Category : Printer + Display Graphics
Archive   : 4DLAB.ZIP
Filename : SHAPEDEF.EGA

;Shapedef.mat shape definition file
;Copyright (c) 1986 George D. Girton
;All Rights Reserved.
flags= "nl"
name= "4d regular hypercube"
vertices=(16)
vx=0 (10, -10, -10, -10)
eg=0 (1 3 4 8)
cl=0 (4 4 4 1)
vx=1 (-10, -10, -10, -10)
eg=1 (2 5 9)
cl=1 (4 4 1)
vx=2 (-10, 10, -10, -10)
eg=2 (3 6 10)
cl=2 (4 4 1)
vx=3 (10, 10, -10, -10)
eg=3 (7 11)
cl=3 (4 1)
vx=4 (10, -10, 10, -10)
eg=4 (5 7 12)
cl=4 (4 4 1)
vx=5 (-10, -10, 10, -10)
eg=5 (6 13)
cl=5 (4 1)
vx=6 (-10, 10, 10, -10)
eg=6 (7 14)
cl=6 (4 1)
vx=7 (10, 10, 10, -10)
eg=7 (15)
cl=7 (1)
vx=8 (10, -10, -10, 10)
eg=8 (9 11 12)
cl=8 (6 6 6)
vx=9 (-10, -10, -10, 10)
eg=9 (10 13)
cl=9 (6 6)
vx=10 (-10, 10, -10, 10)
eg=10 (11 14)
cl=10 (6 6)
vx=11 (10, 10, -10, 10)
eg=11 (15)
cl=11 (6)
vx=12 (10, -10, 10, 10)
eg=12 (13 15)
cl=12 (6 6)
vx=13 (-10, -10, 10, 10)
vx=14 (-10, 10, 10, 10)
eg=14 (15 13)
cl=14 (6 6)
vx=15 (10, 10, 10, 10)
ends=

flags= "nl" ;copyright 1986 George D. Girton All rights reserved.
name= "Rays to points of a hypercube"
vertices=(16)
vx=0 (10, -10, -10, -10)
eg=0 (1,2,3,4,5,6,7,8,9,10,11,12,13,14,15)
cl=0 (1 4 6 1 4 6 1 4 6 1 4 6 1 4 11)
vx=1 (-10, -10, -10, -10)
vx=2 (-10, 10, -10, -10)
vx=3 (10, 10, -10, -10)
vx=4 (10, -10, 10, -10)
vx=5 (-10, -10, 10, -10)
vx=6 (-10, 10, 10, -10)
vx=7 (10, 10, 10, -10)
vx=8 (10, -10, -10, 10)
vx=9 (-10, -10, -10, 10)
vx=10 (-10, 10, -10, 10)
vx=11 (10, 10, -10, 10)
vx=12 (10, -10, 10, 10)
vx=13 (-10, -10, 10, 10)
vx=14 (-10, 10, 10, 10)
vx=15 (10, 10, 10, 10)
ends=

flags= "nl"
name= "4d regular 8-cell"
vertices=(16)
vx=0 (16 0 0 0) ;F
eg=0 (8,13,14,11)
vx=1 (0 16 0 0) ;G
eg=1 (12,9,14,11)
vx=2 (0 0 16 0) ;H
eg=2 (12, 13 10 11)
vx=3 (0 0 0 16) ;K
eg=3 (8,9,10,11)
vx=4 (-16 0 0 0) ;F'
eg=4 (12,9,10,15)
vx=5 (0 -16 0 0) ;G'
eg=5 (8,13,10 15)
vx=6 (0 0 -16 0) ;H'
eg=6 (8,9,14 15)
vx=7 (0 0 0 -16) ;K'
eg=7 (12,13,14,15)
vx=8 (8,-8,-8,8) ;P
vx=9 (-8,8,-8,8) ;Q
vx=10 (-8,-8,8,8) ;R
vx=11 (8,8,8,8) ;S
vx=12 (-8,8,8,-8) ;P'
vx=13 (8,-8,8,-8) ;Q'
vx=14 (8,8,-8,-8) ;R'
vx=15 (-8,-8,-8,-8) ;S'
ends=

