Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on...
Transcript of Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on...
![Page 1: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/1.jpg)
Tiling the surface of a cube by 12 identical pentominoes
Citation for published version (APA):Bouwkamp, C. J. (1998). Tiling the surface of a cube by 12 identical pentominoes. (EUT report. WSK, Dept. ofMathematics and Computing Science; Vol. 98-WSK-02). Eindhoven: Technische Universiteit Eindhoven.
Document status and date:Published: 01/01/1998
Document Version:Publisher’s PDF, also known as Version of Record (includes final page, issue and volume numbers)
Please check the document version of this publication:
• A submitted manuscript is the version of the article upon submission and before peer-review. There can beimportant differences between the submitted version and the official published version of record. Peopleinterested in the research are advised to contact the author for the final version of the publication, or visit theDOI to the publisher's website.• The final author version and the galley proof are versions of the publication after peer review.• The final published version features the final layout of the paper including the volume, issue and pagenumbers.Link to publication
General rightsCopyright and moral rights for the publications made accessible in the public portal are retained by the authors and/or other copyright ownersand it is a condition of accessing publications that users recognise and abide by the legal requirements associated with these rights.
• Users may download and print one copy of any publication from the public portal for the purpose of private study or research. • You may not further distribute the material or use it for any profit-making activity or commercial gain • You may freely distribute the URL identifying the publication in the public portal.
If the publication is distributed under the terms of Article 25fa of the Dutch Copyright Act, indicated by the “Taverne” license above, pleasefollow below link for the End User Agreement:
www.tue.nl/taverne
Take down policyIf you believe that this document breaches copyright please contact us at:
providing details and we will investigate your claim.
Download date: 15. Jan. 2020
![Page 2: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/2.jpg)
EINDHOVEN UNIVERSITY OF TECHNOLOGY Department of Mathematics and Computing Science
TILING THE SURFACE OF A CUBE BY 12 IDENTICAL PENTOMINOES
by
C.J. Bouwkamp
EUT Report 98-WSK -02 Eindhoven, November 1998
![Page 3: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/3.jpg)
Department of Mathematics and Computing Science
Eindhoven University of Technology
P.O. Box 513
5600 MB Eindhoven, The Netherlands
ISSN: 0167-9708
Coden: TUEEDE
![Page 4: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/4.jpg)
Abstract
TILING THE SURFACE OF A CUBE BY 12 IDENTICAL PENTOMINOES
C.J.Bouwkamp
This report deals with tiling the surface of a cube by twelve congruent copies of a planar pentomino, folded over corners, edges and faces of the cube. Only so-called nice tilings are considered, such that the pentominoes are undeformed and easy to recognize. There are no such tHings for pentominoes U and W. The other pentominoes lead to 1054 tilings distinct modulo rotation and reflection. Most of them are asymmetric and of no particular interest. Only 164 of them have some degree of symmetry, as specified in
X(l), T(l), Z(l1), V(2), 1(2), F(23), N(3), Y(lO), L(30), P(81),
with, in parentheses, the number of tHings for the corresponding pentomino. Every symmetric tiling is shown in terms of an unfold of the cube surface onto the plane. Numerical code and details of symmetry are added.
1. Introduction
The problem of tiling the surface of a cube, by a complete set of the 12 different pentominoes, was solved in a previous report [1]. Let me recall that the total number of solutions was found to be 26,358,584 of which 284,402 are nice. Compared to these large numbers, the 1054 and 164 of the new problem is a mere trifle, and so is the corresponding computing time. In the old problem, pentomino X played a special role to obtain all solutions different modulo rotation of the cube. In the new problem X can be left alone, because, as is easy to see, X leads to one solution only, and this solution is rotational-invariant. The cube to be covered is shown in Figure 1 (reflections are eliminated). The 60 squares (cells) are numbered as shown in Figure 2. For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five ordinal numbers of cells covered by the pentomino and ordered to increasing value. Apart from X. the pentominoes are ordered pentomino-wise in the order
U, T, Z, V, W, I, F, N, y, L, P.
The integer arrays for each pentomino are ordered to increasing lexicographical value. The corresponding matrix of:) columns and 35,6 rows is available from the old problem. In the new problem, backtrack is over small subsets of these rows as correspond to the pentomino under consideration.
![Page 5: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/5.jpg)
11
Figure 1. The angle indicated equals arctan(1/3),
.... -~~ ... ....... ..4"1'" 42
\44 45 46 47
~ 51\ ..........
49 50 ..4T' 43 * ~.'".~ ..
... '"~ .. "
\4 :}~ 1 2'" 3 58 60 .... ........
............ \5 ,,48" 52 6 7 8 57 59 30\ ....
" " ", ,.'
\39 55 53 ~ 10 11 12\ }!,' ",2'1"
~. ~. .. '
~ 56 54 13\ .~,1" "Hr' 16 ....... ~. "
26 , ,,22" \18 19 20 2-1 .... ~ .. ,.,
2~ 23 24 25\, ." ....
27 ",2'8" 29 ",
.....
\31 32 33 ~
35 36 37 38\ ••• + ••
-1:0 ,,-4'1" ,.'
....
Figure 2, Cell numbers on the cube's layout.
![Page 6: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/6.jpg)
iii
2. Cubic symmetry
The solid cube has many axes of symmetry. First, the three axes from face to face X, Y, Z. Second, the four diagonals from vertex to vertex Dl, D2, D3, D4. Third, the six axes from edge to edge Tl, T2, T3, T4, T5, T6. See Figure 3, where the corresponding symbols are encircled, at one of two places where the axes cut the cube surface .
••••• &s .... •
.... 41'··· 42 .. , .......
\44 45 46 47 Z
•• *"
,. ... ,. ~ 4~ 49 50 51'··
b.······· .... 41'··· 43
.. @ .. ...... ~ 34 ... 1 3 .... 4 58 60 . "::\ ........ .. , .,' 'ri! @ "Y
" 30\. .. ,,48··· 52 5 6 7 57 59 ,.'
....... X:- ,.'
\39 @ \:: .. ,. ... 55 53 10 11 12 .... 17 .... 21'···
.. , .....
j~ 13"" 14 .. @ .. .......
56 54 16 .~ ........
26 ... 22···········~18 19 20 @ .. ' .. ~ .. ~ . .' @ 23 24 25 \
•• * ••••••
27 ... 28'" 29 .. , .. ' .. '
\~31 32 33 i.i
~~ 36 37 38 ....
.... .. -.. ' 40 ... 41""
.. " .. ~.-".'"
Figure 3. Axes of symmetry within circles.
Now assume that the computer has found a tiling, coded by an ordered set of twelve numbers from 1 to 35;6. for a cube fixed in space, If you rotate the cube with its tiling attached. you can describe the tiling with new code numbers, based on the fixed cube. These new numbers can be found by permutation of cell numbers. in combination with sorting procedures, both for numbers and strings.
![Page 7: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/7.jpg)
iv
In the following table these permutations are given explicitly. They were obtained manually, by use of two identical cubes with their cells numbered, one cube held fixed, the other rotated about the axis considered, then rotating the two cubes identically and noting, for 1 to 60 of the first cube, the corresponding cell numbers of the second cube. The lines of IDENTITY are added. With them you can follow permutations more easily. X stands for rotation over 90 degrees about the x-axis; ROT-l is the file where the 60 numbers will be stored on disk. X*X stands for rotation over 180 degrees about the x-axis; ROT-2 is the corresponding file of storage. And so forth and so on.
