F.A.Q
Hand In Hand
Online Acmers
Problem Archive
Realtime Judge Status
Authors Ranklist
 
     C/C++/Java Exams     
ACM Steps
Go to Job
Contest LiveCast
ICPC@China
Best Coder beta
VIP | STD Contests
    DIY | Web-DIY beta
Author ID 
Password 
 Register new ID

TT

Time Limit: 2000/1000 MS (Java/Others)    Memory Limit: 65536/32768 K (Java/Others)
Total Submission(s): 296    Accepted Submission(s): 40


Problem Description
Association of Collision Management (ACM) is planning to perform the controlled collision of two as-teroids. The asteroids will be slowly brought together and collided at negligible speed. ACM expects asteroids to get attached to each other and form a stable object. Each asteroid has the form of a convex polyhedron. To increase the chances of success of the experiment ACM wants to bring asteroids together in such manner that their centers of mass are as close as possible.
To achieve this, ACM operators can rotate the asteroids and move them independently before bringing them together. Help ACM to find out what minimal distance between centers of mass can be achieved. For the purpose of calculating center of mass both asteroids are considered to have constant density.
 

Input
Input file contains two descriptions of convex polyhedra.
The first line of each description contains integer number n indicate the number of vertices of the polyhedron (4 <= n <= 60). The following n lines contain three integer numbers xi; yi; zi each --- the coordinates of the polyhedron vertices (-10000 <= xi, yi, zi <= 10000). It is guaranteed that the given points are vertices of a convex polyhedron, in particular no point belongs to the convex hull of other points. Each polyhedron is non-degenerate. The two given polyhedra have no common points.
 

Output
Output one floating point number --- the minimal distance between centers of mass of the asteroids that can be achieved. Your answer must be round up to 0.01.
 

Sample Input
8 0 0 0 0 0 1 0 1 0 0 1 1 1 0 0 1 0 1 1 1 0 1 1 1 5 0 0 5 1 0 6 -1 0 6 0 1 6 0 -1 6
 

Sample Output
0.75
 

Source
 

Statistic | Submit | Discuss | Note
Hangzhou Dianzi University Online Judge 3.0
Copyright © 2005-2024 HDU ACM Team. All Rights Reserved.
Designer & Developer : Wang Rongtao LinLe GaoJie GanLu
Total 0.000000(s) query 1, Server time : 2024-11-22 11:17:32, Gzip enabled