flags= "n"
name= "4d regular simplex"
vertices=(5)
vx=0 (-20, 20, 20, -9)
eg=0 (1 2 3 4)
cl=0 (3 3 3 4)
vx=1 ( 0, 0, 0, 18)
eg=1 (2 3 4)
vx=2 (20, -20, 20, -9)
eg=2 (3 4)
vx=3 (20, 20, -20, -9)
eg=3 (4)
vx=4 (-20, -20, -20, -9)
ends=

flags= "n"
name= "4d regular 16-cell diamond"
vertices=(8)
vx=0 (15 0 0 0)
eg=0 (1,2,3,5,6,7)
cl=0 (1 1 1 1 1 1)
vx=1 (0 15 0 0)
eg=1 (0,2,3,4,6,7)
cl=1 (9 9 9 9 9 9)
vx=2 (0 0 15 0)
eg=2 (0,1,3,4,5,7)
cl=2 (3 3 3 3 3 3)
vx=3 (0 0 0 15)
eg=3 (0,1,2,4,5,6)
vx=4 (-15 0 0 0)
eg=4 (5,6,7)
vx=5 (0 -15 0 0)
eg=5 (4,6,7)
vx=6 (0 0 -15 0)
eg=6 (4,5,7)
vx=7 (0 0 0 -15)
eg=7 (4,5,6)
ends=
flags= "rn"
name= "part of 4d 16-cell diamond"
vertices=(8 )
vx=0 (15 0 0 0)
eg=0 (1,2,3)
cl=0 (4,4,4)
vx=1 (0 15 0 0)
eg=1 (0,2,3 )
cl=1 (4,4,4)
vx=2 (0 0 15 0)
eg=2 (0,1,3)
cl=2 (4,4,4)
vx=3 (0 0 0 15)
eg=3 (0,1,2)
cl=3 (4,4,4)
vx=4 (-15 0 0 0)
eg=4 (5,6,7)
vx=5 (0 -15 0 0)
eg=5 (4,6,7)
vx=6 (0 0 -15 0)
eg=6 (4,5,7)
vx=7 (0 0 0 -15)
eg=7 (4,5,6)
ends=

flags= "nrl"
name= "8-cell missing 8 origin lines"
vertices=(16)
vx=0 (16 0 0 0) ;F
eg=0 (8,13,14,11)
vx=1 (0 16 0 0) ;G
eg=1 (12,9,14,11)
vx=2 (0 0 16 0) ;H
eg=2 (12, 13 10 11)
vx=3 (0 0 0 16) ;K
vx=4 (-16 0 0 0) ;F'
eg=4 (12,9,10,15)
vx=5 (0 -16 0 0) ;G'
eg=5 (8,13,10 15)
vx=6 (0 0 -16 0) ;H'
eg=6 (8,9,14 15)
vx=7 (0 0 0 -16) ;K'
vx=8 (8,-8,-8,8) ;P
vx=9 (-8,8,-8,8) ;Q
vx=10 (-8,-8,8,8) ;R
vx=11 (8,8,8,8) ;S
vx=12 (-8,8,8,-8) ;P'
vx=13 (8,-8,8,-8) ;Q'
vx=14 (8,8,-8,-8) ;R'
vx=15 (-8,-8,-8,-8) ;S'
ends=

flags= "rn"
name= "single line from origin"
vertices=(2 )
vx=0 (0 0 0 0)
eg=0 (1)
vx=1 (20 0 0 0)
ends=

flags= "n"
name= "two lines from origin"
vertices=(3 )
vx=0 (0 0 0 0)
eg=0 (1,2)
vx=1 (20 0 0 0)
vx=2 (0 20 0 0)
ends=

flags= "n"
name= "triangle"
vertices=(3 )
vx=0 (0 0 0 0)
eg=0 (1 2)
vx=1 (20 0 0 0)
eg=1 (2)
vx=2 (0 20 0 0)
ends=