IDENTITY
X ROT-1
Y ROT-4
Y*Y ROT-5
Z ROT-7
Z*Z ROT-8
TABLE OF 24 PERMUTATIONS
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60
4 8 12 16 3 7 11 15 2 6 10 14 1 5 9 13 18 52 53 54 22 48 55 56 26 44 39 35 31 27 40 36 32 28 41 37 33 29 42 38 34 30 25 43 60 59 21 47 58 57 17 51 50 49 46 45 19 20 23 24
16 15 14 13 12 11 10 9 8 7 6 5 4 3 2 1 52 51 50 49 48 47 46 45 44 43 42 41 40 39 38 37 36 35 34 33 32 31 30 29 28 27 26 25 24 23 22 21 20 19 18 17 57 58 59 60 53 54 55 56
13 9 5 1 14 10 6 2 15 11 7 3 16 12 8 4 51 17 57 58 47 21 59 60 43 25 30 34 38 42 29 33 37 41 28 32 36 40 27 31 35 39 44 26 56 55 48 22 54 53 52 18 19 20 23 24 50 49 46 45
40 41 42 43 44 45 46 47 48 49 50 51 52 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27
28 29 30 31 32 33 34 35 36 37 38 39 55 53 56 54 58 60 57 59
27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 56 55 54 53 60 59 58 57
14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 3637 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 1
2 3 4 5 6 7 8 9 10 11 12 13 54 56 53 55 59 57 60 58
44 48 52 5 39 55 53 9 35 56 54 13 31 26 22 18 14 27 23 19 15 28 24 20 16 29 25 21 17 12 30 59 57 8 34 60 58 4 38 43 47 51 3 42 46 50 2 41 45 49 1 40 36 32 37 33 10 6 11 7
42 41 40 39 38 37 36 35 34 33 32 31 30 29 28 27 26 25 24 23 22 21 20 19 18 17 16 15 14 13 12 11 10 9 8 7 6 5 4 3 2 1 52 51 50 49 48 47 46 45 44 43 60 59 58 57 56 55 54 53
![Page 8: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/8.jpg)
D1 ROT-10
Dl*Dl ROT-11
D2 ROT-12
D2*D2 ROT-13
D3 ROT-14
D3*D3 ROT-15
D4 ROT-16
D4*D4 ROT-17
T1 ROT-18
T2 ROT-19
T3 ROT-20
51 47 43 38 4 58 60 34 8 57 59 30 12 17 21 25 29 16 20 24 28 15 19 23 27 14 18 22 26 31 13 54 56 35 9 53 55 39 5 52 48 44 40 1 49 45 41 2 50 46 42 3 7 11 6 10 33 37 32 36
5 9 13 18 52 53 54 22 48 55 56 26 44 39 35 31 27 40 36 32 28 41 37 33 29 42 38 34 30 25 43 60 59 21 47 58 57 17 51 4 8 12 16 3 7 11 15 2 6 10 14 1 49 45 50 46 23 19 24 20
52 48 44 40 1 49 45 41 2 50 46 42 3 51 47 43 38 4 58 60 34 8 57 59 30 12 17 21 25 29 16 20 24 28 15 19 23 27 14 18 22 26 31 13 54 56 35 9 53 55 39 5 6 7 10 11 37 36 33 32
12 8 4 51 17 57 68 47 21 59 60 43 25 30 34 38 42 29 33 37 41 28 32 36 40 27 31 35 39 44 26 56 55 48 22 54 53 52 18 13
9 5 1 14 10 6 2 15 11 7 3 16 20 24 19 23 46 50 45 49
43 47 51 3 42 46 50 2 41 45 49 1 40 44 48 52 5 39 55 53 9 35 56 54 13 31 26 22 18 14 27 23 19 15 28 24 20 16 29 25
21 17 12 30 59 57 8 34 60 58 4 38 37 36 33 32 6 7 10 11
26 22 18 14 27 23 19 15 28 24 20 16 29 25 21 17 12 30 59 57 8 34 60 58 4 38 43 47 51 3 42 46 50 2 41 45 49 1 40 44
48 52 5 39 55 53 9 35 56 54 13 31 32 33 36 37 11 10 7 6
38 34 30 25 43 60 59 21 47 58 57 17 51 4 8 12 16 3 7 11 15 2 6 10 14 1 5 9 13 18 52 53 54 22 48 55 56 26 44 39 35 31 27 40 36 32 28 41 37 33 29 42 46 50 45 49 20 24 19 23
17 21 25 29 16 20 24 28 15 19 23 27 14 18 22 26 31 13 54 56 35 9 53 55 39 5 52 48 44 40 1 49 45 41 2 50 46 42 3 51 47 43 38 4 58 60 34 8 57 59 30 12 11 10 7 6 32 33 36 37
31 35 39 44 26 56 55 48 22 54 53 52 18 13 9 5 1 14 10 6 2 15 11 7 3 16 12 8 4 51 17 57 58 47 21 59 60 43 25 30
34 38 42 29 33 37 41 28 32 36 40 27 23 19 24 20 49 45 50 46
3 2 1 52 51 50 49 48 47 46 45 44 43 42 41 40 39 38 37 36 35 34 33 32 31 30 29 28 27 26 25 24 23 22 21 20 19 18 17 16 15 14 13 12 11 10 9 8 7 6 5 4 68 60 57 69 55 53 56 54
25 21 17 12 30 59 57 8 34 60 58 4 38 43 47 51 3 42 46 50 2 41 45 49 1 40 44 48 52 6 39 65 53 9 35 56 54 13 31 26
22 18 14 27 23 19 15 28 24 20 16 29 33 37 32 36 7 11 6 10
18 22 26 31 13 54 56 35 9 53 55 39 5 52 48 44 40 1 49 45 41 2 50 46 42 3 51 47 43 38 4 58 60 34 8 57 59 30 12 17 21 25 29 16 20 24 28 15 19 23 27 14 10 6 11 7 36 32 37 33
v
![Page 9: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/9.jpg)
VI
T4 ROT-21
T5 ROT-22
T6 ROT-23
29 28 27 26 25 24 23 22 21 20 19 18 17 16 15 14 13 12 11 10 9 8 7 6 5 4 3 2 1 52 51 50 49 48 47 46 45 44 43 42
41 40 39 38 37 36 35 34 33 32 31 30 59 57 60 58 54 56 53 55
39 35 31 27 40 36 32 28 41 37 33 29 42 38 34 30 25 43 60 59 21 47 58 57 17 51 4 8 12 16 3 7 11 15 2 6 10 14 1 5 9 13 18 52 53 54 22 48 55 56 26 44 45 46 49 50 24 23 20 19
30 34 38 42 29 33 37 41 28 32 36 40 27 31 35 39 44 26 56 55 48 22 54 53 52 18 13 9 5 1 14 10 6 2 15 11 7 3 16 12
8 4 51 17 57 58 47 21 59 60 43 25 24 23 20 19 45 46 49 50
3. THings different modulo rotation
Coping with the symmetry of the tilings is more difficult than in the old problem. First, a tiling will be identified by a string oflength 48 derived from a concatenation of its twelve code numbers as computed by the backtrack program. Second, it should be clear that successive strings increase in lexicographical value in the course of backtrack. If a tiling is not symmetric, it has 24 different codes by rotation. The first of them, that is the smaller, could be stored, and the 23 others ignored. However, by choice we ignore all asymmetric tHings. If a tiling is symmetric, the first string is not greater than the 23 others, and at least one of the latter is equal to the first. Assume that the computer finds a tiling, TILING say, with string AS. Then we compute 23 strings by permutations corresponding to rotating the cube, and order them to increasing or non-decreasing lexicographical value. Let then B$ be the very first of them. Only if A$=B$ is TILING symmetric, and AS is stored. For details, the reader should consider, and study, the actual program in GWbasic.
