Archimedean spiral
You are encouraged to solve this task according to the task description, using any language you may know.
The Archimedean spiral is a spiral named after the Greek mathematician Archimedes.
An Archimedean spiral can be described by the equation:
with real numbers a and b.
- Task
Draw an Archimedean spiral.
Ada
<lang Ada>with Ada.Numerics.Elementary_Functions;
with SDL.Video.Windows.Makers; with SDL.Video.Renderers.Makers; with SDL.Events.Events;
procedure Archimedean_Spiral is
Width : constant := 800; Height : constant := 800; A : constant := 4.2; B : constant := 3.2; T_First : constant := 4.0; T_Last : constant := 100.0;
Window : SDL.Video.Windows.Window; Renderer : SDL.Video.Renderers.Renderer; Event : SDL.Events.Events.Events;
procedure Draw_Archimedean_Spiral is use type SDL.C.int; use Ada.Numerics.Elementary_Functions; Pi : constant := Ada.Numerics.Pi; Step : constant := 0.002; T : Float; R : Float; begin T := T_First; loop R := A + B * T; Renderer.Draw (Point => (X => Width / 2 + SDL.C.int (R * Cos (T, 2.0 * Pi)), Y => Height / 2 - SDL.C.int (R * Sin (T, 2.0 * Pi)))); exit when T >= T_Last; T := T + Step; end loop; end Draw_Archimedean_Spiral;
procedure Wait is use type SDL.Events.Event_Types; begin loop while SDL.Events.Events.Poll (Event) loop if Event.Common.Event_Type = SDL.Events.Quit then return; end if; end loop; end loop; end Wait;
begin
if not SDL.Initialise (Flags => SDL.Enable_Screen) then return; end if;
SDL.Video.Windows.Makers.Create (Win => Window, Title => "Archimedean spiral", Position => SDL.Natural_Coordinates'(X => 10, Y => 10), Size => SDL.Positive_Sizes'(Width, Height), Flags => 0); SDL.Video.Renderers.Makers.Create (Renderer, Window.Get_Surface); Renderer.Set_Draw_Colour ((0, 0, 0, 255)); Renderer.Fill (Rectangle => (0, 0, Width, Height)); Renderer.Set_Draw_Colour ((0, 220, 0, 255));
Draw_Archimedean_Spiral; Window.Update_Surface;
Wait; Window.Finalize; SDL.Finalise;
end Archimedean_Spiral;</lang>
APL
Works in: Dyalog APL
Uses Dyalog's SharpPlot integration, which works on all supported platforms.
<lang apl> 'InitCauseway' 'View' ⎕CY 'sharpplot'
InitCauseway ⍬ ⍝ initialise current namespace sp←⎕NEW Causeway.SharpPlot sp.DrawPolarChart {⍵(360|⍵)}⌽⍳720 View sp</lang>
AutoHotkey
Requires GDIP <lang AutoHotkey>if !pToken := Gdip_Startup() { MsgBox, 48, gdiplus error!, Gdiplus failed to start. Please ensure you have gdiplus on your system ExitApp } OnExit, Exit SysGet, MonitorPrimary, MonitorPrimary SysGet, WA, MonitorWorkArea, %MonitorPrimary% WAWidth := WARight-WALeft WAHeight := WABottom-WATop Gui, 1: -Caption +E0x80000 +LastFound +AlwaysOnTop +ToolWindow +OwnDialogs Gui, 1: Show, NA hwnd1 := WinExist() hbm := CreateDIBSection(WAWidth, WAHeight) hdc := CreateCompatibleDC() obm := SelectObject(hdc, hbm) G := Gdip_GraphicsFromHDC(hdc) Gdip_SetSmoothingMode(G, 4) pPen := Gdip_CreatePen(0xffff0000, 3)
- --------------------------------
a := 1, b := 4, th := 0.1, step := 0.1 loop, 720 { th += step r := a + b * th x1 := r * Cos(th) y1 := r * Sin(th) x1 += A_ScreenWidth/2 y1 += A_ScreenHeight/2 if (x2 && y2) Gdip_DrawLine(G, pPen, x1, y1, x2, y2) x2 := x1, y2 := y1 if GetKeyState("Esc", "P") break ; next two lines are optional to watch it draw ; Sleep 10 ; UpdateLayeredWindow(hwnd1, hdc, WALeft, WATop, WAWidth, WAHeight) } UpdateLayeredWindow(hwnd1, hdc, WALeft, WATop, WAWidth, WAHeight)
- --------------------------------
return
Exit: Gdip_DeletePen(pPen) SelectObject(hdc, obm) DeleteObject(hbm) DeleteDC(hdc) Gdip_DeleteGraphics(G) Gdip_Shutdown(pToken) ExitApp Return</lang>
AWK
<lang AWK>
- syntax: GAWK -f ARCHIMEDEAN_SPIRAL.AWK
- converted from Applesoft BASIC
BEGIN {
x_min = y_min = 9999 x_max = y_max = 0 h = 96 w = h + h / 2 a = 1 b = 1 m = 6 * 3.1415926 step = .02 for (t=step; t<=m; t+=step) { # build spiral r = a + b * t x = int(r * cos(t) + w) y = int(r * sin(t) + h) if (x <= 0 || y <= 0) { continue } if (x >= 280 ) { continue } if (y >= 192) { continue } arr[x,y] = "*" x_min = min(x_min,x) x_max = max(x_max,x) y_min = min(y_min,y) y_max = max(y_max,y) } for (i=x_min; i<=x_max; i++) { # print spiral rec = "" for (j=y_min; j<=y_max; j++) { rec = sprintf("%s%1s",rec,arr[i,j]) } printf("%s\n",rec) } exit(0)
} function max(x,y) { return((x > y) ? x : y) } function min(x,y) { return((x < y) ? x : y) } </lang>
- Output:
********** *** *** ** ** ** ** ** ** ** ** ** ******* ** ** *** *** * * ** ** ** ** ** ** * * ** ** ** ** ** * * * * **** * * * * *** ** * ** ** * * ** * * * * ** * * * * * * * * * * ** * ** * * * ** * ** * ** * * * ** * * * * * * ** * * ** ** * * ** ** * * * *** *** ** ** ** ****** * * * ** * ** ** * ** ** ** ** ** * **** *** * ******** * * ** *** **** *****
BASIC
AmigaBASIC
<lang amigabasic>a=1.5 b=1.5 pi=3.141592
PSET (320,100) FOR t=0 TO 40*pi STEP .1
r=a+b*t LINE -(320+2*r*SIN(t),100+r*COS(t))
NEXT</lang>
Applesoft BASIC
<lang ApplesoftBasic>110 LET H = 96 120 LET W = H + H / 2 130 HGR2 140 HCOLOR= 3 150 LET A = 1 160 LET B = 9 170 LET PI = 3.1415926535 180 LET M = 10 * PI 190 LET S = .02 200 FOR T = S TO M STEP S 210 LET R = A + B * T 220 LET X = R * COS (T) + W 230 LET Y = R * SIN (T) + H 240 IF X < 0 THEN 290 250 IF Y < 0 THEN 290 260 IF X > 279 THEN 290 270 IF Y > 191 THEN 290 280 HPLOT X,Y 290 NEXT </lang>
BASIC256
<lang BASIC256>
- Basic-256 ver 1.1.4
- Archimedean Spiral
width = 430 : height = 430 graphsize width, height rect 0,0, graphwidth,graphheight penwidth 1 color green
x = width/2 : y = height/2 # Center of graphics window i = 1 : t = 0 : xn = 0 : yn = 0 # Initial values iter = 150 : q = 30
line x,0,x,height
line 0,y,width,y
penwidth 2 color red
while i <= iter
t = i / q * pi xn = (1 + (1 * t)) * cos(t) +x yn = (1 + (1 * t)) * sin(t) +y line x,y,xn,yn x = xn : y = yn print i + chr(9) + int(x) + chr(9) + int(y) + chr(9) + int(t) # chr(9) = TAB i += 1
end while
imgsave "spiral-Basic-256.png", "PNG" </lang>
Commodore BASIC
Commodore BASIC 2.0 lacks in-built graphics capability. This implementation is written for Commodore BASIC 7.0 that was built into the Commodore 128 computer. Should also work for Commodore BASIC 3.5. <lang basic>1 REM ARCHIMEDEAN SPIRAL 2 REM USING COMMODORE BASIC 7.0 3 REM OF THE COMMODORE 128 4 REM ********************************** 10 GRAPHIC 1,1 20 A = 1.5 30 B = 0.7 40 X0 = 160 : Y0 = 100 50 FOR T = 0 TO 40*π STEP 0.2 60 R = A+B*T 70 X = R*COS(T)+160 : Y = R*SIN(T)+100 80 DRAW 1,X0,Y0 TO X,Y 90 X0 = X : Y0 = Y 100 NEXT T 110 GOTO 110</lang>
FreeBASIC
<lang freebasic>' version 16-10-2016 ' compile with: fbc -s gui
Const As double deg2rad = Atn(1) * 4 / 180 ' pi = atn(1) * 4, pi/180
Const As UInteger screensize = 600 ' size of window in pixels Const As Double turns = 5 ' number of turns Const As UInteger halfscrn = screensize \ 2 Const As uinteger sf = (turns * (screensize - 100)) / halfscrn
ScreenRes screensize, screensize, 32 ' screen 600 * 600 pixels, 4 byte color
Dim As Double r, x, y
For r = 0 To turns * 360 Step 0.05
x = Cos(r * deg2rad) * r / sf y = Sin(r * deg2rad) * r / sf PSet(halfscrn + x, halfscrn - y), RGB(255, 255, 255)
Next
' empty keyboard buffer
While InKey <> "" : Wend
Print : Print "hit any key to end program"
Sleep
End</lang>
GW-BASIC
<lang gwbasic>10 A = 0 20 B = 1 30 SCREEN 1 40 FOR THETA = 0 TO 160 STEP .01 50 R = A + B*THETA 60 X = R*COS(THETA) 70 Y = R*SIN(THETA) 80 PSET (160+X, 100-Y),3 90 NEXT THETA 100 IF INKEY$="" THEN GOTO 100 110 SCREEN 2:SCREEN 0 120 END</lang>
