| Time Limit: 1000MS | Memory Limit: 65536K | |
| Total Submissions: 7059 | Accepted: 3030 |
Description
This problem is based on an exercise of David Hilbert, who pedagogically suggested that one study the theory of 4n+1 numbers. Here, we do only a bit of that.
An H-number is a positive number which is one more than a multiple of four: 1, 5, 9, 13, 17, 21,... are the H-numbers. For this problem we pretend that these are the only numbers. The H-numbers are closed under multiplication.
As with regular integers, we partition the H-numbers into units, H-primes, and H-composites. 1 is the only unit. An H-number h is H-prime if it is not the unit, and is the product of two H-numbers in only one way: 1 × h. The rest of the numbers are H-composite.
For examples, the first few H-composites are: 5 × 5 = 25, 5 × 9 = 45, 5 × 13 = 65, 9 × 9 = 81, 5 × 17 = 85.
Your task is to count the number of H-semi-primes. An H-semi-prime is an H-number which is the product of exactly two H-primes. The two H-primes may be equal or different. In the example above, all five numbers are H-semi-primes. 125 = 5 × 5 × 5 is not an H-semi-prime, because it's the product of three H-primes.
Input
Each line of input contains an H-number ≤ 1,000,001. The last line of input contains 0 and this line should not be processed.
Output
For each inputted H-number h, print a line stating h and the number of H-semi-primes between 1 and h inclusive, separated by one space in the format shown in the sample.
Sample Input
21 85 789 0
Sample Output
21 0 85 5 789 62
Source
1 #include <cstdio> 2 #include <cstring> 3 #include <algorithm> 4 #include <iostream> 5 6 using namespace std; 7 8 #define maxn 1000005 9 10 bool H[maxn]; 11 int ans[maxn],ele[maxn]; 12 int len = 0; 13 14 15 void init() { 16 17 for(int i = 1; i <= maxn - 5; i++) { 18 H[i] = (i % 4 == 1); 19 } 20 21 for(int i = 5; i * i <= maxn - 5; i += 4) { 22 if(!H[i]) continue; 23 for(int j = i; j * i <= maxn - 5; j++) { 24 H[j * i] = 0; 25 } 26 } 27 28 for(int i = 5; i <= maxn - 5; i += 4) { 29 if(H[i]) { 30 ele[len++] = i; 31 } 32 } 33 34 for(int i = 0; i < len && ele[i] * ele[i] <= maxn - 5; i++) { 35 for(int j = i; j < len && ele[j] * ele[i] <= maxn - 5; j++) { 36 if(ele[i] * ele[j] % 4 == 1) 37 ans[ ele[i] * ele[j] ] = 1; 38 } 39 } 40 41 for(int i = 0; i <= maxn - 5; i++) { 42 ans[i] += ans[i - 1]; 43 } 44 } 45 46 int main() { 47 // freopen("sw.in","r",stdin); 48 49 init(); 50 51 int x; 52 while(~scanf("%d",&x) && x) { 53 printf("%d %d ",x,ans[x]); 54 } 55 56 return 0; 57 58 }