# finding a triplet having a given sum

I have been struggling with this questions for sometime now. The question goes like this:-

We have n^2 numbers. We need to find out if there exists a triplet a,b,c such that a+b+c = 0. For a more generic case, a+b+c = k. (k is given)

There exists a solution with O(n^2log(n)) complexity.

Any help would be greatly appreciated.

thanks

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You may want to read existing literature on the subset sum problem, which is a more general version of what you are proposing. en.wikipedia.org/wiki/Subset_sum_problem –  mquander Dec 15 '09 at 6:05
Just out of curiosity, is this for Project Euler? –  Carl Smotricz Dec 15 '09 at 6:11
nope this is not for project euler. This problem was asked in one of my exams a couple for years back. –  Pigol Dec 15 '09 at 6:21
are the N numbers unique, or are there duplicates? And: (a != b) && (a != c) ? –  anon Dec 15 '09 at 7:48
What do you mean by n^2 numbers? What is n? –  MAK Dec 15 '09 at 7:51
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I wrote a rough solution.

It can definitely be done in O(n^2). You don't have to sort this.

It's an extension of the problem which requires summing two numbers to x and the trick is to use the hash table.

``````def triplets(l, total):
"""Sum of 3 numbers to get to total
Basically an extension of the 2 table
"""
l = set( l)
d = { }

for i in l:
remain = total - i

inside = {}
for j in l:
if i == j:
continue
inside[j] = remain -j

d[i] = inside

good = set()

for first, dic in d.iteritems():
for second, third in dic.iteritems():
if third in l:

for each in good:
print each

triplets( [2, 3, 4, 5, 6], 3+4+5)
``````

NOTE: we can use a fast sorting method for triplets which will be O(1).

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To get this in O(n²logn), you'd have to sort the numbers. Find all combinations of 2 numbers, and do a binary search to find the third.

The upper bound is much higher for the general version of the problem.

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the number of combinations would be O(n^4). we are looking for an optimized solution. –  Pigol Dec 15 '09 at 8:31
so basically, to rephrase, you're saying there are n items and there's a solution in O(nlog√n)? –  Anurag Dec 15 '09 at 8:40
@Anurag, come on, log√n equals ½log n –  Pavel Shved Dec 15 '09 at 10:25
fair enough Pavel, so it's in O(nlogn).. and here I was rejoicing at the choice of unicode characters :) –  Anurag Dec 15 '09 at 13:51