GuGuFishtion
Time Limit: 3000/1500 MS (Java/Others) Memory Limit: 65536/65536 K (Java/Others)
Total Submission(s): 1204 Accepted Submission(s): 459
Problem Description
Today XianYu is too busy with his homework, but the boring GuGu is still disturbing him!!!!!!
At the break time, an evil idea arises in XianYu's mind.
‘Come on, you xxxxxxx little guy.’
‘I will give you a function ϕ(x) which counts the positive integers up to x that are relatively prime to x.’
‘And now I give you a fishtion, which named GuGu Fishtion, in memory of a great guy named XianYu and a disturbing and pitiful guy GuGu who will be cooked without solving my problem in 5 hours.’
‘The given fishtion is defined as follow:
Gu(a,b)=ϕ(ab)ϕ(a)ϕ(b)
And now you, the xxxxxxx little guy, have to solve the problem below given m,n,p.’
(∑a=1m∑b=1nGu(a,b))(modp)
So SMART and KINDHEARTED you are, so could you please help GuGu to solve this problem?
‘GU GU!’ GuGu thanks.
Input
Input contains an integer T indicating the number of cases, followed by T lines. Each line contains three integers m,n,p as described above.
1≤T≤3
1≤m,n≤1,000,000
max(m,n)<p≤1,000,000,007
And given p is a prime.
Output
Please output exactly T lines and each line contains only one integer representing the answer.
Sample Input
1 5 7 23
Sample Output
2
Source
2018 Multi-University Training Contest 7
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先去学习了一下欧拉函数
这道题根据欧拉函数的定义
因此对于题目要求的
我们需要先计算每一个i/φ(i)的值, 再计算gcd() = i的数对的数目
先预处理出所有的φi
对于一个数i,在a∈[1,n],b∈[1,m]a∈[1,n],b∈[1,m]的范围内,设f[i]为gcd为(i,2i,3i...)的对数设f[i]为gcd为(i,2i,3i...)的对数
显然 : f[i]=[n/i]∗[m/i]f[i]=[n/i]∗[m/i]
那么我们从大到小维护f[i]f[i],因为我们要的是 gcd=igcd=i 的对数,所以要把 gcd=2igcd=2i 的情况减去【预处理】
#include<iostream>
#include<stdio.h>
#include<string.h>
#include<algorithm>
#include<stack>
#define inf 1e18
using namespace std;
int t, n, m;
const int maxn = 1000005;
long long f[maxn], a[maxn], p;
long long cnt[maxn];
long long is[maxn], phi[maxn], pri[maxn], nump;
/*
特性 :
1.若a为质数,phi[a]=a-1;
2.若a为质数,b mod a=0,phi[a*b]=phi[b]*a
3.若a,b互质,phi[a*b]=phi[a]*phi[b](当a为质数时,if b mod a!=0 ,phi[a*b]=phi[a]*phi[b])
*/
void make()
{
memset(phi, 0, sizeof(phi));
memset(f, 0, sizeof(f));
phi[1] = 1;
for(int i = 2; i <= maxn; i++){
if(!is[i]){//i是素数
pri[++nump] = i;
phi[i] = i - 1;
}
for(int j = 1; j <= nump && pri[j] * i < maxn; j++){//筛
is[pri[j] * i] = 1;
if(i % pri[j] == 0){
phi[pri[j] * i] = phi[i] * pri[j];
break;
}
else phi[pri[j] * i] = phi[i] *(pri[j] - 1);
}
}
cnt[1] = 1;
for(int i = 1; i < maxn; i++){
for(int j = 2 * i; j < maxn; j += i){
cnt[j] -= cnt[i];
}
}
}
void deal()
{
f[1] = 1;
for(int i = 2; i <= min(n, m); i++)
f[i] = f[p % i] * (p - p / i) % p;
for(int i = 1; i <= min(n, m); i++){
a[i] = (long long)i * f[phi[i]] % p;
}
}
long long get(int n, int m)
{
long long ans = 0;
for(int i = 1; i <= min(n, m); i++){
ans+= (long long ) cnt[i] * (n / i) * (m / i);
ans %= p;
}
return ans;
}
int main()
{
make();
cin>>t;
while(t--){
scanf("%d%d%lld", &m, &n, &p);
deal();
long long ans = 0;
for(int i = 1; i <= min(n, m); i++){
ans += (long long )a[i] * get(n / i, m / i);
ans %= p;
}
printf("%lld
", ans);
}
return 0;
}