flags= "n"
name= "cube in 3d"
vertices=(8)
vx=0 (-10 -10 10 0)
eg=0 (1,4,3)
vx=1 (-10 10 10 0)
eg=1 (5,2)
vx=2 (10 10 10 0)
eg=2 (3,6)
vx=3 (10 -10 10 0)
eg=3 (7)
vx=4 (-10 -10 -10 0)
eg=4 (5,7)
vx=5 (-10 10 -10 0)
eg=5 (6)
vx=6 (10 10 -10 0)
eg=6 (7)
vx=7 (10 -10 -10 0)
ends=

flags= "n"
name= "octahedron in 3d"
vertices=(6)
vx=0 (15 0 0 0)
eg=0 (1,2,4,5)
vx=1 (0 15 0 0)
eg=1 (2,3,5)
vx=2 (0 0 15 0)
eg=2 (3,4)
vx=3 (-15 0 0 0)
eg=3 (4,5)
vx=4 (0 -15 0 0)
eg=4 (5)
vx=5 (0 0 -15 0)
ends=

flags= "n"
name= "dodecahedron in 3d"
vertices=(20)
vx=0 (13 13 -13 0) ;C'
eg=0 (13 10)
cl=0 (3 4)
vx=1 (-13 13 13 0) ;A'
eg=1 (14 17)
cl=1 (4 4)
vx=2 (13 13 13 0) ;D
eg=2 (8,16,12)
cl=2 (4 3 3)
vx=3 (13 -13 13 0) ;B'
vx=4 (-13 -13 -13 0) ;D'
eg=4 (15 19)
cl=4 (9 9)
vx=5 (-13 13 -13 0) ;B
eg=5 (10, 17, 15)
cl=5 (4 4 4)
vx=6 (-13 -13 13 0) ;C
eg=6 (14 19)
cl=6 (9 9)
vx=7 (13 -13 -13 0) ;A
vx=8 (0 8 21 0) ;P
eg=8 (9 1)
cl=8 (4 4)
vx=9 (0 -8 21 0) ;L
eg=9 (3 6)
cl=9 (4 4)
vx=10 (0 8 -21 0) ;L'
vx=11 (0 -8 -21 0) ;P'
eg=11 (4 10 7)
cl=11 (4 4 4)
vx=12 (21 0 8 0) ;Q
eg=12 (3)
cl=12 (4)
vx=13 (21 0 -8 0) ;M
eg=13 (12 7)
cl=13 (3 4)
vx=14 (-21 0 8 0) ;M'
vx=15 (-21 0 -8 0) ;Q'
eg=15 (14)
cl=15 (9)
vx=16 (8 21 0 0) ;R
eg=16 (17 0)
cl=16 (4 3)
vx=17 (-8 21 0 0) ;N
vx=18 (8 -21 0 0) ;N'
eg=18 (3 7 19)
cl=18 (4 4 4)
vx=19 (-8 -21 0 0) ;R'
ends=

flags= "rn"
name= "icosahedron in 3d"
vertices=(12)
vx=0 (0 13 8 0)
eg=0 (2 4 5 8 9)
cl=0 (1 6 1 1 6)
vx=1 (0 -13 8 0)
eg=1 (3 4 5 10 11)
cl=1 (1 6 15 15 6)
vx=2 (0 13 -8 0)
eg=2 (6 7 8 9)
vx=3 (13 -8 0 0)
eg=3 (4 6 8 10)
vx=4 (8 0 13 0)
eg=4 (5 8)
vx=5 (-8 0 13 0)
eg=5 (9 11)
cl=5 (15 1)
vx=6 (8 0 -13 0)
eg=6 (7 8 10)
vx=7 (-8 0 -13 0)
eg=7 (9 10 11)
cl=7 (15 15 1)
vx=8 (13 8 0 0)
vx=9 (-13 8 0 0)
eg=9 (11)
cl=9 (6)
vx=10 (0 -13 -8 0)
eg=10 (11)
vx=11 (-13 -8 0 0)
ends=

