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# 1/BigInteger in c#

I want to make

``````BigInteger.ModPow(1/BigInteger, 2,5);
``````

but `1/BigInteger` always return `0`, which causes, that the result is `0` too. I tried to look for some `BigDecimal` class for c# but I have found nothing. Is there any way how to count this even if there is no `BigDecimal`?

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Use something else instead of Integer. How about double? – Vlad Spreys Jan 6 '13 at 11:08
Double is too short for division by BigInteger – Martin Ševic Jan 6 '13 at 11:08
How possible `1/BigInteger` returns `0` ?. `BigInters` default value is `0`. It should thrown `DivideByZeroException`. – Soner Gönül Jan 6 '13 at 11:18
From the little I know of El Gamal, I don't think the literal multiplicative inverse is what you're looking for. – Rawling Jan 6 '13 at 11:23
@MartinŠevic Depends on what you want. Suppose your denominator is a `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

`1/a` is 0 for |a|>1, since `BigIntegers` use integer division where the fractional part of a division is ignored. I'm not sure what result you're expecting for this.

I assume you want to modular multiplicative inverse of `a` modulo `m`, and not a fractional number. This inverse exists iff `a` and `m` are co-prime, i.e. `gcd(a, m) = 1`.

• Extended Euclidean algorithm, which works for arbitrary moduli
It's fast, but has input dependent runtime.

I don't have C# code at hand, but porting the pseudo code from wikipedia should be straight forward.

• Using Euler's theorem:

This requires knowledge of φ(m) i.e. you need to know the prime factors of m. It's a popular choice when `m` is a prime and thus φ(m) = m-1 when it simply becomes . If you need constant runtime and you know φ(m), this is the way to go.

In C# this becomes `BigInteger.ModPow(a, phiOfM-1, m)`

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You could be right. Note that `i` and `n` must be relatively prime for this to be well-defined. – Jeppe Stig Nielsen Jan 6 '13 at 12:01

The overload of the `/` operator chosen, is the following:

``````public static BigInteger operator /(
BigInteger dividend,
BigInteger divisor
)
``````

See BigInteger.Division Operator. If the result is between `0` and `1` (which is likely when `dividend` is `1` as in your case), because the return value is an integer, `0` is returned, as you see.

What are you trying to do with the `ModPow` method? Do you realize that `2,5` are two arguments, two and five, not "two-point-five"? Is your intention "take square modulo 5"?

If you want floating-point division, you can use:

``````1.0 / (double)yourBigInt
``````

Note the cast to `double`. This may lose precision and even "underflow" to zero if `yourBigInt` is too huge.

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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
``````
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