Date: Oct 5, 2017 6:24 PM
Author: mitchrae3323@gmail.com
Subject: Re: There is No quantity inbetween .9 repeating and 1

On Wednesday, October 4, 2017 at 2:45:49 AM UTC-7, Zelos Malum wrote:
> Den onsdag 4 oktober 2017 kl. 05:18:42 UTC+2 skrev mitchr...@gmail.com:
> > On Tuesday, October 3, 2017 at 8:10:05 PM UTC-7, Zelos Malum wrote:
> > > Den måndag 2 oktober 2017 kl. 20:24:47 UTC+2 skrev mitchr...@gmail.com:
> > > > On Monday, October 2, 2017 at 3:05:30 AM UTC-7, Zelos Malum wrote:
> > > > > Den måndag 2 oktober 2017 kl. 05:04:50 UTC+2 skrev mitchr...@gmail.com:
> > > > > > Add the infinitely small to .9 repeating and you get 1.
> > > > > > .9 repeating is a Transcendental One.
> > > > > > They share a Sameness that is different only by
> > > > > > the smallest first quantity or 1 divided by
> > > > > > infinity or the infinitely small.
> > > > > >
> > > > > > Mitchell Raemsch

> > > > >
> > > > > There are no infinitesimals in reals so no, 0.999...=1

> > > >
> > > > One divided by infinity gives you the first quantity
> > > > to exist. By the Continuum Hypothesis there is
> > > > an infinity of the infinitely small creating one.
> > > > The is the quantity continuum.
> > > >
> > > > .999 repeating shares a sameness to one because
> > > > there is no quantity in between them.
> > > >
> > > > Mitchell Raemsch

> > >
> > > You clearly have no clue what the continuum hypothesis says.

> >
> > .999 repeating and integer 1 are the end of a size of infinity
> > of the infinitely small. The end of the continuum of quantities.
> >
> > Mitchell Raemsch

>
> So you do NOT know what the conntinuum hypothesis says clearly and you are just doing word sallad.


You have found your truth... I have mine...
There is a continuum of quantity called
an infinity size of the infinitely small.
Creating the finite integers.

Mitchell Raemsch