Path: ...!weretis.net!feeder9.news.weretis.net!news.nk.ca!rocksolid2!i2pn2.org!.POSTED!not-for-mail From: Richard Damon Newsgroups: sci.logic Subject: Re: Incompleteness of Cantor's enumeration of the rational numbers (extra-ordinary) Date: Sat, 14 Dec 2024 09:08:48 -0500 Organization: i2pn2 (i2pn.org) Message-ID: References: <35274130-ffa0-4d11-b634-f2feb3851416@tha.de> MIME-Version: 1.0 Content-Type: text/plain; charset=UTF-8; format=flowed Content-Transfer-Encoding: 8bit Injection-Date: Sat, 14 Dec 2024 14:08:49 -0000 (UTC) Injection-Info: i2pn2.org; logging-data="2822012"; mail-complaints-to="usenet@i2pn2.org"; posting-account="diqKR1lalukngNWEqoq9/uFtbkm5U+w3w6FQ0yesrXg"; User-Agent: Mozilla Thunderbird X-Spam-Checker-Version: SpamAssassin 4.0.0 Content-Language: en-US In-Reply-To: Bytes: 3778 Lines: 47 On 12/14/24 3:53 AM, WM wrote: > On 14.12.2024 09:41, Mikko wrote: >> On 2024-11-19 11:04:08 +0000, WM said: >> >>> On 19.11.2024 10:32, Mikko wrote: >>>> On 2024-11-18 14:29:40 +0000, WM said: >>>> >>>>> On 18.11.2024 10:58, Mikko wrote: >>>>>> On 2024-11-17 12:46:29 +0000, WM said: >>>>> >>>>>>> There are 100 intervals for each natural number. >>>>>>> This can be proven by bijecting J'(100n) and J(n). My intervals >>>>>>> are then exhausted, yours are not. >>>>>> >>>>>> Irrelevant. >>>>> >>>>> Very relevant. >>>> >>>> It is not relevant if no relevancy is shown. >>> >>> But if relevancy is only deleted, it can show up again: >>> >>> Every finite translation of any finite subset of intervals J(n) >>> maintains the relative covering 1/5. If the infinite set has the >>> relative covering 1 (or more), then you claim that the sequence 1/5, >>> 1/5, 1/5, ... has limit 1 (or more). >> >> There is a bijection between your J and my J', where >> J'(n) = (n/100 - 1/10, n/100 + 1/10): for each n there >> is one interval J(n) and one interval of J'(n). Whateever >> you infer from that is either an invalid inference or >> a true conclusion. >> > Please refer to the simplest example I gave you on 2024-11-27: > The possibility of a bijection between the sets ℕ = {1, 2, 3, ...} and D > = {10n | n ∈ ℕ} is contradicted because for every interval (0, n] the > relative covering is not more than 1/10, and there are no further > numbers 10n beyond all natural numbers n. The sequence 1/10, 1/10, > 1/10, ... has limit 1/10. > > Regards, WM > Except that we aren't dealng with the FINITE sets of {1, 2, 3, ..., n} but for the full set of { 1, 2, 3, ... } All you are proving is that you don't understand that infinity isn't finite, and that you logic is basdd on LIES.