# C++ program to calculate quotients of large factorials

How can I write a c++ program to calculate large factorials.

Example, if I want to calculate (100!) / (99!), we know the answer is 100, but if i calculate the factorials of the numerator and denominator individually, both the numbers are gigantically large.

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It sounds to me like you are actually trying to avoid calculating large factorials. –  Jim Lewis Apr 28 '10 at 16:55
You can find several answers here: stackoverflow.com/questions/2416483/how-to-find-a-factorial –  indiv Apr 28 '10 at 17:19
What is your question? Are you asking how to do arithmetic with large numbers, or are you asking how to calculate as many formulas as possible without anything bigger than `long` or `long long`? –  David Thornley Apr 28 '10 at 17:24
possible duplicate of stackoverflow.com/questions/1966077/… –  Potatoswatter Apr 28 '10 at 18:24

expanding on Dirk's answer (which imo is the correct one):

``````#include "math.h"
#include "stdio.h"
int main(){
printf("%lf\n", (100.0/99.0) * exp(lgamma(100)-lgamma(99)) );
}
``````

try it, it really does what you want even though it looks a little crazy if you are not familiar with it. Using a bigint library is going to be wildly inefficient. Taking exps of logs of gammas is super fast. This runs instantly.

The reason you need to multiply by 100/99 is that gamma is equivalent to n-1! not n!. So yeah, you could just do exp(lgamma(101)-lgamma(100)) instead. Also, gamma is defined for more than just integers.

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Of course this particular expression should be optimized, but as for the title question, I like GMP because it offers a decent C++ interface, and is readily available.

``````#include <iostream>
#include <gmpxx.h>

mpz_class fact(unsigned int n)
{
mpz_class result(n);
while(n --> 1) result *= n;
return result;
}

int main()
{
mpz_class result = fact(100) / fact(99);
std::cout << result.get_str(10) << std::endl;
}
``````

compiles on Linux with `g++ -Wall -Wextra -o test test.cc -lgmpxx -lgmp`

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By the sounds of your comments, you also want to calculate expressions like 100!/(96!*4!).

Having "cancelled out the 96", leaving yourself with (97 * ... * 100)/4!, you can then keep the arithmetic within smaller bounds by taking as few numbers "from the top" as possible as you go. So, in this case:

``````i = 96
j = 4
result = i
while (i <= 100) or (j > 1)
if (j > 1) and (result % j == 0)
result /= j
--j
else
result *= i
++i
``````

You can of course be cleverer than that in the same vein.

This just delays the inevitable, though: eventually you reach the limits of your fixed-size type. Factorials explode so quickly that for heavy-duty use you're going to need multiple-precision.

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Here's an example of how to do so:

http://www.daniweb.com/code/snippet216490.html

The approach they take is to store the big #s as a character array of digits.

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You can use a big integer library like gmp which can handle arbitrarily large integers.

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The only optimization that can be made here (considering that in `m!/n!` `m` is larger than `n`) means crossing out everything you can before using multiplication.

If `m` is less than `n` we would have to swap the elements first, then calculate the factorial and then make something like `1 / result`. Note that the result in this case would be double and you should handle it as double.

Here is the code.

``````   if (m == n) return 1;

// If 'm' is less than 'n' we would have
// to calculate the denominator first and then
// make one division operation
bool need_swap = (m < n);
if (need_swap) std::swap(m, n);

// @note You could also use some BIG integer implementation,
// if your factorial would still be big after crossing some values

// Store the result here
int result = 1;
for (int i = m; i > n; --i) {
result *= i;
}

// Here comes the division if needed
// After that, we swap the elements back
if (need_swap) {
// Note the double here
// If m is always > n then these lines are not needed
double fractional_result = (double)1 / result;
std::swap(m, n);
}
``````

Also to mention (if you need some big int implementation and want to do it yourself) - the best approach that is not so hard to implement is to treat your int as a sequence of blocks and the best is to split your int to series, that contain 4 digits each.

Example: `1234 | 4567 | 2323 | 2345 | ...`. Then you'll have to implement every basic operation that you need (sum, mult, maybe pow, division is actually a tough one).

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To solve x!/y! for x > y:

``````int product = 1;
for(int i=0; i < x - y; i ++)
{
product *= x-i;
}
``````

If y > x switch the variables and take the reciprocal of your solution.

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this doesn't work Permutations and combinations. Example, nPr and nCr –  xbonez Apr 28 '10 at 16:59
Works fine for the example, fails for many, many other examples. Try 100!/7!. The question was: "How to calculate large factorials?" Btw, you should make product = 1 in the beginning. –  vladv Apr 28 '10 at 17:00