I've been breaking a sweat over this question I've been asked to answer (it's technically homework). I've considered a hashtable but I'm kind of stuck on the exact specifics of how I'd make this work

Here's the question:

Given

ksets of integersA_{1},A_{2},..,A_{k}of total size O(n), you should determine whether exista_{1}ϵA_{1},a_{2}ϵA_{2},..,a_{k}ϵA_{k}, such thata_{1}+a_{2}+..+a_{k−1}=a_{k}. Your algorithm should run in T_{k}(n) time, where T_{k}(n) = O(n^{k/2}× logn) for evenk, and O(n^{(k+1)/2}) for odd values ofk.

Can anyone give me a general direction so that I can come closer to solving this?

anyanswer to the problem (disregarding complexity)? If so, what do you analyze it's complexity as? Do you think your approach is completely wrong-headed, or are there specific parts that you think are faulty? – Damien_The_Unbeliever Dec 17 '11 at 15:50