# Efficient Algorithm to find max result from adding given number to the summation of all elements or its complement in a list [closed]

Suppose I have number `x`, list of numbers and max number `y`. I need to find maximum result I can obtain from adding `x` to either addition or subtraction of each element in the list such that the summation does not exceed `y` and does not go below 0.

Note: you must either add or subtract each element in the list which means you cannot skip numbers.

Example:

``````x= 3 y=10  list={2,6,1}
``````

Max i can get : `3 - 2 + 6 +1 = 8` which is less than 10 and >0
failure case for this will be `3+2+6+1= 12` which is > y so is invalid solution.
Another failure case `3-2-6 = -5` (no need here to check elements after 6 ,since you got -ve number which is refused)

How can I find this maximal value?

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## closed as too localized by Servy, L.B, Ed Staub, brimborium, woodchips Nov 13 '12 at 1:58

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What have you tried until now? see sscce.org. – dan Nov 12 '12 at 21:48
Seeing your "slow" implementation would've been nice. – Lews Therin Nov 12 '12 at 21:49
SO is not a `Post your homework, get your code` site. – L.B Nov 12 '12 at 21:55
This is not homework sir,this is sub-problem i am facing in part of project doing it for my own use ! – Ss Ela Nov 12 '12 at 22:03
@Servy: I disagree - questions such as "how to approach this problem" is OK for SO, "we" don't only "accept" questions such as: "How to split a string in java" or "I have a bug in my code, can you find it". Algorithmic questions are perfectly fine as well, why won't they be? – amit Nov 12 '12 at 22:13

Here is the solution:

``````    int x = 3, y = 10;
var lst = new List<int>{ 1, 2, 3, 4 };
int n = (int)Math.Pow(2, lst.Count);
var lst2 = new List<List<int>>();
for (int i = 0; i < n; i++)
{
var lstCopy = new int[lst.Count];
lst.CopyTo(lstCopy);
for (int j = 1; j <= i; j *= 2)
if ((j & i) != 0)
lstCopy[(int)Math.Log(j, 2)] *= -1;
}
bool yes = lst2.Select(l=>x + l.Sum()).Any(l=>l > 0 && l < y);
if (yes)
Console.WriteLine(lst2.Select(l => x + l.Sum()).Where(l => l > 0 && l < y).First());
``````

Note here that you will need to check 2^n arrays of integers where n is the length of your original array(it's your {2, 6, 1})

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So, you basically have a list `l`, and a number `y-x` (if you must add `x`, and get `y`, it is easy to see it is equivalent to get `y-x`) and you want to add/subtract each element in `l` and get closest as possible to the value `y-x`.

Note that the problem is equivalent to the Partition Problem, which is NP-Complete, since if you have a list `l`, and values such that `y-x == 0` - you need to find two sublists `l1,l2` such that `sum(l1) - sum(l2) == 0`, and `l1 union l2 = l` which is exactly the partition problem.

Thus - there is no known polynomial solution to the problem.

I'd have a look at exponential (backtracking for example) solution, or a variation on the pseudo polynomial DP solution for the related subset sum problem.

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Thank you :) i will read the Partition problem and the DP solution and give you feedback. – Ss Ela Nov 12 '12 at 22:08