题目描述
给定一个正整数N(Nle2^{31}-1)N(N≤231−1)
求ans_1=sum_{i=1}^nphi(i),ans_2=sum_{i=1}^n mu(i)ans1=∑i=1nϕ(i),ans2=∑i=1nμ(i)
输入输出格式
输入格式:
一共T+1行 第1行为数据组数T(T<=10) 第2~T+1行每行一个非负整数N,代表一组询问
输出格式:
一共T行,每行两个用空格分隔的数ans1,ans2
输入输出样例
输入样例#1: 复制
6 1 2 8 13 30 2333
输出样例#1: 复制
1 1 2 0 22 -2 58 -3 278 -3 1655470 2
裸的杜教筛
$sum_{i=1}^{n}varphi(i) = frac{n imes(n+1)}{2} - sum_{d=2}^{n}sum_{i=1}^{lfloorfrac{n}{d} floor}varphi(i)$
$sum_{i=1}^{n}mu(i) = 1 - sum_{d=2}^{n}sum_{i=1}^{lfloorfrac{n}{d} floor}mu(i)$
然后直接暴力递归计算即可
#include<cstdio> #include<map> #include<ext/pb_ds/assoc_container.hpp> #include<ext/pb_ds/hash_policy.hpp> #define LL long long using namespace std; using namespace __gnu_pbds; const int MAXN=5000030; int N,limit=5000000,tot=0,vis[MAXN],mu[MAXN],prime[MAXN]; LL phi[MAXN]; gp_hash_table<int,LL>Aphi,Amu; void GetMuAndPhi() { vis[1]=1;phi[1]=1;mu[1]=1; for(int i=1;i<=limit;i++) { if(!vis[i]) prime[++tot]=i,phi[i]=i-1,mu[i]=-1; for(int j=1;j<=tot&&i*prime[j]<=limit;j++) { vis[i*prime[j]]=1; if(i%prime[j]==0){mu[i*prime[j]]=0; phi[i*prime[j]]=phi[i]*prime[j]; break;} else {mu[i*prime[j]]=-mu[i]; phi[i*prime[j]]=phi[i]*(prime[j]-1); } } } for(int i=1;i<=limit;i++) mu[i]+=mu[i-1],phi[i]+=phi[i-1]; } LL SolvePhi(LL n) { if(n<=limit) return phi[n]; if(Aphi[n]) return Aphi[n]; LL tmp=n*(n+1)/2; for(int i=2,nxt;i<=n;i=nxt+1) nxt=min(n,n/(n/i)), tmp-=SolvePhi(n/i)*(LL)(nxt-i+1); return Aphi[n]=tmp; } LL SolveMu(LL n) { if(n<=limit) return mu[n]; if(Amu[n]) return Amu[n]; LL tmp=1; for(int i=2,nxt;i<=n;i=nxt+1) nxt=min(n,n/(n/i)), tmp-=SolveMu(n/i)*(LL)(nxt-i+1); return Amu[n]=tmp; } int main() { GetMuAndPhi(); int QWQ; scanf("%d",&QWQ); while(QWQ--) { scanf("%lld",&N); printf("%lld %lld ",SolvePhi(N),SolveMu(N)); } return 0; }