In article <email@example.com>, WM <firstname.lastname@example.org> wrote:
> On 10 Apr., 08:59, William Hughes <wpihug...@gmail.com> wrote: > > > Next argument.- > > Consider a Cantor-list that contains a complete sequence (q_k) of all > rational numbers q_k. The first n digits of the anti-diagonal d are > d_1, d_2, d_3, ..., d_n. It can be shown for every n that the Cantor- > list beyond line n contains infinitely many rational numbers q_k that > have the same sequence of first n digits as the anti-diagonal d. > Proof: There are infinitely many rationals q_k with this property.
Claiming what you are trying to prove does not constitute a proof of what you are trying to prove.