;4D Graphics Laboratory
;copyright 1986 George D. Girton
;All rights reserved.
;A
flags= "n"
name="letter A"
vertices=(11)
vx=0 (0 -12 0 0)
eg=0 (1)
vx=1 (-7 9 0 0)

vx=2 (0 -12 0 0)
eg=2 (3)
vx=3 ( 7 9 0 0)

vx=4 (0 -9 0 0)
eg=4 (5)
vx=5 (6 9 0 0)

vx=6 (-5 3 0 0)
eg=6 (7)
vx=7 (4 3 0 0)

vx=8 (-9 9 0 0)
eg=8 (9)
vx=9 (-3 9 0 0)

vx=10 (3 9 0 0)
eg=10 (11)
vx=11 (9 9 0 0)

ends=

;B
flags= "n"
name="letter B"
vertices= (38)
vx=0 (-6 -12 0 0)
eg=0 (1)
vx=1 (-6 9 0 0)

vx=2 (-5 -12 0 0)
eg=2 (3)
vx=3 (-5 9 0 0)

vx=4 (-9 -12 0 0)
eg=4 (5)
vx=5 (3 -12 0 0)
eg=5 (6)
vx=6 (6 -11 0 0)
eg=6 (7)
vx=7 (7 -10 0 0)
eg=7 (8)
vx=8 (8 -8 0 0)
eg=8 (9)
vx=9 (8 -6 0 0)
eg=9 (10)
vx=10 (7 -4 0 0)
eg=10 (11)
vx=11 (6 -3 0 0)
eg=11 (12)
vx=12 (3 -2 0 0)

vx=13 (3 -12 0 0)
eg=13 (14)
vx=14 (5 -11 0 0)
eg=14 (15)
vx=15 (6 -10 0 0)
eg=15 (16)
vx=16 (7 -8 0 0)
eg=16 (17)
vx=17 (7 -6 0 0)
eg=17 (18)
vx=18 (6 -4 0 0)
eg=18 (19)
vx=19 (5 -3 0 0)
eg=19 (20)
vx=20 (3 -2 0 0)

vx=21 (-5 -2 0 0)
eg=21 (22)
vx=22 (3 -2 0 0)
eg=22 (23)
vx=23 (6 -1 0 0)
eg=23 (24)
vx=24 (7 0 0 0)
eg=24 (25)
vx=25 (8 2 0 0)
eg=25 (26)
vx=26 (8 5 0 0)
eg=26 (27)
vx=27 (7 7 0 0)
eg=27 (28)
vx=28 (6 8 0 0)
eg=28 (29)
vx=29 (3 9 0 0)
eg=29 (30)
vx=30 (-9 9 0 0)

vx=31 (3 -2 0 0)
eg=31 (32)
vx=32 (5 -1 0 0)
eg=32 (33)
vx=33 (6 0 0 0)
eg=33 (34)
vx=34 (7 2 0 0)
eg=34 (35)
vx=35 (7 5 0 0)
eg=35 (36)
vx=36 (6 7 0 0)
eg=36 (37)
vx=37 (5 8 0 0)
eg=37 (38)
vx=38 (3 9 0 0)
ends=

;C
flags= "n"
name="letter C"
vertices= (29)

vx=0( 6 -9 0 0)
eg=0 (1)
vx=1 (7 -6 0 0)
eg=1 (2)
vx=2 (7 -12 0 0)
eg=2 (3)
vx=3 (6 -9 0 0)
eg=3 (4)
vx=4 (4 -11 0 0)
eg=4 (5)
vx=5 (1 -12 0 0)
eg=5 (6)
vx=6 (-1 -12 0 0)
eg=6 (7)
vx=7 (-4 -11 0 0)
eg=7 (8)
vx=8 (-6 -9 0 0)
eg=8 (9)
vx=9 (-7 -7 0 0)
eg=9 (10)
vx=10 (-8 -4 0 0)
eg=10 (11)
vx=11 (-8 1 0 0)
eg=11 (12)
vx=12 (-7 4 0 0)
eg=12 (13)
vx=13 (-6 6 0 0)
eg=13 (14)
vx=14 (-4 8 0 0)
eg=14 (15)
vx=15 (-1 9 0 0)
eg=15 (16)
vx=16 (1 9 0 0)
eg=16 (17)
vx=17 (4 8 0 0)
eg=17 (18)
vx=18 (6 6 0 0)
eg=18 (19)
vx=19 (7 4 0 0)

