# Perform a modulus in a huge number?

I need to do a modulus operation on very large integers. The biggest integer supported by my platform (edit: .NET 2.0) is a 64 bit integer, which aren't big enough for the numbers I'm working with.

How can I do a modulus on really big integers, like 12654875632126424875387321657498462167853687516876876?

I have a solution that treats the number as a string and works it in pieces one by one, but I wanted to know if there's a better way.

Here's my function treating the number as a string. It basically does long division the way you'd do it by hand.

``````    Public Function MyMod(ByVal numberString As String, ByVal modby As Integer) As Integer
Dim position As Integer = -1
Dim curSubtraction As Integer = 0

While position < numberString.Length - 1
position += 1
curSubtraction = curSubtraction * 10 + CInt(numberString.Substring(position, 1))

If (curSubtraction / modby) < 1 And position = numberString.Length - 1 Then
Return curSubtraction
ElseIf (curSubtraction / modby) < 1 Then
Continue While
Else
curSubtraction = curSubtraction Mod modby
End If
End While
Return curSubtraction
End Function
``````

Is there a cleaner, more efficient way?

EDIT: To clarify, the integers are coming from IBAN bank account numbers. According to the specification, you have to convert the IBAN account number (containing letters) into one integer. Then, you do a modulus on the integer. So, I guess you could say that the real source of the integer to perform the modulus on is a string of digits.

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What language is this? You might want to add a tag. –  Bill James Nov 10 '08 at 17:19
It would also be helpful to include an example. Do you have the solution to the huge number in your question mod by some other value? –  Bill the Lizard Nov 10 '08 at 17:22

You haven't specified where the numbers are coming from, but you might be able to make some simplifications. If the numbers are originally smaller, then consider things like:

``````(a + b) MOD n = ((a MOD n) + (b MOD n)) MOD n
``````

or

``````ab MOD n = (a MOD n)(b MOD n) MOD n
``````
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Yes--I needed to clarify the question better. Your solution would work if I started with multiple integers, but in my case I'm starting with one big integer. –  Jim Nov 10 '08 at 17:02
Ahhh... that's a toughie :) –  Tony Arkles Nov 10 '08 at 18:36

Use a crypto/math library. Google for bignum.

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You need an arbitrary-precision integer math library such as IntX.

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If you are using .NET 4, you can just use a BigInteger. But here is how to do it with earlier versions.

There is a mathematical trick with mods where you can just take the first x number of digits, calculate the mod on that value, then prepend the result of that mod back onto the leftover digits, and keep repeating the process until you reach the end of your "huge" number.

Bring on the recursive method! (Sorry I don't do VB)

``````private static int Mod(string value, int mod) {
if (string.IsNullOrEmpty(value)) throw new ArgumentException("Invalid value.", "value");
if (mod <= 0) throw new ArgumentException("Invalid mod.", "mod");

int maxLength = long.MaxValue.ToString().Length - 1;

return value.Length > maxLength
? Mod((Convert.ToInt64(value.Substring(0, maxLength)) % mod).ToString() + value.Substring(maxLength), mod)
: Convert.ToInt32(Convert.ToInt64(value) % mod);}
``````
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