Easy
Given an integer n
, return an array ans
of length n + 1
such that for each i
(0 <= i <= n
), ans[i]
is the number of 1
’s in the binary representation of i
.
Example 1:
Input: n = 2
Output: [0,1,1]
Explanation:
0 --> 0
1 --> 1
2 --> 10
Example 2:
Input: n = 5
Output: [0,1,1,2,1,2]
Explanation:
0 --> 0
1 --> 1
2 --> 10
3 --> 11
4 --> 100
5 --> 101
Constraints:
0 <= n <= 105
Follow up:
O(n log n)
. Can you do it in linear time O(n)
and possibly in a single pass?__builtin_popcount
in C++)?public class Solution {
public int[] CountBits(int num) {
int[] result = new int[num + 1];
int borderPos = 1;
int incrPos = 1;
for (int i = 1; i < result.Length; i++) {
// when we reach pow of 2 , reset borderPos and incrPos
if (incrPos == borderPos) {
result[i] = 1;
incrPos = 1;
borderPos = i;
} else {
result[i] = 1 + result[incrPos++];
}
}
return result;
}
}