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Currently the following problem is taking 3.008** seconds to execute for some testcase provided on hackerearth.com where allowed time is 3.0 seconds so i get time limit error. Please help to reduce execution time.

Problem: Alice has just learnt multiplying two integers. He wants to multiply two integers X and Y to form a number Z.To make the problem interesting he will choose X in the range [1,M] and Y in the range [1,N].Help him to find the number of ways in which he can do this.

Input

First line of the input is the number of test cases T. It is followed by T lines. Each line has three space separated integers, the numbers Z, M and N.

Output

For each test case output a single integer, the number of ways.

Constraints 1 <= T <= 50 1 <= Z <= 10^12 1 <= M <= 10^12 1 <= N <= 10^12

CODE:

#include <iostream>
using namespace std;


int chk_div(long long a,long long b)
{
if(((a/b) * (b) )==a)return 1;
return 0;
}

int main()
{
   int t;
   long  i,j,count;
   long  n,m,z;
   cin>>t;
   while(t--)
   {count=0;
    cin>>z>>m>>n;
    if(m>z)m=z;
    if(n>z)n=z;
    if (m>n)m=n;
    for(i=1;i<=m;i++)
    {
         if(chk_div(z,i))count++;       
     }

   cout<<count<<"\n";
   }
return 0;
}
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  • 18
    Alice is a girl's name.
    – Neil Kirk
    Oct 1, 2013 at 15:54
  • 3
    ((a/b) * (b) )==a -> a % b == 0 (though the compiler might already optimized this for you). also, just a style issue, but prefer using min to comparison, your code will be more readable. Oct 1, 2013 at 15:59
  • 7
    FYI eliminating white space doesn't make it run faster. Oct 1, 2013 at 16:01
  • 6
    Alice Cooper???
    – noelicus
    Oct 1, 2013 at 16:04
  • 4
    Ok, just to address the actual question, here's a big hint: en.wikipedia.org/wiki/Integer_factorization Oct 1, 2013 at 16:07

4 Answers 4

8

The main problem with performance here is the fact that your inner loop does about 10^12 iterations. You can reduce it a million times to sqrt(z) <= 10^6.

The trick here is to notice that Alice can write z = x * y if and only if he can write z = y * x. Also, either x <= sqrt(z) or y <= sqrt(z). Using these facts you can iterate only up to square root of z to count all cases.

0
5

I believe this should get the job done (idea from @zch's answer):

#include <iostream>
#include <cmath>

auto MAX = [] (int A, int B) -> bool { return A > B ? A : B; };
auto MIN = [] (int A, int B) -> bool { return A < B ? A : B; };

using std::cout;
using std::cin;

int main() {
    long long Z, M, N, T, low, high, temp, div;
    int ans;

    for (cin >> T; T--; ) {

        cin >> Z >> M >> N;
        temp = MIN(M, N);
        low = MIN(sqrt(Z), temp);
        high = MAX(M, N);

        for( ans = 0; low > 0 && (Z / low) <= high; --low ) {
            if ( Z % low == 0) {
                ++ans;
                div = Z / low;
                ans += (div != low && div <= temp);
            }
            //cout << temp << " * " << Z / temp << " = " << Z << "\n";
        }
        cout << ans << "\n";
    }

    return 0;
}

Will be adding comments in a bit

Code with comments:

#include <iostream>
#include <cmath>

auto MAX = [] (int A, int B) -> bool { return A > B ? A : B; };
auto MIN = [] (int A, int B) -> bool { return A < B ? A : B; };

using std::cout;
using std::cin;

int main() {
    long long Z, M, N, T, low, high, temp, div;
    int ans;

    for (cin >> T; T--; ) {

        cin >> Z >> M >> N;
        temp = MIN(M, N);
        low = MIN(sqrt(Z), temp);//Lowest value <--We start iteration from this number
        high = MAX(M, N); //Maximum value

        for( ans = 0; low > 0 && (Z / low) <= high; --low ) {

            //Number of things going on in this for-loop
            //I will start by explaining the condition:
                //We want to keep iterating until either low is below 1
                // or when the expression (Z / low) > high.
                //Notice that as the value of low approaches 0,
                //the expression (Z / low) approaches inf
            if ( Z % low == 0) {