4. Computer program
o CLS: REM *** This is program 12SELECT.bas/exe ********************** 1 REM *** It is about covering a cube with 12 identical pentominoes ********* 2 REM *** It computes all codes that are distinct modulo rotation ********* 3 REM *** and STORES them in file "NICE"+P$ ********************************* 100 DEFINT A-Z 105 DIM PIS1(3576),PIS2(3576),PIS3(3576),PIS4(3576),PIS5(3576),TAL(12,5) 110 DIM PNUM(3576),B(12),COD(12),SOL(24,12),A$(23),AR(60),BB$(24),A(24),B$(24) 120 DIM BODY(60) ,COPIS(12),COHOL(12),HOEK(576),COP(12) ,GETAL(1 2,5),X(12) 130 DATA "111, "2","3","4","5 11 ,"6 11 ,117",118","9","10 11 ,"11","12",1113","14","15 11 ,
"16","17","18","19 11 ,"20","21 11 ,"22","23" 140 FOR 1=1 TO 23:READ A$(1):NEXT 200 FOR 1= 1 TO 216:PNUM(I)= 2:NEXT 220 FOR I= 457 TO 696:PNUM(I)= 4:NEXT
![Page 10: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/10.jpg)
230 FOR 1= 697 TO 936:PNUM(I); 5:NEXT 240 FOR 1= 937 TO 1176:PNUM(I)= 6:NEXT 250 FOR 1=1177 TO 1296:PNUM(I)= 7:NEXT 260 FOR 1=1297 TO 1752:PNUM(I)= 8:NEXT 270 FOR 1=1753 TO 2232:PNUM(I)= 9:NEXT 280 FOR 1=2233 TO 2688:PNUM(I)=10:NEXT 290 FOR 1=2689 TO 3168:PNUM(I)=11:NEXT 300 FOR 1=3169 TO 3576:PNUM(I)=12:NEXT
VB
400 OPEN "codel" FOR INPUT AS #l:FOR 1=1 TO 3576:INPUT #1, PIS1(I) :NEXT:CLOSE 410 OPEN "code2/1 FOR INPUT AS #l:FOR 1=1 TO 3576:1NPUT #1, PIS2(I):NEXT:CLOSE 420 OPEN "code3" FOR INPUT AS #l:FOR 1=1 TO 3576:INPUT #1, PIS3(l) :NEXT:CLOSE 430 OPEN /l code4" FOR INPUT AS #l:FOR 1=1 TO 3576:INPUT #1, PIS4(I):NEXT:CLOSE 440 OPEN IIcode5" FOR INPUT AS #1:FOR 1=1 TO 3576:INPUT #1, PIS5(l) :NEXT:CLOSE 460 OPEN "hoek/l FOR INPUT AS 'l:FOR 1=1 TO 676:INPUT #1. HOEK(I) :NEXT:CLOSE 470 FOR 1=1 TO 576:P1S1(HOEK(I»=O:NEXT: REM *** nice tilings only ********** 480 GOSUB 4000 490 OPEN "NICE"+P$ FOR OUTPUT AS #2 500 CLS:FOR 1=1 TO 60:BODY(I)=0:NEXT: 600 J=l:FREHOL=l:
REM *** Tiling computed in lines *** REM *** 600 through 830 ***
608 BEGIN$=DATE$+" u+TIME$ 610 TRYPIS=LDWER 620 IF FREHOL>60 THEN 900 630 IF BODY(FREHOL)<>O THEN FREHOL=FREHOL+1:GOTO 620 640 IF TRYPIS>UPPER THEN 790 660 IF PIS1(TRYPIS)<>FREHOL THEN TRYPIS=TRYPIS+1:GOTO 640 670 IF BODY(PIS2(TRYPIS»=1 THEN TRYPIS=TRYPIS+l:GOTO 640 680 IF BODY(PIS3(TRYPIS»=1 THEN TRYPIS=TRYPIS+l:GOTO 640 690 IF BODY(PIS4(TRYPIS»=1 THEN TRYPIS=TRYPIS+l:GOTO 640 700 IF BODY(PIS6(TRYPIS»=1 THEN TRYPIS=TRYPIS+l:GOTO 640 710 COHOL(J)=FREHOL:COPIS(J)=TRYPIS: REM *** begin of filling *********** 725 IF CM$="x" THEN 1300: REM *** interupt possible *********** 730 BODY(FREHOL)=1 740 BODY(PIS2(TRYPIS»=1 750 BODY(PIS3(TRYPIS»=1 760 BODY(PIS4(TRYPIS»=1 770 BODY(PIS5(TRYPIS»=1 775 CM$=INKEY$: 780 J=J+1:FREHOL=FREHOL+1:GOTO 610: 790 J=J-1:IF J=O THEN 1300: 800 K1=COHOL(J):K2=COPIS(J) 810 COHOL(J)=O:COPIS(J)=O
REM *** interupt possible *********** REM *** end of filling *********** REM *** begin of erasing ***********
820 BODY(Kl)=0:BODY(PIS2(K2»=O:80DY(PIS3(K2»=O:BODY(PIS4(K2»=O:BODY(PIS5(K2»=0 830 FREHOL=K1:TRYPIS=K2+1:GOTO 640: REM *** end of erasing *********** 900 BBB$:::/lII: FOR 1=1 TO 12:BBB$=8BB$+STR$(COPIS(I»:NEXT 910 GOTO 2000 1000 REM 1010 IF B$(A(l»<BBB$ THEN 1020 ELSE FOR I=l TO 12:WRITE #2, COPIS(I):NEXT
![Page 11: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/11.jpg)
viii
1020 GOTO 790 1300 REM 1310 PRINT II
1320 PRINT" 1330 REM 1340 END 2000 REM
Start at "+ BEGIN$ Finish at "+ DATE$+" u+TIME$
2010 FOR 1=1 TO 12:COD(I)=COPIS(I):NEXT 2020 SS=O 2030 FOR JJ=l TO 23 2035 OPEN "ROT-"+A.$(JJ) FOR INPUT AS #1 2040 FOR 1=1 TO 60:INPUT #l,AR(I):NEXT:CLOSE #1 2045 FOR 1=1 TO 12:COP(I)=COPIS(I):NEXT 2047 FOR 1=1 TO 12 2050 X(1)=AR(PIS1(COP(I»):X(2)=A.R(PIS2(COP(I»):X(3)=AR(PIS3(COP(I») 2060 X(4)=AR(PIS4(COP(I»):X{5)=A.R(PIS5(COP(I») 2070 N=5: GOSUB 10000 2080 FOR K=l TO 5:GETAL(I,K)=X(B(K»:NEXT 2090 NEXT 2100 N=12 2110 FOR 1=1 TO 12:X(I)=GETAL(I,l):NEXT 2120 GOSUB 10000 2130 FOR 1=1 TO 12:FOR K=l TO 5 2140 TAL{I,K)=GETAL(B(I),K):NEXT:NEXT 2150 FOR 1=1 TO 12 2160 FOR M=LOWER TO UPPER 2170 IF (PIS1(M)=TAL(I.1) AND PIS2(M)=TAL(I,2) AND PIS3{M)=TAL(I,3) AND PIS4(M)=
TAL(I,4) AND PIS5(M)=TAL(I.5) ) THEN COD(I)=M 2180 NEXT M 2190 NEXT I 2200 REM 2220 REM 2230 SS=SS+l:FOR 1=1 TO 12: SOL(SS,I)=COD(I):NEXT 2240 REM 2250 NEXT JJ 2260 GOTO 20000 4000 INPUT" Pentomino letter (IN CAPITAL!) II;P$ 4010 IF P$="U" THEN LOWER= l:UPPER= 216 4020 IF P$="T" THEN LOWER= 217:UPPER= 456 4030 IF P$=UZ" THEN LOWER= 457:UPPER= 696 4040 IF P$="V" THEN LOWER= 697:upPER= 936 4050 IF P$="W" THEN LOWER= 937:UPPER=1176 4060 IF P$=III" THEN LOWER=1177:UPPER=1296 4070 IF P$=IIFII THEN LOWER=1297:UPPER=1752 4080 IF P$="N" THEN LOWER=1753:UPPER=2232 4090 IF P$="Y" THEN LOWER=2233:UPPER=2688 4100 IF P$=uL" THEN LOWER=2689:UPPER=3168
![Page 12: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/12.jpg)
4110 IF P$="P" THEN LOWER=3169:UPPER=3576 4120 RETURN
ix
10000 REM ************** Sorting numbers X(1),X(2), ... ,X(N) ***************** 10010 V=N:FOR 11=1 TO N:B(II)=II:NEXT 10020 V=INT(V!2):IF V=O THEN 10080 10030 Nl=N-V:FOR KK=l TO Nl:E=KK+V 10040 IF X(B(KK»<=X(B(E» THEN 10070 ELSE T=B(E):F=KK 10050 B(E)=B(F):E=F:F=F-V:IF F>O THEN IF X(B(F»>X(T) THEN 10050 10060 B(E)=T 10070 NEXT:GOTO 10020 10080 RETURN 20000 REM 20010 REM 20020 REM 20030 REM 20040 REM 20050 FOR K=l TO 23: BB$=IIII 20060 FOR 1=1 TO 12 20070 BB$=BB$+STR$(SOL(K,I»:NEXT 20080 B$(K)=BB$ 20090 NEXT 20100 N=23 20110 GOSUB 30000 20120 REM 20130 GOTO 1000 30000 REM ********* Sorting strings *************************************** 30010 V=N:FOR 1=1 TO N:A(I)=I:NEXT 30020 V=INT(V!2):IF v=o THEN RETURN 30030 Nl=N-V:FOR KK=l TO N1:E=KK+V 30040 IF B$(A(KK»<=B$(A(E» THEN 30070 ELSE T=A(E):T$=B$(T):F=KK 30050 A(E)=A(F):E=F:F=F-V:IF F>O THEN IF B$(A(F»>T$ THEN 30050 30060 A(E)=T 30070 NEXT:GOTO 30020
5. Conclusion
Two other programs need be mentioned. The first deals with providing details about the character of symmetry, in terms of axes, with input file "NICE" +PS. The second program draws the layout on my matrix printer, by inputing the 12 code numbers. The corresponding information is given at bottom of page, but for pentomino X. where code is absent. As an ardent puzzler, I made a thin-card-board copy of each layout that has more symmetry than one axis of order 2. after adding a few triangular flaps around the border. Scoring the dashed lines with a blunt knife along a metal straight edge. I can fold the layout into a cube in :3-space and fix it with the flaps inserted between the card-bord and 3 squares pasted at the inside. I can unfold the cube at will. Many beautiful geometric objects result!
