madmike159
Nov6-08, 12:06 PM
I was reading part of a book which was explaining about the probability of finding a partical on a 1d line.
\int^{+\infty}_{-\infty}P(x) dx = 1
This sounds right because if the line was infinitely long then the partical must be on it.
You can them intergrate between a and b to find the probability of it being in a lenght and if a and b were the same the probability would be 0.
But when you intergrate P(x) dx you get \frac{Px^{2}}{2}
by putting the numbers in you get P\infty - -P\infty
or P\infty + P\infty = P\infty
A probability can't be more than 1. I must be missing something or dealing with the infinities in the wrong way.
(Sorry it looks like P^infinity its P x infinity but I couldn't change it.)
\int^{+\infty}_{-\infty}P(x) dx = 1
This sounds right because if the line was infinitely long then the partical must be on it.
You can them intergrate between a and b to find the probability of it being in a lenght and if a and b were the same the probability would be 0.
But when you intergrate P(x) dx you get \frac{Px^{2}}{2}
by putting the numbers in you get P\infty - -P\infty
or P\infty + P\infty = P\infty
A probability can't be more than 1. I must be missing something or dealing with the infinities in the wrong way.
(Sorry it looks like P^infinity its P x infinity but I couldn't change it.)