2017-08-30 00:00:16 +00:00
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//////////////////////////////////////////////////////////////////////
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// 2D and Bezier Stuff.
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//////////////////////////////////////////////////////////////////////
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/*
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BSD 2-Clause License
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Copyright (c) 2017, Revar Desmera
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All rights reserved.
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Redistribution and use in source and binary forms, with or without
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modification, are permitted provided that the following conditions are met:
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* Redistributions of source code must retain the above copyright notice, this
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list of conditions and the following disclaimer.
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* Redistributions in binary form must reproduce the above copyright notice,
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this list of conditions and the following disclaimer in the documentation
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and/or other materials provided with the distribution.
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THIS SOFTWARE IS PROVIDED BY THE COPYRIGHT HOLDERS AND CONTRIBUTORS "AS IS"
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AND ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE
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IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE ARE
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DISCLAIMED. IN NO EVENT SHALL THE COPYRIGHT HOLDER OR CONTRIBUTORS BE LIABLE
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FOR ANY DIRECT, INDIRECT, INCIDENTAL, SPECIAL, EXEMPLARY, OR CONSEQUENTIAL
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DAMAGES (INCLUDING, BUT NOT LIMITED TO, PROCUREMENT OF SUBSTITUTE GOODS OR
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SERVICES; LOSS OF USE, DATA, OR PROFITS; OR BUSINESS INTERRUPTION) HOWEVER
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CAUSED AND ON ANY THEORY OF LIABILITY, WHETHER IN CONTRACT, STRICT LIABILITY,
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OR TORT (INCLUDING NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY OUT OF THE USE
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OF THIS SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF SUCH DAMAGE.
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*/
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include <math.scad>
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include <quaternions.scad>
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// Creates a 2D polygon circle, modulated by one or more superimposed
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// sine waves.
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// r = radius of the base circle.
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// sines = array of [amplitude, frequency] pairs, where the frequency is the
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// number of times the cycle repeats around the circle.
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// Example:
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// modulated_circle(r=40, sines=[[3, 11], [1, 31]], $fn=6);
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module modulated_circle(r=40, sines=[10])
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{
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freqs = len(sines)>0? [for (i=sines) i[1]] : [5];
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points = [
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for (a = [0 : (360/segs(r)/max(freqs)) : 360])
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let(nr=r+sum_of_sines(a,sines)) [nr*cos(a), nr*sin(a)]
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];
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polygon(points);
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}
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// Similar to linear_extrude(), except the result is a hollow shell.
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// wall = thickness of shell wall.
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// height = height of extrusion.
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// twist = degrees of twist, from bottom to top.
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// slices = how many slices to use when making extrusion.
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// Example:
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// extrude_2d_hollow(wall=2, height=100, twist=90, slices=50)
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// circle(r=40, center=true, $fn=6);
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module extrude_2d_hollow(wall=2, height=50, twist=90, slices=60)
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{
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linear_extrude(height=height, twist=twist, slices=slices) {
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difference() {
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children();
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offset(r=-wall) {
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children();
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}
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}
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}
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}
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// Takes a 2D polyline and removes uneccessary collinear points.
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function simplify2d_path(path) = concat(
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[path[0]],
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[
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for (
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i = [1:len(path)-2]
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) let (
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v1 = path[i] - path[i-1],
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v2 = path[i+1] - path[i-1]
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) if (abs(cross(v1,v2)) > 1e-6) path[i]
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],
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[path[len(path)-1]]
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);
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// Takes a 3D polyline and removes uneccessary collinear points.
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function simplify3d_path(path) = concat(
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[path[0]],
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[
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for (
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i = [1:len(path)-2]
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) let (
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v1 = path[i] - path[i-1],
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v2 = path[i+1] - path[i-1]
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) if (vector3d_angle(v1,v2) > 1e-6) path[i]
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],
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[path[len(path)-1]]
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);
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// Takes a closed 2D polyline path, centered on the XY plane, and
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// extrudes it along a 3D spiral path of a given radius, height and twist.
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// polyline = Array of points of a polyline path, to be extruded.
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// h = height of the spiral to extrude along.
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// r = radius of the spiral to extrude along.
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// twist = number of degrees of rotation to spiral up along height.