![Page 13: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/13.jpg)
x
Acknowledgement
My sincere thanks are due to Herman Willemsen for editing text and drawing the originals of Figures 1 through 3.
References
[1] C.J.Bouwkamp, On Benjamin's Pentomino Cube, EUT Report 97-WSK-Ol, Eindhoven, December 1997.
[2] , An old pentomino problem revisited, Simplex SigiUum Veri, Eindhoven, 1995, ISBN 90-386-0197-2, pp. 87-96.
Eindhoven, July 1998
![Page 14: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/14.jpg)
1
ROTATIONAL-INVARIANT
![Page 15: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/15.jpg)
2
.. ~ ...... .
\. : ....... .
.. ....
............................ .. ' . ~ .... ~.-'
. .... ~ .
218 264 274 285 333 338 383 395 400 409 453 455
Four axes order 3 (Dl D2 D3 04) and three axes order 2 (X Y Z)
![Page 16: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/16.jpg)
u ......
....... .. ,
3
"},. ~ .. ' ...... \. ,........... -
\':. ........................... \" ~. Q ....
::.: .~ ••• ~11~ ..... ·,.· \.~
1------.......1 .......... \.::: ... ~.~ .. , ..... ~
.. -~ .......... " ............
..... .-------1
\
................. ...... . .....
~.J .............. . .............. \\.
~\
'--.l\\ 1------....1
......
: .....
... wo'
o .. ~ .. ,. ... " ... '"
.1.. ............ ...
457 504 517 539 545 569 610 635 641 660 666 687
Three axes order 2 (Y T1 T4)
![Page 17: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/17.jpg)
-,:: .- ...... *~ •
.... ~ .... ~ ... .. '
4
........................... . " " .. ~
\ .............. ..1-........... . "' ................... # ..
': ..... ' .................................
........... _-:-:--\:
... ' ............ .
.. ' ............................
. ....... a.~"
\\ ~
....
457 508 518 529 534 559 573 606 630 648 682 692
One axis order 3 (D3) and three axes order 2 (T1 T3 T6)
![Page 18: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/18.jpg)
........
. ~ .. '
............ .~ o ... ~ ........ *
.. ".~ .
,.'
....
,.' .....
5
~* •••
: ..... ~.
..........
...,~ ........ ~
........
458 503 510 543 574 577 604 634 637 664 690 691
ROTATIONAL-INVARIANT
![Page 19: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/19.jpg)
6
......................... ...... '1
. .....
'\ ......
~~------------~
................... ··/T . ....
L--------.....:I ..... ··· .. ·· .. · ......
...........
. ..... . .....
..1.. ............ .
..........
458 503 510 543 574 577 604 634 638 659 688 690
One axis order 3 (D3)
![Page 20: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/20.jpg)
7
............................
..... " ..
.............................. .... .::.::::.:: .
...................................
. ............................ .
.......................
..1. ........... '
458 503 510 543 574 578 599 631 636 650 685 691
One axis order 2 {Xl
![Page 21: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/21.jpg)
.... ··········l··
.1. ............................. .
.... .. -", .. ,
458 503 511 537
'\
8
·1····· .- ..... ~ ...... """ I
'-----.._----...,...-1 ..... ........
.....
......
. .1 .............................. ..
.....
571 574 604 636 637 650
One axis order 3 (D4) and three axes order 2 (T1 T2 T5)
685 691
![Page 22: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/22.jpg)
9
"'r
:\ .. :: .................... . ......................
-'t""--------,
·· .. ···l········ .. ··· .. ........................
1---..;,...----,
L-----.r--.. -..,.,. ........ 1' ........ ..
'\ .....................
.............................. 1 •• ,
': ........ ,
\~ ......................
'\ .,\
J ............. .
458 503 511 537 571 576 590 627 638 659 688 690
One axis order 3 (D2l
![Page 23: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/23.jpg)
10
.. '
................... " ..
. .................... . .....
. ..... .1 ................ ,
463 497 506 526 562 567 578 599 631 636 650 685
Four axes order 3 (01 02 03 04) and three axes order 2 (X Y Z)
![Page 24: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/24.jpg)
11
................ ........... \" ..... ~
........... , "-
'<,: \\"
..... J ............. J
~ ...... ,.
\l ..... . \J. ........................ .
467 483 498 534 545 561 572 606 622 632 667 679
One axis order 4 (Z)
![Page 25: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/25.jpg)
12
........... ····I································~"
\\ .,. .............................. l\ .----__ .,..:,\ ..... ···········1 L: .
......
....
:; ...... ········11--···· ---l .. .1. ............. . .'
...........
~\:::.:::. \l ...... .1. ................ :\.
\\L ..... ········· .... .:--____ --11--____ --':
'\1 ........................ \. \{...................... j.
· . · . · . · . 0. : · . · . · . · . · . · .
~ .. :. .I. ......... :. \\ ..................................... .
467 483 498 534 546 558 596 605 622 632 667 679
One axis order 4 (Z) and four axes order 2 (X Y T2 T3)
![Page 26: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/26.jpg)
13
.··········1················ ............... }\. :..... Ii, ~'" ! : : : .~
\ \ \ \
~······························L .. '
.. ' ..... ······· .. r···· .. ··
<'\1 ................ ............. \". \,l. ............. .
...... .........
~-------+--------~
I ........ ... . ,~ ~ .. "~
474 484 498 508 534 545 561 572 606 622 632 666
ROTATIONAL-INVARIANT
![Page 27: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/27.jpg)
14
......
...............................
.... " ~ .. "
.....................
. ......... ..
698 744 757 763 817 821 866 879 884 888 933 935
Four axes order 3 (01 02 03 04) and three axes order 2 (X Y Z)
![Page 28: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/28.jpg)
15
......
.."" . .. ~ ..
698 746 758 763 780 794 837 857 866 888 903 916
Three axes order 2 (X Y zl
![Page 29: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/29.jpg)
16
..... ~ •••• " ~'O
1177 1206 1218 1229 1243 1252 1262 1274 1281 1287 1293 1295
One axis order 4 (Y) and four axes order 2 (X Z Tl T4)
![Page 30: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/30.jpg)
17
',----"----t-----r---t;---r------------:,...I ... ............
~." .. .......
. . ~ .. ~ ... ~ .....
...... ~ .... .........
••••. 1-'-. -----------'
~. "."
\'\.,] ................................................ \",\
"It •
1178 1205 1218 1233 1235 1252 1266 1268 1281 1290 1291 1295
One axis order 4 (Yl
![Page 31: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/31.jpg)
18
.. , . ~ .. ~ .. ~.,
.~ ..... .. ,
.. '
.~ ........ "' . .. ,
·~ ."
........................
..' ~.
1297 1380 1411 1468 1514 1526 1583 1602 1629 1692 1750 1751
One axis order 2 (X)
![Page 32: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/32.jpg)
19
··········t\ . ...... ~
1':· .......... . \, ..................... .
1297 1380 1411 1468 1515 1523 1603 1613 1648 1706 1716 1737
One axis order 2 (X)
![Page 33: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/33.jpg)
20
...........
1297 1380 1411 1468 1515 1527 1568 1640 1653 1694 1716 1734
One axis order 2 (Xl
![Page 34: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/34.jpg)
21
...... ~ ...... ".~." ..
.......
....... ...J ............. .:
1297 1380 1411 1468 1519 1527 1542 1614 1660 1719 1724 1734
One axis order 2 (Xl
![Page 35: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/35.jpg)
22
." ....
.. '
......................
'------.".-t~; ......... "
............................
....
.~ ..
1297 1381 1411 1463 1531 1539 1609 1620 1642 1694 1716 1734
One axis order 3 (D2)
![Page 36: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/36.jpg)
23
....................
. ....... \\
1297 1381 1411 1463 1533 1539 1580 1620 1640 1694 1716 1734
One axis order 3 (D2)
![Page 37: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/37.jpg)
24
\ ~--~
......................................
.........................
. ......
\ . ................... .
1297 1382 1411 1463 1516 1533 1578 1630 1647 1692 1743 1750
One axis order 4 (Yl
![Page 38: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/38.jpg)
25
................ 1' ........ . ~~*~,. ~ •
. .....
...----1---...,.,..;t .....
'\1 ...... \L ..... ·························· .......
. ..... .. ~" .
" .......... .
1297 1382 1414 1448 1498 1516 1565 1578 1630 1650 1726 1743
One axis order 2 (Y)
![Page 39: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/39.jpg)
26
.... •• ~ •• ' 0"
.............. J ........... . • .. _ •• "~'~' 0"
.........
.......
.. ,
..........
