Re: Solutions to Power Series
From: Peter Pan (RMoebs1_at_compuserve.de)
Date: 07/25/04
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Date: 25 Jul 2004 14:55:19 -0700
Jon wrote
> > If T*N+a[0] is the nth degree polynomial where T=(t,t^2,t^3,...,t^n),
> > N=(a[1],a[2],a[3],...,a[n]), if T is described from two orthogonal
> > systems, its linear requirement precipitates. T remains invariant
> > despite the coordinate system used to describe it. Consequently, my
> > revised web site showing the details,
> > EXAMPLE
> >
> > (t-2)(t-3)(t-4)=0
> > (t^2-5t+6)(t-4)=0
> > t-4
> > -------------
> > t^3-5t^2+ 6t
> > -4t^2+20t-24
> > ----------------
> > t^3-9t^2+26t-24
> >
> > N=+/-(26,-9,1)
REVOLUTIONARY !!!
Why don't you tell C.F. Gauss or E. Galois; they would love to hear
that you have easily solved a problem they have shown to be
principally not solvable!!!
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