# what is the fastest way to find the gcd of n numbers?

what is the fastest way to compute the greatest common divisor of n numbers?

-
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
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
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

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

-

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);
}
}
``````
-

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;
for (int i = 0; i < array.length; i++) {
if (array[i] % d == 0) {
any = true;
array[i] /= d;
} else all = false;
}
if (all) gcd *= d;
} while (any);
}
System.out.println(gcd);
``````

(works for some examples, but not really tested)

-

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

-

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.

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