# Fast multiplication of very large integers

How to multiply two very large numbers greater than 32 characters for example multiplication of 100! with 122! or 22^122 with 11^200 by the help of divide and conquer, do any body have java code or C# code?

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retagged with relevant languages –  Jeffrey Aylesworth Jan 3 '10 at 22:50
Read about multiplication algorithms: en.wikipedia.org/wiki/Multiplication_algorithm –  przemoc Jan 3 '10 at 22:52
"divide and conquer" sounds like homework. Please retag if correct. –  Thorbjørn Ravn Andersen Jan 3 '10 at 23:15
@ThorbjørnRavnAndersen - The "homework" tag is deprecated. –  Hot Licks Jan 26 at 22:27
@HotLicks wasn't three years ago... –  Thorbjørn Ravn Andersen Jan 26 at 23:58
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I wrote one myself that uses Arrays to accomplish just that, just for fun. I believe Java's BigInteger class does the same thing though.

Here is an example in C# that might be useful to you.

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Here's some integer multiplication algorithms

Here's a class library for numbers

It includes the Karatsuba and Schonhage-Strassen algorithms for multiplying large integers.

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You should probably use java.math.BigInteger. This allows representations of integer values well in excess of 2^32 or even 2^64. BigInteger values are essentially limited only by the amount of memory available to the program, i.e. ~4 GB on a 32-bit system and pretty much available physical+virutal memory for 64-bit systems.

``````import java.math.BigInteger;

class Foo
{
public static void main(String args[])
{
BigInteger bigInteger100Fact = bigFactorial(BigInteger("100")); //where bigFactorial is a user-defined function to calculate a factorial
BigInteger bigIntegerBar = new BigInteger("12390347425734985347537986930458903458");

BigInteger product = bigIntegerFact.multiply(bigIntegerBar);
}
}
``````

EDIT: Here's a BigInteger factorial function if you need one

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yes, and for C# consider intX, codeplex.com/IntX –  GregS Jan 4 '10 at 0:02
Just note that BigInteger is using a naive multiplication algorithm so if one needs a FAST multiplication of large numbers, one should use a 3rd party library that uses Karatsuba or another sub n^2 algorithm. –  Voo Nov 6 '11 at 1:08