vx=20 (-1 -12 0 0)
eg=20 (21)
vx=21 (-3 -11 0 0)
eg=21 (22)
vx=22 (-5 -9 0 0)
eg=22 (23)
vx=23 (-6 -7 0 0)
eg=23 (24)
vx=24 (-7 -4 0 0)
eg=24 (25)
vx=25 (-7 1 0 0)
eg=25 (26)
vx=26 (-6 4 0 0)
eg=26 (27)
vx=27 (-5 6 0 0)
eg=27 (28)
vx=28 (-3 8 0 0)
eg=28 (29)
vx=29 (-1 9 0 0)
ends=

;D
flags= "n"
name="letter D"
vertices= (25)
vx=0 (-6 -12 0 0)
eg=0 (1)
vx=1 (-6 9 0 0)

vx=2 (-5 -12 0 0)
eg=2 (3)
vx=3 (-5 9 0 0)

vx=4 (-9 -12 0 0)
eg=4 (5)
vx=5 (1 -12 0 0)
eg=5 (6)
vx=6 (4 -11 0 0)
eg=6 (7)
vx=7 (6 -9 0 0)
eg=7 (8)
vx=8 (7 -7 0 0)
eg=8 (9)
vx=9 (8 -4 0 0)
eg=9 (10)
vx=10 (8 1 0 0)
eg=10 (11)
vx=11 (7 4 0 0)
eg=11 (12)
vx=12 (6 6 0 0)
eg=12 (13)
vx=13 (4 8 0 0)
eg=13 (14)
vx=14 (1 9 0 0)
eg=14 (15)
vx=15 (-9 9 0 0)

vx=16 (1 -12 0 0)
eg=16 (17)
vx=17 (3 -11 0 0)
eg=17 (18)
vx=18 (5 -9 0 0)
eg=18 (19)
vx=19 (6 -7 0 0)
eg=19 (20)
vx=20 (7 -4 0 0)
eg=20 (21)
vx=21 (7 1 0 0)
eg=21 (22)
vx=22 (6 4 0 0)
eg=22 (23)
vx=23 (5 6 0 0)
eg=23 (24)
vx=24 (3 8 0 0)
eg=24 (25)
vx=25 (1 9 0 0)
ends=

flags= "nl"
name= "4d regular 24-cell (step 1)"
vertices=(16)
vx=0 (16 0 0 0) ;F
eg=0 (23,18,17,20,8,13,14,11)
vx=1 (0 16 0 0) ;G
vx=2 (0 0 16 0) ;H
vx=3 (0 0 0 16) ;K
eg=3 (16 17 18 19 8 9 10 11)
vx=4 (-16 0 0 0) ;F'
vx=5 (0 -16 0 0) ;G'
vx=6 (0 0 -16 0) ;H'
vx=7 (0 0 0 -16) ;K'
vx=8 (8,-8,-8,8) ;P
eg=8 (16, 17,18,23)
vx=9 (-8,8,-8,8) ;Q
vx=10 (-8,-8,8,8) ;R
vx=11 (8,8,8,8) ;S
eg=11 (17,18,19 20)
vx=12 (-8,8,8,-8) ;P'
vx=13 (8,-8,8,-8) ;Q'
vx=14 (8,8,-8,-8) ;R'
vx=15 (-8,-8,-8,-8) ;S'
vx=16 (-8,-8,-8,8) ;D
vx=17 (8,8,-8,8) ;C
vx=18 (8,-8,8,8) ;B
vx=19 (-8,8,8,8) ;A
vx=20 (8,8,8,-8) ;D'
vx=21 (-8,-8,8,-8) ;C'
vx=22 (-8,8,-8,-8) ;B'
vx=23 (8,-8,-8,-8) ;A'
ends=

