前言
WA了两次,结果发现打容斥的时候加号打成减号了...
其实这题还是挺简单的
题解
如何计算(1 leq x leq a),(1 leq y leq b),(gcd(x,y)=d)是这题的简化版
给出题解
然后发现这题就是那道题加一个容斥原理
我们要求的答案就是(ans(b,d)-ans(b,c-1)-ans(a-1,d)+ans(a-1,c-1))
小学生都会证啊
于是愉快的AC了
代码
#include <cstdio>
#include <algorithm>
#define ll long long
#define MAXNUM 50005
int mu[MAXNUM], is_not_prime[MAXNUM], primes[MAXNUM / 10], prime_num;
// prefix
ll qzh[MAXNUM];
int read(){
int x = 0; int zf = 1; char ch = ' ';
while (ch != '-' && (ch < '0' || ch > '9')) ch = getchar();
if (ch == '-') zf = -1, ch = getchar();
while (ch >= '0' && ch <= '9') x = x * 10 + ch - '0', ch = getchar(); return x * zf;
}
void init(){
mu[1] = 1; is_not_prime[0] = is_not_prime[1] = 1;
for (int i = 2; i <= MAXNUM; ++i){
if (!is_not_prime[i]) mu[primes[++prime_num] = i] = -1;
for (int j = 1; j <= prime_num && primes[j] * i <= MAXNUM; ++j){
is_not_prime[i * primes[j]] = 1;
if (!(i % primes[j])) break;
else
mu[primes[j] * i] = -mu[i];
}
}
for (int i = 1; i <= MAXNUM; ++i)
qzh[i] = qzh[i - 1] + mu[i];
}
ll solve(int n, int m, int d){
if (n == 0 || m == 0) return 0;
ll ans = 0;
n /= d, m /= d;
if (n > m) n ^= m ^= n ^= m; ans = 0;
for (int l = 1, r; l <= n; l = r + 1){
r = std::min(n / (n / l), m / (m / l));
ans += (ll)(qzh[r] - qzh[l - 1]) * (n / l) * (m / l);
}
return ans;
}
int main(){
init();
int T = read(), a, b, n, m, d; ll ans;
while (T--){
a = read(), n = read(), b = read(), m = read(), d = read();
ans = solve(n, m, d) - solve(n, b - 1, d) - solve(a - 1, m, d) + solve(a - 1, b - 1, d);
printf("%lld
", ans);
}
return 0;
}