Most efficient algorithm for finding all thecombinations [closed]

Here it is i will have almost 50-100 numbers for which i have to find the combinations that are equal to greater than a specific number and use the results further in my problem.. :

for example : i have 2 3 5 and have yo find all the combinations whose sums are equal to or greater than say 5 ,

So answer will be 5(2+3),5(5) , 7(5+2) , 8(5+3) ,10(2+3+5)

I don't need the sums i just need the combinations that fulfill the sum requirements .

The number will also be under 100.

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closed as off-topic by Mitch Wheat, Burkhard, Krishnabhadra, Luv, Yu HaoAug 5 '13 at 4:38

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No attempt shown. –  Mitch Wheat Aug 5 '13 at 4:03
Since each number is either included or excluded in a combination the number of combinations will be 2^100 = 1.2676506e+30 (~1 000 000 000 000 000 000 000 000 000 000) in the worst case. That's assuming that you need all combinations with a sum higher than 0 and all numbers are unique. Even if a fraction of the combinations are excluded through an efficient algorithm you will still end up with a huge number of permutations which will take time to iterate through. Are you certain that this is the best way to solve your problem? –  Akinakes Aug 5 '13 at 4:23
Looks like a class assignment –  andy256 Aug 5 '13 at 4:47