92 lines
4.0 KiB
OpenSCAD
92 lines
4.0 KiB
OpenSCAD
//
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// NopSCADlib Copyright Chris Palmer 2018
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// nop.head@gmail.com
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// hydraraptor.blogspot.com
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//
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// This file is part of NopSCADlib.
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//
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// NopSCADlib is free software: you can redistribute it and/or modify it under the terms of the
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// GNU General Public License as published by the Free Software Foundation, either version 3 of
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// the License, or (at your option) any later version.
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//
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// NopSCADlib is distributed in the hope that it will be useful, but WITHOUT ANY WARRANTY;
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// without even the implied warranty of MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.
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// See the GNU General Public License for more details.
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//
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// You should have received a copy of the GNU General Public License along with NopSCADlib.
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// If not, see <https://www.gnu.org/licenses/>.
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//
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//
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//! Draw a polygon with rounded corners. Each element of the vector is the XY coordinate and a radius in clockwise order.
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//! Radius can be negative for a concave corner.
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//!
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//! Because the tangents need to be calculated to find the length these can be calculated separately and re-used when drawing to save calculating them twice.
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//
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include <../utils/core/core.scad>
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function circle_tangent(p1, p2) = //! Compute the clockwise tangent between two circles represented as [x,y,r]
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let(
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r1 = p1[2],
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r2 = p2[2],
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dx = p2.x - p1.x,
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dy = p2.y - p1.y,
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d = sqrt(dx * dx + dy * dy),
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theta = atan2(dy, dx) + acos((r1 - r2) / d),
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v = [cos(theta), sin(theta)]
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)[ p1 + r1 * v, p2 + r2 * v ];
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function rounded_polygon_tangents(points) = //! Compute the straight sections needed to draw and to compute the lengths
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let(len = len(points))
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[for(i = [0 : len - 1])
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let(ends = circle_tangent(points[i], points[(i + 1) % len]))
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for(end = [0, 1])
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ends[end]];
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function sumv(v, i = 0, sum = 0) = i == len(v) ? sum : sumv(v, i + 1, sum + v[i]);
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// the cross product of 2D vectors is the area of the parallelogram between them. We use the sign of this to decide if the angle is bigger than 180.
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function rounded_polygon_length(points, tangents) = //! Calculate the length given the point list and the list of tangents computed by ` rounded_polygon_tangents`
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let(
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len = len(points),
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indices = [0 : len - 1],
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straights = [for(i = indices) norm(tangents[2 * i] - tangents[2 * i + 1])],
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arcs = [for(i = indices) let(p1 = tangents[2 * i + 1],
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p2 = tangents[(2 * i + 2) % (2 * len)],
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corner = points[(i + 1) % len],
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c = [corner.x, corner.y],
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v1 = p1 - c,
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v2 = p2 - c,
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r = abs(corner.z),
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a = acos((v1 * v2) / sqr(r))) r ? PI * (cross(v1, v2) <= 0 ? a : 360 - a) * r / 180 : 0]
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)
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sumv(concat(straights, arcs));
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module rounded_polygon(points, _tangents = undef) { //! Draw the rounded polygon from the point list, can pass the tangent list to save it being calculated
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len = len(points);
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indices = [0 : len - 1];
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tangents = _tangents ? _tangents : rounded_polygon_tangents(points);
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difference(convexity = points) {
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union() {
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for(i = indices)
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if(points[i][2] > 0)
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hull() {
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translate([points[i].x, points[i].y])
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circle(points[i][2]);
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polygon([tangents[(2 * i - 1 + 2 * len) % (2 * len)], tangents[2 * i], [points[i].x, points[i].y]]);
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}
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polygon(tangents, convexity = points);
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}
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for(i = indices)
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if(points[i][2] < 0)
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hull() {
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translate([points[i].x, points[i].y])
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circle(-points[i][2]);
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polygon([tangents[(2 * i - 1 + 2 * len) % (2 *len)], tangents[2 * i], [points[i].x, points[i].y]]);
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}
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}
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}
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