Euler is a well-known matematician, and, among many other things, he discovered that the formula n 2 + n + 41 produces a prime for 0 ≤ n < 40. For n = 40, the formula produces 1681, which is 41 ∗ 41. Even though this formula doesn’t always produce a prime, it still produces a lot of primes. It’s known that for n ≤ 10000000, there are 47,5% of primes produced by the formula!
So, you’ll write a program that will output how many primes does the formula output for a certain interval.
Input
Each line of input will be given two positive integer a and b such that 0 ≤ a ≤ b ≤ 10000. You must read until the end of the file.
Output
For each pair a, b read, you must output the percentage of prime numbers produced by the formula in this interval (a ≤ n ≤ b) rounded to two decimal digits.
Sample Input
0 39
0 40
39 40
Sample Output
100.00
97.56
50.00
题意就是把两数之间的数代入此公式,把是素数的统计起来,算出百分比
如果直接暴力写会超时,因此要用到打表。先把表打出来,用的时候直接拿就行了
代码如下
#include<stdio.h>
#include<math.h>
#include<string.h>
int book[10005];
void ti()
{
int i,j,m;
memset(book,0,sizeof(book));
for(i=0;i<=10005;i++)
{
int f=0;
m=i*i+i+41;
for(j=2;j<=sqrt(m);j++)
{
if(m%j==0)
{
f=1;
break;
}
}
if(f==0)
book[i]=1;
}
for(i=0;i<=10000;i++)
book[i]=book[i]+book[i-1];
}
int main()
{
int a,b,f;
ti();
while(~scanf("%d%d",&a,&b))
{
double c=book[b]-book[a-1];
printf("%.2lf\n",c/(b-a+1)*100.0+1e-8);
}
return 0;
}
