Name:
Anonymous
2009-01-28 11:07
but 3*.333...=.999...
1 =/= 0;
Name:
Anonymous
2009-01-28 17:13
Basic fucking math analysis
It's not hard at all to show that the repeating decimal 0.9999... equals 1.
Geometric sequences.
.999= 9/10 + 9/100 + 9/1000 + ...
The decimal .999... is a geometric series with the first term 9/10 and common ratio 1/0
Using the forumala a/(1-r), you get .999... = (9/10)/(1-(1/10)) = (9/10)/(9/10)=1
QED
Fags.
Prove me wrong.