Truncated Spheres [message #21786] Tue, 21 December 2010 21:46 UTC 


Hi all,
After working with Orangery on this D32 (not numbered yet)
I decided to go on the idea of making dice from truncated spheres.
As you know, a round D6 can be defined as the intersection of a cube and a sphere:
Using the same method, I also designed a rounded D12 (intersection of a dodecahedron and a sphere).
As I originally wanted to make a D10, I put back two opposite portions of sphere to the D12 to get this round D10 with a 5fold symmetry:
Then, instead of using the original portions of sphere, I replaced them by cones (tangent to the sphere) to get this pointed D10:
Another D10 with a 4fold symmetry can be obtained by using a different underlying polygon with 10 faces (2 squares and 8 nonregular pentagons):
Note the strange way I had to numbered it: this is due to the fact that a face is not always opposed to another face but to an edge.
Finally, playing with truncated spheres and cones, I found this strange shape that is midway between a sphere and a cube.
Don't know exactly what to do with it (not a die anyway because it can stop on a "edge", even though it has no edge ).
Currently I am working on a 3rd D10 with a 3fold symmetry (not finished yet) and also on a D9... So, more news will come soon!
[Updated on: Tue, 21 December 2010 22:23 UTC]



Re: Truncated Spheres [message #21787 is a reply to message #21786 ] Tue, 21 December 2010 22:08 UTC 


Nice. I had made a d9 using the same technique. I was going to un"hide" it, but looking at it I realize that I just numbered the faces even though it doesn't land with a face up. Woops. Well, something else to fix. I'd like to make a bunch of other oddsided dice ("odd" both in the sense of an unusual number for sides of a die and also some that are odd and not even), and do some randomness tests on them, see if they're close to fair.
It looks like your method of intersecting spheres with dual polyhedra yields the same results as the one that I tried, with slicing identical circles off a sphere at the appropriate points (but yours is probably simpler).



Re: Truncated Spheres [message #21788 is a reply to message #21787 ] Tue, 21 December 2010 22:32 UTC 


Yes, I suspect that the 2 methods leads to the same result and our D9 are more or less the same (yours is actually "rounder" that mine, I think).
Feel free to show it in this thread if you wish, once it is finished.
For the numbering, I thought doing it as the D10 4fold (with numbers in the edges) but another method would be to put the numbers near the bottom, on the adjacent faces, as in a standard D4.





Re: Truncated Spheres [message #22228 is a reply to message #21786 ] Thu, 06 January 2011 15:06 UTC 


Magic, the dice look great. I didn't think the D10 with four fold symmetry would work. It looks fair too! I have not seen anything like it before.
Look forward to seeing the D9.
Unfortunately I have still yet to decorate the D32's that you made for me as I have been bogged down with other things.
[Updated on: Thu, 06 January 2011 15:18 UTC]



Re: Truncated Spheres [message #22248 is a reply to message #22228 ] Thu, 06 January 2011 21:32 UTC 


Thanks Orangery. On my side, I have still to number the D32 and the D9.
I ordered all the other truncated sphere dice today. I will test their fairness as soon as possible.



Re: Truncated Spheres [message #22278 is a reply to message #21786 ] Fri, 07 January 2011 10:15 UTC 


Personally I think the number on a die should be read face up whether on a face or an edge. I don't particularly like the 'normal' D4 where you have to read along the bottom.
I like all your D10's except the ones with cones (I'm funny like that ). My favourite is the one that is made up from 2 squares and 8 nonregular pentagons as it has the optimal surface area to land on and as far as I know, is unique.
I think It would be nice (as you have come this far) to finish off the set with a D4, D8 and D20 as an alternative to the usual D&D dice and give them a posh name.
The D9, D14 and D32 could be available as addons. I hope to buy most of these dice this year once some spare cash comes available.



Re: Truncated Spheres [message #22294 is a reply to message #22278 ] Fri, 07 January 2011 18:02 UTC 


Yes you are right, I can do a D4 (numbered on the round part), a D8 and a D20 to complete the set.
And perhaps also a D12 based on a rhombic dodecahedron.
So many things to design, so little time...




