本文探讨了经典的旅行商问题,并提供了一种简洁的方法来计算最短路径。该方法适用于矩形网格布局的城镇,通过分析城镇布局的奇偶特性来确定最优路径长度。
Problem Description
For years, computer scientists have been trying to find efficient solutions to different computing problems. For some of them efficient algorithms are already available, these are the “easy” problems like sorting, evaluating
a polynomial or finding the shortest path in a graph. For the “hard” ones only exponential-time algorithms are known. The traveling-salesman problem belongs to this latter group. Given a set of N towns and roads between these towns, the problem is to compute
the shortest path allowing a salesman to visit each of the towns once and only once and return to the starting point.
The president of Gridland has hired you to design a program that calculates the length of the shortest traveling-salesman tour for the towns in the country. In Gridland, there is one town at each of the points of a rectangular grid. Roads run from every town in the directions North, Northwest, West, Southwest, South, Southeast, East, and Northeast, provided that there is a neighbouring town in that direction. The distance between neighbouring towns in directions North–South or East–West is 1 unit. The length of the roads is measured by the Euclidean distance. For example, Figure 7 shows 2 × 3-Gridland, i.e., a rectangular grid of dimensions 2 by 3. In 2 × 3-Gridland, the shortest tour has length 6.
The president of Gridland has hired you to design a program that calculates the length of the shortest traveling-salesman tour for the towns in the country. In Gridland, there is one town at each of the points of a rectangular grid. Roads run from every town in the directions North, Northwest, West, Southwest, South, Southeast, East, and Northeast, provided that there is a neighbouring town in that direction. The distance between neighbouring towns in directions North–South or East–West is 1 unit. The length of the roads is measured by the Euclidean distance. For example, Figure 7 shows 2 × 3-Gridland, i.e., a rectangular grid of dimensions 2 by 3. In 2 × 3-Gridland, the shortest tour has length 6.
Input
The first line contains the number of scenarios.
For each scenario, the grid dimensions m and n will be given as two integer numbers in a single line, separated by a single blank, satisfying 1 < m < 50 and 1 < n < 50.
For each scenario, the grid dimensions m and n will be given as two integer numbers in a single line, separated by a single blank, satisfying 1 < m < 50 and 1 < n < 50.
Output
The output for each scenario begins with a line containing “Scenario #i:”, where i is the number of the scenario starting at 1. In the next line, print the length of the shortest traveling-salesman tour rounded to two decimal
digits. The output for every scenario ends with a blank line.
Sample Input
2 2 2 2 3
Sample Output
Scenario #1: 4.00 Scenario #2: 6.00
一道规律题
当n,m有一者能够为偶数时,结果是n*m
否者必有一条路需要斜着走,结果为n*m-1+1.41
#include <stdio.h>
#include <math.h>
int main()
{
int t,i = 1;
scanf("%d",&t);
while(t--)
{
double n,m;
scanf("%lf%lf",&n,&m);
printf("Scenario #%d:\n",i++);
if((int)n%2==0 || (int)m%2==0)
printf("%.2lf\n",n*m);
else
printf("%.2lf\n",n*m-1+sqrt(2.0));
printf("\n");
}
return 0;
}
扫一扫
332
被折叠的 条评论
为什么被折叠?
到【灌水乐园】发言
