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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) {
    if (n%sqrt == 0) {

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;

    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();
            if (*it % factors[i] == 0) {
    cout << count;
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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();

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).

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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))

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