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
Constraints:
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.
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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(k^{3}) time on expectation (assuming the system is wellconditioned). 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! 

