The relevant question is: Algorithm to generate Poisson and binomial random numbers?

I just take her description for the Binomial random number:

For example, consider binomial random numbers. A binomial random number is the number of heads in N tosses of a coin with probability p of a heads on any single toss. If you generate N uniform random numbers on the interval (0,1) and count the number less than p, then the count is a binomial random number with parameters N and p.

There is a trivial solution in Algorithm to generate Poisson and binomial random numbers? through using iterations:

```
public static int getBinomial(int n, double p) {
int x = 0;
for(int i = 0; i < n; i++) {
if(Math.random() < p)
x++;
}
return x;
}
```

However, my purpose of pursing a binomial random number generator is just to avoid the inefficient loops (i from 0 to n). My n could be very large. And p is often very small.

A toy example of my case could be: n=1*10^6, p=1*10^(-7).

The n could range from 1*10^3 to 1*10^10.