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singleNumber.II.cpp
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singleNumber.II.cpp
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// Source : https://oj.leetcode.com/problems/single-number-ii/
// Author : Hao Chen
// Date : 2014-06-17
/**********************************************************************************
*
* Given an array of integers, every element appears three times except for one. Find that single one.
*
* Note:
* Your algorithm should have a linear runtime complexity. Could you implement it without using extra memory?
*
*
**********************************************************************************/
class Solution {
public:
Solution(){
srand(time(0));
}
//random invoker
int singleNumber(int A[], int n) {
if (rand()%2){
return singleNumber_1(A, n);
}
return singleNumber_2(A, n);
}
/*
* This solution is clear & straightforward implementation.
*
* We use an array of 32 length(e.g. count[32]) to count the the bits for all of numbers.
*
* Because the same number appear 3 times, which means the sum of i-th bits for all numbers should be 3 times.
*
* In other word, the sum of the i-th bits mod 3, it must be 0 or 1. 1 means that is the single number bit.
*
* This solution can be easy to extend to "every element appears k times except for one."
*
*/
int singleNumber_1(int A[], int n) {
int count[32] = {0};
int result = 0;
for (int i = 0; i < 32; i++) {
for (int j = 0; j < n; j++) {
if ((A[j] >> i) & 1) {
count[i]++;
}
}
result |= ((count[i] % 3) << i);
}
return result;
}
/*
* The following solution is popular solution on Internet, but it looks it's not easy to understand.
*
* Actually, it just optimizes the above soultion.
*
* Let's see how it improve the above.
*
* We use three bitmasks,
* 1) `ones` as a bitmask which represents the i-th bit had appeared once.
* 2) `twos` as a bitmask which represents the i-th bit had appeared twice.
* 3) `threes` as a bit mask which represents the i-th bit had appeared three times.
*
* When the i-th bit had appeared for the third time, clear the i-th bit of both `ones` and `twos` to 0.
* The final answer will be the value of `ones`
*
*/
int singleNumber_2(int A[], int n) {
int ones = 0, twos = 0, threes = 0;
for (int i = 0; i < n; i++) {
// `ones & A[i]` the result is the bitmask which the bits appeared twice
twos |= ones & A[i];
// XOR means remove the bit which appeared twice int `ones`
ones ^= A[i];
// count the `three`
threes = ones & twos;
// clear the `ones` and `twos` if the i-th bit had appeared three times.
ones &= ~threes;
twos &= ~threes;
}
return ones;
}
};