Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

You are given a number of dices n, each with a number of faces m. You roll all the n dices and note the sum of all the throws you get from rolling each dice. If you get a sum >= x, you win, otherwise you lose. Find the probability that you win.

I thought of generating all combinations of 1 to m ( of size n ) and keeping count of only those whose sum is more then x . Total no of ways are m^n

After that its just the divison of both.

Is there a better way ?

share|improve this question

3 Answers 3

up vote 5 down vote accepted

[EDIT: As noted by jpalacek, the time complexity was wrong -- I've now fixed this.]

You can solve this more efficiently with dynamic programming, by first changing it into the question:

How many ways can I get at least x from n dice?

Express this as f(x, n). Then it must be that

f(x, n) = sum(f(x - i, n - 1)) for all 1 <= i <= m.

I.e. if the first die has 1, the remaining n - 1 dice must add up to at least x - 1; if the first die has 2, the remaining n - 1 dice must add up to at least x - 2; and so on.

There are m terms in the sum, so if you memoise this function, it will be O(m^2*n^2), since it will be required to do this summing work at most (m * n) * n times (i.e. once per unique set of inputs to the function, assuming that the first parameter x <= m * n).

As a final step to get a probability, just divide the result of f(x, n) by the total number of possible outcomes, i.e. m^n.

share|improve this answer
Your analysis is slightly flawed: To calculate f(x,n), you need to calculate more than m*n function values (rather something like x*n, but surely less than that). So in the end it will result in something like O(x*n*m) –  jpalecek Jan 6 '13 at 13:57
@jpalecek: Good catch, thanks. Assuming x <= n*m (since otherwise the answer is trivially 0), a bound of O(m^2 * n^2) should be OK -- I'll update the answer. –  j_random_hacker Jan 6 '13 at 14:00

Just to add up on @j_random_hacker's basically correct answer, you can make it even faster when you note that

f(x, n) = f(x-1, n) - f(x-m-1, n-1) + f(x-1, n-1) if x>m+1

This way, you'll only spend O(1) time calculating each of the f value.

share|improve this answer
Very nice, +1! Had to stare at it for a while before it clicked: all the terms in the sum I gave are shared with the calculation for the previous value of x except for the first and last, so just subtract and add them respectively. –  j_random_hacker Jan 6 '13 at 14:19

//Passing curFace value will disallow duplicate combinations
//For 3 dices - and sum 8 - 2 4 2 and 2 2 4 are the same combination - so should be counted as one

int sums(int totSum,int noDices,int mFaces,int curFace,HashMap<String,Integer> map)

    int count=0;

    if (noDices<=0 || totSum<=0)
            return 0;

    if (noDices==1)
         if (totSum>=1 & totSum<=mFaces)
             return 1;
             return 0;    
    if (map.containsKey(noDices+"-"+totSum))
        return map.get(noDices+"-"+totSum);

    for (int i=curFace;i<=mFaces;i++)


    map.put(noDices+"-" +totSum,count);

    return count;
share|improve this answer

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.