Date: Feb 17, 2013 5:26 PM
Author: William Hughes
Subject: Re: Matheology § 222 Back to the roots
On Feb 17, 10:02 pm, WM <mueck...@rz.fh-augsburg.de> wrote:
> There is no d!
There is no potentially infinite sequence,
x, such that the nth FIS of x consists of
x is not the diagonal of the potentially
> There is for every FIS of d a FIS of a line.
> That's all we can know and say about d.
> > WM denies saying
> > There is no line l such that
> > l and d are coFIS
> > Do you agree
> > For every natural number n,
> > the nth line and d are not coFIS.
> On the contrary! For every latural number the n-th line and d_1, ...,
> d_n are coFIS. Please name a natural number (without falling back to
> "all natural numbers" which is not allowed in potential infinity) such
> that there is no line that is coFIS with some d_1, ..., d_n. And
> remember, there is no d other than every d_1, ..., d_n.
> Regards, WM