Here is an interview question: Input: Integer N; different positive integers a1, a2 ... aN;
Output: the minimum positive integer m, which cannot be represented in the form m = x1*a1+x2*a2+...xN*aN, where xi={0,1}.
Here is an interview question: Input: Integer N; different positive integers a1, a2 ... aN; Output: the minimum positive integer m, which cannot be represented in the form m = x1*a1+x2*a2+...xN*aN, where xi={0,1}. 


naive solution:
i calculated all possible sums, and iterated until i found an integer which is not in the list 


For extremely fast allsumsof3numbers code, see explanation at polygenelubricants.com of code by Aliaksei Safryhin. The series of statements like
may look clumsy and slow, but in my tests ran many times faster than shiftedbitmap methods. Also see Al Zimmermann's Son of Darts and How can I improve this algorithm for solving a modified Postage Stamp problem? and if you can find darts.pdf by John Morris, 7 July 2010, it contains code of a fairly fast enumerator for firstmissingsubsetsums for 3 to 20 numbers. 


Since the minimal difference between two successive numbers is the least of the a_{n} factors, and 0 is representable, I'd say min_{n}(a_{n})  1 Of course, if min_{n}(a_{n}) = 1, you could make a similar reasoning for the secondtominimum. 

