| Time Limit: 5000MS | Memory Limit: 65536K | |
| Total Submissions: 7392 | Accepted: 4291 |
Description
The sequence of n − 1 consecutive composite numbers (positive integers that are not prime and not equal to 1) lying between two successive prime numbers p and p + n is called a prime gap of length n. For example, ‹24, 25, 26, 27, 28› between 23 and 29 is a prime gap of length 6.
Your mission is to write a program to calculate, for a given positive integer k, the length of the prime gap that contains k. For convenience, the length is considered 0 in case no prime gap contains k.
Input
The input is a sequence of lines each of which contains a single positive integer. Each positive integer is greater than 1 and less than or equal to the 100000th prime number, which is 1299709. The end of the input is indicated by a line containing a single zero.
Output
The output should be composed of lines each of which contains a single non-negative integer. It is the length of the prime gap that contains the corresponding positive integer in the input if it is a composite number, or 0 otherwise. No other characters should occur in the output.
Sample Input
10 11 27 2 492170 0
Sample Output
4 0 6 0 114
Source
#include <iostream> #include<stdio.h> #include<stdlib.h> using namespace std; #define maxn 1300000 bool hash[maxn]; void inithash() { int i,j; for(j=4; j<maxn; j+=2) hash[j]=1; for(i=3; i<1200; i+=2) if(!hash[i]) for(j=i*i; j<maxn; j+=i) hash[j]=1; } int isprime(int N) { if(!hash[N]) return true; return false; } int main() { inithash(); int n; while(scanf("%d",&n),n) { int i=n; while(1) { if(isprime(i)) break; i++; } int j=n; while(1) { if(isprime(j)) break; j--; } printf("%d ",i-j); } return 0; }