IS-BASIC
<lang IS-BASIC>100 GRAPHICS LORES 2 110 OPTION ANGLE DEGREES 120 PLOT 640,360,ANGLE 90; 130 FOR I=2 TO 33.2 STEP .05 140 PLOT FORWARD I,LEFT 5; 150 NEXT</lang>
Locomotive Basic
<lang locobasic>10 a=1.5:b=2 20 mode 2:rad:move 320,200 30 for t=0 to 40*pi step 0.2 40 r=a+b*t 50 draw r*sin(t)+320,r*cos(t)+200 60 next 70 while inkey$="":wend</lang>
Run BASIC
<lang Run BASIC> 'archimedean spiral.bas
'runs in Run Basic 'Run Basic website http://www.runbasic.com 'From Rosettacode.org/wiki/ *** Liberty_BASIC
graphic #g, 300,300 'width and height - the center is 150 c = 255 '255 for white '0 for black print "Welcome to the Arch-Spiral Program"
pi=acs(-1) nLoops = 5 #g cls("blue") 'blue background color #g color(c,c,c) 'set line color - see color above
for t=0 to 2*pi*nLoops step 0.01 'c = c - 1 'changes color parameter x=100*t/(2*pi*nLoops)*cos(t)+150 '150x150 is the center y=100*t/(2*pi*nLoops)*sin(t)+150 #g color(c,c,c) 'changes color #g set(x,y) 'if c <1 then c=255 next render #g
print "Thank you and Goodbye" end
End</lang>
QBasic
<lang qbasic>SCREEN 12 WINDOW (-2.67, -2!)-(2.67, 2!) PI = 4 * ATN(1) H = PI / 40 A = .2: B = .05 PSET (A, 0) FOR I = 0 TO 400
T = I * H X = (A + B * T) * COS(T) Y = (A + B * T) * SIN(T) LINE -(X, Y)
NEXT</lang>
Sinclair ZX81 BASIC
Works with the unexpanded (1k RAM) ZX81. The output is quite blocky, but identifiably a spiral. <lang basic>10 LET A=1.5 20 LET B=0.7 30 FOR T=0 TO 7*PI STEP 0.05 40 LET R=A+B*T 50 PLOT R*COS T+32,R*SIN T+22 60 NEXT T</lang>
- Output:
Screenshot here.
C
Interactive code which asks the parameters a and b as inputs, the number of cycles and the division steps. Requires the WinBGIm library. <lang C>
- include<graphics.h>
- include<stdio.h>
- include<math.h>
- define pi M_PI
int main(){ double a,b,cycles,incr,i;
int steps,x=500,y=500;
printf("Enter the parameters a and b : "); scanf("%lf%lf",&a,&b);
printf("Enter cycles : "); scanf("%lf",&cycles);
printf("Enter divisional steps : "); scanf("%d",&steps);
incr = 1.0/steps;
initwindow(1000,1000,"Archimedean Spiral");
for(i=0;i<=cycles*pi;i+=incr){ putpixel(x + (a + b*i)*cos(i),x + (a + b*i)*sin(i),15); }
getch();
closegraph(); } </lang>
C#
<lang csharp>using System; using System.Linq; using System.Drawing; using System.Diagnostics; using System.Drawing.Drawing2D;
class Program {
const int width = 380; const int height = 380; static PointF archimedeanPoint(int degrees) { const double a = 1; const double b = 9; double t = degrees * Math.PI / 180; double r = a + b * t; return new PointF { X = (float)(width / 2 + r * Math.Cos(t)), Y = (float)(height / 2 + r * Math.Sin(t)) }; }
static void Main(string[] args) { var bm = new Bitmap(width, height); var g = Graphics.FromImage(bm); g.SmoothingMode = SmoothingMode.AntiAlias; g.FillRectangle(new SolidBrush(Color.White), new Rectangle { X = 0, Y = 0, Width = width, Height = height }); var pen = new Pen(Color.OrangeRed, 1.5f);
var spiral = Enumerable.Range(0, 360 * 3).AsParallel().AsOrdered().Select(archimedeanPoint); var p0 = new PointF(width / 2, height / 2); foreach (var p1 in spiral) { g.DrawLine(pen, p0, p1); p0 = p1; } g.Save(); // is this really necessary ? bm.Save("archimedes-csharp.png"); Process.Start("archimedes-csharp.png"); // Launches default photo viewing app }
} </lang>
C++
<lang cpp>
- include <windows.h>
- include <string>
- include <iostream>
const int BMP_SIZE = 600;
class myBitmap { public:
myBitmap() : pen( NULL ), brush( NULL ), clr( 0 ), wid( 1 ) {} ~myBitmap() { DeleteObject( pen ); DeleteObject( brush ); DeleteDC( hdc ); DeleteObject( bmp ); } bool create( int w, int h ) { BITMAPINFO bi; ZeroMemory( &bi, sizeof( bi ) ); bi.bmiHeader.biSize = sizeof( bi.bmiHeader ); bi.bmiHeader.biBitCount = sizeof( DWORD ) * 8; bi.bmiHeader.biCompression = BI_RGB; bi.bmiHeader.biPlanes = 1; bi.bmiHeader.biWidth = w; bi.bmiHeader.biHeight = -h; HDC dc = GetDC( GetConsoleWindow() ); bmp = CreateDIBSection( dc, &bi, DIB_RGB_COLORS, &pBits, NULL, 0 ); if( !bmp ) return false; hdc = CreateCompatibleDC( dc ); SelectObject( hdc, bmp ); ReleaseDC( GetConsoleWindow(), dc ); width = w; height = h; return true; } void clear( BYTE clr = 0 ) { memset( pBits, clr, width * height * sizeof( DWORD ) ); } void setBrushColor( DWORD bClr ) { if( brush ) DeleteObject( brush ); brush = CreateSolidBrush( bClr ); SelectObject( hdc, brush ); } void setPenColor( DWORD c ) { clr = c; createPen(); } void setPenWidth( int w ) { wid = w; createPen(); } void saveBitmap( std::string path ) { BITMAPFILEHEADER fileheader; BITMAPINFO infoheader; BITMAP bitmap; DWORD wb; GetObject( bmp, sizeof( bitmap ), &bitmap ); DWORD* dwpBits = new DWORD[bitmap.bmWidth * bitmap.bmHeight]; ZeroMemory( dwpBits, bitmap.bmWidth * bitmap.bmHeight * sizeof( DWORD ) ); ZeroMemory( &infoheader, sizeof( BITMAPINFO ) ); ZeroMemory( &fileheader, sizeof( BITMAPFILEHEADER ) ); infoheader.bmiHeader.biBitCount = sizeof( DWORD ) * 8; infoheader.bmiHeader.biCompression = BI_RGB; infoheader.bmiHeader.biPlanes = 1; infoheader.bmiHeader.biSize = sizeof( infoheader.bmiHeader ); infoheader.bmiHeader.biHeight = bitmap.bmHeight; infoheader.bmiHeader.biWidth = bitmap.bmWidth; infoheader.bmiHeader.biSizeImage = bitmap.bmWidth * bitmap.bmHeight * sizeof( DWORD ); fileheader.bfType = 0x4D42; fileheader.bfOffBits = sizeof( infoheader.bmiHeader ) + sizeof( BITMAPFILEHEADER ); fileheader.bfSize = fileheader.bfOffBits + infoheader.bmiHeader.biSizeImage; GetDIBits( hdc, bmp, 0, height, ( LPVOID )dwpBits, &infoheader, DIB_RGB_COLORS ); HANDLE file = CreateFile( path.c_str(), GENERIC_WRITE, 0, NULL, CREATE_ALWAYS, FILE_ATTRIBUTE_NORMAL, NULL ); WriteFile( file, &fileheader, sizeof( BITMAPFILEHEADER ), &wb, NULL ); WriteFile( file, &infoheader.bmiHeader, sizeof( infoheader.bmiHeader ), &wb, NULL ); WriteFile( file, dwpBits, bitmap.bmWidth * bitmap.bmHeight * 4, &wb, NULL ); CloseHandle( file ); delete [] dwpBits; } HDC getDC() const { return hdc; } int getWidth() const { return width; } int getHeight() const { return height; }
private:
void createPen() { if( pen ) DeleteObject( pen ); pen = CreatePen( PS_SOLID, wid, clr ); SelectObject( hdc, pen ); } HBITMAP bmp; HDC hdc; HPEN pen; HBRUSH brush; void *pBits; int width, height, wid; DWORD clr;
}; class spiral { public:
spiral() { bmp.create( BMP_SIZE, BMP_SIZE ); } void draw( int c, int s ) { double a = .2, b = .3, r, x, y; int w = BMP_SIZE >> 1; HDC dc = bmp.getDC(); for( double d = 0; d < c * 6.28318530718; d += .002 ) { r = a + b * d; x = r * cos( d ); y = r * sin( d ); SetPixel( dc, ( int )( s * x + w ), ( int )( s * y + w ), 255 ); } // saves the bitmap bmp.saveBitmap( "./spiral.bmp" ); }
private:
myBitmap bmp;
}; int main(int argc, char* argv[]) {
spiral s; s.draw( 16, 8 ); return 0;
} </lang>
Clojure
<lang clojure> (use '(incanter core stats charts io))
(defn Arquimidean-function
[a b theta] (+ a (* theta b)))
(defn transform-pl-xy [r theta]
(let [x (* r (sin theta)) y (* r (cos theta))] [x y]))
(defn arq-spiral [t] (transform-pl-xy (Arquimidean-function 0 7 t) t))
(view (parametric-plot arq-spiral 0 (* 10 Math/PI)))
</lang>
Common Lisp
Common Lisp doesn't provide native graphical output. Libraries or bitmapped output could be used instead, but for this solution, the output is accomplished with character printing.
