# Find vector elements that sum up to specific number in MATLAB

Let us consider that we have a vector `VEC`.

Is ther a way to find which vector elements can be grouped so as they sum up to a given number NUM in MATLAB?

For example if `VEC = [2 5 7 10]` and `NUM = 17`

The requested algorithm should provide the answer that subvectors `[2 5 10]` and `[7 10]` sum up to given `NUM`.

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Are you looking for a solution for small vectors, or does it also need to work for long vectors? (thousands of elements?) – Dennis Jaheruddin Feb 13 '13 at 14:49
It would be helpful if the algorithm worked for vectors that contain number of elements from 10 to 50. – ToLos Mil Feb 15 '13 at 9:15
In that case you may want to reconsider your needs. You may have already expected this, but for a vector of length 50 the number of results can exceed 10^14. Perhaps you only need a few results? – Dennis Jaheruddin Feb 15 '13 at 9:44
I expexted it really, but I wonder if an algorithm exists that can provide a solution possibly by using heuristic rules, thus avoiding to explore the whole space of possible solutions. – ToLos Mil Feb 15 '13 at 10:10
Assuming `vec = ones(50)` and `num = 25` which solutions would you like to see? – Dennis Jaheruddin Feb 15 '13 at 10:19

Here is a way to solve this using `conbntns`, a function from the Mapping Toolbox that retrieves all possible combinations of set of values (if you don't have this toolbox, you can use combinator from the FEX). So, for vector `A`, for example, we'll find all possible combination of a given length (1 to the length of `A`) then sum them and see which is equal to `NUM=17`:

``````NUM=17;
A=[2 5 7 10];
for ii=1:numel(A)
B=combntns(A,ii);
C=sum(B,2);
D=find(C==NUM);
if ~isempty(D)
B(D,:)
end
end

ans =
7    10
ans =
2     5    10
``````

Of course you can store `B(D,:)` output into a cell array or whatever for future use...

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Here's another way to do it without any toolboxes or third party functions. It steps through all possible combinations of values in `VEC` and tests if the sum equals `NUM`.

``````VEC = [2 5 7 10]
NUM = 17;
n = length(VEC);
for i = 1:(2^n - 1)
ndx = dec2bin(i,n) == '1';
if sum(VEC(ndx)) == NUM
VEC(ndx)
end
end

ans =
7    10
ans =
2     5    10
``````

This is similar to natan's answer, but without using `conbntns`.

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please don't use `i` as a variable in matlab – Shai Feb 13 '13 at 16:46
I do it all the time. I do not use `i` for imaginary numbers. For speed and improved robustness, you can replace complex i and j by 1i. – shoelzer Feb 13 '13 at 18:25
@Shai I posted my argument as a response to the question you linked. – shoelzer Feb 13 '13 at 19:13

If I'm not mistaken this problem is NP-hard.
But an interesting approach might be using `bintprog`:

``````n = numel( VEC );
x0 = zeros( 1, n ); % one possible init guess
x = bintprog( zeros( n, 1 ), ...  % objective function meaningless, we look for feasibility
[], [], ... % no inequality constraints
VEC(:)', NUM, ... %' we want the sum of selected elements to equal NUM
x0 ); % changing init x0 might result with different solutions
find( x )
``````

the binary vector `x` (the solution of the optimization in `bintprog`) selects the relevant elements that sum to `NUM`

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+1 , very nice approach `bintprog`... – bla Feb 13 '13 at 23:40
Very nice approach indeed, but as i understand it, it can not provide all possible solutions (for example in the given example there are two possible solutions, i.e. [7 10] and [2 5 10]). Am i wrong? – ToLos Mil Feb 15 '13 at 9:18
@ApostolosMilioudis - you are correct. `bintprog` searches for a single solution only. However, since the problem is NP complete, this might find a solution faster than O(2^n)... – Shai Feb 17 '13 at 6:13