[Search for users]
[Overall Top Noters]
[List of all Conferences]
[Download this site]
| Title: | Mathematics at DEC |
|
| Moderator: | RUSURE::EDP |
|
| Created: | Mon Feb 03 1986 |
| Last Modified: | Fri Jun 06 1997 |
| Last Successful Update: | Fri Jun 06 1997 |
| Number of topics: | 2083 |
| Total number of notes: | 14613 |
1435.0. "Discs covering a circle" by ANGLIN::KIRKMAN (Big date on September 14) Tue Apr 30 1991 20:54
This is a variation off an old problem that I posted in
ROBTOB::BRAIN_BOGGLERS a while back. We solved the original problem,
then we went merrily churning through alternatives until I ran into one
I couldn't solve. Sooo ...
Take a circle radius R, five (5) discs radius r. Arrange the discs so
they completely cover all the area in the circle. What is the largest
possible R, and what is the arrangement of the disks?
The best configuration I found was a "mickey mouse" shape with 3 discs
having their edge touching the center of the circle, and 2 dics having
both ends of their diameter line fall on the circle.
Intuitively, I thought that sliding the inner discs arround might
improve the result, but its been too long since I solved diff. eq.
Scott
| T.R | Title | User | Personal
Name | Date | Lines
|
|---|