An array of N elements is given indexed from 1 to N. All elements are unknown and integers. Given some queries in the form of A, B, C where A is the starting index, B is the ending index and C is the sum of all elements between A and B inclusive. Find out all the elements of array. Example:
N=4 1, 3, 0 2, 4, 4
One valid solution to this is:
2, -3, 1, 6
1<=A<=B<=N, 2<=N<=65000, C<=1000000000
Any solution fulfilling the given criteria is accepted and assume enough queries are given to find out all the elements.
One way to solve this is by treating the problem as a series of simultaneous equations. Each summation gives you a linear equation in up to n variables, so if you can find a solution to that equation that has integer values you should be all set.
Using Gaussian Elimination on a series of n variables with k different constraints takes (assuming that n = O(k)) O(k3) time on expectation (assuming the system is well-conditioned). From there, finding integer solutions should be easy; just find the common denominator of any one solution vector and multiply through by it.
Hope this helps!