# Is there a quick way of finding if (n-1)! is divisible by n?

I know the usual way of finding n-1 factorial iteratively and then checking. But that has a complexity of O(n) and takes too much time for large n. Is there an alternative?

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Yes there is: if `n` is a prime, obviously `(n-1)!` isn't divisible by `n`.

If `n` is not a prime and can be written as `n = a * b` with `a != b` then `(n-1)!` is divisible by `n` because it contains `a` and `b`.

If `n = 4`, `(n-1)!` isn't divisible by `n`, but if `n = a * a` with `a` being a prime number > 2, `(n-1)!` is divisible by `n` because we find `a` and `2a` in `(n-1)!` (thanks to Juhana in comments).

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to find it n is prime, won't I have to iterate over 1 through n? –  batman Oct 21 '12 at 11:18
@learner nope, only from 2 to `floor(sqrt(n))`. –  user529758 Oct 21 '12 at 11:18
A naive method would be to test numbers between 1 and `sqrt(n)` (and not `n`) to see if they are divisors of `n`, but that's another question (stackoverflow.com/questions/2586596/…). –  alestanis Oct 21 '12 at 11:19
What about perfect squares? 4 is not a prime, but `3! / 4 = 1.5`. –  Juhana Oct 21 '12 at 11:24