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totalHammingDistance.cpp
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totalHammingDistance.cpp
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// Source : https://leetcode.com/problems/total-hamming-distance/
// Author : Calinescu Valentin
// Date : 2017-01-09
/***************************************************************************************
*
* The Hamming distance between two integers is the number of positions at which the
* corresponding bits are different.
*
* Now your job is to find the total Hamming distance between all pairs of the given
* numbers.
*
* Example:
* Input: 4, 14, 2
*
* Output: 6
*
* Explanation: In binary representation, the 4 is 0100, 14 is 1110, and 2 is 0010 (just
* showing the four bits relevant in this case). So the answer will be:
* HammingDistance(4, 14) + HammingDistance(4, 2) + HammingDistance(14, 2) = 2 + 2 + 2 = 6.
*
* Note:
* Elements of the given array are in the range of 0 to 10^9
* Length of the array will not exceed 10^4.
***************************************************************************************/
/*
* Solution 1 - O(N)
*
* The total Hamming Distance is equal to the sum of all individual Hamming Distances
* between every 2 numbers. However, given that this depends on the individual bits of
* each number, we can see that we only need to compute the number of 1s and 0s for each
* bit position. For example, we look at the least significant bit. Given that we need to
* calculate the Hamming Distance for each pair of 2 numbers, we see that the answer is
* equal to the number of 1s at this position * the number of 0s(which is the total number
* of numbers - the number of 1s), because for each 1 we need to have a 0 to form a pair.
* Thus, the solution is the sum of all these distances at every position.
*/
class Solution {
public:
int totalHammingDistance(vector<int>& nums) {
long long solution = 0;
int ones[31];
for(int i = 0; i < 31; i++)
ones[i] = 0;
for(vector<int>::iterator it = nums.begin(); it != nums.end(); ++it)
{
for(int i = 0; (1 << i) <= *it; i++) //i is the position of the bit
if((1 << i) & *it)//to see if the bit at i-position is a 1
ones[i]++;
}
for(int i = 0; i < 31; i++)
solution += ones[i] * (nums.size() - ones[i]);
return solution;
}
};