Given a number of different denominations of coins (e.g., 1 cent, 5 cents, 10 cents, 25 cents), get all the possible ways to pay a target number of cents.
Arguments
coins - an array of positive integers representing the different denominations of coins, there are no duplicate numbers and the numbers are sorted by descending order, eg. {25, 10, 5, 2, 1}
target - a non-negative integer representing the target number of cents, eg. 99
Assumptions
coins is not null and is not empty, all the numbers in coins are positive
target >= 0
You have infinite number of coins for each of the denominations, you can pick any number of the coins.
Return
a list of ways of combinations of coins to sum up to be target.
each way of combinations is represented by list of integer, the number at each index means the number of coins used for the denomination at corresponding index.
Examples
coins = {2, 1}, target = 4, the return should be
[
[0, 4], (4 cents can be conducted by 0 2 cents + 4 1 cents)
[1, 2], (4 cents can be conducted by 1 2 cents + 2 1 cents)
[2, 0] (4 cents can be conducted by 2 2 cents + 0 1 cents)
]
public class Solution {
public List<List<Integer>> combinations(int target, int[] coins) {
// Write your solution here.
List<List<Integer>> res = new ArrayList<>();
List<Integer> sol = new ArrayList<>();
dfs(target, coins, res, 0 , sol) ;
return res;
}
private void dfs(int remain, int[] coins,List<List<Integer>> res, int index, List<Integer> sol){
//base case
if (index == coins.length) {
if (remain == 0 ) {
res.add(new ArrayList<>(sol));
}
return ;
}
//当前的coin 能用几次用几次的往下压: 因为次数从0开始, 所以需要 <=
for (int i=0 ; i<= remain/coins[index]; i++ ) {
sol.add(i) ;
dfs(remain-i*coins[index], coins, res, index+1, sol);
sol.remove(sol.size()-1);
}
}
}