.... """"" /""" \,\,
1""""""""""""""""""""""""""""""""""""""""""""
1297 1383 1411 1459 1512 1527 1568 1629 1637 1719 1726 1751
One axis order 3 (D3)
![Page 40: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/40.jpg)
.. ' ·· .. ·····1·· ...... -
~"",
. ,.-"
.... ~ .... .....
......
.~ ~.~ •• 'O
~~.' .. ~
21
.! .. ~ .• '
.... ~ .
1297 1383 1411 1459 1512 1527 1568 1629 1639 1696 1718 1751
One axis order 3 (D3)
![Page 41: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/41.jpg)
28
..................... \ .
. ,.-., ~-'
00"--....
. ............................ .
................................. ......... .
OM ..... ~.
. ....................... .
1297 1384 1411 1463 1478 1533 1578 1593 1647 1692 1707 1750
One axis order 4 (Y)
![Page 42: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/42.jpg)
29
.' ~ ..
':
.... ~ .. ' ~.
. ..... ....................
.--_---,....-_---1
1297 1384 1414 1448 1478 1498 1565 1578 1593 1650 1707 1726
One axis order 2 (Yl
![Page 43: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/43.jpg)
30
·····L .....•..................•................. \\
.. ' ....
~ .. " .
1-------,..----..,.,....1 ...... . ... ~ .. ~ .......
...... .......
······h
.I. .............. ;
\\
\\,
1297 1385 1407 1492 1501 1506 1573 1602 1631 1688 1740 1746
One axis order 3 (D4)
![Page 44: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/44.jpg)
31
·····r\.. /., ~
...... h . ....... / .. L
....... ..............
.. ~ .....
......
J .............. ;
1297 1385 1407 1492 1501 1506 1573 1602 1633 1658 1737 1746
One axis order 3 (D4)
![Page 45: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/45.jpg)
.~ ..... , ... ······1
: .- .... . .... .. ,
32
~.'" .
. .......
\l ....... . -,,\J ....................................... .
1297 1386 1411 1422 1509 1527 1568 1629 1637 1719 1726 1751
One axis order 3 (D3)
![Page 46: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/46.jpg)
.... . ~ .. ~ ... ~. ~ .........
.. ~~,.,
33
.' ~ .
.....
..-....
1297 1386 1411 1422 1509 1527 1568 1629 1639 1696 1718 1751
One axis order 3 (D3)
![Page 47: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/47.jpg)
34
....... *
........................
......
,,' .",," ... ~ ..... -"
1297 1389 1411 1417 1464 1518 1521 1573 1628 1640 1697 1716
One axis order 4 (Z)
![Page 48: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/48.jpg)
35
......
. ...
.......
. ......
1297 1389 1411 1417 1466 1497 1549 1570 1628 1640 1697 1716
One axis order 4 (Z)
![Page 49: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/49.jpg)
36
." ~.
J ............. .
.......
1309 1376 1390 1398 1490 1498 1517 1574 1626 1637 1719 1726
One axis order 2 (Y)
![Page 50: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/50.jpg)
37
......
....... ' .. ~
:: ."
......
. .. 1 ... ············;
.............
~ ........ .. .... "' ......
\l ..................... . . \J. ........................ .
1309 1376 1390 1398 1490 1498 1517 1574 1626 1639 1696 1718
One axis order 3 (D4)
![Page 51: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/51.jpg)
38
....
. .... J ............. .
. ' ':
.....
~ ............................................ .
1309 1376 1390 1398 1490 1498 1519 1544 1623 1637 1719 1726
One axis order 3 (D2)
![Page 52: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/52.jpg)
, ........ . ··· .. ·1
: ..
.... ~ ~.~ ..... ~"-
···r····· .... _ .•.• _ .•. -.1
.I. ..... . ................. ...... .
39
........
.... ~ ......
.... . " ....... ~-"
. ....... .
L,
....... .1. ............. ,:
\l ...... .. \,L .• •····· ... ··
1309 1376 1390 1401 1467 1489 1517 1574 1626 1639 1696 1718
Four axes order 3 (D1 D2 D3 D41 and three axes order 2 (X Y Z)
![Page 53: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/53.jpg)
40
.. '
.............. J ................ ,........ .... _--I
. ..1 .............. ..-
.. ,
....................
1311 1373 1391 1398 1490 1498 1519 1544 1623 1637 1719 1726
Four axes order 3 (D1 D2 D3 D4) and three axes order 2 IX y Z)
![Page 54: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/54.jpg)
41
.,~ ...... .....
. . "~.
\l ........ \"t ..... ········· .... · ................ ··
. .... .. ..... ~ ..
1755 1857 1865 1907 1934 1963 2006 2087 2093 2156 2177 2204
Three axes order 2 (X Y Z)
![Page 55: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/55.jpg)
42
. ~-.'
....
.~ .. \
1757 1835 1865 1896 1915 1991 2056 2087 2111 2148 2163 2218
Oneaxisorder.2 (Yl
![Page 56: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/56.jpg)
43
... ~ .
. .. ,,-~.' .
. ,,~ .... -
"' ..... .. -
" .......
1758 1836 1850 1882 1964 1991 2035 2061 2075 2095 2148 2163
One axis order 4 (2)
![Page 57: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/57.jpg)
44
.""
.... .----+--..:<-....1----------.4: ........... .
~: .......
..,
.. ' ~.
2235 2336 2366 2421 2467 2483 2536 2540 2584 2633 2680 2688
One axis order 2 (Xl
![Page 58: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/58.jpg)
\
..•.. ~ .. ~:-~ .....
45
2235 2336 2366 2421 2469 2481 2523 2548 2606 2650 2678 2683
Three axes order 2 (X Y Z)
![Page 59: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/59.jpg)
46
..... :
...... , ...
: ..
~ .......
'\""\ ~----~--~------------~----~I··· ~.~ .........
.. : ........
' ....
. ....
......
2235 2340 2350 2421 2459 2467 2536 2540 2584 2633 2680 2687
One axis order 2 (Xl
![Page 60: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/60.jpg)
47
... '
......
. " ...... ~
.. ~. "
.~ ..
. :: .....
..' ---
....... ,
2235 2340 2350 2421 2462 2468 2488 2577 2616 2635 2646 2665
One axis order 2 (X)
![Page 61: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/61.jpg)
48
•• *.-~:
.. -"
.......
.. ,
2235 2341 2350 2404 2474 2504 2525 2559 2577 2635 2646 2665
One axis order 3 (D1)
![Page 62: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/62.jpg)
49
... ~
.....
. ....
\ ............................... .
2235 2346 2349 2383 2417 2421 2468 2523 2592 2599 2646 2650
One axis order 4 (Z)
![Page 63: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/63.jpg)
50
: 0--
........ :.
./. ............ .. .. '
':;---
:\1 .............. ..1. ........ .... \,L .. ············
"'\ ......... ···············l\ \:...................... L
. . . .
\ \ · . · . · . · . · .
'\ ~\\
2235 2346 2353 2363 2371 2431 2482 2526 2535 2545 2646 2650
One axis order 4 (Z)
![Page 64: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/64.jpg)
51
\
......... ,.
\ .I. ............. .:
.. '
'\" ................................. ···············h .
....
2241 2308 2326 2356 2415 2433 2496 2518 2535 2552 2596 2644
One axis order 2 (Y)
![Page 65: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/65.jpg)
52
.. J .............. ;
..... ~ ...
"\.. ....... -.............. .--····h,
2242 2308 2326 2353 2411 2433 2480 2496 2535 2552 2593 2640
Three axes order 2 (X Y Z)
![Page 66: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/66.jpg)
53
.. '
.. ~ .. ~ ..
\l I I ........ .: \,,'1... .................................. .
2262 2291 2303 2326 2377 2433 2445 2456 2496 2552 2569 2612
Four axes order 3 (D1 D2 D3 D4) and three axes order 2 (X Y Z)
![Page 67: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/67.jpg)
54
: .-
..................
............ ]
::;--
J ............................ . ....
I I .... : . . ' .......................... .
2689 2816 2844 2898 2919 2942 3034 3068 3092 3138 3151 3158
One cax i s order 2 - {Y:)
![Page 68: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/68.jpg)
55
...... ~
....
........ ~" ....
.~ .... ,~ ... ...
~." . .. ~ ...
2689 2816 2846 2880 2944 2952 2959 3037 3054 3089 3141 3168
One axis order 2 {Xl
![Page 69: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/69.jpg)
56
.. [ ............................................\\.\.
. ... ~.
I-----:-r~ . ... -
\".... .. ·············1 ..... "". . .
'\ ...................
....
