Number-theory problem (from another forum)

JaneFairfax · 2011-06-09 04:10:57

The following problem was posted by someone else on another forum but has not received any reply on that forum. Im re-posting it here so people here can have a crack at it.

bobbym · 2011-06-09 07:26:51

Hello JaneFairfax;

gAr · 2011-06-09 17:46:17

Hi all,

I don't know whether there are infinite integers satisfying the congruences.
All the 40 integers are in between -305 and 271.
I combined those to:

I'm stuck here!

gAr · 2011-06-09 23:10:53

Hi,

An update:
There were 4 duplicates in the answer I calculated, so there are 36 solutions.
All the answers are of the form:

I still can't prove that there are more solutions or not.

bobbym · 2011-06-09 23:16:39

Hi all;

A little bit more:

The system of quadratic congruences can be reduced down to a system of linear congruences.

As a consequence of the above congruences we can say.

And:

We can now form the 2 linear congruences:

With:

Which just means nm = {...-33, -16, 1,18,35,52,69,86,...}

Unfortunately, I still am unable to prove using this easier set of congruences that there are just 40 solutions.

gAr · 2011-06-09 23:24:13

Hi bobbym,

From my previous post, is it possible to determine or prove that there are finite values of n satisfying the condition?

bobbym · 2011-06-09 23:27:51

Hi gAr;

I did not see that. I will look at it now.

gAr · 2011-06-09 23:29:59

Okay.

bobbym · 2011-06-09 23:40:04

Hi gAr;

So far I am unable to go the last step. I am checking on CRT right now. One question before we move on.

Here is my 40, in (m,n) form. How are you getting 36?

gAr · 2011-06-10 00:02:28

Hi bobbym,

Yes, those are the values I'm also getting. I made a mistake when comparing the methods.
I took n from the brute force method and put it in the fraction, and got 4 duplicate m's.

bobbym · 2011-06-10 00:05:46

Hi gAr;

Your parametric form is beautiful but it does leave out some solutions.

gAr · 2011-06-10 00:22:43

Yes, sad!
But it yields only integers when the n from the answer is substituted, so that form is okay, I guess.
Need to patch it!

*edit: The 4 missing values from the parametric form:
(-18,1)
(-16,1)
(-1,16)
(1,18)

Last edited by gAr (2011-06-10 00:39:31)

gAr · 2011-06-14 02:32:03

Hello everybody,

Any updates on this?

bobbym · 2011-06-14 02:37:34

Hi gAr;

Nothing on this end.

gAr · 2011-06-14 02:45:39

Hi bobbym,

Okay, I wonder whether JaneFairfax or the other forum has got something.
Just curious.

bobbym · 2011-06-14 02:50:38

Hi gAr;

I could not find the other forum. I tend to think the problem may have a mistake. Usually when someone posts a number theory question it has no solutions, a couple of solutions or an infinite number of solutions. It looks like this one has just 40 solutions, that is odd.

gAr · 2011-06-14 02:57:42

Yes, that's really odd.
And 40 doesn't even seem to be related to 17.

bobbym · 2011-06-14 03:07:41

Also the fact that the 40 solutions occur so early and in such a small interval.

gAr · 2011-06-14 03:15:15

Yes!
I'll wait for JaneFairfax, she knows number theory more than I do.

bobbym · 2011-06-14 03:21:50

That sounds like a good idea right now.

Avon · 2011-06-15 12:04:00

The first two congruences are equivalent to

.

17n-1 and 17m+1 cannot be 0 so we have

and
.

Hence if

then
and if then .

Now suppose that |m| > 17 and |n| > 17.
It follows from the two congruences above that

so
.

17n-17m-1 cannot be 0 so we have

so
and hence .

Since |m|-17 and |n|-17 are both positive integers it follows that

and similarly .

Therefore if (m,n) is a solution to these congruences then |m| and |n| are both at most 307
and so the bobbym's brute force search has found all of the solutions.

gAr · 2011-06-15 19:34:23

Hi Avon,

Thanks!

Math Is Fun Forum

#1 2011-06-09 04:10:57

Number-theory problem (from another forum)

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Re: Number-theory problem (from another forum)

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