Collinearity of points
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This is an attempt at determining collinearity of a series of points. Rather than compare tangents, one stackoverflower suggested calculating areas of triangles. Other strategies?
def polygon_area(points): area = 0 q = points[-1] for p in points: area += p[0] * q[1] - p[1] * q[0] q = p return area / 2 def plot(points): if len(points) < 3: return None a = 0 for pi, p in enumerate(points[:-2]): npt = points[pi+1] nnpt = points[pi+2] a += abs(polygon_area([points[pi], npt, nnpt])) return a pts = [ (725,417), (548, 440), (414, 458), (261, 479) ] # tolerance for error margin = 200 v = plot(pts) print("plotted area", v) fontSize(100) if -.5*margin < v < .5*margin: text("colinear",(100,100)) else: text("not colinear",(100,100)) # draw the dots fill(0,0,1) stroke(1,0,0) translate(100,100) newPath() moveTo(pts[0]) for p in pts[1:]: lineTo(p) drawPath() ds = 10 fill(0,0,1) stroke(None) for p in pts: oval(p[0]-.5*ds, p[1]-.5*ds, ds, ds)
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what would be 'compare tangents'?
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comparing angles is probably more expensive?def get_angle(p1, p2): return atan2((p2[1] - p1[1]), (p2[0] - p1[0])) pts = [ (725,417), (548, 440), (414, 458), (261, 479) ] angles = [ get_angle(point, pts[p+1]) for p, point in enumerate(pts[:-1])] angle = get_angle(pts[0], pts[-1]) # tolerance for error margin = pi/180 fontSize(100) if all(abs(a - angle) < margin for a in angles): text("colinear",(100,100)) else: text("not colinear",(100,100)) # draw the dots fill(0,0,1) stroke(1,0,0) translate(100,100) newPath() moveTo(pts[0]) for p in pts[1:]: lineTo(p) drawPath() ds = 10 fill(0,0,1) stroke(None) for p in pts: oval(p[0]-.5*ds, p[1]-.5*ds, ds, ds)
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That animation of the KABK crown I did: was looking into this question so as to avoid having to define the collinear = invalid segments explicitly — having the code test the combinations is a more elegant solution.
https://twitter.com/MauriceMeilleur/status/973090865882296325
