File:Moebius Surface 1 Display.png
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Moebius_Surface_1_Display.png (725 × 542 pixels, file size: 151 KB, MIME type: image/png)
File information
Structured data
Captions
File:Moebius strip.svg is a vector version of this file. It should be used in place of this PNG file when not inferior.
File:Moebius Surface 1 Display.png → File:Moebius strip.svg
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DescriptionMoebius Surface 1 Display.png |
A moebius strip parametrized by the following equations:
where n=1. This plot is for display purposes by itself. If you are lookig for the image that is part of the sequence from n=0 to 1, see below for the other version, along with a thumbnail version with less mesh lines. |
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Date | ||||
Source |
Self-made, with Mathematica 5.1 This diagram was created with Mathematica. |
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Author | Inductiveload | |||
Permission (Reusing this file) |
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Other versions |
Mathematical Function Plot | |
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Description | Moebius Strip, 1 half-turn (n=1) |
Equation | :
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Co-ordinate System | Cartesian (Parametric Plot) |
u Range | 0 .. 4π |
v Range | 0 .. 0.3 |
Mathematica Code
[edit]Please be aware that at the time of uploading (15:19, 19 June 2007 (UTC)), this code may take a significant amount of time to execute on a consumer-level computer. |
This uses Chris Hill's antialiasing code to average pixels and produce a less jagged image. The original code can be found here. |
This code requires the following packages:
<<Graphics`Graphics`
MoebiusStrip[r_:1] = Function[ {u, v, n}, r {Cos[u] + v Cos[n u/2]Cos[u], Sin[u] + v Cos[n u/2]Sin[u], v Sin[n u/2], {EdgeForm[AbsoluteThickness[4]]}}]; aa[gr_] := Module[{siz, kersiz, ker, dat, as, ave, is, ar}, is = ImageSize /. Options[gr, ImageSize]; ar = AspectRatio /. Options[gr, AspectRatio]; If[! NumberQ[is], is = 288]; kersiz = 4; img = ImportString[ExportString[gr, "PNG", ImageSize -> ( is kersiz)], "PNG"]; siz = Reverse@Dimensions[img[[1, 1]]][[{1, 2}]]; ker = Table[N[1/kersiz^2], {kersiz}, {kersiz}]; dat = N[img[[1, 1]]]; as = Dimensions[dat]; ave = Partition[Transpose[Flatten[ListConvolve[ker, dat[[All, All, #]]]] \ & /@ Range[as[[3]]]], as[[2]] - kersiz + 1]; ave = Take[ave, Sequence @@ ({1, Dimensions[ave][[#]], kersiz} & /@ Range[Length[Dimensions[ave]] - 1])]; Show[Graphics[Raster[ave, {{0, 0}, siz/kersiz}, {0, 255}, ColorFunction -> RGBColor]], PlotRange -> {{0, siz[[ 1]]/kersiz}, {0, siz[[2]]/kersiz}}, ImageSize -> is, AspectRatio -> ar] ] deg = 1; gr = ParametricPlot3D[Evaluate[MoebiusStrip[][u, v, deg]], {u, 0, 4π}, {v, 0, .3}, PlotPoints -> {249, 5}, PlotRange -> {{-1.3, 1.3}, {-1.3, 1.3}, {-0.7, 0.7}}, Boxed -> False, Axes -> False, ImageSize -> 800, PlotRegion -> {{-0.22, 1.15}, {-0.5, 1.4}}, DisplayFunction -> Identity ]; finalgraphic = aa[gr]; Export["Moebius Surface " <> ToString[deg] <> ".png", finalgraphic]
File history
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Date/Time | Thumbnail | Dimensions | User | Comment | |
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current | 15:19, 19 June 2007 | 725 × 542 (151 KB) | Inductiveload (talk | contribs) | {{Information |Description=A moebius strip parametrized by the following equations: :<math>x = \cos u + v\cos\frac{nu}{2}\cos u</math> :<math>y = \sin u + v\cos\frac{nu}{2}\sin u</math> :<math>z = v\sin\frac{nu}{2}</math>, where ''n''=1. This plot is for |
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