Re: Construct compact set of R whose limit points form a countable set
From: Shmuel (Seymour J.) Metz (spamtrap_at_library.lspace.org.invalid)
Date: 10/10/04
- Next message: Shmuel (Seymour J.) Metz: "Re: Skolem's Paradox and why is math the way it is?"
- Previous message: Shmuel (Seymour J.) Metz: "Re: compactness"
- In reply to: James: "Construct compact set of R whose limit points form a countable set"
- Next in thread: Dave L. Renfro: "Re: Construct compact set of R whose limit points form a countable set"
- Messages sorted by: [ date ] [ thread ]
Date: Sat, 09 Oct 2004 21:45:58 -0300
In <135bec53.0410071658.4b6d564e@posting.google.com>, on 10/07/2004
at 05:58 PM, ADemetris@gmail.com (James) said:
>Construct a compact set of real numbers whose limit points form a
>countable set.
>How should I start?
Take away the middle third.
-- Shmuel (Seymour J.) Metz, SysProg and JOAT <http://patriot.net/~shmuel> Unsolicited bulk E-mail subject to legal action. I reserve the right to publicly post or ridicule any abusive E-mail. Reply to domain Patriot dot net user shmuel+news to contact me. Do not reply to spamtrap@library.lspace.org
- Next message: Shmuel (Seymour J.) Metz: "Re: Skolem's Paradox and why is math the way it is?"
- Previous message: Shmuel (Seymour J.) Metz: "Re: compactness"
- In reply to: James: "Construct compact set of R whose limit points form a countable set"
- Next in thread: Dave L. Renfro: "Re: Construct compact set of R whose limit points form a countable set"
- Messages sorted by: [ date ] [ thread ]
Relevant Pages
|
Loading