                //If this condition evaluates to true, we know 2 things:
                    /*Z is divisible by this value of low and 
                        low is in the range of MIN(M,N) <--true*/
                    /*Because of our condition, (Z / low) is
                        within the range of MAX(M, N) <--true*/
                ++ans;
                div = Z / low;

                //This second part checks if the opposite is true i.e.
                    /*the value of low is in the range of
                        MAX(M, N) <--true*/
                    /*the value (Z / low) is in the range of
                        MIN(M, N) <--true only in some cases*/
                ans += (div != low && div <= temp);

                //(div != low) is to avoid double counting
                /*An example of this is when Z, M, N have the values:
                    1000000, 1000000, 1000000
                    The value of low at the start is 1000 */
            }
        }
        cout << ans << "\n";
    }
    return 0;
}
4
  • A good start. The next step in speed improvement might be to factor Z. Oct 1, 2013 at 19:08
  • @Smac89 thanks the code worked... but cant you please explain the "ans += (div != low && div <= temp);" line in the code Oct 2, 2013 at 10:24
  • @MahendraChandwani Here are the values the code produces when it is run with the values Z = 1000000, M = 1000000, N = 1000000. As you can see from the example, the first output produced is 1000 * 1000. This is saying that the value of X is 1000 and value of Y is 1000 to produce a product Z. Now if I were to swap the values of X and Y, this is redundant because X is still 1000 and Y is still 1000. So there is no need to count this case more than once because we don't get different values for X and Y
    – smac89
    Oct 2, 2013 at 15:23
  • @MahendraChandwani To maximize the amount of combinations we get, we try to see if some of the higher end values can also fit into the smaller bucket. This why we do div <= temp. As the iteration continues div gets larger so doing this, we are able to get as many matches as possible before it gets to large. Note that this simple line of code ans += (div != low && div <= temp); keeps us from having to do the iteration twice by making use of the value we have already got.
    – smac89
    Oct 2, 2013 at 15:46
2

In fact, you have to resolve the problem in a different way:

find the Prime decomposition:

so Z = A^a * B^b * ... * P^p with A, B, .., P prime numbers

and so you just have to compute the number of possibilities from a, b, ... p.

(So the result is up to (1 + a) * (1 + b) * ... * (1 + p) depending of M&N constraints).

5
  • You must also limit the possibilities as specified by M and N. Oct 1, 2013 at 17:29
  • @EricPostpischil: According to given constraints, it results that max(M) == max(N) == Z.
    – Jarod42
    Oct 1, 2013 at 17:32
  • The problem statement says that Z, M, and N are read from input as separate integers. M and N may be smaller than or larger than Z. The only constraint is that each of Z, M, and N is at least one and is at most 10**12. Oct 1, 2013 at 17:37
  • With this corrected, how does this help to solve the question?
    – zch
    Oct 1, 2013 at 18:06
  • @zch: For most values of Z, factoring Z greatly reduces the number of cases that must be tested. Oct 1, 2013 at 19:09
-1
  • Your if(((a/b) * (b) ) == a) return 1; will always return 1. Why are you dividing A with B (a/b) then multiply the result by B. This is ambiguous because, your answer will be A. when you say, (a/b) * (b). B`s will cancel each other out and you are left with A as your answer. And so basically you are comparing if A == A, which is true.
5
  • / for integer types is integer division, discarding remainder. For example 9 / 4 == 2.
    – zch
    Oct 1, 2013 at 17:00
  • The point is you are dividing A by B then multiply the result with B. I am not sure if Double is limited or should not be used in this problem for accuracy purpose. I think that is left to the coder.
    – Juniar
    Oct 1, 2013 at 17:07
  • (9 / 4) * 4 will give 2 * 4 != 9. This check is correct, it would be better written as a % b == 0, though.
    – zch
    Oct 1, 2013 at 17:11
  • If that is the case, I suggest using the mod formula. Even though that might not help with performance issue. But it could be faster. I know for sure that you can do it with one line of instruction with the mod formula, unlike this computation that takes two lines of instructions.
    – Juniar
    Oct 1, 2013 at 18:01
  • He could also try ((a/b) * (b) == a) ? 1 : 0; as far as limiting the total number of instructions is concern.
    – Juniar
    Oct 1, 2013 at 18:15

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