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what is the fastest way to find the greatest common divisor of n numbers other than using gcd(a,b,c)=gcd(gcd(a,b),c).

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2  
finding GCD recursively is the fastest known method. Do you want some kind of special optimization? –  Shamim Hafiz Feb 3 '11 at 11:28
    
@Gunner: The question is about the GCD of more than 2 arguments. –  Marcelo Cantos Feb 3 '11 at 11:30
    
@ Marcelo Cantos: The concept is still same. –  Shamim Hafiz Feb 3 '11 at 11:33
1  
Every method I can think of that does not use the fact that gcd(a,b,c)=gcd(gcd(a,b),c) is slower. –  Peter G. Feb 3 '11 at 12:38
1  
Why do you ask? Using gcd(a,b,c)=gcd(gcd(a,b),c) is the best method, much faster in general than using for example factorization. In fact, for polynomials one uses gcd with the derivative first to find factors which occurs more than once. –  starblue Feb 3 '11 at 13:00

5 Answers 5

You may want to sort the numbers first and compute the gcd recursively starting from the smallest two numbers.

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Without recursion:

int result = numbers[0];
for(int i = 1; i < numbers.length; i++){
    result = gcd(result, numbers[i]);
}
return result;

For very large arrays, it might be faster to use the fork-join pattern, where you split your array and calculate gcds in parallel. Here is some pseudocode:

int calculateGCD(int[] numbers){
    if(numbers.length <= 2){
        return gcd(numbers);    
    }
    else {
        INVOKE-IN-PARALLEL {
            left = calculateGCD(extractLeftHalf(numbers));
            right = calculateGCD(extractRightHalf(numbers));
        }
        return gcd(left,right);
    }
}
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If you have a lot of small numbers, factorization may be actually faster.

//Java
int[] array = {60, 90, 45};
int gcd = 1;
outer: for (int d = 2; true; d += 1 + (d % 2)) {
    boolean any = false;
    do {
        boolean all = true;
        any = false;
        boolean ready = true;
        for (int i = 0; i < array.length; i++) {
            ready &= (array[i] == 1);
            if (array[i] % d == 0) {
                any = true;
                array[i] /= d;
            } else all = false;
        }
        if (all) gcd *= d;
        if (ready) break outer;
    } while (any);
}
System.out.println(gcd);

(works for some examples, but not really tested)

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up vote 0 down vote accepted

Here was the answer I was looking for. The best way to find the gcd of n numbers is indeed using recursion.ie gcd(a,b,c)=gcd(gcd(a,b),c). But I was getting timeouts in certain programs when I did this.

The optimization that was needed here was that the recursion should be solved using fast matrix multiplication algorithm.

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2  
Can you elaborate ? –  g4ur4v Nov 18 '12 at 17:25

Refer the Wikipedia link for further optimized algorithm for the problem: http://en.wikipedia.org/wiki/Lehmer%27s_GCD_algorithm

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