On 3/18/2013 10:45 AM, WM wrote: > On 18 Mrz., 13:50, William Hughes <wpihug...@gmail.com> wrote: > >> So you take a set of lines that contains an unfindable line >> remove all the findable lines and end up with a set >> that contains an unfindable line, but no findable line ?!? > > If you remove every findable line, there cannot remain a findable > line, can it? > > But the more pressing question is: You construct a list such that > every line contains all preceding contents. You get ready, i.e., the > list contains all that it can contain. Nevertheless there is no line > that contains everything that the list contains.
I knew this looked familiar.
So, I have some real space with an algebraic dimension given by the finite list of its coordinates.
But, absent continuity constraints, it all fits on one line having a single coordinate.