Suppose you have N integers from 1 to N. We define a beautiful arrangement as an array that is constructed by these N numbers successfully if one of the following is true for the ith position (1 <= i <= N) in this array:
The number at the ith position is divisible by i.
i is divisible by the number at the ith position.
Now given N, how many beautiful arrangements can you construct?
Note:
N is a positive integer and will not exceed 15.
Example 1:
Input: 2
Output: 2
Explanation:
The first beautiful arrangement is [1, 2]:
Number at the 1st position (i=1) is 1, and 1 is divisible by i (i=1).
Number at the 2nd position (i=2) is 2, and 2 is divisible by i (i=2).
The second beautiful arrangement is [2, 1]:
Number at the 1st position (i=1) is 2, and 2 is divisible by i (i=1).
Number at the 2nd position (i=2) is 1, and i (i=2) is divisible by 1.
Solution:Backtracking
思路:
Time Complexity: O(N) Space Complexity: O(N)
Solution Code:
public class Solution {
int count = 0;
public int countArrangement(int N) {
if (N == 0) return 0;
helper(N, 1, new int[N + 1]);
return count;
}
private void helper(int N, int pos, int[] used) {
if (pos > N) {
count++;
return;
}
for (int i = 1; i <= N; i++) {
if (used[i] == 0 && (i % pos == 0 || pos % i == 0)) {
used[i] = 1;
helper(N, pos + 1, used);
used[i] = 0;
}
}
}
}
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