to me.

Thanks for the big hint. I worked hard on it. Sorry to wimp out but I was unable to complete the square without getting a rational that I was unable to deal with. I came up with many interesting alternate forms like
4n^6+n^3+5 = (n^3-5)(4n^3+21)+110 which I then could use my method in post #5 on.
I tried to guess what you want but I couldn't. Please provide your method as it will an education for me.

Last edited by bobbym (2009-08-09 18:00:17)

JaneFairfax · 2009-08-09 21:52:56

Well well, you really are stuck. Well then, have a look at ValentineAs solution here: http://www.artofproblemsolving.com/Foru … p?t=294059

bobbym · 2009-08-09 22:03:53

Hi Jane;

I got here like she did:

Missed this: Didn't see the factorization. Also if I ever knew anything about
quadratic residues I forgot it.

Thanks Jane. First itiselizabeth and now ValentineA. Some smart girls over there.

Last edited by bobbym (2009-08-09 22:25:54)

JaneFairfax · 2009-08-10 01:50:42

bobbym wrote:

Also if I ever knew anything about quadratic residues I forgot it.

Quadratic residues is just a fanciful way of talking about congruences of perfect squares.

In this problem, you can verify directly that no perfect square can be congruent to −1 mod 7 by checking individually. In fact it is sufficient to check only because of the fact that for any .

Last edited by JaneFairfax (2009-08-10 01:52:30)

bobbym · 2009-08-10 08:11:47

Hi Jane;

Thanks for beefing up my quadratic residues a little, so I can forget them again. Thanks also for providing the third answer because another method is always valuable. I must say though that I like my 2 ways better.

Last edited by bobbym (2009-08-10 17:03:44)

Math Is Fun Forum

#1 2009-08-09 04:56:01

Divisibility by 7

#2 2009-08-09 05:46:09

Re: Divisibility by 7

#3 2009-08-09 06:03:17

Re: Divisibility by 7

#4 2009-08-09 06:14:37

Re: Divisibility by 7

#5 2009-08-09 07:57:44

Re: Divisibility by 7

#6 2009-08-09 09:06:02

Re: Divisibility by 7

#7 2009-08-09 09:09:36

Re: Divisibility by 7

#8 2009-08-09 13:29:27

Re: Divisibility by 7

#9 2009-08-09 17:51:29

Re: Divisibility by 7

#10 2009-08-09 21:52:56

Re: Divisibility by 7

#11 2009-08-09 22:03:53

Re: Divisibility by 7

#12 2009-08-10 01:50:42

Re: Divisibility by 7

#13 2009-08-10 08:11:47

Re: Divisibility by 7

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