<lang lisp>(defun draw-coords-as-text (coords size fill-char)
(let* ((min-x (apply #'min (mapcar #'car coords))) (min-y (apply #'min (mapcar #'cdr coords))) (max-x (apply #'max (mapcar #'car coords))) (max-y (apply #'max (mapcar #'cdr coords))) (real-size (max (+ (abs min-x) (abs max-x)) ; bounding square (+ (abs min-y) (abs max-y)))) (scale-factor (* (1- size) (/ 1 real-size))) (center-x (* scale-factor -1 min-x)) (center-y (* scale-factor -1 min-y)) (intermediate-result (make-array (list size size) :element-type 'char :initial-element #\space))) (dolist (c coords) (let ((final-x (floor (+ center-x (* scale-factor (car c))))) (final-y (floor (+ center-y (* scale-factor (cdr c)))))) (setf (aref intermediate-result final-x final-y) fill-char))) ; print results to output (loop for i below (array-total-size intermediate-result) do (when (zerop (mod i size)) (terpri)) (princ (row-major-aref intermediate-result i)))))
(defun spiral (a b step-resolution step-count)
"Returns a list of coordinates for r=a+b*theta stepping theta by step-resolution" (loop for theta from 0 upto (* step-count step-resolution) by step-resolution for r = (+ a (* b theta)) for x = (* r (cos theta)) for y = (* r (sin theta)) collect (cons x y)))
(draw-coords-as-text (spiral 10 10 0.01 1500) 30 #\*)
- Output
- *
- ****** *
- **** *** **
- *** ** *
- ** ** *
- ** ** *
- * ** **
- ** * *
- ** ****** * *
- * ** ** ** *
- * ** * * *
- * ** * * **
- * * * * *
- * * * ** * *
- * * *** ** *
- * ** * *
- * * ** *
- * ** ** **
- ** ** ** *
- * ** ** **
- ** ******** *
- * **
- ** **
- ** **
- ** ***
- ** **
- **** ***
- *******
</lang>
FOCAL
<lang FOCAL>1.1 S A=1.5 1.2 S B=2 1.3 S N=250 1.4 F T=1,N; D 2 1.5 X FSKP(2*N) 1.6 Q
2.1 S R=A+B*T; D 3 2.2 X FPT(2*T,X1+512,Y1+390) 2.3 S R=A+B*(T+1); D 4 2.4 X FVEC(2*T+1,X2-X1,Y2-Y1)
3.1 S X1=R*FSIN(.2*T) 3.2 S Y1=R*FCOS(.2*T)
4.1 S X2=R*FSIN(.2*(T+1)) 4.2 S Y2=R*FCOS(.2*(T+1))</lang> This program uses FOCAL-11 on a DEC GT40 vector graphics terminal.
Frege
<lang frege>module Archimedean where
import Java.IO import Prelude.Math
data BufferedImage = native java.awt.image.BufferedImage where
pure native type_3byte_bgr "java.awt.image.BufferedImage.TYPE_3BYTE_BGR" :: Int native new :: Int -> Int -> Int -> STMutable s BufferedImage native createGraphics :: Mutable s BufferedImage -> STMutable s Graphics2D
data Color = pure native java.awt.Color where
pure native orange "java.awt.Color.orange" :: Color pure native white "java.awt.Color.white" :: Color pure native new :: Int -> Color
data BasicStroke = pure native java.awt.BasicStroke where
pure native new :: Float -> BasicStroke
data RenderingHints = native java.awt.RenderingHints where
pure native key_antialiasing "java.awt.RenderingHints.KEY_ANTIALIASING" :: RenderingHints_Key pure native value_antialias_on "java.awt.RenderingHints.VALUE_ANTIALIAS_ON" :: Object
data RenderingHints_Key = pure native java.awt.RenderingHints.Key
data Graphics2D = native java.awt.Graphics2D where
native drawLine :: Mutable s Graphics2D -> Int -> Int -> Int -> Int -> ST s () native drawOval :: Mutable s Graphics2D -> Int -> Int -> Int -> Int -> ST s () native fillRect :: Mutable s Graphics2D -> Int -> Int -> Int -> Int -> ST s () native setColor :: Mutable s Graphics2D -> Color -> ST s () native setRenderingHint :: Mutable s Graphics2D -> RenderingHints_Key -> Object -> ST s () native setStroke :: Mutable s Graphics2D -> BasicStroke -> ST s ()
data ImageIO = mutable native javax.imageio.ImageIO where
native write "javax.imageio.ImageIO.write" :: MutableIO BufferedImage -> String -> MutableIO File -> IO Bool throws IOException
width = 640 center = width `div` 2
roundi = fromIntegral . round
drawGrid :: Mutable s Graphics2D -> ST s () drawGrid g = do
g.setColor $ Color.new 0xEEEEEE g.setStroke $ BasicStroke.new 2 let angle = toRadians 45 margin = 10 numRings = 8 spacing = (width - 2 * margin) `div` (numRings * 2) forM_ [0 .. numRings-1] $ \i -> do let pos = margin + i * spacing size = width - (2 * margin + i * 2 * spacing) ia = fromIntegral i * angle multiplier = fromIntegral $ (width - 2 * margin) `div` 2 x2 = center + (roundi (cos ia * multiplier)) y2 = center - (roundi (sin ia * multiplier)) g.drawOval pos pos size size g.drawLine center center x2 y2
drawSpiral :: Mutable s Graphics2D -> ST s () drawSpiral g = do
g.setStroke $ BasicStroke.new 2 g.setColor $ Color.orange let degrees = toRadians 0.1 end = 360 * 2 * 10 * degrees a = 0 b = 20 c = 1 drSp theta = do let r = a + b * theta ** (1 / c) x = r * cos theta y = r * sin theta theta' = theta + degrees plot g (center + roundi x) (center - roundi y) when (theta' < end) (drSp (theta' + degrees)) drSp 0
plot :: Mutable s Graphics2D -> Int -> Int -> ST s () plot g x y = g.drawOval x y 1 1
main = do
buffy <- BufferedImage.new width width BufferedImage.type_3byte_bgr g <- buffy.createGraphics g.setRenderingHint RenderingHints.key_antialiasing RenderingHints.value_antialias_on g.setColor Color.white g.fillRect 0 0 width width drawGrid g drawSpiral g f <- File.new "SpiralFrege.png" void $ ImageIO.write buffy "png" f</lang>
Output is here due to Is file uploading blocked forever?
