[ACM]Shopping
题目描述
Saya
and Kudo go shopping together.
You can assume the street as a straight line, while the shops are some points on the line.
They park their car at the leftmost shop, visit all the shops from left to right, and go back to their car.
Your task is to calculate the length of their route.
You can assume the street as a straight line, while the shops are some points on the line.
They park their car at the leftmost shop, visit all the shops from left to right, and go back to their car.
Your task is to calculate the length of their route.
输入
The
input consists of several test cases.
The first line of input in each test case contains one integer N (0<N<100001), represents the number of shops.
The next line contains N integers, describing the situation of the shops. You can assume that the situations of the shops are non-negative integer and smaller than 2^30.
The last case is followed by a line containing one zero.
The first line of input in each test case contains one integer N (0<N<100001), represents the number of shops.
The next line contains N integers, describing the situation of the shops. You can assume that the situations of the shops are non-negative integer and smaller than 2^30.
The last case is followed by a line containing one zero.
输出
For
each test case, print the length of their shopping route.
示例输入
4 24 13 89 37 6 7 30 41 14 39 42 0
示例输出
152 70
提示
Explanation
for the first sample: They park their car at shop 13; go to shop 24, 37 and 89 and finally return to shop 13. The total length is (24-13) + (37-24) + (89-37) + (89-13) = 152
解题思路:一开始没有多想算法,第一反应就是先排序,再把排序(从小到大)后的几个距离数值放在数组a[]中,然后用一个循环 sum+=( a[j+1]-a[j] ),最后再加上 最大距离 - 最小距离 ,输出最终sum,结果提交超时。后来又想了想算法,发现 原来sum+=( a[j+1]-a[j] )的结果和 最大距离与最小距离的差相等,因此本题不需要排序,只要找出数组中最小的数min,和最大的数max 即可, 用公式 sum=2*(max-min),输出sum就可以了,问题通过。本题再次证明了算法的重要性。 Ps:本题里的提示部分是个陷阱啊!
代码:
#include <iostream> using namespace std; int main() { int N,i; while(cin>>N&&N!=0) { int a[100001],min,max; for(i=1;i<=N;i++) cin>>a[i]; min=a[1]; max=a[1]; for(i=2;i<=N;i++) { if(a[i]>max) max=a[i]; if(a[i]<min) min=a[i]; } int sum=0; sum=2*(max-min);//最重要的一步 cout<<sum<<endl; } return 0; }