We are given an integer array of size 5000. Then, we are given 10^5 queries which consists of 2 indices (ai, bi). For each query, we have to solve the 3SUM problem on the subarray[ai...bi], and give the number of unordered triples of distinct indices i, j, k such that A[i] + A[j] + A[k] = 0.
Her...
Can you give examples? With the 3SUM query, we have to check if a triplet exists with sum = 0? Also, if there ain't a link, how did you come up with 2 seconds time frame?
I added some examples and specified the problem further. To answer your first question, we have to find the number of triplets where the sum = 0 in a subarray (refer to the problem statement). For the second question, that is just the time frame we have to solve it in.
I am thinking further on trying to calculate answer for a range as it is a little tricky. For example, let's say we found a triplet in range [1,4] and [1,5]. If we find a triplet in the range [3,7], it kind of collides with previous ranges' answers.
Hey vivek, thanks for the help so far. I think first I could do the O(N^2) 3sum algorithm on the original array, and then store the results in a new one
I would have to sort them in a way for easy access
Maybe we could use segment trees for range querying? Not sure though.