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// Example:
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// poly = [[-10,0], [-3,-5], [3,-5], [10,0], [0,-30]];
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// extrude_2dpath_along_spiral(poly, h=200, r=50, twist=1000, $fn=36);
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module extrude_2dpath_along_spiral(polyline, h, r, twist=360) {
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pline_count = len(polyline);
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steps = ceil(segs(r)*(twist/360));
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poly_points = [
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for (
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p = [0:steps]
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) let (
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a = twist * (p/steps),
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dx = r*cos(a),
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dy = r*sin(a),
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dz = h * (p/steps),
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cp = [dx, dy, dz],
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rotx = matrix3_xrot(90),
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rotz = matrix3_zrot(a),
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rotm = rotz * rotx
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) for (
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b = [0:pline_count-1]
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) rotm*point3d(polyline[b])+cp
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];
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poly_faces = concat(
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[[for (b = [0:pline_count-1]) b]],
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[
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for (
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p = [0:steps-1],
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b = [0:pline_count-1],
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i = [0:1]
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) let (
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b2 = (b == pline_count-1)? 0 : b+1,
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p0 = p * pline_count + b,
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p1 = p * pline_count + b2,
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p2 = (p+1) * pline_count + b2,
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p3 = (p+1) * pline_count + b,
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pt = (i==0)? [p0, p2, p1] : [p0, p3, p2]
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) pt
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],
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[[for (b = [pline_count-1:-1:0]) b+(steps)*pline_count]]
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);
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polyhedron(points=poly_points, faces=poly_faces, convexity=10);
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}
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function points_along_path3d(
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polyline, // The 2D polyline to drag along the 3D path.
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path, // The 3D polyline path to follow.
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q=Q_Ident(), // Used in recursion
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n=0 // Used in recursion
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) = let(
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end = len(path)-1,
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v1 = (n == 0)? [0, 0, 1] : normalize(path[n]-path[n-1]),
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v2 = (n == end)? normalize(path[n]-path[n-1]) : normalize(path[n+1]-path[n]),
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crs = cross(v1, v2),
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axis = norm(crs) <= 0.001? [0, 0, 1] : crs,
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ang = vector3d_angle(v1, v2),
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hang = ang * (n==0? 1.0 : 0.5),
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hrot = Quat(axis, hang),
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arot = Quat(axis, ang),
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roth = Q_Mul(hrot, q),
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rotm = Q_Mul(arot, q)
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) concat(
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[for (i = [0:len(polyline)-1]) Q_Rot_Vector(point3d(polyline[i]),roth) + path[n]],
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(n == end)? [] : points_along_path3d(polyline, path, rotm, n+1)
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);
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// Takes a closed 2D polyline path, centered on the XY plane, and
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// extrudes it perpendicularly along a 3D polyline path, forming a solid.
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// polyline = Array of points of a polyline path, to be extruded.
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// path = Array of points of a polyline path, to extrude along.
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// convexity = max number of surfaces any single ray can pass through.
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// Example:
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// shape = [ [-15, 0], [0, 0], [-5, 10], [0, 10], [5, 10], [10, 5], [15, 0], [10, -5], [5, -10], [0, -10], [-5, -10], [-10, -5], [-15, 0] ];
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// path = [ [0, 0, 0], [100, 33, 33], [200, -33, -33], [300, 0, 0] ];
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2018-02-16 22:49:32 +00:00
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// extrude_2dpath_along_3dpath(shape, path);
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2017-08-30 00:00:16 +00:00
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module extrude_2dpath_along_3dpath(polyline, path, convexity=10) {
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pline_count = len(polyline);
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path_count = len(path);
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poly_points = points_along_path3d(polyline, path);
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poly_faces = concat(
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[[for (b = [0:pline_count-1]) b]],
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[
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for (
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p = [0:path_count-2],
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b = [0:pline_count-1],
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i = [0:1]
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) let (
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b2 = (b == pline_count-1)? 0 : b+1,
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p0 = p * pline_count + b,
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p1 = p * pline_count + b2,
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p2 = (p+1) * pline_count + b2,
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p3 = (p+1) * pline_count + b,
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pt = (i==0)? [p0, p2, p1] : [p0, p3, p2]
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) pt
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],
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[[for (b = [pline_count-1:-1:0]) b+(path_count-1)*pline_count]]
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);
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polyhedron(points=poly_points, faces=poly_faces, convexity=convexity);
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}
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// vim: noexpandtab tabstop=4 shiftwidth=4 softtabstop=4 nowrap
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