# Algorithm to find the pair of numbers in an integer array whoes sum are equal

Algorithm to find the pair of numbers in an integer array whoes sum are equal. ex {1 2 3 4 6}

here{3 2} { 4 1} should be the output, because the sum is 3+2=5, 4+1=5.

Here the main thing is the complexity shld be O(n). Please help me if we find any solutions for this?

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Will the array always be sorted? –  Karl Knechtel Dec 4 '10 at 12:23
is sum of pairs already given? –  Rozuur Dec 4 '10 at 12:24
@user281402 - I don't think so, ex {1 2 3 4 6} and there may be more O(n) –  JeffO Dec 4 '10 at 12:30
Is it guaranteed that there will be n/2 pairs, and that at most one element will have no pair? –  Dialecticus Dec 4 '10 at 12:58
Array {1 2 3 4 6} has another solution: 3+4, 1+6. –  Dialecticus Dec 4 '10 at 12:59
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Are you sure that the problem is solvable at all in O(n)?

Imagine the case when the input sequence is just {0, 0, 0, 0, 0, 0, ..., 0}. Here every two pairs satisfy the condition. Just listing all the pairs is already at least O(n^2).

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I think algorithm should be answer in O(n) if there is a pair or not, It's not important have more than 1 pair. –  Saeed Amiri Dec 4 '10 at 13:31
@Saeed: the OP clearly states in the question that the output should contain the pair(s), not just the information whether such pairs exist. Let's wait for the OP's update (if any). –  Vlad Dec 4 '10 at 13:50
Yes, but I think (like other people in comments) `OP` does not clarify exact problem, OP's sample says another thing. there are 2, 2-pair (as @Dialecticus said), and OP just mentioned one of them. –  Saeed Amiri Dec 4 '10 at 13:55
@Saaed: maybe, so we need additional input. It's possible however that OP just didn't find this extra solution himself. –  Vlad Dec 4 '10 at 13:56

I think it's possible:

you need a second array tmp = {} with the length of sum.

``````sum = 5
array = {1,2,3,4,6}
for every i in array{
if i>=sum:
continue
if tmp[i] != 0 {
output {i,(sum-i)}
tmp[i] = 0
continue
}

tmp[sum-i] := i
}
``````

that's it. so simple and with O(n)

cons:

1. it won't find a pair like {5,0}, therefore you have to use real Integer-Objects to check at line 6 against NULL and assign NULL in line 8,
2. pairs with a negative number won't work.
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I am not sure whether this is possible to do effectively.

According to the given information, the array is not sorted and you don't know the expected summation you will need to traverse through the array twice.

Think of a search algorithm. the least complex one, the linear (sequential) search has the O(n) complexity. It is just for traverse the array. If you know the sum you are expecting then the case is similar, and actually what you need to do is a linear search. For anything else you get a higher complexity.

But in your case you don't know the sum so you will need to traverse over more than one time. My head says this is O(n log n) or O(n^2).

Perhaps there might be a solution that utilizes more data structures, perhaps a summation table (2D array???) but the chance of existing such a solution is low.

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If you know the sum, there is no reason for finding the pair (as easy as you wrote), you know sum is `S`, how you can find the similar pair? –  Saeed Amiri Dec 4 '10 at 13:43
why the chances for the solution with the elaborate data structures are low? Could you please explain? –  Vlad Dec 4 '10 at 14:19