```Date: Mar 15, 2013 8:02 PM
Author: Virgil
Subject: Re: Matheology � 224

In article <0c0b10c7-65f5-4de7-ac70-b038d6e356e4@r8g2000vbj.googlegroups.com>, William Hughes <wpihughes@gmail.com> wrote:> On Mar 15, 8:34 pm, WM <mueck...@rz.fh-augsburg.de> wrote:> > > > Let's first prove that already two cannot be necessary by the fact> > that two always can be replaced by one of them without changing the> > contents.> > > This is true but the fact that the two lines are> necessary has nothing to do with their contents.  Two lines> cannot be replaced by one of them without changing the number> of lines.> > Consider the case is potential infinity.> A set of lines, K, that has an unfindable last number> must contain at least two findable lines.> The fact that these two lines are necessary has> nothing to do with the contents of the lines.How can a set of lines be made to HAVE an unfindable last line unless one can somehow FIND that allegedly unfindable last line?Outside of WMytheology, it can't. Which demonstrates the MYTHeology in W-MYTH-eology--
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