Prove to me that real numbers are not countable

No.11647653 ViewReplyOriginalReport
The "real numbers aren't countable" says cantor the cunt, but he's WRONG

Here is a simple method that pairs ALL real numbers with ALL natural numbers

start with number A

enumerate all base fractions between A and A+1 (if base is 10, then A+1/10, A+2/10...etc.)

move to A-1

enumerate all base fractions between A-1, A. enumerate all base fractions of base fractions between A, A+1 (A+1/100,A+2/100,etc.) enumerate all base fractions between A+1 and A+2

move to A-2

repeat the fraction process until you get to A+3

move to A-3

repeat the fraction process until you get to A+4

etc.

Given infinite steps, the entirety of the real numbers are pairs to the natural numbers. This is incontestable. You literally can not prove me wrong.