![[BZOJ2820]YY的GCD](https://image.shishitao.com:8440/aHR0cHM6Ly9ia3FzaW1nLmlrYWZhbi5jb20vdXBsb2FkL2NoYXRncHQtcy5wbmc%2FIQ%3D%3D.png?!?w=700&webp=1 "[BZOJ2820]YY的GCD")
[BZOJ2820]YY的GCD
试题描述
神犇YY虐完数论后给傻×kAc出了一题给定N, M,求1<=x<=N, 1<=y<=M且gcd(x, y)为质数的(x, y)有多少对kAc这种
傻×必然不会了,于是向你来请教……多组输入
输入
第一行一个整数T 表述数据组数接下来T行,每行两个正整数,表示N, M
输出
T行,每行一个整数表示第i组数据的结果
输入示例
输出示例
数据规模及约定
T = 10000
N, M <= 10000000
题解
设
![[BZOJ2820]YY的GCD](https://image.shishitao.com:8440/aHR0cHM6Ly9pbWFnZXMyMDE1LmNuYmxvZ3MuY29tL2Jsb2cvODIyMTM3LzIwMTYwOC84MjIxMzctMjAxNjA4MjExODMzMzE1NzMtMjAzMDc2NzIxNy5wbmc%3D.png?w=700&webp=1 "[BZOJ2820]YY的GCD")
易知
![[BZOJ2820]YY的GCD](https://image.shishitao.com:8440/aHR0cHM6Ly9pbWFnZXMyMDE1LmNuYmxvZ3MuY29tL2Jsb2cvODIyMTM3LzIwMTYwOC84MjIxMzctMjAxNjA4MjExODM0NTY3NzYtMTIxMzc5NDI5MC5wbmc%3D.png?w=700&webp=1 "[BZOJ2820]YY的GCD")
……式1
根据莫比乌斯反演有
![[BZOJ2820]YY的GCD](https://image.shishitao.com:8440/aHR0cHM6Ly9pbWFnZXMyMDE1LmNuYmxvZ3MuY29tL2Jsb2cvODIyMTM3LzIwMTYwOC84MjIxMzctMjAxNjA4MjExODM3MDkxMjAtNjAyMTk3NzQ3LnBuZw%3D%3D.png?w=700&webp=1 "[BZOJ2820]YY的GCD")
……式2
根据 式1 和 式2 可得
![[BZOJ2820]YY的GCD](https://image.shishitao.com:8440/aHR0cHM6Ly9pbWFnZXMyMDE1LmNuYmxvZ3MuY29tL2Jsb2cvODIyMTM3LzIwMTYwOC84MjIxMzctMjAxNjA4MjExODM5MDE1ODktMTI5MzYxNzU2Ny5wbmc%3D.png?w=700&webp=1 "[BZOJ2820]YY的GCD")
我们要求这个
![[BZOJ2820]YY的GCD](https://image.shishitao.com:8440/aHR0cHM6Ly9pbWFnZXMyMDE1LmNuYmxvZ3MuY29tL2Jsb2cvODIyMTM3LzIwMTYwOC84MjIxMzctMjAxNjA4MjExODQ4MDE2NTEtMTIwMzAzNDk4MC5wbmc%3D.png?w=700&webp=1 "[BZOJ2820]YY的GCD")
不妨令![[BZOJ2820]YY的GCD](https://image.shishitao.com:8440/aHR0cHM6Ly9pbWFnZXMyMDE1LmNuYmxvZ3MuY29tL2Jsb2cvODIyMTM3LzIwMTYwOC84MjIxMzctMjAxNjA4MjExODQxNDEwMTEtMTg2OTY0OTY3OC5wbmc%3D.png?w=700&webp=1 "[BZOJ2820]YY的GCD")
,那么我们可以用线性筛求出每一个 g(T),递推式如下:(对于一个质数 k)
![[BZOJ2820]YY的GCD](https://image.shishitao.com:8440/aHR0cHM6Ly9pbWFnZXMyMDE1LmNuYmxvZ3MuY29tL2Jsb2cvODIyMTM3LzIwMTYwOC84MjIxMzctMjAxNjA4MjExODQ1NDA0MDEtNDg0MjY4MDkxLnBuZw%3D%3D.png?w=700&webp=1 "[BZOJ2820]YY的GCD")
然后![[BZOJ2820]YY的GCD](https://image.shishitao.com:8440/aHR0cHM6Ly9pbWFnZXMyMDE1LmNuYmxvZ3MuY29tL2Jsb2cvODIyMTM3LzIwMTYwOC84MjIxMzctMjAxNjA4MjExODQ5MDUzNzAtMzMxNzY1ODY1LnBuZw%3D%3D.png?w=700&webp=1 "[BZOJ2820]YY的GCD")
这部分我们可以分块计算,即将所有相同的 [n/T][m/T] 利用乘法分配律只计算一次,这样就不会被卡成暴力了。
#include <iostream>
#include <cstdio>
#include <cstdlib>
#include <cstring>
#include <algorithm>
using namespace std; const int BufferSize = 1 << 16;
char buffer[BufferSize], *Head, *Tail;
inline char Getchar() {
if(Head == Tail) {
int l = fread(buffer, 1, BufferSize, stdin);
Tail = (Head = buffer) + l;
}
return *Head++;
}
int read() {
int x = 0, f = 1; char c = Getchar();
while(!isdigit(c)){ if(c == '-') f = -1; c = Getchar(); }
while(isdigit(c)){ x = x * 10 + c - '0'; c = Getchar(); }
return x * f;
} #define maxn 10000010
#define LL long long
int T, n, m; int prime[maxn], cnt, u[maxn], g[maxn];
LL sum[maxn];
bool vis[maxn];
void u_table() {
int N = maxn - 10;
u[1] = 1; g[1] = 0;
for(int i = 2; i <= N; i++) {
if(!vis[i]) prime[++cnt] = i, u[i] = -1, g[i] = 1;
for(int j = 1; j <= cnt && (LL)prime[j] * (LL)i <= (LL)N; j++)
if(i % prime[j]) vis[i*prime[j]] = 1, u[i*prime[j]] = -u[i], g[i*prime[j]] = u[i] - g[i];
else{ vis[i*prime[j]] = 1, u[i*prime[j]] = 0, g[i*prime[j]] = u[i]; break; }
}
for(int i = 1; i <= N; i++) sum[i] = sum[i-1] + (LL)g[i];
return ;
} int main() {
u_table();
T = read(); while(T--) {
n = read(); m = read();
if(n > m) swap(n, m);
int p = 1;
LL ans = 0;
for(; p <= n;) {
int np = p;
p = min(n / (n / np), m / (m / np));
ans += (sum[p] - sum[np-1]) * (LL)(n / np) * (LL)(m / np);
p++;
}
printf("%lld\n", ans);
} return 0;
}