This is a Subset sum problem, It's NP-Compelete but there is pseudo polynomial time algorithm for it. see wiki.
The problem can be solved in polynomial if the sum of items in set is polynomially related to number of items, from wiki:
The problem can be solved as follows
using dynamic programming. Suppose the
x1, ..., xn
and we wish to determine if there is a
nonempty subset which sums to 0. Let N
be the sum of the negative values and
P the sum of the positive values.
Define the boolean-valued function
Q(i,s) to be the value (true or false)
"there is a nonempty subset of x1, ..., xi which sums to s".
Thus, the solution to the problem is
the value of Q(n,0).
Clearly, Q(i,s) = false if s < N or s
P so these values do not need to be stored or computed. Create an array to
hold the values Q(i,s) for 1 ≤ i ≤ n
and N ≤ s ≤ P.
The array can now be filled in using a
simple recursion. Initially, for N ≤ s
≤ P, set
Q(1,s) := (x1 = s).
Then, for i = 2, …, n, set
Q(i,s) := Q(i − 1,s) or (xi = s) or Q(i − 1,s − xi) for N ≤ s ≤ P.
For each assignment, the values of Q
on the right side are already known,
either because they were stored in the
table for the previous value of i or
because Q(i − 1,s − xi) = false if s −
xi < N or s − xi > P. Therefore, the
total number of arithmetic operations
is O(n(P − N)). For example, if all
the values are O(nk) for some k, then
the time required is O(nk+2).
This algorithm is easily modified to
return the subset with sum 0 if there
This solution does not count as
polynomial time in complexity theory
because P − N is not polynomial in the
size of the problem, which is the
number of bits used to represent it.
This algorithm is polynomial in the
values of N and P, which are
exponential in their numbers of bits.
A more general problem asks for a
subset summing to a specified value
(not necessarily 0). It can be solved
by a simple modification of the
algorithm above. For the case that
each xi is positive and bounded by the
same constant, Pisinger found a linear