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On 11/4/24 5:47 AM, WM wrote:
The intervals cannot be dense because they have a length of less than 3 in an infinite space. The rationals are dense. This proves that they are not countable.>>I said the nearest one. There is no interval nearer than the nearest one.Unless "nearest" isn't a thing because things are dense.
It is proven in an inconsistent theory. I describe the true mathematics.No, it is a PROVEN statement, therefor true.Therefore the>
point has no nearest interval.
That is an unfounded assertions and therefore not accepted.
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