1be9fbbc5c1bdad785f683dc5228c726e28796ef
3 import matplotlib
.pyplot
as plt
5 from matplotlib
import pylab
6 from mpl_toolkits
.mplot3d
import Axes3D
10 x
, y
, z
= symbols('x y z')
14 diam_plot
= fig
.add_subplot(2, 2, 1)
15 diam_plot
.set_title('Diamond')
16 diam_plot
.set_xlim(-1, 1)
17 diam_plot
.set_ylim(-1, 1)
18 diam
= Ge(y
, x
- 1) & Le(y
, x
+ 1) & Ge(y
, -x
- 1) & Le(y
, -x
+ 1)
19 diam
.plot(diam_plot
, fill
=True, edgecolor
='red', facecolor
='yellow')
21 cham_plot
= fig
.add_subplot(2, 2, 2, projection
='3d')
22 cham_plot
.set_title('Chamfered cube')
23 cham_plot
.set_xlim(0, 3)
24 cham_plot
.set_ylim(0, 3)
25 cham_plot
.set_zlim(0, 3)
26 cham
= Le(0, x
) & Le(x
, 3) & Le(0, y
) & Le(y
, 3) & Le(0, z
) & Le(z
, 3) & \
27 Le(z
- 2, x
) & Le(x
, z
+ 2) & Le(1 - z
, x
) & Le(x
, 5 - z
) & \
28 Le(z
- 2, y
) & Le(y
, z
+ 2) & Le(1 - z
, y
) & Le(y
, 5 - z
) & \
29 Le(y
- 2, x
) & Le(x
, y
+ 2) & Le(1 - y
, x
) & Le(x
, 5 - y
)
30 cham
.plot(cham_plot
, facecolors
=(1, 0, 0, 0.75))
32 rhom_plot
= fig
.add_subplot(2, 2, 3, projection
='3d')
33 rhom_plot
.set_title('Rhombicuboctahedron')
34 rhom_plot
.set_xlim(0, 3)
35 rhom_plot
.set_ylim(0, 3)
36 rhom_plot
.set_zlim(0, 3)
38 Le(x
+ y
+ z
, 7) & Ge(-2, -x
- y
- z
) & \
39 Le(-1, x
+ y
- z
) & Le(x
+ y
- z
, 4) & \
40 Le(-1, x
- y
+ z
) & Le(x
- y
+ z
, 4) & \
41 Le(-1, -x
+ y
+ z
) & Le(-x
+ y
+ z
, 4)
42 rhom
.plot(rhom_plot
, facecolors
=(0, 1, 0, 0.75))
44 cubo_plot
= fig
.add_subplot(2, 2, 4, projection
='3d')
45 cubo_plot
.set_title('Truncated cuboctahedron')
46 cubo_plot
.set_xlim(0, 5)
47 cubo_plot
.set_ylim(0, 5)
48 cubo_plot
.set_zlim(0, 5)
49 cubo
= Le(0, x
) & Le(x
, 5) & Le(0, y
) & Le(y
, 5) & Le(0, z
) & Le(z
, 5) & \
50 Le(x
-4, y
) & Le(y
, x
+ 4) & Le(-x
+ 1, y
) & Le(y
, -x
+ 9) & \
51 Le(y
-4, z
) & Le(z
, y
+ 4) & Le(-y
+ 1, z
) & Le(z
, -y
+ 9) & \
52 Le(z
-4, x
) & Le(x
, z
+ 4) & Le(-z
+ 1, x
) & Le(x
, -z
+ 9) & \
53 Le(3, x
+ y
+ z
) & Le(x
+ y
+ z
, 12) & \
54 Le(-2, x
- y
+ z
) & Le(x
- y
+ z
, 7) & \
55 Le(-2, -x
+ y
+ z
) & Le(-x
+ y
+ z
, 7) & \
56 Le(-2, x
+ y
- z
) & Le(x
+ y
- z
, 7)
57 cubo
.plot(cubo_plot
, facecolors
=(0, 0, 1, 0.75))