Re: Truncated Spheres [message #24073 is a reply to message #22588 ] Sun, 20 February 2011 07:52 UTC 


Another member of the Truncated Sphere family (asked by Orangery ): the D4 Sphere.
Because the numbers are written exactly on the vertices, it is much easier to read the result than on traditional D4 (tetrahedron). And it should also roll better.

Attachment: D4Sphere.jpg
(Size: 9.61KB, Downloaded 1830 time(s))
[Updated on: Sun, 20 February 2011 08:02 UTC] So many things to design, so little time...



Re: Truncated Spheres [message #24074 is a reply to message #24073 ] Sun, 20 February 2011 10:01 UTC 


This looks a fun die... nice work. Do you think you will get round to making up a 'set'?
By the way have you tried 'Uni Posca' pens. They are great for colouring the dice. I tried them out on the D32's you made (pictures to follow). I painted the numbers in by hand (still have three to do). The colours look good (they still need to be varnished) but I want to try and improve on the numbering as I like things to look consistent (may try rubber stamp blocks).
Numbering of a normal D32 from 031 might be used for days of the month. If the die lands on a zero the player could choose any day of his/her choice (or throw again). Just a thought.
I started on my web site... http://theorangery.weebly.com/



Re: Truncated Spheres [message #24078 is a reply to message #24074 ] Sun, 20 February 2011 11:17 UTC 


Hi Orangery,
You mean a set including the still missing D8 and D20?
Well, I am in the process of beginning the D8, but it will take some time. In the meantime, if you wish a special set of existing dice, just PM me.
The numbering of the D32 is a nightmare for me: each time I beging to look into it, I see new problem. I have to find the exact angles between the faces and, say, the horizontal plane if I want to do it proprerly (well, basically I need some courage ).
Numbering from 1 to 31 with an extra symbol (like a star) to represent either 0 or 32 or "replay" can be an idea.
I didn't try Uni Posca pens, but I heard about them in this forum. I have to see if they are available in France.
For now, I let Shapeways dye the dice and for inking the numbers, I use "Hybrid Gel Grip Mettalic", some gel ink rollers with 0.8mm balls from the Japaneese Pentel. The white in particular works very great. Then I finish them with some coats of acrylic varnish.
Good luck with your website!
[Updated on: Sun, 20 February 2011 11:18 UTC] So many things to design, so little time...




Re: Truncated Spheres [message #24168 is a reply to message #24081 ] Wed, 23 February 2011 20:26 UTC 


I wasn't sure what you meant about the numbers failing as I don't think you have mentioned having trouble with any of the other die. I'm okay with 2D stuff, not 3D,
Anyway, another great dice (over 50 downloads). Will you be getting these made (D4, D8)?



Re: Truncated Spheres [message #24170 is a reply to message #24168 ] Wed, 23 February 2011 21:10 UTC 


Carving numbers on dice, as any boolean operation (union, intersection, substration...) is a very... "random" operation. Sometimes it works, sometimes it fails...
It is (and has always been) a pain to do...
I will probably order the D4 and the D8 but not immediately: as an antiaddiction policy, I do not place a new order as long as the current one has not been delivered. And my latest order has not arrived yet and does not include dice, sorry...
PS: the downloads are just people reading the message, not peple ordering the die, unfortunately...
[Updated on: Wed, 23 February 2011 21:11 UTC] So many things to design, so little time...



Re: Truncated Spheres [message #24961 is a reply to message #21786 ] Fri, 18 March 2011 11:09 UTC 


I have just received the three different versions of the D10's. They are brilliant! Every dice collector should have these. Now I just need to paint them without messing up.




Re: Truncated Spheres [message #24981 is a reply to message #21786 ] Fri, 18 March 2011 19:29 UTC 


wouldn't that be 33333rd? Keep up the good work. These are definitely different.
The Mad Moder
michael@shapeways.com




Re: Truncated Spheres [message #24986 is a reply to message #24983 ] Fri, 18 March 2011 21:19 UTC 


Wow, that D33 is the weirdest die I have even seen. I thought my eyes were going funny when I first saw it. I also looked at the D9 and D11... they are also mad things. You seem to be on a roll .
I painted the D10's but I got in a mess with them. I didn't have a gel pen. Will try a different technique.




