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I'm looking for integers solution here. I know it has infinitely many solution derived from the first pair solution and gcd(a,b)|c. However, how could we find the first pair of solution? Is there any algorithm to solve this problem?

Thanks,
Chan

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3  
what did your web search yield? –  David Heffernan Feb 6 '11 at 23:45
    
@David Heffernan: Extended Euclidean algorithm is what I got, but I could not understand their pseudo-code written in a very weird language. –  Chan Feb 7 '11 at 0:16

1 Answer 1

up vote 7 down vote accepted

Note that there isn't always a solution. In fact, there's only a solution if c is a multiple of gcd(a, b).

That said, you can use the extended euclidean algorithm for this.

Here's a C++ function that implements it, assuming c = gcd(a, b). I prefer to use the recursive algorithm:

function extended_gcd(a, b)
    if a mod b = 0
        return {0, 1}
    else
        {x, y} := extended_gcd(b, a mod b)
        return {y, x-(y*(a div b))}

int ExtendedGcd(int a, int b, int &x, int &y)
{
    if (a % b == 0)
    {
        x = 0;
        y = 1;
        return b;
    }

    int newx, newy;
    int ret = ExtendedGcd(b, a % b, newx, newy);

    x = newy;
    y = newx - newy * (a / b);
    return ret;
}

Now if you have c = k*gcd(a, b) with k > 0, the equation becomes:

ax + by = k*gcd(a, b) (1)
(a / k)x + (b / k)y = gcd(a, b) (2)

So just find your solution for (2), or alternatively find the solution for (1) and multiply x and y by k.

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@IVIad: Thanks, can you briefly explain how it work? I tried to implement it using C++ but I could not get the expected result. –  Chan Feb 7 '11 at 0:31
    
@Chan - done. I hope it helps. –  IVlad Feb 7 '11 at 1:05

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