Re: Two results of set geometry

On Sep 27, 4:05 pm, WM <mueck...@xxxxxxxxxxxxxxxxx> wrote:
On 27 Sep., 14:59, William Hughes <wpihug...@xxxxxxxxxxx> wrote:



On Sep 27, 7:26 am, WM <mueck...@xxxxxxxxxxxxxxxxx> wrote:

On 26 Sep., 23:04, William Hughes <wpihug...@xxxxxxxxxxx> wrote:

<snip>

There is a bijection between the *elements* of the complete column,
and the *elements* of the set of rows.

There is a bijection between the *finite* elements of the complete
column, and the elements of the set of rows. That is not in question.

And since all the elements of the complete column are finite
the statement

There is a bijection between the elements of the complete column
and the set of rows

Of course.

And an equivalent statement is

There is a bijection between the complete column and
the set of rows.


- William Hughes

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