【LeetCode】172. Factorial Trailing Zeroes

Factorial Trailing Zeroes

Given an integer n, return the number of trailing zeroes in n!.

Note: Your solution should be in logarithmic time complexity.

Credits:
Special thanks to @ts for adding this problem and creating all test cases.

 

对n!做质因数分解n!=2x*3y*5z*...

显然0的个数等于min(x,z),并且min(x,z)==z

证明:

对于阶乘而言,也就是1*2*3*...*n
[n/k]代表1~n中能被k整除的个数
那么很显然
[n/2] > [n/5] (左边是逢2增1,右边是逢5增1)
[n/2^2] > [n/5^2](左边是逢4增1,右边是逢25增1)
……
[n/2^p] > [n/5^p](左边是逢2^p增1,右边是逢5^p增1)
随着幂次p的上升,出现2^p的概率会远大于出现5^p的概率。
因此左边的加和一定大于右边的加和,也就是n!质因数分解中,2的次幂一定大于5的次幂

 

class Solution {
public:
    int trailingZeroes(int n) {
        int ret = 0;
        while(n)
        {
            ret += n/5;
            n /= 5;
        }
        return ret;
    }
};

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