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I have read a lot of good algos to calculate n! mod m but they were usually valid when m was prime . I wanted to know whether some good algo exists when m is not prime .I would be helpful if someone could write the basic function of the algo too.I have been using

long long factMOD(long long n,long long mod)
{
    long long res = 1; 
    while (n > 0)
    {
        for (long long i=2, m=n%mod; i<=m; i++)
        res = (res * i) % mod;
        if ((n/=mod)%2 > 0) 
        res = mod - res;
    }
    return res;
}

but getting wrong answer when I try to print factMOD(4,3) even. source of this algo is :
http://comeoncodeon.wordpress.com/category/algorithm/

share|improve this question
    
just do all the multiplications mod m - it could not be very difficult. –  mvp Feb 10 '13 at 21:05
    
This - take modulo m whenever the result of the multiplication becomes greater than m. –  user529758 Feb 10 '13 at 21:06
    
@mvp-n is given to me of the order of 10^7.I need a better algo to do it. –  kavish Feb 10 '13 at 21:07
    
Have you considered an algorithm that utilizes chained modulos? (a*b) mod p = ((a mod p) * (b mod p)) mod p. This could well help you with your problem, particularly when combined with an early-exit short-cut on any encounter of zero. –  WhozCraig Feb 10 '13 at 21:15
    
@WhozCraig this is actually already done as much as possible; it's just kind of implicit. The left side of the multiplication is the running product, which is already mod-m; and the right side of the multiplication should already be less than m if you apply either of the early-exit optimizations, meaning that taking it mod m is a no-op. –  hobbs Feb 10 '13 at 22:04

2 Answers 2

up vote 2 down vote accepted

This is what I've come up with:

#include <stdio.h>
#include <stdlib.h>

unsigned long long nfactmod(unsigned long long n, unsigned long long m)
{
    unsigned long long i, f;
    for (i = 1, f = 1; i <= n; i++) {
        f *= i;
        if (f > m) {
            f %= m;
        }
    }
    return f;
}

int main(int argc, char *argv[])
{
    unsigned long long n = strtoull(argv[1], NULL, 10);
    unsigned long long m = strtoull(argv[2], NULL, 10);

    printf("%llu\n", nfactmod(n, m));

    return 0;
}

and this:

h2co3-macbook:~ h2co3$ ./mod 1000000 1001001779
744950559
h2co3-macbook:~ h2co3$

runs in a fraction of a second.

share|improve this answer
1  
Looks like you just did someone's homework ;) –  Blender Feb 10 '13 at 21:19
    
@Blender Quite... :-( Sad he was soooo stubborn... But you know, I must stock up of reputation because I won't have much time for SO, I'll have a busy week... –  user529758 Feb 10 '13 at 21:22
    
@Blender: No actually it wasn't my homework. I was going through some online good combinatorial questions and there I was stuck in one of these types. –  kavish Feb 10 '13 at 21:23
    
@kavish And what's the problem with my answer that finally made you unaccept it? –  user529758 Feb 10 '13 at 21:24
    
@kavish And how is this different than any other suggestion made? –  Code-Apprentice Feb 10 '13 at 21:26

The basic algorithm is valid for any value of m:

product := 1
for i := 2 to n
    product := (product * i) mod m
return product

and an easy optimization is that you can bail out early and return 0 whenever product becomes 0. You can also return 0 at the beginning if n > m, since that guarantees that n! is a multiple of m.

share|improve this answer
    
this algo won't suffice to solve my problem. I have been given n to be nearly 10^7. This will exceeede time limits by huge amount. –  kavish Feb 10 '13 at 21:10
    
@kavish: Have you tried implementing it? It runs almost instantly for me in Python, which is a relatively slow language. –  Blender Feb 10 '13 at 21:14
1  
@kavish 10^7 is not a very big number. –  hobbs Feb 10 '13 at 21:14
    
@kavish Have you attempted this algorithm to check whether or not it meets your time constraints? –  Code-Apprentice Feb 10 '13 at 21:14
1  
@kavish See my answer. I've implemented almost the exact same algorithm (without the optimization Hobbs proposed) yet it run instantly for me for n = 1 000 000... –  user529758 Feb 10 '13 at 21:17

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