Sum
Time Limit: 1000ms
Memory Limit: 32768KB
This problem will be judged on HDU. Original ID: 440764-bit integer IO format: %I64d Java class name: Main
XXX is puzzled with the question below:
$1, 2, 3, ..., n (1leq nleq 400000)$ are placed in a line. There are $m (1leq mleq 1000) $operations of two kinds.
Operation 1: among the x-th number to the y-th number (inclusive), get the sum of the numbers which are co-prime with $p( 1leq pleq 400000)$.
Operation 2: change the x-th number to $c( 1leq cleq 400000)$.
For each operation, XXX will spend a lot of time to treat it. So he wants to ask you to help him.
$1, 2, 3, ..., n (1leq nleq 400000)$ are placed in a line. There are $m (1leq mleq 1000) $operations of two kinds.
Operation 1: among the x-th number to the y-th number (inclusive), get the sum of the numbers which are co-prime with $p( 1leq pleq 400000)$.
Operation 2: change the x-th number to $c( 1leq cleq 400000)$.
For each operation, XXX will spend a lot of time to treat it. So he wants to ask you to help him.
Input
There are several test cases.
The first line in the input is an integer indicating the number of test cases.
For each case, the first line begins with two integers --- the above mentioned n and m.
Each the following m lines contains an operation.
Operation 1 is in this format: "1 x y p".
Operation 2 is in this format: "2 x c".
The first line in the input is an integer indicating the number of test cases.
For each case, the first line begins with two integers --- the above mentioned n and m.
Each the following m lines contains an operation.
Operation 1 is in this format: "1 x y p".
Operation 2 is in this format: "2 x c".
Output
For each operation 1, output a single integer in one line representing the result.
Sample Input
1 3 3 2 2 3 1 1 3 4 1 2 3 6
Sample Output
7 0
Source
解题:容斥原理暴力算出原解,然后暴力修改
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1 #include <bits/stdc++.h> 2 using namespace std; 3 typedef long long LL; 4 const int maxn = 100; 5 int pm[maxn],tot; 6 unordered_map<int,int>ump; 7 void init(LL x){ 8 tot = 0; 9 for(int i = 2; i*i <= x; ++i){ 10 if(x%i == 0){ 11 pm[tot++] = i; 12 while(x%i == 0) x /= i; 13 } 14 } 15 if(x > 1) pm[tot++] = x; 16 } 17 LL solve(LL x,LL p){ 18 LL ret = (x*(x + 1))>>1; 19 init(p); 20 for(int i = 1; i < (1<<tot); ++i){ 21 int cnt = 0; 22 LL tmp = 1; 23 for(int j = 0; j < tot; ++j){ 24 if((i>>j)&1){ 25 ++cnt; 26 tmp *= pm[j]; 27 } 28 } 29 LL y = x/tmp; 30 if(cnt&1) ret -= ((y*(y + 1))>>1)*tmp; 31 else ret += ((y*(y + 1))>>1)*tmp; 32 } 33 return ret; 34 } 35 int main(){ 36 int kase,n,m,op,x,y,p; 37 scanf("%d",&kase); 38 while(kase--){ 39 ump.clear(); 40 scanf("%d%d",&n,&m); 41 for(int i = 0; i < m; ++i){ 42 scanf("%d",&op); 43 if(op == 2){ 44 scanf("%d%d",&x,&y); 45 ump[x] = y; 46 }else{ 47 scanf("%d%d%d",&x,&y,&p); 48 LL ret = solve(y,p) - solve(x-1,p); 49 for(auto &it:ump){ 50 if(it.first >= x && it.first <= y){ 51 if(__gcd(it.first,p) == 1) ret -= it.first; 52 if(__gcd(it.second,p) == 1) ret += it.second; 53 } 54 } 55 printf("%I64d ",ret); 56 } 57 } 58 } 59 return 0; 60 }