2689 2817 2843 2908 2951 2956 3007 3055 3094 3122 3155 3166
One. axis., order 2. (Z)
![Page 70: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/70.jpg)
57
.... ~. ".
2689 2817 2844 2894 2929 2973 3034 3069 3092 3134 3155 3166
One axis order 2 (Yl
![Page 71: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/71.jpg)
.... ~ ...
...
_. ~ . ...
58
........ ..-
'\.J .·····1·······························\\ .. ' .. '.-.- :" . . . .
\\ \ ..... " ;
2689 2817 2844 2894 2929 2973 3038 3042 3094 3122 3155 3166
One axi s_ order 2 {Z.l
![Page 72: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/72.jpg)
59
....
\\'J. .......................................... \.,'\.
2689 2817 2847 2880 2929 2973 3034 3069 3094 3122 3155 3166
Three axes order 2 {X Y Z}
![Page 73: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/73.jpg)
60
! ."
\, j 1··········\ \, ................ ............ \\ . . . . :~ :~ . . '\. \.,
". : . ;
.L.· .. ······· .. ·~
2689 2817 2847 2880 2929 2973 3038 3042 3092 3134 3155 3166
One. axis order2AXh
![Page 74: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/74.jpg)
61
f ........................................... .\.\.
.' ."~
: ."
: .....
2689 2817 2847 2887 2891 2940 2995 3069 3094 3122 3155 3166
One axis order 2 (Z)
![Page 75: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/75.jpg)
62
.. -.--
.....
.......... \\
. .....
2689 2817 2847 2888 2903 2911 2928 3069 3094 3122 3155 3166
One axis order 2 (Z)
![Page 76: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/76.jpg)
63
............... ,1" ..... . ·······l
.....
...................... ..... . ..... \\ ~ ____________ -L __ ~
. .
2689 2817 2850 2871 2900 2973 3034 3069 3097 3113 3140 3166
One axis order 2 IY}
![Page 77: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/77.jpg)
64
.. '
.. ~.
2689 2817 2854 2862 2926 2979 2998 3026 3094 3122 3155 3166
One axis order 2 .. ·(Zl
![Page 78: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/78.jpg)
65
r .' ".""." .. ""." "." ,," " .. " ",."" \\.,.
. ......... .. ~~."
.. ~ .. ..'
~." .. ~ .
r-----~------~----~----------~--~
2689 2820 2825 2880 2929 2973 3034 3072 3077 3122 3155 3166
Three axes order 2 (X Y Z)
![Page 79: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/79.jpg)
..... ~., ..
.....
66
.. ~~":
······1 ~.......... L. ----_---i..
.. ' .....
. ...
. ~~.~ . . . '
2689 2820 2825 2880 2929 2974 3020 3055 3091 3147 3150 3166
One axis order 2 (Xl
![Page 80: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/80.jpg)
67
.,."
....................... \
\ . .. ".~ ....
............ -.....
•• !.>'
.1. ........................... .
.. ~~
2689 2820 2825 2880 2929 2976 3014 3017 3062 3110 3160 3166
One axis order 2 (Xl
![Page 81: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/81.jpg)
68
.. '
......
.",,~. ~ .~ .....
..............................
.. '
........ .... .....
..................
. ....
.........
·:1 .•• •·•
2689 2820 2825 2880 2929 2976 3015 3029 3037 3054 3160 3166
OneJ.axis order 2 .. {X.i.
![Page 82: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/82.jpg)
..... ··· .. ······r· ············l
.. ~.' . .. '
...... . ~ .~ .... -.
~ ...... ~ ."
.. , .........
~.. I .... \\ ........................................ .
....
2689 2820 2825 2880 2929 2982 2989 3052 3097 3113 3140 3166
One axis order 2 (X)
![Page 83: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/83.jpg)
70
.. '
: .....
..'
* .....
: .....
2689 2820 2825 2887 2891 2940 2995 3072 3077 3122 3155 3166
One .-aX! s order 2 (Z)
![Page 84: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/84.jpg)
71
•................................................ [\\, . -
~~ ......
.. ~ ..... .....
.~ .~ .. ' .. -
. .......
2689 2820 2830 2840 2904 2911 2928 2983 3077 3122 3155 3166
One axis order 2 (Z)
![Page 85: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/85.jpg)
72
................................................... [\\,
.., \'\
: ..... ~ ....... ~.'
'\l ........................ \-=.
\=J................ ....... \:. . . . . ~ ~ . . \ \ . . . .
2689 2820 2831 2835 2898 2935 2978 2999 3077 3122 3155 3166
One. axis.. order 2. (Z.)
![Page 86: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/86.jpg)
73
.~ ~~ ........... '
.. '
~.' ." ....
l ......... ······· ............... .
2690 2800 2843 2910 2928 2937 2954 2968 3083 3097 3143 3152
One axis order 3 (03)
![Page 87: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/87.jpg)
14
.. '
....
. ..... "~
2690 2800 2853 2864 2944 2952 2959 3031 3054 3089 3141 3168
One axis. order 2.:(}{J
![Page 88: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/88.jpg)
. ~ ... ' .....
15
\. I I .. ". \\ ............... ........................... \\. · . · . · . · . · . · . · . · . · . · .
~ ~ · . · . · . · . · . · . · .
~. -'
2691 2814 2817 2844 2894 2929 2973 3038 3042 3094 3129 3131
One axis order 2 (Z)
![Page 89: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/89.jpg)
76
.....
. ~.~ .. :- ..... .
2691 2814 2817 2847 2887 2891 2940 2995 3069 3094 3129 3131
_,Three axes. order 2 .(X Y Z)
![Page 90: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/90.jpg)
77
: 0-... ~. ----..,..--______ -40-_---'
............
2691 2814 2817 2854 2862 2926 2979 2998 3026 3094 3129 3131
One axis order 2 (Z)
![Page 91: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/91.jpg)
78
································l\,: ····1 : e"··~··"···· :"
. .
\'\. \\
.. '
. "' .~ .,~"
..... ....
......
I I ...... . ................ .......... .
2698 2759 2810 2831 2835 2906 2935 2973 3037 3083 3087 3166
On.e axis oreer 2·(Yl
![Page 92: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/92.jpg)
···r··············· ~.'.' .
.,..::. •.• _ •• _---1_
79
..... ~ .... ,....:."-----'
2698 2768 2794 2812 2839 2855 2961 2971 3019 3054 3063 3143
One axis order 2 (Z)
![Page 93: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/93.jpg)
80
. -~"
.. -•• 0 ~,,~
·:--+-----'---...,---~ ... ",
....
: .....
..... . ....... \\. 1:
2698 2770 2787 2812 2855 2889 2961 2971 3030 3037 3054 3101
Three aMes ordex.2.AX Y Z)
![Page 94: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/94.jpg)
81
.=--t---.l.....---~---::-it; .'-
.......
. ...... ~ . ....
. ~. ~~., . .. ,
\\" ............................. ···············h
2698 2770 2787 2812 2855 2889 2962 2966 3024 3059 3096 3114
One axis order 2 (X)
![Page 95: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/95.jpg)
82
2698 2770 2791 2810 2838 2906 2929 2973 3037 3054 3155 3166
Four,.,axes order 3 (D1 D2 D3 D4) and three axes order 2 (X Y Z)
![Page 96: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/96.jpg)
... " ...
.... ··········r· ....
~"." .
.. ' ~ .. ~. ~::: .~*'~ ..
83
.r=-----' ............................. ~
I ........ .i . ~ a.···
I---------,,~ .. .... .........
. ...... .
2700 2768 2794 2802 2839 2905 2947 3013 3019 3063 3090 3143
Three axes order 2 (X Y Z)
![Page 97: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/97.jpg)
84
..... ~ .. -' .
3169 3227 3287 3346 3364 3368 3429 3451 3493 3550 3564 3568
One axis order 2 (YJ
![Page 98: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/98.jpg)
85
.~ .... ... ~~ .. " .......
3169 3227 3287 3347 3352 3364 3429 3451 3493 3551 3555 3564
One axis order 2 IY)
![Page 99: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/99.jpg)
86
: ~ ..
.. ~.
3169 3227 3287 3348 3356 3361 3428 3436 3462 3512 3553 3562
One axis order 2 (Zl
![Page 100: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/100.jpg)
87
................................. ==]\\,
....
... ,.~' .
3169 3227 3289 3335 3354 3401 3403 3447 3462 3512 3553 3562
One axis order 2 (Z)
![Page 101: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/101.jpg)
88
........
.. ~-
3169 3227 3291 3328 3352 3363 3415 3453 3466 3508 3562 3570
One axis order 3 (D3)
![Page 102: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/102.jpg)
... .-.. ~ .....
