Find the number of pairs whose sum is divisible by k?

Given a value of k. Such that k<=100000 We have to print the number of pairs such that sum of elements of each pair is divisible by k. under the following condition first element should be smaller than second, and both element should be less than 10^9

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And what have you done so far for this assignment? –  Mat Sep 12 '13 at 16:23
What language are you using? –  jonhopkins Sep 12 '13 at 16:23
i used the brute force technique but failed –  Vidyut Vyom Sep 12 '13 at 16:27
Can you post the code you tried so that we can help you figure out what went wrong with it? –  jonhopkins Sep 12 '13 at 16:32

I've found a solution, let `a` and `b` numbers such that `(a+b)%k=0` then we have to find that pairs `(a,b)`, where `a<b`, so let's count how many pairs `(a,b)` satisfy the condition that `a+b=k`, for example if `k=3` `0+3=3, 1+2=3, 2+1=3, 3+0=3` there are 4 pairs but only 2 pairs which is `(K+1)/2 (integer division)` so similar for find the pairs `(a,b)` which sum is `2k, 3k,.. nk`, and the solution will be `(k+1)/2 + (2k+1)/2 + (3k+1)/2 + ... + (nk+1)/2`, and that is equal to `(k*n*(n+1)/2 + n)/2` with time complexity `O(1)`, take care in the case if `n*k=2*10^9`, because `a` can't be more than `10^9` for the given constraint.

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Some psuedo-code to get you started. It uses the brute-force technique you say you tried, but maybe something was wrong in your code?

``````max = 1000000000
numberPairs = 0
for i = 1 to max - 2 do
for j = i + 1 to max - 1 do
if (i + j) mod k = 0 then
numberPairs = numberPairs + 1
end if
end do
end do
``````
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this code will take too much time, can you suggest optimised algorithm –  Vidyut Vyom Sep 13 '13 at 3:18

One way is brute force:

``````int numPairs = 0;
for (i = 0; i < 10e9; i++)
{
for (j = i+1; j < 10e9; j++)
{
int sum = i + j;
if (sum % k == 0) numPairs++;
}
}
return numPairs;
``````

I'll leave it up to you to optimize this for performance. I can think of at least one way to significantly speed this up.

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this is brute force technique which i know. can you suggest other technique? –  Vidyut Vyom Sep 13 '13 at 3:17
this code will take too much time, can you suggest optimised algorithm –  Vidyut Vyom Sep 13 '13 at 3:20
First optimization: observe that many different pairs of numbers have the same sum (ex: 57 and 100, 58 and 99, 59 and 98, 60 and 97, etc). You are wasting your time summing and modding the same value over and over again. Here's a hint: how many sum values there are for two integers between 0 and 10e9? Answer: 2 x 10e9. Your problem has been reduced from O(n^2) to O(n)! –  Thomas Nguyen Sep 16 '13 at 17:16