Go
Creates a PNG file using only built-in packages. <lang go>package main
import ( "image" "image/color" "image/draw" "image/png" "log" "math" "os" )
func main() { const ( width, height = 600, 600 centre = width / 2.0 degreesIncr = 0.1 * math.Pi / 180 turns = 2 stop = 360 * turns * 10 * degreesIncr fileName = "spiral.png" )
img := image.NewNRGBA(image.Rect(0, 0, width, height)) // create new image bg := image.NewUniform(color.RGBA{255, 255, 255, 255}) // prepare white for background draw.Draw(img, img.Bounds(), bg, image.ZP, draw.Src) // fill the background fgCol := color.RGBA{255, 0, 0, 255} // red plot
a := 1.0 b := 20.0
for theta := 0.0; theta < stop; theta += degreesIncr { r := a + b*theta x := r * math.Cos(theta) y := r * math.Sin(theta) img.Set(int(centre+x), int(centre-y), fgCol) }
imgFile, err := os.Create(fileName) if err != nil { log.Fatal(err) } defer imgFile.Close()
if err := png.Encode(imgFile, img); err != nil { imgFile.Close() log.Fatal(err) } }</lang>
Haskell
<lang haskell>#!/usr/bin/env stack -- stack --resolver lts-7.0 --install-ghc runghc --package Rasterific --package JuicyPixels
import Codec.Picture( PixelRGBA8( .. ), writePng ) import Graphics.Rasterific import Graphics.Rasterific.Texture import Graphics.Rasterific.Transformations
archimedeanPoint a b t = V2 x y
where r = a + b * t x = r * cos t y = r * sin t
main :: IO () main = do
let white = PixelRGBA8 255 255 255 255 drawColor = PixelRGBA8 0xFF 0x53 0x73 255 size = 800 points = map (archimedeanPoint 0 10) [0, 0.01 .. 60] hSize = fromIntegral size / 2 img = renderDrawing size size white $ withTransformation (translate $ V2 hSize hSize) $ withTexture (uniformTexture drawColor) $ stroke 4 JoinRound (CapRound, CapRound) $ polyline points
writePng "SpiralHaskell.png" img</lang>
Output is here due to Is file uploading blocked forever?
J
<lang j>require'plot' 'aspect 1' plot (*^)j.0.01*i.1400</lang>
Java
<lang java>import java.awt.*; import static java.lang.Math.*; import javax.swing.*;
public class ArchimedeanSpiral extends JPanel {
public ArchimedeanSpiral() { setPreferredSize(new Dimension(640, 640)); setBackground(Color.white); }
void drawGrid(Graphics2D g) { g.setColor(new Color(0xEEEEEE)); g.setStroke(new BasicStroke(2));
double angle = toRadians(45);
int w = getWidth(); int center = w / 2; int margin = 10; int numRings = 8;
int spacing = (w - 2 * margin) / (numRings * 2);
for (int i = 0; i < numRings; i++) { int pos = margin + i * spacing; int size = w - (2 * margin + i * 2 * spacing); g.drawOval(pos, pos, size, size);
double ia = i * angle; int x2 = center + (int) (cos(ia) * (w - 2 * margin) / 2); int y2 = center - (int) (sin(ia) * (w - 2 * margin) / 2);
g.drawLine(center, center, x2, y2); } }
void drawSpiral(Graphics2D g) { g.setStroke(new BasicStroke(2)); g.setColor(Color.orange);
double degrees = toRadians(0.1); double center = getWidth() / 2; double end = 360 * 2 * 10 * degrees; double a = 0; double b = 20; double c = 1;
for (double theta = 0; theta < end; theta += degrees) { double r = a + b * pow(theta, 1 / c); double x = r * cos(theta); double y = r * sin(theta); plot(g, (int) (center + x), (int) (center - y)); } }
void plot(Graphics2D g, int x, int y) { g.drawOval(x, y, 1, 1); }
@Override public void paintComponent(Graphics gg) { super.paintComponent(gg); Graphics2D g = (Graphics2D) gg; g.setRenderingHint(RenderingHints.KEY_ANTIALIASING, RenderingHints.VALUE_ANTIALIAS_ON);
drawGrid(g); drawSpiral(g); }
public static void main(String[] args) { SwingUtilities.invokeLater(() -> { JFrame f = new JFrame(); f.setDefaultCloseOperation(JFrame.EXIT_ON_CLOSE); f.setTitle("Archimedean Spiral"); f.setResizable(false); f.add(new ArchimedeanSpiral(), BorderLayout.CENTER); f.pack(); f.setLocationRelativeTo(null); f.setVisible(true); }); }
}</lang>
JavaScript
ES5
<lang html> <html> <head><title>Archimedean spiral</title></head> <body onload="pAS(35,'navy');">
Archimedean spiral
<canvas id="canvId" width="640" height="640" style="border: 2px outset;"></canvas> <script> // Plotting Archimedean_spiral aev 3/17/17 // lps - number of loops, clr - color. function pAS(lps,clr) {
var a=.0,ai=.1,r=.0,ri=.1,as=lps*2*Math.PI,n=as/ai; var cvs=document.getElementById("canvId"); var ctx=cvs.getContext("2d"); ctx.fillStyle="white"; ctx.fillRect(0,0,cvs.width,cvs.height); var x=y=0, s=cvs.width/2; ctx.beginPath(); for (var i=1; i<n; i++) { x=r*Math.cos(a), y=r*Math.sin(a); ctx.lineTo(x+s,y+s); r+=ri; a+=ai; }//fend i ctx.strokeStyle = clr; ctx.stroke();
} </script></body></html> </lang>
- Output:
Page with Archimedean spiral like ASjs.png. Right-clicking on the canvas you can save spiral as a png-file, for example.
ES6
Assumes the same HTML canvas embedding as above, but is functionally composed. Defines and logs a set of points, before rendering them to canvas. <lang html><html> <head>
<title>Archimedean spiral</title> <style>h3 {font-family:sans-serif; color:gray;}</style>
</head> <body onload="main('red')(15)">
Archimedean spiral
<canvas id="spiral" width="640" height="640" style="border: 2px outset;"></canvas> <script></lang> <lang javascript>const main = strColor => intCycles => {
const ai = 0.05, ri = 0.1, cvs = document.getElementById('spiral'), ctx = cvs.getContext('2d'), s = cvs.width / 2,
points = enumFromTo(1)( Math.PI * 2 * intCycles / ai ).map(i => [Math.cos, Math.sin].map( f => ri * i * f(ai * i) + s ));
return ( console.log(points), ctx.fillStyle = 'white', ctx.fillRect(0, 0, cvs.width, cvs.height), ctx.beginPath(),
points.forEach(xy => ctx.lineTo(...xy)),
ctx.strokeStyle = strColor, ctx.stroke(), points );
};
// enumFromTo :: Int -> Int -> [Int] const enumFromTo = m => n =>
Array.from({ length: 1 + n - m }, (_, i) => m + i);</lang>
<lang html></script></body></html></lang>
jq
Works with gojq, the Go implementation of jq
SVG version
<lang jq>def spiral($zero; $turns; $step):
def pi: 1 | atan * 4; def p2: (. * 100 | round) / 100;
def svg: 400 as $width | 400 as $height | 2 as $swidth # stroke | "blue" as $stroke | (range($zero; $turns * 2 * pi; $step) as $theta | (((($theta)|cos) * 2 * $theta + ($width/2)) |p2) as $x | (((($theta)|sin) * 2 * $theta + ($height/2))|p2) as $y | if $theta == $zero then "<path fill='transparent' style='stroke:\($stroke); stroke-width:\($swidth)' d='M \($x) \($y)" else " L \($x) \($y)" end), "' />";
"<svg width='100%' height='100%' xmlns='http://www.w3.org/2000/svg'>", svg, "</svg>" ;
spiral(0; 10; 0.025) </lang>
- Output:
PNG version of SVG file (Please feel free to upload to RC)
ASCII Art Version
<lang jq>def spiral($a; $b; $step; $h):
def min($x;$y): if $x <= $y then $x else $y end; def max($x;$y): if $x <= $y then $y else $x end; def pi: 1 | atan * 4; (6 * pi) as $m | ($h * 1.5) as $w | { x_min: 9999, y_min: 9999, x_max: 0, y_max: 0, arr: [] } | reduce range($step; $m+$step; $step) as $t (.; .r = $a + $b * $t | ((.r * ($t|cos) + $w) | round) as $x | ((.r * ($t|sin) + $h) | round) as $y | if $x <= 0 or $y <= 0 then . elif $x >= 280 then . elif $y >= 192 then . else .arr[$x][$y] = "*" | .x_min = min(.x_min; $x) | .x_max = max(.x_max; $x) | .y_min = min(.y_min; $y) | .y_max = max(.y_max; $y)
end )
# ... and print it | .arr as $arr | range(.x_min; .x_max + 1) as $i | reduce range(.y_min; .y_max+1) as $j ( ""; . + ($arr[$i][$j] // " ") ) | "\(.)\n" ;
spiral(1; 1; 0.02; 96)</lang>
- Output:
As for awk.
