# Iteratively implement Euclid's Algorithm in C

I have 2 types of implementation of Euclid's Algorithm using iteration, not recursion. One is common:

``````void myXEuclid(int a, int b)
{
int prevx = 1, x = 0;
int prevy = 0, y = 1;
int q, r;

while (b)
{
q = a / b;
r = a % b;

int tmp = x;
x = prevx - q * x;
prevx = tmp;

tmp = y;
y = prevy - q * y;
prevy = tmp;

a = b;
b = r;
}
printf("prevx = %d, prevy = %d\n", prevx, prevy);
}
``````

I don't really understand where the initializations come from:

``````int prevx = 1, x = 0;
int prevy = 0, y = 1;
``````

Anyway, I can still get the right answer from the snippet above. But in RSA algorithm when I do A*B mod n = 1, I have to ensure B is the minimum nonnegative number. So here comes the next confusing implementation of Euclid's Algorithm, also using iteration:

``````int Euc(int A, int B)
{
int a = A, b = B;
int quotient, remainder, lastY;
int x = 0, y = 1;

int X = 1, Y = 1;

while (a)
{
quotient = b / a;
remainder = b % a;
b = a;
a = remainder;
lastY = y;
y *= quotient;

if (X == Y)
{
if (x >= y)
{
y = x - y;
}
else
{
y = y - x;
Y = 0;
}
}
else
{
y = x + y;
X = 1 - X;
Y = 1 - Y;
}

x = lastY;
}

if (X == 0)
{
x = B - x;
}

return x;
}
``````

I don't know what the capital variable X and Y means and where, again, their initializations come from. But the function above can return x meeting the equation A * x mod B = 1, and it's the minimum nonnegative one.

I can understand the recursive one. But not the iterative ones. To be honest, I have not slept well for days.

I am not from a English-speaking country. So if you can help me, Please explain simply and in detail. Thanks. Merci.

-
This is not the extended version of the euclidean algorithm. The extended version gives you also a linear combination of the gcd(a,b) with a and b. –  moose Aug 31 '13 at 11:45