# Arithmetic sequence in a list of numbers

For a given set of numbers

``````3 5 3 6 3 4 10 4 5 2
``````

I wish to find all the `**triplets**` which form a arithmetic progression.

``````like (3,3,3) (3,4,5) (6,4,2) (3,4,5)
``````

I have a trivial O(n^3) solution. I was wondering if it can be done it time O(n^2) or less.

Any help is highly appreciated.

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why the C++ tag? –  Cheers and hth. - Alf Nov 10 '12 at 9:24
@Cheersandhth.-Alf I just removed the C++ tag. –  Ali Nov 10 '12 at 9:54

`O(n^2 * logn)` can be achieved by:

1. Sort the array - O(nlogn)
2. iterate all pairs (O(n^2) of those) - and for each pair (x,y) do a binary search to see if you have: `max{x,y} + abs(x-y)` or `min{x,y} - abs(x-y)` as an element.
Special care should be taken for pairs where `x==y` - but it can be easily solved within the same time complexity.

Note that this solution will give you 1 occurance of each triplet (no duplicates).

(EDIT: by using a hash table (histogram if you care for the number of triplets ) and look in it instead of sorting the array and using binary search - you can reduce the time to `O(n^2)` on average, with the cost of `O(n)` additional space).

Without the 1 occurance drawback - it cannot be done better then `O(n^3)`, because there could be `O(n^3)` such triplets, for example in the array `[1,1,1,...,1]` - you have `chose(3,n)` such triplets.

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You're wrong with the second part - you can use two binary searches to find the lower and upper bound of the number you're looking for and count how many of it there are. –  Ivan Vergiliev Nov 10 '12 at 9:16
@IvanVergiliev: You can count how many there are - but not to output them - which seems to be what the OP is asking. –  amit Nov 10 '12 at 9:20
you can reduce this to O( n^2 ) by adding a hash table for the lookup of third member –  Cheers and hth. - Alf Nov 10 '12 at 9:21
@Cheersandhth.-Alf: You are correct, I added indication for it. thanks. –  amit Nov 10 '12 at 9:24
Why do we need to do the binary search? As far as I see it, we are done after the first sort. Just print all possible tripplet-combinations. Every combination x,y,z can be print xyz and zyx. They always follow the given requirements, because of the previous sort. –  tb- Nov 10 '12 at 10:54