Julia
<lang julia>using UnicodePlots
spiral(θ, a=0, b=1) = @. b * θ * cos(θ + a), b * θ * sin(θ + a)
x, y = spiral(1:0.1:10) println(lineplot(x, y))</lang>
- Output:
┌────────────────────────────────────────┐ 10 │⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⡆⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀│ │⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⣀⣀⠤⠤⠤⠤⠤⠤⡧⠤⣀⣀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀│ │⠀⠀⠀⠀⠀⠀⠀⢀⡠⠔⠊⠉⠀⠀⠀⠀⠀⠀⠀⠀⡇⠀⠀⠀⠉⠓⠤⢄⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀│ │⠀⠀⠀⠀⠀⡠⠊⠁⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⡇⠀⠀⠀⠀⠀⠀⠀⠉⠢⡀⠀⠀⠀⠀⠀⠀⠀⠀⠀│ │⠀⠀⠀⡠⠊⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⡇⠀⠀⠀⠀⠀⠀⠀⠀⠀⠘⢤⠀⠀⠀⠀⠀⠀⠀⠀│ │⠀⠀⡜⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⡇⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⢇⠀⠀⠀⠀⠀⠀⠀│ │⠀⡸⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⣀⠔⠊⠉⠉⠙⣧⡀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⢸⠀⠀⠀⠀⠀⠀⠀│ │⠤⡧⠤⠤⠤⠤⠤⠤⠤⠤⠤⠤⠤⡴⠥⠤⠤⠤⠤⠤⡧⠤⠤⠤⠤⠤⠤⠤⠤⠤⠤⠤⡼⠤⠤⠤⠤⠤⠤⠄│ │⠀⡇⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⢣⠀⠀⠀⠀⠀⠀⡇⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⣰⠁⠀⠀⠀⠀⠀⠀⠀│ │⠀⢇⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠈⢆⠀⠀⠀⠀⠀⡇⠀⠀⠀⠀⠀⠀⠀⠀⣀⠜⠀⠀⠀⠀⠀⠀⠀⠀⠀│ │⠀⠘⡄⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠉⠒⠤⣀⡀⡇⠀⠀⠀⣀⣀⠤⠔⠊⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀│ │⠀⠀⠘⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠈⡏⠉⠉⠉⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀│ │⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⡇⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀│ │⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⡇⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀│ -10 │⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⡇⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀⠀│ └────────────────────────────────────────┘ -10 10
Kotlin
<lang scala>// version 1.1.0
import java.awt.* import javax.swing.*
class ArchimedeanSpiral : JPanel() {
init { preferredSize = Dimension(640, 640) background = Color.white }
private fun drawGrid(g: Graphics2D) { g.color = Color(0xEEEEEE) g.stroke = BasicStroke(2f) val angle = Math.toRadians(45.0) val w = width val center = w / 2 val margin = 10 val numRings = 8 val spacing = (w - 2 * margin) / (numRings * 2)
for (i in 0 until numRings) { val pos = margin + i * spacing val size = w - (2 * margin + i * 2 * spacing) g.drawOval(pos, pos, size, size) val ia = i * angle val x2 = center + (Math.cos(ia) * (w - 2 * margin) / 2).toInt() val y2 = center - (Math.sin(ia) * (w - 2 * margin) / 2).toInt() g.drawLine(center, center, x2, y2) } }
private fun drawSpiral(g: Graphics2D) { g.stroke = BasicStroke(2f) g.color = Color.magenta val degrees = Math.toRadians(0.1) val center = width / 2 val end = 360 * 2 * 10 * degrees val a = 0.0 val b = 20.0 val c = 1.0 var theta = 0.0 while (theta < end) { val r = a + b * Math.pow(theta, 1.0 / c) val x = r * Math.cos(theta) val y = r * Math.sin(theta) plot(g, (center + x).toInt(), (center - y).toInt()) theta += degrees } }
private fun plot(g: Graphics2D, x: Int, y: Int) { g.drawOval(x, y, 1, 1) }
override fun paintComponent(gg: Graphics) { super.paintComponent(gg) val g = gg as Graphics2D g.setRenderingHint(RenderingHints.KEY_ANTIALIASING, RenderingHints.VALUE_ANTIALIAS_ON) drawGrid(g) drawSpiral(g) }
}
fun main(args: Array<String>) {
SwingUtilities.invokeLater { val f = JFrame() f.defaultCloseOperation = JFrame.EXIT_ON_CLOSE f.title = "Archimedean Spiral" f.isResizable = false f.add(ArchimedeanSpiral(), BorderLayout.CENTER) f.pack() f.setLocationRelativeTo(null) f.isVisible = true }
}</lang>
Lua
<lang Lua> a=1 b=2 cycles=40 step=0.001 x=0 y=0
function love.load()
x = love.graphics.getWidth()/2 y = love.graphics.getHeight()/2
end
function love.draw()
love.graphics.print("a="..a,16,16) love.graphics.print("b="..b,16,32)
for i=0,cycles*math.pi,step do love.graphics.points(x+(a + b*i)*math.cos(i),y+(a + b*i)*math.sin(i)) end
end </lang>
M2000 Interpreter
<lang M2000 Interpreter> module Archimedean_spiral { smooth on ' enable GDI+ def r(θ)=5+3*θ cls #002222,0 pen #FFFF00 refresh 5000 every 1000 { \\ redifine window (console width and height) and place it to center (symbol ;) Window 12, random(10, 18)*1000, random(8, 12)*1000; move scale.x/2, scale.y/2 let N=2, k1=pi/120, k=k1, op=5, op1=1 for i=1 to int(1200*min.data(scale.x, scale.y)/18000) pen op swap op, op1 Width 3 {draw angle k, r(k)*n} k+=k1 next refresh 5000 \\ press space to exit loop if keypress(32) then exit } pen 14 cls 5 refresh 50 } Archimedean_spiral </lang>
Maple
<lang Maple> plots[polarplot](1+2*theta, theta = 0 .. 6*Pi) </lang>
Mathematica/Wolfram Language
The built-in function PolarPlot easily creates the desired plot <lang Mathematica>With[{a = 5, b = 4}, PolarPlot[a + b t, {t, 0, 10 Pi}]]</lang>
MATLAB
<lang MATLAB>a = 1; b = 1; turns = 2; theta = 0:0.1:2*turns*pi; polarplot(theta, a + b*theta);</lang>
Nim
<lang Nim>import math
import gintro/[glib, gobject, gtk, gio, cairo]
const
Width = 601 Height = 601
Limit = 12 * math.PI
Origin = (x: float(Width div 2), y: float(Height div 2)) B = floor((Width div 2) / Limit)
- ---------------------------------------------------------------------------------------------------
proc draw(area: DrawingArea; context: Context) =
## Draw the spiral.
var theta = 0.0 var delta = 0.01 var (prevx, prevy) = Origin
# Clear the region. context.moveTo(0, 0) context.setSource(0.0, 0.0, 0.0) context.paint()
# Draw the spiral. context.setSource(1.0, 1.0, 0.0) context.moveTo(Origin.x, Origin.y) while theta < Limit: let r = B * theta let x = Origin.x + r * cos(theta) # X-coordinate on drawing area. let y = Origin.y + r * sin(theta) # Y-coordinate on drawing area. context.lineTo(x, y) context.stroke() # Set data for next round. context.moveTo(x, y) prevx = x prevy = y theta += delta
- ---------------------------------------------------------------------------------------------------
proc onDraw(area: DrawingArea; context: Context; data: pointer): bool =
## Callback to draw/redraw the drawing area contents.
area.draw(context) result = true
- ---------------------------------------------------------------------------------------------------
proc activate(app: Application) =
## Activate the application.
let window = app.newApplicationWindow() window.setSizeRequest(Width, Height) window.setTitle("Archimedean spiral")
# Create the drawing area. let area = newDrawingArea() window.add(area)
# Connect the "draw" event to the callback to draw the spiral. discard area.connect("draw", ondraw, pointer(nil))
window.showAll()
- ———————————————————————————————————————————————————————————————————————————————————————————————————
let app = newApplication(Application, "Rosetta.spiral") discard app.connect("activate", activate) discard app.run()</lang>
PARI/GP
Note: cartes2() can be found here on PARI/GP page.
