>"""""law""""" of large numbers
>it's actually a theorem.
>define """""large"""""
>>8463298
Isn't it technically "the sum of a large number of uniform random variables will tend toward a normal random distribution"?
>>8463427
Oh wait, never mind, it's just "a large number of random variables will approach the proportion of the random distribution they are samples from.
>>8463298
>Pythagorean """""""""""""""""""""""""""""""""Theorem"""""""""""""""""""""""""""""""""
>>8463427
No it's the Laplace-Gauss Theorem. Law of Large number is that is [math] ( X_n ) [/math] is a sequence of integrable random variables i.i.d then
[eqn] \frac{1}{n}\sum_{k=1} X_k [/eqn] converges p.s. toward [math]\mathbf{E}(X_1)[/math]
>>8463609
Yeah okay, so my second post.