. .................... .
3169 3227 3296 3307 3344 3394 3413 3455 3462 3512 3563 3570
One axis order 2 (2)
![Page 103: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/103.jpg)
90
.. ~ .. .. ,
3169 3227 3297 3307 3344 3394 3413 3457 3462 3512 3553 3562
One axis order 2 {Z}
![Page 104: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/104.jpg)
91
3169 3228 3291 3308 3349 3360 3429 3452 3497 3512 3553 3562
Three axes order 2 (X Y Z)
![Page 105: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/105.jpg)
92
.......
.. ......
3169 3228 3291 3308 3349 3360 3430 3454 3466 3508 3553 3562
One axis order 2 (X)
![Page 106: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/106.jpg)
93
:- ...... .
.................... " .. ~ .. ,,~ ... , .
.....
.-~ . . ' ..... ~.".'
..........................
3169 3228 3291 3308 3349 3360 3431 3448 3498 3506 3553 3562
One axis order 2 (X)
![Page 107: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/107.jpg)
94
.~ ... " .... ~.' ~ ...
. ~ ,"
3169 3228 3291 3308 3349 3360 3433 3448 3482 3498 3553 3562
One axis order 2 (Xl
![Page 108: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/108.jpg)
95
..... ~ ............................ ..-- ......... \\
......
.' -~ .......
3169 3228 3291 3308 3349 3361 3426 3435 3488 3507 3552 3562
One axis order 2 IXI
![Page 109: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/109.jpg)
......
..... ~ ... ~ .
"···L ...................•... / .............. \\ ..
.... .... "
.....
.. .. "' ... ~ .. ........
3169 3228 3291 3308 3349 3361 3427 3437 3455 3505 3552 3562
One axis order 2 (X)
![Page 110: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/110.jpg)
:; .................... . ........... ~ .. ~
......
97
3169 3228 3291 3308 3351 3358 3397 3430 3486 3508 3526 3568
One axis order 2 {Xl
![Page 111: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/111.jpg)
........... ,. .... I
\
.I
....... . . ' ........................ .
3169 3228 3292 3302 3349 3360 3429 3452 3498 3506 3553 3562
One axis order 2 (Y)
![Page 112: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/112.jpg)
99
... ".- "~.~ ......... " .. .
. ~~.,
... " ... ~.
3169 3228 3292 3302 3349 3360 3431 3448 3497 3512 3553 3562
One axis order 2 (Z)
![Page 113: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/113.jpg)
100
3169 3228 3294 3301 3341 3389 3418 3437 3497 3512 3553 3562
One axis order 2 (2)
![Page 114: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/114.jpg)
101
~.-.....
. ~ .'
....................
. ...
3169 3228 3294 3301 3342 3371 3418 3437 3497 3512 3553 3562
One axis order 2 (Zl
![Page 115: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/115.jpg)
.-..
..~ ..
3169 3228 3296 3301 3343 3359 3427 3429 3452 3505 3547 3561
One axis order 2 (Yl
![Page 116: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/116.jpg)
3169 3228 3296 3301 3343 3361 3415 3424 3454 3508 3553 3563
One axis order 3 (D4)
![Page 117: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/117.jpg)
1~
······· .... ·l\ .. ' L
3169 3228 3296 3301 3343 3361 3415 3424 3455 3505 3552 3563
One axis order 3 (D4)
![Page 118: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/118.jpg)
105
.' .~
.....
.. '
.~.. . ..... \\ .................................... .
3169 3228 3296 3302 3332 3349 3427 3429 3452 3506 3536 3553
One axis order 2 (Y)
![Page 119: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/119.jpg)
106
: ."
: ~.
_ .... \
.1.. ............ .:
3169 3229 3275 3296 3348 3360 3430 3457 3466 3505 3547 3561
One axis order 3 (D2)
![Page 120: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/120.jpg)
107
."'~~
~ . \'!. ......... .
3169 3229 3275 3296 3348 3361 3427 3437 3457 3505 3547 3561
One axis order 3 (D2)
![Page 121: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/121.jpg)
108
·········· .... ·r ................................. ~\\,'
.. '
." ~ .... ...... --
.....
3169 3229 3275 3297 3348 3361 3424 3439 3457 3512 3553 3562
One axis order 2 (Z)
![Page 122: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/122.jpg)
109
~ .....
... ~ . ...
. ......
. ....... . ......
: .... ~~. ~.
3169 3230 3275 3294 3341 3389 3418 3439 3466 3512 3553 3562
One axis order 2 (Z)
![Page 123: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/123.jpg)
. .. "'~' ~ .. ' .~
110
....
............................................... i,\~
. ~~.
3169 3230 3275 3294 3342 3371 3418 3439 3466 3512 3553 3562
One axis order 2 (Z)
![Page 124: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/124.jpg)
111
.... J .. ...................................... \\ .
.......
3169 3230 3275 3297 3343 3359 3424 3430 3454 3508 3553 3562
One axis order 3 {D4}
![Page 125: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/125.jpg)
112
-.~.
-~ ..
3169 3230 3275 3297 3343 3359 3424 3430 3455 3505 3552 3562
One axis order 3 (D4)
![Page 126: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/126.jpg)
0"· .. • "~'"
......
~ .... ~ ."
-
.~.. . ..... \\ .....................•.................
113
. ....
... _0·
3169 3231 3276 3289 3362 3377 3427 3433 3447 3512 3553 3562
One axis order 2 (Z)
![Page 127: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/127.jpg)
114
· ...•.................................... ]\\
... ~
3169 3231 3276 3291 3332 3375 3427 3433 3452 3512 3553 3562
One axis order 2 (Zl
![Page 128: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/128.jpg)
115
.....
..0.
3169 3235 3276 3289 3349 3360 3433 3447 3503 3512 3553 3562
One axis order 2 (Z)
![Page 129: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/129.jpg)
116
: ~ .. "'
3169 3236 3276 3290 3349 3360 3433 3446 3502 3512 3553 3562
One axis order 2 (Z)
![Page 130: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/130.jpg)
117
.. ' ~_ .... --,,'" ....
. .. 1.. ............ ...
....
..'
....... ~." ..
3169 3238 3271 3287 3353 3364 3368 3429 3477 3493 3564 3568
One axis order 2 (Y)
![Page 131: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/131.jpg)
118
3169 3239 3269 3292 3338 3354 3363 3416 3453 3466 3508 3562
One axis order 3 (D3)
![Page 132: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/132.jpg)
119
.. ~ .. : .'
.......
.~ ..
3169 3239 3271 3287 3349 3360 3434 3436 3512 3523 3558 3576
One axis order 2 (Zl
![Page 133: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/133.jpg)
120
.. '
.....
:_0·'
3169 3239 3272 3287 3348 3361 3421 3436 3512 3523 3558 3576
One axis order 2 (2)
![Page 134: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/134.jpg)
121
.. '
... ".-
3169 3239 3275 3281 3296 3348 3361 3426 3439 3455 3512 3523
One axis order 2 (Z)
![Page 135: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/135.jpg)
122
................................... :1
.~ ...
3169 3240 3274 3296 3304 3359 3378 3427 3429 3480 3508 3561
One axis order 2 (Yl
![Page 136: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/136.jpg)
123
......... \
.. ~ ....
. ....
3169 3241 3274 3285 3335 3382 3395 3429 3480 3491 3539 3572
One axis order 2 {Yl
![Page 137: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/137.jpg)
124
"--0
'.
: .....
.I. ...................... .
0" •••••••
......
3169 3241 3274 3285 3337 3364 3382 3429 3480 3491 3541 3564
One axis order 2 (Y)
![Page 138: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/138.jpg)
125
.. '
~ .... ..' ~
.' .~
3169 3241 3274 3296 3304 3357 3382 3427 3429 3480 3508 3559
One axis order 2 (Yl
![Page 139: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/139.jpg)
1'26
....
.....
.." .~
3169 3242 3272 3287 3347 3364 3386 3429 3478 3493 3551 3564
One axis order 2 (Yl
![Page 140: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/140.jpg)
127
: .-
3169 3243 3272 3287 3347 3364 3385 3429 3478 3493 3551 3564
One axis order 2 (Y)
![Page 141: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/141.jpg)
128
\. : 0- '.
....
: ...
. ...
3169 3244 3271 3287 3349 3360 3434 3436 3512 3530 3553 3562
One axis order 2 (Z)
![Page 142: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/142.jpg)
129
· .... ~
,.'
3169 3244 3272 3287 3348 3361 3421 3436 3512 3530 3553 3562
One axis order 2 (Z)
![Page 143: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/143.jpg)
130
.. ,
~ ............................................ .
