# Can it be possible to compute in linear time O(n) or O(nlogn)

I am trying to find an approach in O(n) or O(n log n) to return the output in the following case. If i have a set with n elements and i need to find the minimum set of numbers in the set which adds up to the number given.

For example, A=[0,9,1,2,5,4], If i were given with q=6, then my possible combinations are: (2+4), (1+5) and should return null if no proper subset is found?, This is not an homework question, I just want to learn for good programming approaches.

• Commented Feb 19, 2013 at 3:06
• looks like you have to try out every possible combination.. cannot be done in O(n).. but maybe a multithreaded version could be faster Commented Feb 19, 2013 at 3:06
• if you're interested, have a look at matroids and greedy algorithms;) Commented Feb 19, 2013 at 3:08
• Please refer to my question that has the solution stackoverflow.com/questions/14575931/… Commented Feb 19, 2013 at 5:36
• stackoverflow.com/questions/14575931/… Commented Feb 19, 2013 at 5:44