[seqfan] Re: Frobenius Numbers

[Neil Sloane]

well, it would be OK to add a handful of them, but don't overdo it!
Neil

On Sat, Aug 4, 2012 at 2:51 AM, Veikko Pohjola <veikko at nordem.fi> wrote:

> You can obviously construct an infinite set of Frobenius number sequences
> from k consecutive triangular (or whatever being relatively prime) numbers
> letting k grow. What would be the judgement of those sequences being of
> general interest?
> Veikko
>
> ----- Original Message ----- From: "Harvey P. Dale" <hpd1 at nyu.edu>
> To: "Sequence Fanatics Discussion list" <seqfan at list.seqfan.eu>
> Sent: Wednesday, July 25, 2012 9:28 PM
> Subject: [seqfan] Frobenius Numbers
>
>
>
>             A069756 gives the Frobenius numbers for any two consecutive
>> square numbers, and A069755 gives the Frobenius numbers for any three
>> consecutive triangular numbers.  Obviously, other possible sequences are
>> possible, e.g., (1) Frobenius numbers for any three consecutive square
>> numbers, (2) Frobenius numbers for any four consecutive triangular
>> numbers, etc.  Are any of these of sufficient interest to include in the
>> OEIS?
>>
>>            Best,
>>
>>            Harvey
>>
>>
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>
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-- 
Dear Friends, I have now retired from AT&T. New coordinates:

Neil J. A. Sloane, President, OEIS Foundation
11 South Adelaide Avenue, Highland Park, NJ 08904, USA
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