Given an array of positive integers arr and a sum x, find all unique combinations in arr where the sum is equal to x. The same repeated number may be chosen from arr unlimited number of times. Elements in a combination (a1, a2, …, ak) must be printed in non-descending order. (ie, a1 <= a2 <= … <= ak).
The combinations themselves must be sorted in ascending order, i.e., the combination with smallest first element should be printed first. If there is no combination possible the print "Empty" (without quotes).
Input : arr = 2, 4, 6, 8 x = 8 Output : [2, 2, 2, 2] [2, 2, 4] [2, 6] [4, 4] 
Since the problem is to get all the possible results, not the best or the number of result, thus we don’t need to consider DP(dynamic programming), recursion is needed to handle it.
We should use the following algorithm.
1. Sort the array(non-decreasing). 2. First remove all the duplicates from array. 3. Then use recursion and backtracking to solve the problem. (A) If at any time sub-problem sum == 0 then add that array to the result (vector of vectors). (B) Else if sum if negative then ignore that sub-problem. (C) Else insert the present array in that index to the current vector and call the function with sum = sum-ar[index] and index = index, then pop that element from current index (backtrack) and call the function with sum = sum and index = index+1
Below is C++ implementation of above steps.
( 2 2 2 2 ) ( 2 2 4 ) ( 2 6 ) ( 4 4 ) ( 8 )
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