On Saturday, December 21, 2013 6:22:05 PM UTC-4, jonas.t...@gmail.com wrote:
> You see it is all very simple to be able to claim that 0.999... actually add up to 1. You must be able to prove that there is such x that 10^-x actually equals zero and i do not see how you can.
You can't because it is never true. Fortunately, you dont't have to. 0.111... is equal to 1. (Hint look at the *limit* of the partial sums. Or look up the definition of infinite sum in a first year Calculus book. It has nothing to do with your imbecilic twaddle about adding up an infinite number of integers.)