Given a set of candidate numbers (candidates) (without duplicates) and
a target number (target), find all unique combinations in candidates where
the candidate numbers sums to target.
The same repeated number may be chosen from candidates unlimited number
of times.
Note:
target) will be positive integers.Input: candidates = [2,3,6,7], target = 7,
A solution set is:
[
[7],
[2,2,3]
]
Input: candidates = [2,3,5], target = 8,
A solution set is:
[
[2,2,2,2],
[2,3,3],
[3,5]
]
Since the problem is to get all the possible results, not the best or the number of result, thus we donβt need to consider DP (dynamic programming), backtracking approach using recursion is needed to handle it.
Here is an example of decision tree for the situation when candidates = [2, 3] and target = 6:
0
/ \
+2 +3
/ \ \
+2 +3 +3
/ \ / \ \
+2 β β β β
/ \
β β