Re: How many different unit fractions are lessorequal than all unit fractions? (infinitary)

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Sujet : Re: How many different unit fractions are lessorequal than all unit fractions? (infinitary)
De : richard (at) *nospam* damon-family.org (Richard Damon)
Groupes : sci.math
Date : 01. Nov 2024, 00:43:33
Autres entêtes
Organisation : i2pn2 (i2pn.org)
Message-ID : <9ca97f4a24ae1e3041583265125cf860d2fada11@i2pn2.org>
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On 10/31/24 1:35 PM, WM wrote:
On 31.10.2024 12:36, Richard Damon wrote:
On 10/30/24 11:38 AM, WM wrote:
 
NUF(x) MUST jump from 0 to Aleph_0 at all real values x, as below ANY real number x, there are Aleph_0 unit fractions.
 You cannot distinguish them by any real number? That proves that they are dark.
 Regards, WM
 
They are not finite values.
We have gone over this before, and you keep on changing your mind, as you are stuck in an inconsistancy.
If you want a value where NUF(x) would be 1, it can not be in any of the finite number systems, as all of them have no smallest value.
They CAN be in a trans-finite number system, like the infinitesimals, but then they are not "dark", just non-finite.
When this is pointed out, you try to say that you mean for your dark numbers to be finite, but they can't be, as all those values are definable by the rules of the finite numbers.

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2 Sep 24 +* Re: How many different unit fractions are lessorequal than all unit fractions?2098Richard Damon
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