/usr/share/axiom-20120501/input/tetra.input is in axiom-test 20120501-8.
This file is owned by root:root, with mode 0o644.
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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 61 62 63 | --Copyright The Numerical Algorithms Group Limited 1994.
-- Sierpinsky's Tetrahedron
-- Bring DH matrices into the environment
)set expose add con DenavitHartenbergMatrix
)read dhtri
-- set up the coordinates of the corners of a tetrahedron
x1:DoubleFloat := sqrt(2.0@DoubleFloat/3.0@DoubleFloat)
x2:DoubleFloat := sqrt(3.0@DoubleFloat)/6
p1 := point [-0.5@DoubleFloat, -x2, 0.0@DoubleFloat]
p2 := point [0.5@DoubleFloat, -x2, 0.0@DoubleFloat]
p3 := point [0.0@DoubleFloat, 2*x2, 0.0@DoubleFloat]
p4 := point [0.0@DoubleFloat, 0.0@DoubleFloat, x1]
-- The base of the tetrahedron
baseTriangle := [p2, p1, p3]
-- The "middle triangle" inscribed in the base of the tetrahedon
mt := [0.5@DoubleFloat*(p2+p1), 0.5@DoubleFloat*(p1+p3), 0.5@DoubleFloat*(p3+p2)]
-- The bases of the triangles of the subdivided tetrahedon
bt1 := [mt.1, p1, mt.2]
bt2 := [p2, mt.1, mt.3]
bt3 := [mt.2, p3, mt.3]
bt4 := [0.5@DoubleFloat*(p2+p4), 0.5@DoubleFloat*(p1+p4), 0.5@DoubleFloat*(p3+p4)]
-- create the transformations which bring the base of the tetrahedron
-- to the bases of the subdivided tetrahedron
tt1 := tri2tri(baseTriangle, bt1)
tt2 := tri2tri(baseTriangle, bt2)
tt3 := tri2tri(baseTriangle, bt3)
tt4 := tri2tri(baseTriangle, bt4)
-- Draw a Sierpinsky tetrahedron with n levels of recursive subdivision
drawPyramid(n) ==
s := create3Space()$ThreeSpace DoubleFloat
dh := rotatex(0.0@DoubleFloat)
drawPyramidInner(s, n, dh)
makeViewport3D(s, "Sierpinsky Tetrahedron")$VIEW3D
-- Recursively draw a Sierpinsky tetrahedron
drawPyramidInner(s, n, dh) ==
n = 0 => makeTetrahedron(s, dh, n)
-- draw the 4 recursive pyramids
drawPyramidInner(s, n-1, dh * tt1)
drawPyramidInner(s, n-1, dh * tt2)
drawPyramidInner(s, n-1, dh * tt3)
drawPyramidInner(s, n-1, dh * tt4)
-- draw a tetrahedron into the given space, with the given color,
-- transforming it by the given DH matrix
makeTetrahedron(sp, dh, color) ==
w1 := dh*p1
w2 := dh*p2
w3 := dh*p3
w4 := dh*p4
polygon(sp, [w1, w2, w4])
polygon(sp, [w1, w3, w4])
polygon(sp, [w2, w3, w4])
void()
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