<lang parigp> \\ The Archimedean spiral \\ ArchiSpiral() - Where: lps is a number of loops, c is a direction 0/1 \\ (counter-clockwise/clockwise). 6/6/16 aev \\ Note: cartes2() can be found here on \\ http://rosettacode.org/wiki/Polyspiral#PARI.2FGP page. ArchiSpiral(size,lps,c=0)={ my(a=.0,ai=.1,r=.0,ri=.1,as=lps*2*Pi,n=as/ai,x,y,vc,vx=List(.0),vy=vx); if(c<0||c>1, c=0); if(c, ai*=-1); print(" *** The Archimedean spiral: size=",size," loops=",lps," c=",c); for(i=1, n, vc=cartes2(r,a); x=vc[1]; y=vc[2];
listput(vx,x); listput(vy,y); r+=ri; a+=ai;
);\\fend i plothraw(Vec(vx),Vec(vy)); } {\\ Executing: ArchiSpiral(640,5); \\ArchiSpiral1.png ArchiSpiral(640,5,1); \\ArchiSpiral2.png } </lang>
- Output:
> ArchiSpiral(640,5); \\ArchiSpiral1.png *** The Archimedean spiral: size=640 loops=5 c=0 > ArchiSpiral(640,5,1); \\ArchiSpiral2.png *** The Archimedean spiral: size=640 loops=5 c=1
Perl
<lang Perl>use Imager; use constant PI => 3.14159265;
my ($w, $h) = (400, 400); my $img = Imager->new(xsize => $w, ysize => $h);
for ($theta = 0; $theta < 52*PI; $theta += 0.025) {
$x = $w/2 + $theta * cos($theta/PI); $y = $h/2 + $theta * sin($theta/PI); $img->setpixel(x => $x, y => $y, color => '#FF00FF');
}
$img->write(file => 'Archimedean-spiral.png'); </lang>
Phix
You can run this online here.
-- -- demo\rosetta\Archimedean_spiral.exw -- =================================== -- include pGUI.e Ihandle dlg, canvas cdCanvas cddbuffer, cdcanvas function redraw_cb(Ihandle /*ih*/, integer /*posx*/, /*posy*/) integer a = 0, b = 5 integer {width, height} = IupGetIntInt(canvas, "DRAWSIZE") integer {centerX,centerY} = sq_floor_div({width,height},2) cdCanvasActivate(cddbuffer) integer c=0 for deg=0 to 360*7 do atom rad = deg*PI/180 atom r = rad*b + a integer x = centerX + floor(r*cos(rad)) integer y = centerY + floor(r*sin(rad)) if c<20 then ?{x,y} c+= 1 end if cdCanvasPixel(cddbuffer, x, y, #00FF00) 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_RED) return IUP_DEFAULT end function procedure main() IupOpen() canvas = IupCanvas(NULL) IupSetAttribute(canvas, "RASTERSIZE", "500x500") -- initial size IupSetCallback(canvas, "MAP_CB", Icallback("map_cb")) IupSetCallback(canvas, "ACTION", Icallback("redraw_cb")) dlg = IupDialog(canvas) IupSetAttribute(dlg, "TITLE", "Archimedean spiral") IupShow(dlg) IupSetAttribute(canvas, "RASTERSIZE", NULL) -- release the minimum limitation if platform()!=JS then IupMainLoop() IupClose() end if end procedure main()
Processing
Processing examples are animated, with a new point / segment added each draw() frame. Because Processing includes multiple built-in ways for drawing in rotating frames of reference, there are several ways to approach the Archimedean spiral problem.
Java mode
with points
When drawn with points the rotation must be very small, and initially the animation is very slow. This is because the points will move further and further apart as the radius increases. <lang Processing>float x, y; float theta; float rotation;
void setup() {
size(300, 300); theta = 0; rotation = 0.1; background(255);
}
void draw() {
translate(width/2.0, height/2.0); x = theta*cos(theta/PI); y = theta*sin(theta/PI); point(x, y); theta = theta + rotation; // check restart if (x>width/2.0) frameCount=-1;
}</lang>
with points, rotated
Rotates the canvas matrix using the built-in rotate() and draws a simple point, rather than computing rotated coordinates with sin()/cos(). <lang Processing>float theta; float rotation;
void setup() {
size(300, 300); theta = 0; rotation = 0.1; background(255);
}
void draw() {
translate(width/2.0, height/2.0); theta += rotation; rotate(theta/PI); point(theta, 0); // check restart if (theta>width/2.0) frameCount=-1;
}</lang>
with points, vector
Rotates a vector object of increasing magnitude using the built-in PVector and draws its point, rather than computing rotated coordinates with sin()/cos(). <lang Processing>PVector pv; float rotation;
void setup() {
size(300, 300); rotation = 0.1; pv = new PVector(rotation, 0); background(255);
}
void draw() {
translate(width/2.0, height/2.0); pv.setMag(pv.mag()+rotation); println(pv.mag()); pv.rotate(rotation/PI); point(pv.x, pv.y); // check restart if (pv.mag()>width/2.0) frameCount=-1;
}</lang>
with line segments
Draw each new line segments anchored to the previous point in order to keep the spiral visually connected no matter how much the radius expands. <lang Processing>float px, py, x, y; float theta; float rotation;
void setup() {
size(300, 300); px = py = x = y = theta = 0; rotation = 0.1; background(255);
}
void draw() {
translate(width/2.0, height/2.0); x = theta*cos(theta/PI); y = (theta)*sin(theta/PI); line(x, y, px, py); theta = theta + rotation; px = x; py = y; // check restart if (px>width/2.0) frameCount=-1;
}</lang>
with line segments, rotated
Uses the built-in rotate() and screenX() to rotate the frame of reference and then recover the rotated screen position of each next point. Draw each new line segments anchored to the previous point in order to keep the spiral visually connected no matter how much the radius expands. <lang Processing>float x, y, px, py; float theta; float rotation;
void setup() {
size(300, 300); x = y = px = py = theta = 0; rotation = 0.1; background(255);
}
void draw() {
// find coordinates with rotating reference frame pushMatrix(); rotate(theta/PI); x = screenX(theta, 0); y = screenY(theta, 0); popMatrix();
translate(width/2.0, height/2.0); theta += rotation; line(px, py, x, y); px = x; py = y; if (theta>width/2.0) frameCount=-1; // start over
}</lang>
Processing Python mode
with points
When drawn with points the rotation must be very small, and initially the animation is very slow. This is because the points will move further and further apart as the radius increases. <lang python>theta = 0 rotation = 0.1
def setup():
size(300, 300) background(255)
def draw():
global theta translate(width / 2.0, height / 2.0) x = theta * cos(theta / PI) y = theta * sin(theta / PI) point(x, y) theta = theta + rotation # check restart if x > width / 2.0: background(255) theta = 0</lang>
PureBasic
<lang PureBasic>#MAXLOOP = 7*360
- XCENTER = 640/2
- YCENTER = 480/2
- SCALAR = 200
If OpenWindow(0, 100, 200, 640, 480, "Archimedean spiral")
If CreateImage(0, 640, 480,24,RGB(255,255,255)) If StartDrawing(ImageOutput(0)) i.f=0.0 While i<=#MAXLOOP x.f=#XCENTER+Cos(Radian(i))*#SCALAR*i/#MAXLOOP y.f=#YCENTER+Sin(Radian(i))*#SCALAR*i/#MAXLOOP Plot(x,y,RGB(50,50,50)) i+0.05 Wend StopDrawing() EndIf EndIf ImageGadget(0, 0, 0, 0, 0, ImageID(0)) Repeat : Event = WaitWindowEvent() : Until Event = #PB_Event_CloseWindow
EndIf End</lang>
Python
Using the turtle module.
<lang python>from turtle import * from math import * color("blue") down() for i in range(200):
t = i / 20 * pi x = (1 + 5 * t) * cos(t) y = (1 + 5 * t) * sin(t) goto(x, y)
up() done()</lang>
R
<lang r>with(list(s=seq(0, 10 * pi, length.out=500)),
plot((1 + s) * exp(1i * s), type="l"))</lang>
Racket
File:Archemedian-spiral-racket.png <lang racket>#lang racket/base (require plot
racket/math)
- x and y bounds set to centralise the circle
(define (archemedian-spiral-renderer2d a b θ/τ-max
#:samples (samples (line-samples))) (define (f θ) (+ a (* b θ))) (define max-dim (+ a (* θ/τ-max 2 pi b))) (polar f 0 (* θ/τ-max 2 pi) #:x-min (- max-dim) #:x-max max-dim #:y-min (- max-dim) #:y-max max-dim #:samples samples))
(plot (list (archemedian-spiral-renderer2d 0.0 24 4)))
- writes to a file so hopefully, I can post it to RC...
(plot-file (list (archemedian-spiral-renderer2d 0.0 24 4))
"images/archemidian-spiral-racket.png")</lang>
Raku
(formerly Perl 6)
<lang perl6>use Image::PNG::Portable;
my ($w, $h) = (400, 400);
my $png = Image::PNG::Portable.new: :width($w), :height($h);
(0, .025 ... 52*π).race.map: -> \Θ {
$png.set: |((cis( Θ / π ) * Θ).reals »+« ($w/2, $h/2))».Int, 255, 0, 255;
}
$png.write: 'Archimedean-spiral-perl6.png';</lang>
REXX
This REXX version allows the user to specify (or override) the various constants used to calculate and display the spiral (plot).
