Sierpinski curve: Difference between revisions
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A partial translation anyway which produces a static image of a |
A partial translation anyway which produces a static image of a SC of level 5, yellow on blue, which can be viewed with a utility such as EOG. |
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<lang go>package main |
<lang go>package main |
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Revision as of 18:14, 5 March 2020
- Task
Produce a graphical or ASCII-art representation of a Sierpinski curve of at least order 3.
Go
A partial translation anyway which produces a static image of a SC of level 5, yellow on blue, which can be viewed with a utility such as EOG. <lang go>package main
import (
"github.com/fogleman/gg" "math"
)
var (
width = 770.0 height = 770.0 dc = gg.NewContext(int(width), int(height))
)
var cx, cy, h float64
func lineTo(newX, newY float64) {
dc.LineTo(newX-width/2+h, height-newY+2*h) cx, cy = newX, newY
}
func lineN() { lineTo(cx, cy-2*h) } func lineS() { lineTo(cx, cy+2*h) } func lineE() { lineTo(cx+2*h, cy) } func lineW() { lineTo(cx-2*h, cy) }
func lineNW() { lineTo(cx-h, cy-h) } func lineNE() { lineTo(cx+h, cy-h) } func lineSE() { lineTo(cx+h, cy+h) } func lineSW() { lineTo(cx-h, cy+h) }
func sierN(level int) {
if level == 1 { lineNE() lineN() lineNW() } else { sierN(level - 1) lineNE() sierE(level - 1) lineN() sierW(level - 1) lineNW() sierN(level - 1) }
}
func sierE(level int) {
if level == 1 { lineSE() lineE() lineNE() } else { sierE(level - 1) lineSE() sierS(level - 1) lineE() sierN(level - 1) lineNE() sierE(level - 1) }
}
func sierS(level int) {
if level == 1 { lineSW() lineS() lineSE() } else { sierS(level - 1) lineSW() sierW(level - 1) lineS() sierE(level - 1) lineSE() sierS(level - 1) }
}
func sierW(level int) {
if level == 1 { lineNW() lineW() lineSW() } else { sierW(level - 1) lineNW() sierN(level - 1) lineW() sierS(level - 1) lineSW() sierW(level - 1) }
}
func squareCurve(level int) {
sierN(level) lineNE() sierE(level) lineSE() sierS(level) lineSW() sierW(level) lineNW() lineNE() // needed to close the square in the top left hand corner
}
func main() {
dc.SetRGB(0, 0, 1) // blue background dc.Clear() level := 5 cx, cy = width/2, height h = cx / math.Pow(2, float64(level+1)) squareCurve(level) dc.SetRGB255(255, 255, 0) // yellow curve dc.SetLineWidth(2) dc.Stroke() dc.SavePNG("sierpinski_square_curve.png")
}</lang>
Julia
Modified from Craft of Coding blog, Processing version <lang Julia>using Luxor
function sierpinski_curve(x0, y0, h, level)
x1, y1 = x0, y0 lineto(x, y) = begin line(Point(x1, y1), Point(x, y), :stroke); x1, y1 = x, y end lineN() = lineto(x1,y1-2*h) lineS() = lineto(x1,y1+2*h) lineE() = lineto(x1+2*h,y1) lineW() = lineto(x1-2*h,y1) lineNW() = lineto(x1-h,y1-h) lineNE() = lineto(x1+h,y1-h) lineSE() = lineto(x1+h,y1+h) lineSW() = lineto(x1-h,y1+h) function drawN(i) if i == 1 lineNE(); lineN(); lineNW() else drawN(i-1); lineNE(); drawE(i-1); lineN(); drawW(i-1); lineNW(); drawN(i-1) end end function drawE(i) if i == 1 lineSE(); lineE(); lineNE() else drawE(i-1); lineSE(); drawS(i-1); lineE(); drawN(i-1); lineNE(); drawE(i-1) end end function drawS(i) if i == 1 lineSW(); lineS(); lineSE() else drawS(i-1); lineSW(); drawW(i-1); lineS(); drawE(i-1); lineSE(); drawS(i-1) end end function drawW(i) if i == 1 lineNW(); lineW(); lineSW() else drawW(i-1); lineNW(); drawN(i-1); lineW(); drawS(i-1); lineSW(); drawW(i-1) end end function draw_curve(levl) drawN(levl); lineNE(); drawE(levl); lineSE() drawS(levl); lineSW(); drawW(levl); lineNW() end draw_curve(level)
end
