Re: Rational numbers, irrational numbers: each dense in real numbers

On Sep 20, 2:55 pm, "Ross A. Finlayson" <r...@xxxxxxxxxxxxxxx> wrote:
On Sep 19, 9:09 am, MoeBlee <jazzm...@xxxxxxxxxxx> wrote:

On Sep 18, 2:43 pm, "Ross A. Finlayson" <r...@xxxxxxxxxxxxxxx> wrote:

Any ordinal equivalent to the set of irrationals would do. (Ordinals
are sets of lesser ordinals.)

Yes, any ordinal equinumerous with the set of irrationals would do.
That's fine. But let us know when you identify the mistake later in
your argument.

Well, let's hear it. Don't be coy, if you see an error note it.

No, I do that so often with other cranks. I think it would be more
interesting to lead you to it. So a hint: look more closely at the
definition of 'well ordering'.

MoeBlee

.

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