In the first message all links were identical (thanks to Melinda who told m=
e that). They should look this way:
Face of shallow face-cut 24-cell. It has 57 stickers.
http://groups.yahoo.com/group/4D_Cubing/photos/album/772706687/pic/12650624=
11/view
View of 24-cell in S4, 23 faces of 24 are visible
http://groups.yahoo.com/group/4D_Cubing/photos/album/772706687/pic/20878302=
18/view
Face of face-cut 16-cell. 53 stickers here, most of them are one-color.
http://groups.yahoo.com/group/4D_Cubing/photos/album/772706687/pic/40243926=
/view
Fragment of 5D cube that is cut in halves by 16 "diagonal" planes (perpendi=
cular to main diagonal). Each face has 249 stickers.
http://groups.yahoo.com/group/4D_Cubing/photos/album/772706687/pic/81161994=
5/view
Face of the 5D cube shallow cut by 32 diagonal planes. There are 49 sticker=
in one face: 16 of 5C, 32 of 4C, and 1 1C (actually, it's a side of the co=
re of the cube, and so it's 10C :) )
http://groups.yahoo.com/group/4D_Cubing/photos/album/772706687/pic/52829176=
/view
Face of {3,3,3}^2 (duotetrahedron?), face-cut. It has 105 stickers, most of=
them are parts of more-than-one color pieces.
http://groups.yahoo.com/group/4D_Cubing/photos/album/772706687/pic/13607911=
20/view
View of the duotetrahedron. All 8 faces have the same form {3,3}x{3,3,3}.
http://groups.yahoo.com/group/4D_Cubing/photos/album/772706687/pic/17729304=
83/view
Andrey
Andrey also added comments for each photo so you don't need to
cross-check with the email comments. Just use the scrolling thumbnail
view at the bottom of the images and watch the comments.
-Melinda
On 4/13/2011 1:29 PM, Andrey wrote:
> In the first message all links were identical (thanks to Melinda who told me that). They should look this way:
>
> Face of shallow face-cut 24-cell. It has 57 stickers.
> http://groups.yahoo.com/group/4D_Cubing/photos/album/772706687/pic/1265062411/view
>
> View of 24-cell in S4, 23 faces of 24 are visible
> http://groups.yahoo.com/group/4D_Cubing/photos/album/772706687/pic/2087830218/view
>
> Face of face-cut 16-cell. 53 stickers here, most of them are one-color.
> http://groups.yahoo.com/group/4D_Cubing/photos/album/772706687/pic/40243926/view
>
> Fragment of 5D cube that is cut in halves by 16 "diagonal" planes (perpendicular to main diagonal). Each face has 249 stickers.
> http://groups.yahoo.com/group/4D_Cubing/photos/album/772706687/pic/811619945/view
>
> Face of the 5D cube shallow cut by 32 diagonal planes. There are 49 sticker in one face: 16 of 5C, 32 of 4C, and 1 1C (actually, it's a side of the core of the cube, and so it's 10C :) )
> http://groups.yahoo.com/group/4D_Cubing/photos/album/772706687/pic/52829176/view
>
>
> Face of {3,3,3}^2 (duotetrahedron?), face-cut. It has 105 stickers, most of them are parts of more-than-one color pieces.
> http://groups.yahoo.com/group/4D_Cubing/photos/album/772706687/pic/1360791120/view
>
> View of the duotetrahedron. All 8 faces have the same form {3,3}x{3,3,3}.
> http://groups.yahoo.com/group/4D_Cubing/photos/album/772706687/pic/1772930483/view
>
> Andrey
And small correction to last message (thanks to Roice, who found the mistak=
e). Object in last two pictures is not {3,3,3}^2, but only {3,3}^2 (with fa=
ces {3,3}x{3}}. {3,3,3}^2 would have 10 faces with 495 stickers on each. Or=
may be there is a cutting with 176 stickers per face... Interesting idea.
... on the 3-inch screen of the Android phone!
The latest interface presented by Melinda is good enough for the actual s=
olving of 3^4 cube! It took about three hours (part of solving was by one h=
and in the Moscow subway). Main problem was in the sticker selection - stic=
kers are very small and it's difficult to select what I need. And one of st=
ages in my method requires middle layers twists, and I had to use many 4D r=
otations for it...
Anyway, puzzle is solvable :) Melinda, thank you for it!
Andrey