I am using Perl to model a random variable (`Y`

) which is the sum of some ~15-40k independent Bernoulli random variables (`X_i`

), each with a different success probability (`p_i`

). Formally, `Y=Sum{X_i}`

where `Pr(X_i=1)=p_i`

and `Pr(X_i=0)=1-p_i`

.

I am interested in quickly answering queries such as `Pr(Y<=k)`

(where `k`

is given).

Currently, I use random simulations to answer such queries. I randomly draw each `X_i`

according to its `p_i`

, then sum all `X_i`

values to get `Y'`

. I repeat this process a few thousand times and return the fraction of times `Pr(Y'<=k)`

.

Obviously, this is not totally accurate, although accuracy greatly increases as the number of simulations I use increases.

Can you think of a reasonable way to get the exact probability?

exactprobability you need to either find the formula in a statistics book or derive it yourself using calculus. In other words, this is not really a programming question. On the other hand, when you do find a formula that purports to give the answer, you'll want to make sure the formula is consistent with the best simulation you've been able to program. – Narveson Dec 10 '10 at 16:30`p_i`

s are usually very small. In some cases a Poissonian is much better than a Gaussian. – David B Dec 11 '10 at 13:26