
Re: An oo List Of REALS in ZFC
Posted:
Mar 2, 2013 9:47 PM


On Mar 3, 11:44 am, George Greene <gree...@email.unc.edu> wrote: > On Mar 2, 6:12 pm, Graham Cooper <grahamcoop...@gmail.com> wrote: > > > R1 = { (1,3) , (2,1) , (3,4) , (4,1) , (5,5) ... } > > > R1 = 0.31415... > > >  > > > LIST = { > > (1, { (1,3) , (2,1) , (3,4) , (4,1) , (5,5) ... } ) , > > (2, { (1,1) , (2,4) , (3,1) , (4,4) , (4,2) ... } ) , > > So? > It's a countablyinfinitelylong list of reals. > It's obviously NOT a list of ALL of them. > In particular, its antidiagonal IS NOT ON it. >
That "An ANTIDIAGAONAL is not any ROW" is a Structural Postulate of 2 dimensional arrays and has no bearing on the DATA in the list.
It's merely DIGITn ~= ~DIGITn
State your antidiagonal function and SEE what strings are uncountable on this LIST.
0.00.. 0.00.. ..
YOU ARE WRONG GEORGE!
That is why you DODGE EVERY THREAD once a difficult question arises.
You can use SHODDY LOGIC But you INSIST TO THE REST OF THE WORLD they must too!
Herc

