For example you need to get d in the next:

**3*d = 1 (mod 9167368)**

this is equally:

**3*d = 1 + k * 9167368, where k = 1, 2, 3, ...**

rewrite it:

**d = (1 + k * 9167368)/3**

Your d must be the integer with the **lowest** k.

Let's write the formula:

**d = (1 + k * fi)/e**

```
public static int MultiplicativeInverse(int e, int fi)
{
double result;
int k = 1;
while (true)
{
result = (1 + (k * fi)) / (double) e;
if ((Math.Round(result, 5) % 1) == 0) //integer
{
return (int)result;
}
else
{
k++;
}
}
}
```

let's test this code:

```
Assert.AreEqual(Helper.MultiplicativeInverse(3, 9167368), 6111579); // passed
```

`1/BigInteger`

returns`0`

?.`BigInters`

default value is`0`

. It should thrown`DivideByZeroException`

. – Soner Gönül Jan 6 '13 at 11:18`BigInteger`

with less than 300 decimal figures, then the division of`1`

by the corresponding double works OK. Precision is lost, but magnitude is OK. But with e.g. 400 decimal figures,`double`

will over-/underflow to infinity or zero. – Jeppe Stig Nielsen Jan 6 '13 at 11:50