Re: how

On 4/19/24 11:37 AM, WM wrote:

Le 19/04/2024 à 00:42, Richard Damon a écrit :

On 4/18/24 10:59 AM, WM wrote:

 

>
ω follows upon all natural numbers. There is nothing between them and ω.

 

Right, and any Natural Number * 2 is a Natural Number, so less than ω.

 If all elements of the set {1, 2, 3, ...} are doubled and nevertheless remain below ω, then you have created new natural numbers which have not been doubled. Hence you have not doubled all natural numbers. But that is what has to be done and, according to actual infinity, can be done.

Nope. The numbers were always there. That is just the nature of an unbounded set.
You are just using logic which can't deal with unbounded sets.

>
Your logic can't handle the fact that the set of Natural  Numbers is unbounded on the high side, so it doesn't understand that.

 Your logic can't double all natural numbers such that none below ω is missing. You create always new natural numbers. They have  not been doubled.

Nope. The whole countable infinity was always theres and all of them map to that subset of them.
That is just how infinite sets work, and why your bounded logic just blows up your mind when you erroneously apply it to them.

 Regards, WM