Some things w/ infinity
I think theoretically. Thus infinity and 0 are perfectly real in this way of thought. I did not see this somewhere, as you so seem to say, but I THOUGHT of it. I have been seeing 0 and infinity, and I find myself liking them very much. I wanted to find the answers to the calculations that you can make with them, and thus this page.Originally posted by Fringan@Sep 28 2004, 06:31 AM
The first thing you have to understand is that you cannot divide anything with 0. The whole idea with infinity is that there is no smallest (or largest) measurement of space or time. When I type for instance 1/0, I don't really mean exactly 1/0. It's just a simplification of something like (hope this goes well in ascii) :
lim?????x^2-y^2
x->0??-----------
?????????????x-y
Calculating a derivata as done above is a good example of how you can not divide by null but only go as close as 0 as possible (or nessecary). To make it simpler you type 1/0 instead of typing something like \"1 divided by 1*10^-y where y is an incredibly large number, like a trillion-trillion-billion-zillion-zackawillions\"
The simple reason to do this is to save paper, ink and time. In order to understand this you must also understand there both is and is no infinity (you actually never get to infinity, you just pretend to in math by dividing by zero which is, as you now know, not possible).
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