Re: Truncated Spheres [message #25890 is a reply to message #25023 ] Mon, 11 April 2011 05:57 UTC 


The long awaited Truncated Sphere D20 is now available!
This is the intersection of an icosahedron with a sphere. As you can see, due to the fact that a vertex is surrounded by 5 triangles, the rounded area is larger than in other Truncated Sphere dice. So the faces are smaller and the numbers too.
The distance from one face to the opposite one is 2 cm. This die is hollow, with a thickness of 1.5 mm (suitable for Alumide for instance).

Attachment: D20.jpg
(Size: 15.24KB, Downloaded 1503 time(s))
So many things to design, so little time...



Re: Truncated Spheres [message #25892 is a reply to message #25890 ] Mon, 11 April 2011 06:12 UTC 


I also designed a D10 for percentage and a new version if the D6 (circle faces nearly in contact and wall thickness of 1.5 mm only).
As a consequence the Truncated Sphere Dice Set is now available !
This set is composed of 7 regular Truncated Sphere Dice:
 D4
 D6
 D8
 D10
 D%
 D12
 D20
Ideal for dice collectors and RPG players!
I will probably create later another set for unusual Truncated Sphere dice (D9, D11, D17 etc.)
So many things to design, so little time...



Re: Truncated Spheres [message #25895 is a reply to message #25890 ] Mon, 11 April 2011 06:53 UTC 


I wish these dice could turn out exactly as the 3D CAD drawings (not a mark on them), .
I think there is only the Rhombic Dodecahedron left. I'm assuming it will have different properties than the regular shape?
The two D10's you made (not the one with the 14 sides) roll really well and for about the same length of time (on average) even though they are constructed quite differently.



Re: Truncated Spheres [message #25941 is a reply to message #25895 ] Mon, 11 April 2011 21:15 UTC 


I have seen outstanding results in metal after sanding and polishing, but my postproduction skills stop at inking and varnishing plastic...
The Rhombic Dodecahedron is definitvely different from the regular Dodecahdron and will come with the Rhombic Triacontahdron (D30).
By the way, the Rhombic Dodecahedron is from the same family as the D9 and the future D15 (because 9=3+3+3, 12=4+4+4 and 15=5+5+5)
I plan also to make a different D8.
Concerning the D10s, you are speaking of the D10 with 4fold symmetry (polyhedron with squares and pentagons) and the D10 with 5fold symmetry (derived from a regular dodecahedron), right?
Is there a problem with the 3rd one (D10 with 3fold symmetry, derived from the D14) or is is just that you did not test it?
[Updated on: Mon, 11 April 2011 21:19 UTC] So many things to design, so little time...



Re: Truncated Spheres [message #25957 is a reply to message #25941 ] Tue, 12 April 2011 07:29 UTC 


Re D9 family of dice, does this mean there is a D3 (1+1+1)?
Going off on a tangent, I thought I had read somewhere that the D11 was constructed using the '1+n+n+n+1 formula (1+3+3+3+1). Same with the D17 (1+5+5+5+1). Does this mean that a D5 might be possible (1+1+1+1+1) and also the 'different' D8 you mention (1+2+2+2+1)?
As for the D10 (fourteen flat sides), there is no problem with it. I didn't mention it simply because it rolls for longer than the other two (as expected). My favourite D10 is the one made up of squares and pentagons.



Re: Truncated Spheres [message #25970 is a reply to message #25895 ] Tue, 12 April 2011 15:07 UTC 


Have you looked at circle packings on the sphere? That is, finding the arrangement of n identical nonoverlapping circles on the sphere so that the circles have maximum radius.
This website looks like it has some data you might be able to use (although not much in the way of pictures):
http://www.buddenbooks.com/jb/pack/sphere/intro.htm



Re: Truncated Spheres [message #26010 is a reply to message #25970 ] Wed, 13 April 2011 10:35 UTC 


