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tech / sci.math / Re: Why actually Polynomials are basically Diophantine equations?

Re: Why actually Polynomials are basically Diophantine equations?

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Subject: Re: Why actually Polynomials are basically Diophantine equations?
From: b.karzed...@yahoo.com (bassam karzeddin)
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by: bassam karzeddin - Wed, 2 Aug 2023 00:22 UTC

On Saturday, March 3, 2018 at 8:21:09 PM UTC+2, bassam king karzeddin wrote:
> On Saturday, April 22, 2017 at 5:20:05 PM UTC+3, bassam king karzeddin wrote:
> > It is not so hard to recognize this simple truth for a given Polynomial of (nth) degree, and becomes easily clearer if the given polynomial of odd degree, where then it is more than trivial case even first by trial and error to substitute a rational number or generally a constructible number in its simple form, for a solution as (n/m), for some nonzero integer (n),
> >
> > And if your solution requires both your integers (n and m) to be each with infinite sequence of digits, then your solution actually either a constructible number or an approximate solution that actually does not exist for that polynomial or that same Diophantine equation
> >
> > Regards
> > Bassam King Karzeddin
> > 22th, April, 2017
The origin of polonomials are the Diaphontine Equations
BKK

Subject	Author
Re: Why actually Polynomials are basically Diophantine equations?	bassam karzeddin