|
2010-07-03, 19:44
|
#1 |
"Lucan"
Dec 2006
England
2×3×13×83 Posts |
Platonic solids and the Golden ratio (r)
As an erstwhile 3D-engine programmer (among other things)
I read a beautiful article about simple starting points for the vertices of the five regular solids. Before my video(visio?)spatial ability goes completely bonkers let me try to remember them: (1,1,1), (1,-1,-1), (-1,1,-1), (-1,-1,1) tetrahedron (+/-1,+/-1,+/-1) cube (+/-1,0,0) etc octahedron (+/-r,+/-1,0) (permute cyclicly) icosohedron HELP! David Last fiddled with by Prime95 on 2010-07-03 at 21:40 Reason: Watch the language please |
|
|
|
2010-07-04, 13:57
|
#2 | |
Apr 2010
9716 Posts |
Quote:
P.S.: And post the result 
|
|
|
|
|
|
2010-07-04, 17:14
|
#3 | |
|
"Lucan"
Dec 2006
England
2·3·13·83 Posts |
Quote:
the centre of the 20 triangles gives the simplest orientation for the vertices of the dodecahedron. This is "puzzles" - not "homework help"  David PS Apologies for my French in the first post. |
|
|
|
|
|
2010-07-04, 17:48
|
#4 | |
|
Apr 2010
151 Posts |
Quote:
|
|
|
|
|
|
2010-07-04, 18:14
|
#6 | |
|
Apr 2010
2278 Posts |
Quote:
(+/-r-1, +/-r, 0) (permute cyclicly), (+/-1,+/-1,+/-1) dodecahedron (I have used r = (1+sqrt(5))/2, hence 1/r = r-1, but the above scheme can be used with r's conjugate as well.) Last fiddled with by ccorn on 2010-07-04 at 18:55 Reason: Explain r |
|
|
|
|
|
2010-07-04, 19:35
|
#7 | |
|
"Lucan"
Dec 2006
England
2×3×13×83 Posts |
Quote:
The edges of one are perpendicular to those of the dual. I've just remembered why I brought this up: World cup football! In Mexico 1970 they first used a truncated icosohedron, (20 white hexagons and 12 black pentagons). Better known these days as C60 or Buckminsterfullerine. I can't see why he found it so difficult to think of a structure with 60 vertices. I made one out of cardboard at the time, also the great(?) stellated(?) dodecahedron which makes a beautiful Christmas decoration. David Last fiddled with by davieddy on 2010-07-04 at 19:47 |
|
|
|
|
|
2010-07-04, 21:41
|
#8 |
Jan 2005
Minsk, Belarus
1100100002 Posts |
|
|
|
|
|
2010-07-04, 21:48
|
#9 | |
|
Apr 2010
2278 Posts |
Quote:
|
|
|
|
|
|
2010-07-04, 22:21
|
#10 | |
|
Apr 2010
151 Posts |
Quote:
|
|
|
|
|
 |
| Thread Tools | |
Similar Threads
|
||||
| Thread | Thread Starter | Forum | Replies | Last Post |
| My algorithm mimics 2^P-1 with the golden ratio | ONeil | ONeil | 12 | 2018-04-17 09:15 |
| Gödel, Escher, Bach: An Eternal Golden Braid | xilman | Reading | 2 | 2015-11-07 02:18 |
| Ratio of Areas | davar55 | Puzzles | 2 | 2008-02-13 03:20 |
| The Tangent and the golden mean | mfgoode | Puzzles | 1 | 2007-01-31 16:26 |
| The Golden Section. | mfgoode | Math | 28 | 2004-05-31 10:40 |