3170 3230 3254 3312 3325 3345 3403 3447 3463 3514 3525 3553
One axis order 3 (D2)
![Page 144: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/144.jpg)
131
.... . -.'
-" .. , .. '
3170 3230 3256 3304 3349 3360 3430 3454 3466 3508 3553 3562
Four axes order 3 (Dl D2 D3 D4l and three axes order 2 (X Y Z)
![Page 145: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/145.jpg)
132
.' .
"
·· .. ·t ... // ............................. \\ ..
. " \: :.
: .-
\ .... ,
... -
J ............. .
3170 3230 3256 3304 3349 3360 3430 3455 3466 3505 3552 3562
One axis order 3 (D4)
![Page 146: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/146.jpg)
.. ~' . ..... ~ .. ~ ... " ... ~ ... ~ .....
..... '
':, .... 0" ..... ~ ••
...... .......... "',.~ ...
133
..... \ .
...... ~ ~ ,_ ..
. . '~
.... '
. .....
.....
.J ......... . .......
J.
3170 3230 3256 3304 3349 3360 3431 3448 3498 3506 3553 3562
One axis order 2 (X)
![Page 147: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/147.jpg)
134
.....
. .....
.....
3170 3230 3256 3304 3349 3360 3433 3448 3482 3498 3553 3562
One axis order 2 (Xl
![Page 148: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/148.jpg)
135
= .....
3170 3230 3256 3304 3349 3361 3426 3435 3488 3507 3552 3562
One axis order 2 (X}
![Page 149: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/149.jpg)
136
......... ,. '\. .... (
~
·············b·· .. / ............................ , \\ .
....
3170 3230 3256 3304 3349 3361 3427 3437 3455 3505 3552 3562
One axis order 2 (Xl
![Page 150: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/150.jpg)
137
....
..........
3170 3230 3258 3303 3342 3360 3418 3430 3466 3506 3536 3553
One axis order 3 (D2)
![Page 151: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/151.jpg)
138
.... .. 0«« ...
3170 3230 3258 3303 3342 3361 3418 3427 3437 3506 3536 3553
One axis order 3 (D2)
![Page 152: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/152.jpg)
, .. -..... ,.. ~* ... ' .....
139
.. , .. '
."."" .~
3170 3230 3259 3303 3341 3364 3406 3418 3462 3482 3536 3553
One axis order 3 (D21
![Page 153: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/153.jpg)
140
..... :
'1'-- ............ :.
\\ ................................... .
3170 3230 3259 3305 3325 3341 3403 3448 3463 3482 3523 3553
One axis order 3 (D2)
![Page 154: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/154.jpg)
141
. ~,' . . " ': · ......... ~ .
...... \, ..... ' .... ~.
"' ....
'\1 ............................. . \'1. ............ ..
3170 3231 3256 3301 3348 3361 3427 3437 3455 3505 3552 3562
One axis order 3 (Dl)
![Page 155: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/155.jpg)
142
..----:-:-1: ...
..... '!-".~-----j
3170 3231 3258 3301 3319 3348 3426 3430 3455 3505 3523 3552
One axis order 2 {Yl
![Page 156: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/156.jpg)
143
...
~ .... .......
: ......
.... " ~ .. " .. ~ ......... \.,\".,
3170 3231 3259 3301 3319 3348 3425 3430 3455 3505 3523 3552
One axis order 2 (Yl
![Page 157: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/157.jpg)
144
3170 3234 3258 3301 3319 3342 3418 3426 3430 3505 3523 3546
One axis order 2 (Y)
![Page 158: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/158.jpg)
145
~.-.-.... , ........... . . . "~
... ~.~ .. ~ ....... -.. ........... ,..
..'
3170 3234 3259 3301 3319 3342 3418 3425 3430 3505 3523 3546
One axis order 2 (Y)
![Page 159: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/159.jpg)
146
:1 ....
, ...... / ..... ·r· .. ··· .. ·/·· .. · .. ····· \""'"
.---'-----:-oi'\\ ... // ............... ·············L
: ~.
1---:-1': .... '
'0'-"
~ J ...... '\1. .. /./ ...... . :~
--\
J ................... .
. - ......... .
......
3170 3239 3256 3281 3305 3348 3371 3437 3455 3498 3506 3562
One axis order 3 (D1)
![Page 160: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/160.jpg)
147
.....
: ..
. ............. .
3170 3239 3258 3281 3303 3348 3361 3426 3435 3488 3508 3523
One axis order 2 (Z)
![Page 161: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/161.jpg)
..... ..... ":
:\1 ............. \ .. . \'{.............. ................... \,\."".
. ."~
3170 3239 3258 3281 3304 3319 3375 3427 3431 3455 3506 3536
One axis order 2 (X)
![Page 162: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/162.jpg)
149
'\1 ............. \ .. . \{.............. ................... \\
3170 3239 3258 3281 3304 3319 3375 3427 3433 3455 3482 3536
One axis order 2 (Xl
![Page 163: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/163.jpg)
.... · ~." =,., •••..
150
.:---r---..L..-----..,;: ."
~.- .... ...... ••••••. 1-'-•• :.:..-____ --, ___ L......:.
3170 3239 3258 3281 3304 3319 3376 342& 3430 3488 3508 3523 )
Three axes order 2 (X Y Z)
![Page 164: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/164.jpg)
151
........ . ~~ .. " .. ,
..... ~
3170 3239 3258 3282 3304 3319 3376 3426 3430 3487 3508 3523
One axis order 2 (YJ
![Page 165: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/165.jpg)
152
3170 3239 3259 3282 3303 3348 3361 3425 3435 3487 3508 3523
One axis order 2 (Z)
![Page 166: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/166.jpg)
153
.... ~ .
. ...
3170 3239 3259 3282 3304 3319 3376 3425 3430 3487 3508 3523
Three axes order 2 IX Y Z)
![Page 167: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/167.jpg)
154
~:
~.' ..
~ ......
....
:- ....
3170 3241 3254;-~278 3321 3328 3382 3423_l~4-30 3484 3525 3532
One axis order 4 (Y)
![Page 168: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/168.jpg)
155
.. " .. -~~ ......
. ~ ...... .
~ ... ' ."
~: ... " .. -
3170 3241 3256 3278 3307 3348 3394 3437 3455 3495 3515 3562
One axis order 3 (Dl)
![Page 169: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/169.jpg)
156
············ .. l\ .................................. L =. ~:
31'3 3222 3296 3301 3342 336~~416 3426 3455 3505 3523·~552
One axis order 3 (D4)
![Page 170: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/170.jpg)
.. " .. ~ ... ~ .. ~~. ,,'
157
.'~ ~~
.--_....,.,...;..a ... ·~·
3173 3226 3231 3296 3301 3348 3361 3427 3437 3455 3506 3536
One axis order 2 (Z)
![Page 171: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/171.jpg)
l .... \L.········
158
··········h .. . [
3173 3226 3231 329ft '3302 3332 3375 3427 3431"3455 3506 3536
Three axes order 2 (X Y Z)
![Page 172: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/172.jpg)
159
........... \\ ·····L
~ ..... ~ ....
..-",
.... . . ~ ..
3173 3226 3231 3296 3302 3332 3375 3427 3433 3455 3482 3536
One axis order 2 (X)
![Page 173: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/173.jpg)
160
~ ...
3175 3226 3231 3276 3296 3332 3375. 3,427 3433 3455 3482 3536''>
Three axes order 2 IX Y Z)
![Page 174: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/174.jpg)
161
.. ' .. -. ~ ..
. .....
I ........ J ."," .' ~ ...
3176 3221 3290 3311 3353 3361 3412 3423 3480 3516 3529 3552
One axis order 4 {Xl
![Page 175: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/175.jpg)
152
.. 1 .. ··········· ...
.. ' : ~ ..
3176 3221 3290 33fl 3353 3361 3413 3422 3484 3511 3529 3552
One axis order 4 (Xl
![Page 176: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/176.jpg)
163
.. -
3176 3221 3296 3301 3344 3361 3413 3422 3455 3505 3524 3552
One axis order 3 ID4)
![Page 177: Tiling the surface of a cube by 12 identical pentominoes · For the computer a pentomino placed on the cube is an integer array of dimension five, the elements of which are the five](https://reader033.fdocuments.net/reader033/viewer/2022041422/5e1f970349ba8f65f24e71a3/html5/thumbnails/177.jpg)
164
................ 1".
:; .......... . "'r
3185 3225 3238 3249 3325 3335 j353 3403 3450 3463 3529 3539
Four axes order 3 (D1 D2 D3 D4) and three axes order 2 (X Y Z)