@Orangery No, unfortunately, n cannot be 1 or 2. Or more precisely when it is 2 the polyhedron is degenerated.
For instance, 1+3+3+3+1 implies that the face of the poles are triangles (because n=3). If you put n=2 then the poles degenerate into simple edges (a polygon with two vertices is a "doubleedge") and what you actually get is 2+2+2 which is a simple cube (D6)...
Same thing for 1+n+n+1 (n=4 gives your favorite D10 )
For n=3 you get the regular octahedron (D8) and for n=2 you can consider that the poles degenerate into perpendicular edges and you obtain the regular tetrahedron (D4).
The new D8 will actually be a 4+4, like the regular octahedron, but with a twist of 45° on the four lower faces.
I also have some ideas for a D3...
@Henryseg Yes, I had a look at them and at the repulsion force polyhedra of Martin Trump, but basically I found it difficult to take advantage of this information (maximum angle for the cones or coordinates of the center of the points). So, sometime I use them to fin a good approximate position for the face but then I try to solve equations to maximize the radius of the circles.
[Updated on: Wed, 13 April 2011 10:36 UTC] So many things to design, so little time...



Re: Truncated Spheres [message #26143 is a reply to message #26010 ] Sun, 17 April 2011 08:38 UTC 


As announced in the previous message, I am glad to present the Alternative D8 Sphere.
It is not based on the regular octahedron but on an trapezohedron ("antidiamant" in French) that are dual of the antiprisms.
It is a cocreator, so you can choose your numbering.
With numbers on edges, the number will be on top of the die, when it lies on a horizontal plane. With the numbers on the bottom faces, you will have to look under the die to find out the result. Choose no numbers if you prefer contemplating the shape or if you would like to take care of the numbering by yourself!
So many things to design, so little time...



Re: Truncated Spheres [message #26144 is a reply to message #26143 ] Sun, 17 April 2011 13:30 UTC 


I like the look of this one. Could this configuration work for a D6 (instead of a cube?).




Re: Truncated Spheres [message #26147 is a reply to message #26145 ] Sun, 17 April 2011 16:49 UTC 


@Orangery: I knew you would like it: it is like the D10 with 4fold symmetry but without the top and bottom faces (and the angles are different). Unfortunately for the D6, the trapezohedron that maximize the diameter of the circles is precisely... the cube! So, this method gives nothing new. For n=5, I think you would get the D10 with 5fold symmetry and for n=6 the rounded part would probably become too large (larger than a face).
@Dizingof: thanks and welcome back!
So many things to design, so little time...





Re: Truncated Spheres [message #26803 is a reply to message #26802 ] Sun, 01 May 2011 06:35 UTC 


This a a die I designed a long time ago and that I forgot numbering.
So, after a long time on the drawing table, here is the D18 Sphere:
As the number of faces is even, each number is exactly on a face (sometimes, these dice look very usual ).
Instead, the numbering is very interesting in this case.
Opposite faces numbers sum to 19, obviously. As a consequence any group of 8 numbers of a large diameter sum to 76. A more unexpected consequence is that any group of 5 numbers follows this strange rule: if you sum the double of the central number to the 4 other surrounding numbers, you obtain 57.
Example in the rendering image:
...4..
9 18 5
...3..
2x18 + 4 + 9 + 5 + 3 = 57
But the most interesting property in this particular numbering is that the sum of the six numbers surrounding a spherical zone is always 57.
Example here: 18 + 5 + 7 + 11 +13 + 3 = 57
I had to use a computer to find the good combination (there are a lot of them, by the way).
I could number this die from 1 to 9 twice (I found a way of doing it where the 8 numbers of the large diameters always sum to 40) or from 1 to 6 three time or even from 1 to 3 six times. Let me know if you want some particular numbering.

Attachment: D18.jpg
(Size: 14.78KB, Downloaded 1319 time(s))
[Updated on: Sun, 01 May 2011 08:49 UTC] So many things to design, so little time...



Re: Truncated Spheres [message #26804 is a reply to message #26803 ] Sun, 01 May 2011 08:44 UTC 


I wasn't expecting a D18. I like the way it could be also set up to be a D9, D6 and D3... very interesting!
Going back to a previous post, I now understand how a cube is made up of six trapezohedrons... but what happens if you stick two (squashed) tetrahedrons together?





