# Maximum and Minimum Value for Triplet

I have a Java computational problem in which I am given an array of integers:

For example:

3 -2 -10 0 1

and I am supposed to compute what is the minimal integer and maximum triplet that can be formed from these integers. (In this case, min=-30,max=60)

I initially thought that the maximum would always be positive and minimum would always be negative.

Hence,

My initial algorithm was:

1. Scan the array and take out the 3 largest elements inside, store into an array.
2. At the same time, take out the 3 smallest elements inside, store into another array.

By inequalities, we can deduce the following:

+ve = (-)(-)(+) or (+)(+)(+)

-ve = (+)(+)(-) or (-)(-)(-)

Hence, I used the elements from the two arrays that I computed to try to obtain the maximal and minimal triplet. (i.e. In order to obtain the maximal triplet, I compared the triplet formed by the largest 3 with the triplet formed by the smallest 2 and the largest integer)

However, I realized that if all the given integers were negative, my algorithm would be defeated because of the fact that the maximal would be negative. (Vice-versa for minimal)

I know that I can simply add more checks to solve this problem or simply just use the brute force O(N^3) solution. But there must be a better way to solve this problem.

This problem must be solved by recursion and only in O(N) time.

I am in a fix. Could someone please guide me?

Thanks.

-
out of curiosity, what is leading you to recursion and O(N)? I can do this problem in anywhere from 2 - 4 lines of scala code depending on how confusing you want the lines to be. I doubt it's O(N), but it's a pretty elegant solution. Basically, compute the lists of combinations of all sizes, sum them up and do min and max. Brute force as you suggest, but elegant in scala. –  Matt Oct 29 '13 at 5:12
Why not minimum value is 3*(-2-10)=-36. Or, -10*(-2-3)=-50, or -10*(-2)*(-3)= -60? –  ElKamina Oct 29 '13 at 5:58
confirm SoC student :D –  mauris Oct 27 at 15:45
Anyway for those who are looking for the solution: github.com/mauris/CS1020-Labs/tree/master/practice-pe/… - The solution is O(n logn) –  mauris Oct 29 at 14:42