Probstat/notes/balls and bins
- This is part of probstat. The materials on this part is from this course at Berkeley.
We consider a balls-and-bins experiment where we throw n balls independently into n bins uniformly at random.
Question 1: How many possible outcomes are there?
Since each ball has n choices and their choices are independent, there are outcomes.
Question 2: What is the probability that bin 1 is empty?
In this case, each ball only have n - 1 choices (because they have to avoid bin 1); therefore there are outcomes where bin 1 is empty. Since each outcome is equally likely, the probability that bin 1 is empty is .
Number of empty bins
Let random variable X be the number of empty bins.
{{{1}}}
It will be very hard to compute E[X] directly. (Just computing P{ X = 3 } seems to be exceedingly hard.)