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On 11/26/2024 2:15 PM, WM wrote:It contradicts inclusion monotony.On 26.11.2024 19:49, Jim Burns wrote:It contradicts ℕᶠⁱⁿ being finite, nothing else.There are no last end.segments of ℕᶠⁱⁿ>
There are no finitely.sized end segments of ℕᶠⁱⁿ
There are no finite cardinals common to
each end.segment of ℕᶠⁱⁿ
That is a contradiction.
Then also no numbers are remaining in the endsegments.If there are no common numbers,Yes.
then all numbers must have been lost.
But then no numbers are remaining.
Each finite.cardinal k is countable.past toThat is true. But you claimed that every endsegment is infinite. In an infinite endsegment numbers are remaining. In many infinite endsegments infinitely many numbers are the same.
k+1 which indexes
Eᶠⁱⁿ(k+1) which doesn't hold
k which is not common to
all end segments.
Each finite.cardinal k is not.in
the intersection of all end segments,
the set of elements common to all end.segments,
which is empty.
No numbers are remaining.
That does not contradict the fact that infinite endsegments have infinitely many numbers in common and hence an infinite intersection.Then there are finite endsegments becauseFor each cardinal.which.can.change.by.1 j
∀k ∈ ℕ: |E(k+1)| = |E(k)| - 1.
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