# Find the GCD of two numbers without using divison or mod operator?

I want to find GCD of two numbers but without using division or mod operator. one obvious way would be to write own mod function like this:

``````enter code here
int mod(int a, int b)
{
while(a>b)
a-=b;

return a;
}
``````

and then use this function in the euclid algorithm. Any other way ??

-
Why do you need that? it's extremly inefficient. – Roman Dzhabarov Dec 4 '12 at 19:03

You can use the substraction based version of euclidean algorithm up front:

``````function gcd(a, b)
if a = 0
return b
while b ≠ 0
if a > b
a := a − b
else
b := b − a
return a
``````
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+1, this is what I was going to post. – user529758 Dec 4 '12 at 18:43
@H2CO3 This is what I would have been posting too. What we should have been posting is Bobby Dizzles's version below. – Pascal Cuoq Dec 4 '12 at 21:05

What you are looking for is the Binary GCD algorithm:

``````public class BinaryGCD {

public static int gcd(int p, int q) {
if (q == 0) return p;
if (p == 0) return q;

// p and q even
if ((p & 1) == 0 && (q & 1) == 0) return gcd(p >> 1, q >> 1) << 1;

// p is even, q is odd
else if ((p & 1) == 0) return gcd(p >> 1, q);

// p is odd, q is even
else if ((q & 1) == 0) return gcd(p, q >> 1);

// p and q odd, p >= q
else if (p >= q) return gcd((p-q) >> 1, q);

// p and q odd, p < q
else return gcd(p, (q-p) >> 1);
}

public static void main(String[] args) {
int p = Integer.parseInt(args[0]);
int q = Integer.parseInt(args[1]);
System.out.println("gcd(" + p + ", " + q + ") = " + gcd(p, q));
}
}
``````
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This is basically a bitwise way to implement mod and divisions :| – amit Dec 4 '12 at 18:40
This is mind-blowing. How the heck did it get downvoted? (apart from the fact that until one carefully reads the cases “p and q odd”, it looks like it cannot possibly work, perhaps) – Pascal Cuoq Dec 4 '12 at 20:57

Recursive GCD computing using subtraction:

``````int GCD(int a, int b)
{
int gcd = 0;
if(a < 0)
{
a = -a;
}
if(b < 0)
{
b = -b;
}
if (a == b)
{
gcd = a;
return gcd;
}
else if (a > b)
{
return GCD(a-b,b);
}
else
{
return GCD(a,b-a);
}
}
``````