The task is really simple: given N exits on a highway which forms a simple cycle, you are supposed to tell the shortest distance between any pair of exits.
Input Specification:
Each input file contains one test case. For each case, the first line contains an integer N (in [3]), followed by N integer distances D1 D2 ⋯ DN, where Diis the distance between the i-th and the (-st exits, and DN is between the N-th and the 1st exits. All the numbers in a line are separated by a space. The second line gives a positive integer M (≤), with M lines follow, each contains a pair of exit numbers, provided that the exits are numbered from 1 to N. It is guaranteed that the total round trip distance is no more than 1.
Output Specification:
For each test case, print your results in M lines, each contains the shortest distance between the corresponding given pair of exits.
Sample Input:
5 1 2 4 14 9
3
1 3
2 5
4 1
Sample Output:
3
10
7
#include<bits/stdc++.h> using namespace std; typedef long long ll; #define MAXN 100005 int a[MAXN]; ll dis[MAXN] = {0}; int main(){ int n;cin >> n; ll sum = 0; for(int i=0;i < n;i++){ cin >> a[i];sum+=a[i]; dis[i+1] = sum; } int t;cin >> t; int cnt = 0; while(t--){ int x,y;cin >> x >> y; if(x == y){cout << 0 << endl;continue;} if(x > y)swap(x,y); ll sum1 = dis[y-1] - dis[x-1]; ll sum2 = dis[x-1] - dis[0] + dis[n] - dis[y-1]; cout << min(sum1,sum2) << endl; } return 0; }
两点之间距离是距0的距离之差,线段树和树状数组差不多就这个性质吧。