Sujet : Re: More complex numbers than reals?
De : chris.m.thomasson.1 (at) *nospam* gmail.com (Chris M. Thomasson)
Groupes : sci.mathDate : 11. Jul 2024, 06:33:21
Autres entêtes
Organisation : A noiseless patient Spider
Message-ID : <v6nqr2$2as5t$1@dont-email.me>
References : 1 2 3 4 5 6
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On 7/9/2024 3:29 PM, FromTheRafters wrote:
Chris M. Thomasson formulated the question :
On 7/9/2024 10:30 AM, Ben Bacarisse wrote:
WM <wolfgang.mueckenheim@tha.de> writes:
>
Le 09/07/2024 à 14:37, Ben Bacarisse a écrit :
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A mathematician, to whom this is a whole new topic, would start by
asking you what you mean by "more". Without that, they could not
possibly answer you.
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Good mathematicians could.
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So, what do you mean by "more" when applied to
sets like C and R?
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Proper subsets have less elements than their supersets.
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Let's see if Chris is using that definition. I think he's cleverer than
you so he will probably want to be able to say that {1,2,3} has "more"
elements than {4,5}.
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I was just thinking that there seems to be "more" reals than natural numbers. Every natural number is a real, but not all reals are natural numbers.
Seems is a funny word. Does there not 'seem' to be 'more' naturals than primes? Intuition fails, these sets are of the same cardinality.
[...]
I do think that the number of primes is infinite in the sense that they are all in the naturals. Every prime is a natural, but not every natural is a prime? Strange thoughts? Is there a countable number of infinite primes, just like there is a countable number of infinite naturals? Fair enough? countable as in if this natural number passes inspection, its a prime?
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