Let f(x) be the number of zeroes at the end of x!. (Recall that x! = 1 * 2 * 3 * ... * x, and by convention, 0! = 1.)
For example, f(3) = 0 because 3! = 6 has no zeroes at the end, while f(11) = 2 because 11! = 39916800 has 2 zeroes at the end. Given K, find how many non-negative integers x have the property that f(x) = K.
Example 1: Input: K = 0 Output: 5 Explanation: 0!, 1!, 2!, 3!, and 4! end with K = 0 zeroes. Example 2: Input: K = 5 Output: 0 Explanation: There is no x such that x! ends in K = 5 zeroes.
Note:
Kwill be an integer in the range[0, 10^9].
Companies:
Amazon
// OJ: https://leetcode.com/problems/preimage-size-of-factorial-zeroes-function/
// Author: github.com/lzl124631x
// Time: O((logK)^2)
// Space: O(1)
class Solution {
private:
int getZeros(int i) {
int ans = 0;
while (i) {
ans += i;
i /= 5;
}
return ans;
}
public:
int preimageSizeFZF(int K) {
if (!K) return 5;
int i = 1;
while (getZeros(i) < K) i *= 5;
int L = i / 5, R = i;
while (L <= R) {
int M = (L + R) / 2;
int z = getZeros(M);
if (z == K) return 5;
if (z < K) L = M + 1;
else R = M - 1;
}
return 0;
}
};