Note: the value of a doesn't mean that much as the plot is automatically centered. <lang rexx>/*REXX pgm plots several cycles (half a spiral) of the Archimedean spiral (ASCII plot).*/ parse arg cy a b inc chr . /*obtain optional arguments from the CL*/ if cy== | cy=="," then cy= 3 /*Not specified? Then use the default.*/ if a== | a=="," then a= 1 /* " " " " " " */ if b== | b=="," then b= 9 /* " " " " " " */ if inc== | inc=="," then inc= 0.02 /* " " " " " " */ if chr== | chr=="," then chr= '∙' /* " " " " " " */ if length(chr)==3 then chr= d2c(chr) /*plot character coded in decimal? */ if length(chr)==2 then chr= x2c(chr) /* " " " " hexadecimal? */ cy= max(2, cy); LOx= . /*set the LOx variable (a semaphore).*/ parse value scrsize() with sd sw . /*get the size of the terminal screen. */ w= sw - 1 ; mw= w * (cy-1) * 4 /*set useable width; max width for calc*/ h= sd - 1 + cy*10; mh= h * (cy-1) /* " " depth; " depth " " */ @.= /*initialize the line based plot field.*/
do t=1 to pi()*cy by inc /*calc all the coördinates for spiral. */ r= a + b* t /* " " " R " " */ x= w + r*cos(t); xx= x % 2 /* " " " X " " */ y= h + r*sin(t); yy= y % 2 /* " " " Y " " */ if x<0 | y<0 | x>mw | y>mh then iterate /*Is X or Y out of bounds? Then skip.*/ if LOx==. then do; LOx= xx; HIx= xx; LOy= yy; HIy= yy end /* [↑] find the minimums and maximums.*/ LOx= min(LOx, xx); HIx= max(HIx, xx) /*determine the X MIN and MAX. */ LOy= min(LOy, yy); HIy= max(HIy, yy) /* " " Y " " " */ @.yy= overlay(chr, @.yy, xx+1) /*assign the plot character (glyph). */ end /*t*/
call plot /*invoke plotting subroutine (to term).*/ exit /*stick a fork in it, we're all done. */ /*──────────────────────────────────────────────────────────────────────────────────────*/ pi: pi=3.1415926535897932384626433832795028841971693993751058209749445923078; return pi plot: do row=HIy to LOy by -1; say substr(@.row, LOx+1); end; return r2r: return arg(1) // (pi() * 2) /*normalize radians ───► a unit circle.*/ /*──────────────────────────────────────────────────────────────────────────────────────*/ cos: procedure; parse arg x; x= r2r(x); _= 1; a= abs(x); hpi= pi * .5
numeric fuzz min(6, digits() - 3); if a=pi then return -1 if a=hpi | a=hpi*3 then return 0 if a=pi / 3 then return .5 if a=pi * 2 / 3 then return -.5; q= x*x; z= 1 do k=2 by 2 until p=z; p= z; _= -_ *q/(k*k-k); z= z+_; end; return z
/*──────────────────────────────────────────────────────────────────────────────────────*/ sin: procedure; parse arg x; x= r2r(x); _= x; numeric fuzz min(5, max(1, digits() -3))
if x=pi * .5 then return 1; if x==pi*1.5 then return -1 if abs(x)=pi | x=0 then return 0; q= x*x; z= x do k=2 by 2 until p=z; p= z; _= -_ *q/(k*k+k); z= z+_; end; return z</lang>
- output when using the following inputs: 13 , 5 , db
(Output is shown at 1/20 size.)
█ █ █ ██ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ ██ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ ██ █ ██ █ ██ █ █ █ ██ █ █ ██ █ █ █ █ █ ██ █ ██ █ █ ██ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ ██ █ █ █ █ ██ █ █ █ █ ██ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ ███ ███ ███ ███ ███ █ █ █ █ ███ ███ █ █ █ █ █ ██ ██ █ █ █ █ █ ██ ██ █ █ █ ██ █ ██ █ █ █ ██ █ █ █ █ ██ █ █ █ █ █ █ ██ ██ █ █ █ █ █ █ ██ ██ █ █ █ █ █ █ █ █ █ ██ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ ██ █ █ █ █ █████ █ █ █ █ █ ███████ ███████ █ █ █ █ █ ████ ████ █ █ █ █ █ ███ ████ █ █ █ █ ███ ██ █ █ █ █ █ █ ██ ███ █ █ █ ██ ██ █ █ █ █ █ █ ██ ██ █ █ █ █ █ █ █ █ █ █ ██ █ █ █ █ █ █ █ ██ █ █ █ █ █ ██ ██ █ █ █ █ █ █ █ █ █ █ ██ ██ █ █ █ █ █ █ █ █ █ █ ██ ██ █ █ █ █ █ █ █ ████████████ █ █ █ █ █ █ █████ ████ ██ █ █ █ █ ███ ████ █ █ █ █ █ █ █ ███ ███ █ █ █ █ █ █ █ ██ ███ █ █ █ █ ██ ██ █ █ █ █ █ █ ███ ██ █ █ █ █ █ █ ██ █ █ █ █ █ █ █ ██ ██ █ █ █ █ █ █ ██ █ ██ █ █ █ █ █ █ █ ██ █ █ █ █ █ ██ █ █ █ █ █ █ █ █ █ ██ █ █ █ █ █ █ ██ █ █ █ █ █ █ █ ██ █ █ █ █ █ ██ █ █ █ █ █ █ █ █ █ █ ████████████ █ █ █ █ █ █ ███ ███ █ █ █ █ █ █ █ █ █ ██ ███ █ ██ █ █ █ █ █ ██ ██ █ █ █ █ █ █ █ █ ██ ██ ██ █ █ █ █ █ █ █ ██ ██ █ █ █ █ █ █ █ █ █ ██ ██ █ █ █ █ █ ██ █ █ █ █ █ █ █ █ █ █ █ ██ █ █ █ █ █ █ ██ ██ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ ██ ██ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ ██ █ █ █ █ █ █ █ █ ██ █████ █ █ █ █ █ █ █ █ █ ███ ███ █ █ █ █ █ █ █ █ █ ██ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ ██ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ ██ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ ██ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ ██ ██ █ █ █ █ █ █ █ █ █ █ ██ █ █ █ █ █ █ █ █ ██ █ █ █ █ █ █ █ █ █ █ ██ █ █ █ █ █ █ █ ██ ██ ██ █ █ █ █ █ █ █ ███ ███ ██ █ █ █ █ █ █ █ █ █ █████ █████ █ █ █ █ █ █ █ █ ███ ██ ██ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ ██ █ █ █ █ █ █ ██ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ ██ █ █ █ █ █ █ █ ██ █ █ █ █ █ █ █ █ ██ █ █ █ █ █ ██ ██ ██ █ █ █ █ █ █ ██ ██ ██ █ █ █ █ █ █ ██ ██ █ █ █ █ █ █ ██ ███ █ █ █ █ █ ██ ███ ████ ██ █ █ █ █ █ █ ████ ████ █ █ █ █ █ █ █ █████████████ █ █ █ █ █ █ ██ █ █ █ █ █ ██ █ █ █ █ █ █ █ ██ █ █ █ █ ██ █ █ █ █ ██ █ █ █ █ █ █ █ ██ █ █ █ █ ██ █ ██ █ █ █ █ █ ██ █ █ █ █ █ ██ ██ █ █ █ █ █ ██ █ █ █ █ █ █ █ ███ ███ █ █ █ ██ ██ █ █ █ █ █ █ ███ ████ █ █ █ █ ██ ████ ███ █ █ █ █ ██████ ██████ █ █ █ █ █ ██████████ █ █ █ █ ██ █ █ █ █ ██ █ █ █ █ █ █ █ █ █ ██ ██ █ █ █ █ █ █ █ ██ ██ █ █ █ █ █ █ █ █ █ ██ ██ █ █ █ ██ █ █ █ █ █ █ ██ ██ █ █ █ ██ ██ █ █ █ ███ ███ █ █ █ █ ██ █ ███ █ █ █ ████ ███ █ █ █ █ ██ ████ ██████ ██████ █ █ █ █ █ █ ██ █ █ █ █ █ █ █ █ █ █ █ █ █ █ ██ █ █ █ █ ██ █ ██ █ █ █ ██ █ █ ██ █ █ █ █ █ ██ █ █ █ █ ██ █ █ ██ ██ █ █ ██ █ ██ █ █ █ ██ █ ██ ██ █ █ █ ██ ██ ██ ██ ██ ██ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ █ ██ █ █ █ █ █ ██ ██ █ █ █ █ ██ █ ██ █ █ █ ██ █ █ █ █ █ █ █ ██ █ █ █ █
Ring
<lang ring> /*
+--------------------------------------------------------------------------------------------------------- + Program Name : Archimedean spiral +---------------------------------------------------------------------------------------------------------
- /
Load "guilib.ring"
horzSize = 400 vertSize = 400
counter = 0 ### cycle thru colors colorRed = new qcolor() { setrgb(255,000,000,255) } colorGreen = new qcolor() { setrgb(000,255,000,255) } colorBlue = new qcolor() { setrgb(000,000,255,255) } colorYellow = new qcolor() { setrgb(255,255,000,255) }
penUseR = new qpen() { setcolor(colorRed) setwidth(1) } penUseG = new qpen() { setcolor(colorGreen) setwidth(1) } penUseB = new qpen() { setcolor(colorBlue) setwidth(1) } penUseY = new qpen() { setcolor(colorYellow) setwidth(1) }