;B
flags= "n"
name="4D Alphabet block"
vertices= (38)
vx=0 (14,-6 -12 14)
eg=0 (1)
vx=1 (14,-6 9 14)

vx=2 (14,-5 -12 14)
eg=2 (3)
vx=3 (14,-5 9 14)

vx=4 (14,-9 -12 14)
eg=4 (5)
vx=5 (14,3 -12 14)
eg=5 (6)
vx=6 (14,6 -11 14)
eg=6 (7)
vx=7 (14,7 -10 14)
eg=7 (8)
vx=8 (14,8 -8 14)
eg=8 (9)
vx=9 (14,8 -6 14)
eg=9 (10)
vx=10 (14,7 -4 14)
eg=10 (11)
vx=11 (14,6 -3 14)
eg=11 (12)
vx=12 (14,3 -2 14)

vx=13 (14,3 -12 14)
eg=13 (14)
vx=14 (14,5 -11 14)
eg=14 (15)
vx=15 (14,6 -10 14)
eg=15 (16)
vx=16 (14,7 -8 14)
eg=16 (17)
vx=17 (14,7 -6 14)
eg=17 (18)
vx=18 (14,6 -4 14)
eg=18 (19)
vx=19 (14,5 -3 14)
eg=19 (20)
vx=20 (14,3 -2 14)

vx=21 (14,-5 -2 14)
eg=21 (22)
vx=22 (14,3 -2 14)
eg=22 (23)
vx=23 (14,6 -1 14)
eg=23 (24)
vx=24 (14,7 0 14)
eg=24 (25)
vx=25 (14,8 2 14)
eg=25 (26)
vx=26 (14,8 5 14)
eg=26 (27)
vx=27 (14,7 7 14)
eg=27 (28)
vx=28 (14,6 8 14)
eg=28 (29)
vx=29 (14,3 9 14)
eg=29 (30)
vx=30 (14,-9 9 14)

vx=31 (14,3 -2 14)
eg=31 (32)
vx=32 (14,5 -1 14)

eg=32 (33)
vx=33 (14,6 0 14)
eg=33 (34)
vx=34 (14,7 2 14)
eg=34 (35)
vx=35 (14,7 5 14)
eg=35 (36)
vx=36 (14,6 7 14)
eg=36 (37)
vx=37 (14,5 8 14)
eg=37 (38)
vx=38 (14,3 9 14)

vx=39 (9 9 14 14) ;last vertex of A
;A
vx=40 (0 -12 14 14)
eg=40 (41)
vx=41 (-7 9 14 14)

vx=42 (0 -12 14 14)
eg=42 (43)
vx=43 ( 7 9 14 14)

vx=44 (0 -9 14 14)
eg=44 (45)
vx=45 (6 9 14 14)

vx=46 (-5 3 14 14)
eg=46 (47)
vx=47 (4 3 14 14)

vx=48 (-9 9 14 14)
eg=48 (49)
vx=49 (-3 9 14 14)
;eg=49 (106)

;C
vx=50( 6 -14 -9 14)
eg=50 (51)
vx=51 ( 7 -14 -6 14)
eg=51 (52)
vx=52 ( 7 -14 -12 14)
eg=52 (53)
vx=53 ( 6 -14 -9 14)
eg=53 (54)
vx=54 ( 4 -14 -11 14)
eg=54 (55)
vx=55 ( 1 -14 -12 14)
eg=55 (56)
vx=56 ( -1 -14 -12 14)
eg=56 (57)
vx=57 ( -4 -14 -11 14)
eg=57 (58)
vx=58 ( -6 -14 -9 14)
eg=58 (59)
vx=59 ( -7 -14 -7 14)
eg=59 (60)
vx=60 ( -8 -14 -4 14)
eg=60 (61)
vx=61 ( -8 -14 1 14)
eg=61 (62)
vx=62 ( -7 -14 4 14)
eg=62 (63)
vx=63 ( -6 -14 6 14)
eg=63 (64)
vx=64 ( -4 -14 8 14)
eg=64 (65)
vx=65 ( -1 -14 9 14)
eg=65 (66)
vx=66 ( 1 -14 9 14)
eg=66 (67)
vx=67 ( 4 -14 8 14)
eg=67 (68)
vx=68 ( 6 -14 6 14)
eg=68 (69)
vx=69 ( 7 -14 4 14)

