Announcing Stack Overflow Documentation

We started with Q&A. Technical documentation is next, and we need your help.

Whether you're a beginner or an experienced developer, you can contribute.

Sign up and start helping → Learn more about Documentation →

I calculated permutation of numbers as:-

nPr = n!/(n-r)!

where n and r are given . 1<= n,r <= 100

i find p=(n-r)+1
  multiply digit by digit and store in array.

But how will I calculate the nCr = n!/[r! * (n-r)!] for the same range.?

I did this using recursion as follow :-

#include <stdio.h>
typedef unsigned long long i64;
i64 dp[100][100];
i64 nCr(int n, int r)
if(n==r) return dp[n][r] = 1;
if(r==0) return dp[n][r] = 1;
if(r==1) return dp[n][r] = (i64)n;
if(dp[n][r]) return dp[n][r];
return dp[n][r] = nCr(n-1,r) + nCr(n-1,r-1);

int main()
int n, r;
while(scanf("%d %d",&n,&r)==2)
    r = (r<n-r)? r : n-r;
return 0;

but range for n <=100 , and this is not working for n>60 .

share|improve this question
look at wikipedia page on combination, the solution is there. – didierc Jan 28 '13 at 6:31
Remark: For n = 100, r = 50, you have nCr = 100891344545564193334812497256 which does not fit into a 64-bit variable. – Martin R Jan 28 '13 at 6:34
see this other question. – didierc Jan 28 '13 at 6:49
also, keep in mind that nCr = nC(n - r). – didierc Jan 28 '13 at 6:51

Consider using a BigInteger type of class to represnet your big numbers. BigInteger is available in Java and C# (version 4+ of the .NET Framework). From your question, it looks like you are using C++ (which you should always add as a tag). So try looking here and here for a usable C++ BigInteger class.

One of the best methods for calculating the binomial coefficient I have seen suggested is by Mark Dominus. It is much less likely to overflow with larger values for N and K than some other methods.

static long GetBinCoeff(long N, long K)
   // This function gets the total number of unique combinations based upon N and K.
   // N is the total number of items.
   // K is the size of the group.
   // Total number of unique combinations = N! / ( K! (N - K)! ).
   // This function is less efficient, but is more likely to not overflow when N and K are large.
   // Taken from:  http://blog.plover.com/math/choose.html
   if (K > N) return 0;
   long r = 1;
   long d;
   for (d = 1; d <= K; d++)
      r *= N--;
      r /= d;
   return r;

Just replace all the long definitions with BigInt and you should be good to go.

share|improve this answer
very nice answer can this be improved at C# .NET 4.5.2 ? – MonsterMMORPG Sep 10 '15 at 21:36
Offhand, I don't see how. Do you have a suggestion for an improvement? – Bob Bryan Sep 10 '15 at 23:08

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.