Eddy has solved lots of problem involving calculating the number of coprime pairs within some range. This problem can be solved with inclusion-exclusion method. Eddy has implemented it lots of times. Someday, when he encounters another coprime pairs problem, he comes up with diff-prime pairs problem. diff-prime pairs problem is that given N, you need to find the number of pairs (i, j), where %7D)
%7D)
Eddy tried to solve it with inclusion-exclusion method but failed. Please help Eddy to solve this problem.
Note that pair (i1, j1) and pair (i2, j2) are considered different if i1 ≠ i2 or j1 ≠ j2.
输入描述:
Input has only one line containing a positive integer N.1 ≤ N ≤ 107
输出描述:
Output one line containing a non-negative integer indicating the number of diff-prime pairs (i,j) where i, j ≤ N
示例1
输入
3
输出
2
示例2
输入
5
输出
6
题意:给你一个n,让你求从1到n中满足 i/gcd(i,j)和j/gcd(i,j) 都属素数的(i,j)的个数。
解题思路:
如果i,j自己就是素数的话,那么肯定满足条件,那么如果我们一开始就知道从1到n的范围里素数的个数的话,那么我们就可以得到答案的一部分解,为什么说是一部分,因为还有一部分解来自于素数的倍数(>1)。我们可以知道如果在1~n中,能被i整除的数的个数为n/i 素数已经用完了,那么我们把这个答案-1为剩下的倍数。
然后我只需要统计一下两个 素数的倍数的组合方案数就ok了。我一开始暴力跑,但是超时了,借用了队友的思想。非常棒。
但是竟然还多次提交浮点错误,真是醉了。还是太粗心。
#include<stdio.h>
#include<string.h>
#include<algorithm>
using namespace std;
const int maxn=1e7+10;
#define ll long long
ll cnt[maxn],tot,pri[maxn],n;
bool vis[maxn];
void find(){
memset(vis,0,sizeof(vis));tot=0;
vis[1]=1;
ll i,j;
for(i=2;i<=1e7;i++){
if(!vis[i]) pri[tot++]=i;
for(j=0;j<tot&&i*pri[j]<=1e7;j++){
vis[i*pri[j]]=1;
}
}
}
int main(){
ll i,j;
find();
scanf("%lld",&n);
ll l;
for(l=0;pri[l]<=n&&l<tot;l++);
ll ans=l*(l-1)/2;
for(i=1;i<l;i++){
cnt[i]=n/pri[i]-1;
ans+=i*cnt[i];
}
printf("%lld\n",ans*2);
return 0;
}