# For ax % b = c, where a, b, and c are known, how do I find a compliant x? [closed]

From what I can tell, this is not the multiplicative inverse of modulo (which is what I keep finding with google searches), since x is the unknown. b and a are relatively prime, and % is the modulus operator used in most programming languages. Using a for loop to find matches could take up to 4 billion iterations to find the matching value of x. I know there is more than one value for x which solves this equation... I need the smallest that is greater than 0.

I know this could be re-written as ax - by = c where both x and y are unknown, but I don't know how to solve this equation for a matching x where both x and y are integers. I keep running into Euclid's solution for gcd(m, n) = 1 in conjunction to this problem, but although I can implement this algorithm, I don't know how to use the results to solve my problem.

Although this appears to be a math question, it is in the domain of "computer" math and algorithms instead of the theoretical I keep finding with google searches. I'm hoping for a simple algorithm, equation, or built-in math call if possible - sample code would be awesome.

Thanks.

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## closed as off topic by Oded♦, Gordon Gustafson, Petar Minchev, bensiu, WimApr 16 '11 at 20:10

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A better site for this is math.stackexchange.com or cstheory.stackexchange.com –  Oded Apr 16 '11 at 20:03
Belongs on math.stackexchange.com have voted to move there. –  Darren Young Apr 16 '11 at 20:03
@Darren how do you vote to move to math.stackexchange? It doesn't appear in my list of sites to migrate to. –  Gordon Gustafson Apr 16 '11 at 20:06
if a and b are not relatively prime there might not be a solution –  jon_darkstar Apr 16 '11 at 20:07
Have a look at the Wikipedia article on the Euclidean algorithm. You'll find your exact problem there -- even with the same variable names! Also have a look at the article "Extended Euclidean algorithm". –  Sven Marnach Apr 16 '11 at 20:07