2015
04-15

# Shortest Path on a Cylinder

Ant Smart is on a surface of cylinder now. He wants to move to another position of the cylinder’s surface. Like many other animals named Smart, he wants to find out the shortest path from one point to another.
Unfortunately, Ant Smart is not enough smart to solve this question now. It is your task to find out the answer.

There are several test cases in this problem. The first line of input contains a single integer denoting the number of test cases.
For each test case, the first line contains two integers: radius and height (1<=radius<=100, 1<=height<=100), denoting the radius and height of the cylinder.
For the next two lines, each line contains three integers: h, a and r (0 <= h <= height, 0 <= a < 360, 0 <= r <= radius), denoting one point on the surface of cylinder each. The h indicates a circle on the surface of cylinder which apart h from the bottom. And the polar angle a and radius r indicates the position of the point on the circle. In the other words, if the cylinder is (0,0,0) – (0,0,height) on the 3D grid coordinate. The point can be represented as (cos(a)*r, sin(a)*r, h).
You may assume that r!=radius only when h=0 or h=height for each point.

Warning: There are about one thousand test cases. Be careful with the time efficiency.

There are several test cases in this problem. The first line of input contains a single integer denoting the number of test cases.
For each test case, the first line contains two integers: radius and height (1<=radius<=100, 1<=height<=100), denoting the radius and height of the cylinder.
For the next two lines, each line contains three integers: h, a and r (0 <= h <= height, 0 <= a < 360, 0 <= r <= radius), denoting one point on the surface of cylinder each. The h indicates a circle on the surface of cylinder which apart h from the bottom. And the polar angle a and radius r indicates the position of the point on the circle. In the other words, if the cylinder is (0,0,0) – (0,0,height) on the 3D grid coordinate. The point can be represented as (cos(a)*r, sin(a)*r, h).
You may assume that r!=radius only when h=0 or h=height for each point.

Warning: There are about one thousand test cases. Be careful with the time efficiency.

2
5 10
10 0 3
5 0 5
90 49
49 312 39
0 52 65

Case #1: 7.00
Case #2: 171.02

1. 网站做得很好看，内容也多，全。前段时间在博客园里看到有人说：网页的好坏看字体。觉得微软雅黑的字体很好看，然后现在这个网站也用的这个字体！nice!