vx=70 ( -1 -14 -12 14)
eg=70 (71)
vx=71 ( -3 -14 -11 14)
eg=71 (72)
vx=72 ( -5 -14 -9 14)
eg=72 (73)
vx=73 ( -6 -14 -7 14)
eg=73 (74)
vx=74 ( -7 -14 -4 14)
eg=74 (75)
vx=75 ( -7 -14 1 14)
eg=75 (76)
vx=76 ( -6 -14 4 14)
eg=76 (77)
vx=77 ( -5 -14 6 14)
eg=77 (78)
vx=78 ( -3 -14 8 14)
eg=78 (79)
vx=79 ( -1 -14 9 14)

;D
vx=80 (-14 14,-6 -12 )
eg=80 (81)
vx=81 (-14 14,-6 9 )

vx=82 (-14 14,-5 -12 )
eg=82 (83)
vx=83 (-14 14,-5 9 )

vx=84 (-14 14,-9 -12 )
eg=84 (85)
vx=85 (-14 14,1 -12 )
eg=85 (86)
vx=86 (-14 14,4 -11 )
eg=86 (87)
vx=87 (-14 14,6 -9 )
eg=87 (88)
vx=88 (-14 14,7 -7 )
eg=88 (89)
vx=89 (-14 14,8 -4 )
eg=89 (90)
vx=90 (-14 14,8 1 )
eg=90 (91)
vx=91 (-14 14,7 4 )
eg=91 (92)
vx=92 (-14 14,6 6 )
eg=92 (93)
vx=93 (-14 14,4 8 )
eg=93 (94)
vx=94 (-14 14,1 9 )
eg=94 (95)
vx=95 (-14 14,-9 9 )

vx=96 (-14 14,1 -12 )
eg=96 (97)
vx=97 (-14 14,3 -11 )
eg=97 (98)
vx=98 (-14 14,5 -9 )
eg=98 (99)
vx=99 (-14 14,6 -7 )
eg=99 (100)
vx=100 (-14 14,7 -4 )
eg=100 (101)
vx=101 (-14 14,7 1 )
eg=101 (102)
vx=102 (-14 14,6 4 )
eg=102 (103)
vx=103 (-14 14,5 6 )
eg=103 (104)
vx=104 (-14 14,3 8 )
eg=104 (105)
vx=105 (-14 14,1 9 )

;from A
vx=106 (3 9 14 14)
eg=106 (39)

ends=
flags= "nl"
name= "two 3d cube 'faces' of 4d hypercube"
vertices=(16)
vx=0 (10, -10, -10, -10)
eg=0 (1 3 4)
cl=0 (6 6 6)
vx=1 (-10, -10, -10, -10)
eg=1 (2 5)
cl=1 (6 6)
vx=2 (-10, 10, -10, -10)
eg=2 (3 6)
cl=2 (6 6)
vx=3 (10, 10, -10, -10)
eg=3 (7)
cl=3 (6)
vx=4 (10, -10, 10, -10)
eg=4 (5 7)
cl=4 (6)
vx=5 (-10, -10, 10, -10)
eg=5 (6)
cl=5 (6)
vx=6 (-10, 10, 10, -10)
eg=6 (7)
cl=6 (6)
vx=7 (10, 10, 10, -10)
vx=8 (10, -10, -10, 10)
eg=8 (9 11 12)
cl=8 (11 11 11)
vx=9 (-10, -10, -10, 10)
eg=9 (10 13)
cl=9 (11 11 )
vx=10 (-10, 10, -10, 10)
eg=10 (11 14)
cl=10 (11 11)
vx=11 (10, 10, -10, 10)
eg=11 (15)
cl=11 (11)
vx=12 (10, -10, 10, 10)
eg=12 (13 15)
cl=12 (11 11)
vx=13 (-10, -10, 10, 10)
vx=14 (-10, 10, 10, 10)
eg=14 (15 13)
cl=14 (11 11)
vx=15 (10, 10, 10, 10)
ends=
endfile=