Drawing(800, 800) sierpinski_curve(10, 790, 3, 6) finish() preview() </lang>
Phix
<lang Phix>-- demo\rosetta\Sierpinski_curve.exw -- -- Draws curves lo to hi (simultaneously), initially {1,1}, max {8,8} -- Press +/- to change hi, shift +/- to change lo. -- ("=_" are also mapped to "+-", for the non-numpad +/-) -- include pGUI.e
Ihandle dlg, canvas cdCanvas cddbuffer, cdcanvas
integer width, height,
lo = 1, hi = 1
atom cx, cy, h
procedure lineTo(atom newX, newY)
cdCanvasVertex(cddbuffer, newX-width/2+h, height-newY+2*h) cx = newX cy = newY
end procedure
procedure lineN() lineTo(cx,cy-2*h) end procedure procedure lineS() lineTo(cx,cy+2*h) end procedure procedure lineE() lineTo(cx+2*h,cy) end procedure procedure lineW() lineTo(cx-2*h,cy) end procedure
procedure lineNW() lineTo(cx-h,cy-h) end procedure procedure lineNE() lineTo(cx+h,cy-h) end procedure procedure lineSE() lineTo(cx+h,cy+h) end procedure procedure lineSW() lineTo(cx-h,cy+h) end procedure
procedure sierN(integer level)
if level=1 then lineNE() lineN() lineNW() else sierN(level-1) lineNE() sierE(level-1) lineN() sierW(level-1) lineNW() sierN(level-1) end if
end procedure
procedure sierE(integer level)
if level=1 then lineSE() lineE() lineNE() else sierE(level-1) lineSE() sierS(level-1) lineE() sierN(level-1) lineNE() sierE(level-1) end if
end procedure
procedure sierS(integer level)
if level=1 then lineSW() lineS() lineSE() else sierS(level-1) lineSW() sierW(level-1) lineS() sierE(level-1) lineSE() sierS(level-1) end if
end procedure
procedure sierW(integer level)
if level=1 then lineNW() lineW() lineSW() else sierW(level-1) lineNW() sierN(level-1) lineW() sierS(level-1) lineSW() sierW(level-1) end if
end procedure
procedure sierpinskiCurve(integer level)
sierN(level) lineNE() sierE(level) lineSE() sierS(level) lineSW() sierW(level) lineNW()
end procedure
function redraw_cb(Ihandle /*ih*/, integer /*posx*/, integer /*posy*/)
{width, height} = IupGetIntInt(canvas, "DRAWSIZE") cdCanvasActivate(cddbuffer) for level=lo to hi do cx = width/2 cy = height h = cx/power(2,level+1) cdCanvasBegin(cddbuffer, CD_CLOSED_LINES) sierpinskiCurve(level) cdCanvasEnd(cddbuffer) end for cdCanvasFlush(cddbuffer) return IUP_DEFAULT
end function
function map_cb(Ihandle ih)
cdcanvas = cdCreateCanvas(CD_IUP, ih) cddbuffer = cdCreateCanvas(CD_DBUFFER, cdcanvas) cdCanvasSetBackground(cddbuffer, CD_WHITE) cdCanvasSetForeground(cddbuffer, CD_BLUE) return IUP_DEFAULT
end function
function key_cb(Ihandle /*ih*/, atom c)
if c=K_ESC then return IUP_CLOSE end if if find(c,"+=-_") then bool bShift = IupGetInt(NULL,"SHIFTKEY") if c='+' or c='=' then if bShift then lo = min(lo+1,hi) else hi = min(8,hi+1) end if elsif c='-' or c='_' then if bShift then lo = max(1,lo-1) else hi = max(lo,hi-1) end if end if IupSetStrAttribute(dlg, "TITLE", "Sierpinski curve (%d..%d)",{lo,hi}) cdCanvasClear(cddbuffer) IupUpdate(canvas) end if return IUP_CONTINUE
end function
procedure main()
IupOpen() canvas = IupCanvas(NULL) IupSetAttribute(canvas, "RASTERSIZE", "770x770") IupSetCallback(canvas, "MAP_CB", Icallback("map_cb")) IupSetCallback(canvas, "ACTION", Icallback("redraw_cb"))
dlg = IupDialog(canvas) IupSetAttribute(dlg, "TITLE", "Sierpinski curve (1..1)") IupSetCallback(dlg, "K_ANY", Icallback("key_cb"))
IupMap(dlg) IupShowXY(dlg,IUP_CENTER,IUP_CENTER) IupMainLoop() IupClose()
end procedure
main()</lang>
Sidef
Uses the LSystem() class from Hilbert curve. <lang ruby>var rules = Hash(
x => 'xF+G+xF--F--xF+G+x',
)
var lsys = LSystem(
width: 550, height: 550,
xoff: -9, yoff: -271,
len: 5, angle: 45, color: 'dark green',
)
lsys.execute('F--xF--F--xF', 5, "sierpiński_curve.png", rules)</lang> Output image: Sierpiński curve