Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

There is a problem on interviewstreet called UnfriendlyNumbers. The problem goes like this -

There is one friendly number and N unfriendly numbers. We want to find how many numbers are there which exactly divide the friendly number, but does not divide any of the unfriendly numbers. Sample Input: 8 16 2 5 7 4 3 8 3 18 Sample Output: 1

All the testcases that I can imagine execute correctly, but for some reason, the website deems it incorrect for a set of testcases. Do you guys see any errors in the code/logic?

void get_factors(unsigned long n, vector<unsigned long> &factors)
{
    unsigned long sqrt = pow(n, 0.5);
    for (unsigned long i = 1; i < sqrt; i++) {
        if (n%i == 0) {
            factors.push_back(i);
            factors.push_back(n/i);
        }
    }
    if (n%sqrt == 0) {
        factors.push_back(sqrt);
    }
}


int
main(int argc, char *argv[])
{
    unsigned int n; 
    unsigned long k, j;
    cin >> n >> k;

    if (n == 0 || k == 0) {
        cout << 0 << endl;
        return 0;
    }

    set<unsigned long> unfriendly;
    for (int i = 0; i < n; i++) {
        cin >> j;
        unfriendly.insert(j);
    }

    vector<unsigned long> factors;
    get_factors(k, factors);

    unsigned int count = factors.size();
    for (int i = 0; i < factors.size(); i++) {
        for (set<unsigned long>::iterator it = unfriendly.lower_bound(factors[i]); 
             it !=  unfriendly.end();
             it++)
        {
            if (*it % factors[i] == 0) {
                count--;
                break;
            }
        }
    }
    cout << count;
}
share|improve this question
    
I'd replace i = 1; i < sqrt with i = 1; i <= sqrt so that you can get rid of your second if statement. Also, are those failed cases specified? –  Blender Apr 18 '12 at 20:50
    
No, it doesn't specify the failed testcases –  zonked.zonda Apr 18 '12 at 21:01
    
@Blender, when n == 16, for example, that would cause 4 to get counted twice. –  Karl Bielefeldt Apr 18 '12 at 21:04
    
@KarlBielefeldt: Thanks, I didn't notice that. –  Blender Apr 18 '12 at 21:06

2 Answers 2

Your get_factors is incorrect. For numbers like 30 or 35, some divisors are omitted.

sqrt is the largest integer not exceeding the square root, but when n == sqrt*(sqrt+1) or n == sqrt*(sqrt+2), you don't record sqrt+1 resp. sqrt+2 as divisors.

Also, there is the possibility that

unsigned long sqrt = pow(n, 0.5);

can yield a wrong result if n is sufficiently large, better adjust it

while(sqrt > n/sqrt) --sqrt;
while(sqrt+1 <= n/(sqrt+1)) ++sqrt;

And, it may be that unsigned long isn't large enough, for safety use unsigned long long.

Apart from that, the only thing I see that could fail is if any of the numbers is 0.

    for (set<unsigned long>::iterator it = unfriendly.lower_bound(factors[i]); 
         it !=  unfriendly.end();
         it++)

will fail if an unfriendly number is 0; and if the friendly number is 0, all bets are off (the answer is then 0 if any unfriendly number is 0, infinity otherwise).

share|improve this answer
    
You are right Daniel. Thanks for pointing out. –  zonked.zonda Apr 18 '12 at 21:00
    
Fixed the get_factors bug (Thanks Daniel). Now the algorithm finds the solution, but it isn't fast enough. The contraints are that the number n and k are of the order 10^18 and 10^13 respectively, and the code in c++ should solve it in < 3 seconds. I improved the algorithm further. I start from the largest element in the factors set. Whenever, I find a number from the factors_set that divides an unfriendly number, I remove that number and all its factors from the factors_set. Still not fast enough! Any other ideas for improvements in the algorithm? –  zonked.zonda Apr 18 '12 at 23:29
    
If you determine the divisors of n your way, where n is about 10^18, you need about 10^9 divisions. That takes something like 5 seconds on my box. Typically the testing machines for online judges are slower. So the first thing to optimise is the get_factors method. If n has only few divisors, more elaborate algorithms are needed, but typically obtaining the prime factorisation of n by trial division should be fast enough (if p <= q are the two largest prime factors of n, you need to divide to max(p,sqrt(q))). From that, construct the divisors. –  Daniel Fischer Apr 18 '12 at 23:51

Get the common divisors between the unfriendly numbers and the friendly number K using GCD. O(N)

Then get the divisors of K in O(sqrt(K)).

Loop the cmn_div and div of k, to get the answer in O(N*sqrt(K))

share|improve this answer

Your Answer

 
discard

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.