A simple probabilistic method is with the Fermat test, which you can look up in Wikipedia:

```
: *mod ( a b n -- n2 )
*/mod drop ;
: expmod { x e n -- n2 } \ compute x^e mod n by repeated squaring
e 0= if 1 exit
else
x e 2/ n recurse dup n *mod
e 1 and if x n *mod then
then ;
: prime ( n -- f )
3 swap dup expmod 3 = ;
```

If this test says the number is composite, then it is definitely composite. If it says the number is prime, then it is PROBABLY prime, but a few composite numbers will slip through (such numbers are called "pseudoprimes"). The test is quite fast and sufficient for some purposes.

The code you posted tests divisors 2,3,4,5,... up to the square root of n, and it would be about 2x as fast if it tested 2,3,5,7... since there's no need to test even divisors larger than 2.