# C# ModInverse Function

Is there a built in function that would allow me to calculate the modular inverse of a(mod n)? e.g. 19^-1 = 11 (mod 30), in this case the 19^-1 == -11==19;

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Note that you can reverse arbitrary multiplications. For example 2 has multiplicative inverse modulo 30 since GCD(2,30)!=1 –  CodesInChaos Sep 20 '11 at 10:39

Since .Net 4.0+ implements BigInteger with a special modular arithmetics function ModPow (which produces “`X` power `Y` modulo `Z`”), you don't need a third-party library to emulate ModInverse. If `m` is a prime, all you need to do is to compute:

``````a_inverse = BigInteger.ModPow(a, n - 2, n)
``````

For more details, look in Wikipedia: Modular multiplicative inverse, section Using Euler's theorem, the special case “when m is a prime”. By the way, there is a more recent SO topic on this: 1/BigInteger in c#, with the same approach suggested by CodesInChaos.

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The BouncyCastle Crypto library has a BigInteger implementation that has most of the modular arithmetic functions. It's in the Org.BouncyCastle.Math namespace.

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``````int modInverse(int a, int n)
{
int i = n, v = 0, d = 1;
while (a>0) {
int t = i/a, x = a;
a = i % x;
i = x;
x = d;
d = v - t*x;
v = x;
}
v %= n;
if (v<0) v = (v+n)%n;
return v;
}
``````
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``````BigInteger modInverse(BigInteger a, BigInteger n)
{
BigInteger i = n, v = 0, d = 1;
while (a > 0)
{
BigInteger t = i / a, x = a;
a = i % x;
i = x;
x = d;
d = v - t * x;
v = x;
}
v %= n;
if (v < 0) v = (v + n) % n;
return v;
}
``````
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There is nothing built in to C# to support modular arithmetic. You need to implement it yourself, or better still, find a library.

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What kind of library? –  Nook Sep 20 '11 at 10:38
@Nook: er... A C# library? –  Serge - appTranslator Sep 20 '11 at 10:42
A library for modular arithmetic. –  David Heffernan Sep 20 '11 at 10:42