deg2rad = atan(1) * 4 / 180 screensize = 600 turns = 5 halfscrn = screensize / 2 sf = (turns * (screensize - 100)) / halfscrn x = 1 y = 1 r = 0 inc = 0.50 ### control increment speed of r
New qapp {
win1 = new qwidget() { setwindowtitle("Draw Spiral") setgeometry(100,100,600,600) label1 = new qlabel(win1) { setgeometry(10,10,600,600) settext("") } Canvas = new qlabel(win1) { MonaLisa = new qPixMap2( 600,600) color = new qcolor(){ setrgb(255,0,0,255) }
daVinci = new qpainter() { begin(MonaLisa) penUse = new qpen() { setcolor(colorRed) setwidth(1) } setpen(penUseR) #endpaint() ### This will Stop the Painting } setpixmap(MonaLisa) } oTimer = new qTimer(win1) { setinterval(1) ### 1 millisecond settimeoutevent("DrawCounter()") start() } show() ### Will show Painting ONLY after exec } exec()
}
- ====================================================
Func DrawCounter()
x = cos(r * deg2rad) * r / sf y = sin(r * deg2rad) * r / sf r += inc ### 0.20 fast, 0.90 slow
if r >= turns * 360 r = inc x = 1 y = 1 counter++ whichColor = counter % 4 See "whichColor: "+ whichColor +nl
if whichColor = 0 daVinci.setpen(penUseR) ok if whichColor = 1 daVinci.setpen(penUseG) ok if whichColor = 2 daVinci.setpen(penUseB) ok if whichColor = 3 daVinci.setpen(penUseY) ok ok
hpoint = halfscrn + x ypoint = halfscrn - y
daVinci.drawpoint(hpoint, ypoint) Canvas.setpixmap(MonaLisa) ### Need this setpixmap to display imageLabel win1.show() ### Need this show to display imageLabel
return </lang>
Ruby
JRubyArt is an implementation of Processing in ruby, that uses JRuby to provide the interoperability with the java libraries. <lang ruby> INCR = 0.1 attr_reader :x, :theta
def setup
sketch_title 'Archimedian Spiral' @theta = 0 @x = 0 background(255) translate(width / 2.0, height / 2.0) begin_shape (0..50*PI).step(INCR) do |theta| @x = theta * cos(theta / PI) curve_vertex(x, theta * sin(theta / PI)) end end_shape
end
def settings
size(300, 300)
end </lang>
Rust
<lang rust>#[macro_use(px)] extern crate bmp;
use bmp::{Image, Pixel}; use std::f64;
fn main() {
let width = 600u32; let half_width = (width / 2) as i32; let mut img = Image::new(width, width); let draw_color = px!(255, 128, 128);
// Constants defining the spiral size. let a = 1.0_f64; let b = 9.0_f64;
// max_angle = number of spirals * 2pi. let max_angle = 5.0_f64 * 2.0_f64 * f64::consts::PI;
let mut theta = 0.0_f64; while theta < max_angle { theta = theta + 0.002_f64;
let r = a + b * theta; let x = (r * theta.cos()) as i32 + half_width; let y = (r * theta.sin()) as i32 + half_width; img.set_pixel(x as u32, y as u32, draw_color); }
// Save the image let _ = img.save("archimedean_spiral.bmp").unwrap_or_else(|e| panic!("Failed to save: {}", e));
}</lang>
SAS
<lang sas>data xy; h=constant('pi')/40; do i=0 to 400;
t=i*h; x=(1+t)*cos(t); y=(1+t)*sin(t); output;
end; keep x y; run;
proc sgplot; series x=x y=y; run;</lang>
Scala
Java Swing Interoperability
<lang Scala>
object ArchimedeanSpiral extends App {
SwingUtilities.invokeLater(() => new JFrame("Archimedean Spiral") {
class ArchimedeanSpiral extends JPanel { setPreferredSize(new Dimension(640, 640)) setBackground(Color.white)
private def drawGrid(g: Graphics2D): Unit = { val (angle, margin, numRings) = (toRadians(45), 10, 8) val w = getWidth val (center, spacing) = (w / 2, (w - 2 * margin) / (numRings * 2))
g.setColor(new Color(0xEEEEEE)) for (i <- 0 until numRings) { val pos = margin + i * spacing val size = w - (2 * margin + i * 2 * spacing) g.drawOval(pos, pos, size, size) val ia = i * angle val x2 = center + (cos(ia) * (w - 2 * margin) / 2).toInt val y2 = center - (sin(ia) * (w - 2 * margin) / 2).toInt g.drawLine(center, center, x2, y2) } }
private def drawSpiral(g: Graphics2D): Unit = { val (degrees: Double, center) = (toRadians(0.1), getWidth / 2) val (a, b, c, end) = (0, 20, 1, 360 * 2 * 10 * degrees)
def plot(g: Graphics2D, x: Int, y: Int): Unit = g.drawOval(x, y, 1, 1)
def iter(theta: Double): Double = { if (theta < end) { val r = a + b * pow(theta, 1 / c) val x = r * cos(theta) val y = r * sin(theta) plot(g, (center + x).toInt, (center - y).toInt) iter(theta + degrees) } else theta }
g.setStroke(new BasicStroke(2)) g.setColor(Color.orange) iter(0) }
override def paintComponent(gg: Graphics): Unit = { super.paintComponent(gg) val g = gg.asInstanceOf[Graphics2D] g.setRenderingHint(RenderingHints.KEY_ANTIALIASING, RenderingHints.VALUE_ANTIALIAS_ON) drawGrid(g) drawSpiral(g) } }
add(new ArchimedeanSpiral, BorderLayout.CENTER) pack() setDefaultCloseOperation(WindowConstants.EXIT_ON_CLOSE) setLocationRelativeTo(null) setResizable(false) setVisible(true) } )
}</lang>
Scheme
<lang scheme> (import (scheme base)
(scheme complex) (rebottled pstk))
- settings for spiral
(define *resolution* 0.01) (define *count* 2000) (define *a* 10) (define *b* 10) (define *center*
(let ((size 200)) ; change this to alter size of display (* size 1+i)))
(define (draw-spiral canvas)
(define (coords theta) (let ((r (+ *a* (* *b* theta)))) (make-polar r theta))) ; (do ((i 0 (+ i 1))) ; loop to draw spiral ((= i *count*) ) (let ((c (+ (coords (* i *resolution*)) *center*))) (canvas 'create 'line (real-part c) (imag-part c) (+ 1 (real-part c)) (imag-part c)))))
(let ((tk (tk-start)))
(tk/wm 'title tk "Archimedean Spiral") (let ((canvas (tk 'create-widget 'canvas))) (tk/pack canvas) (canvas 'configure 'height: (* 2 (real-part *center*)) 'width: (* 2 (imag-part *center*))) (draw-spiral canvas)) (tk-event-loop tk))
</lang>
Scilab
<lang>a = 3; b = 2;
theta = linspace(0,10*%pi,1000); r = a + b .* theta;
//1. Plot using polar coordinates scf(1); polarplot(theta,r);
//2. Plot using rectangular coordinates //2.1 Convert coordinates using Euler's formula z = r .* exp(%i .* theta); x = real(z); y = imag(z);
scf(2); plot2d(x,y);</lang>
Seed7
<lang seed7>$ include "seed7_05.s7i";
include "draw.s7i"; include "keybd.s7i";
const proc: main is func
local const float: xCenter is 117.0; const float: yCenter is 139.0; const float: maxTheta is 10.0 * PI; const float: delta is 0.01; const float: a is 1.0; const float: b is 7.0; var float: theta is 0.0; var float: radius is 0.0; begin screen(256, 256); clear(curr_win, black); KEYBOARD := GRAPH_KEYBOARD; while theta <= maxTheta do radius := a + b * theta; point(round(xCenter + radius * cos(theta)), round(yCenter - radius * sin(theta)), white); theta +:= delta; end while; DRAW_FLUSH; ignore(getc(KEYBOARD)); end func;</lang>
Sidef
<lang ruby>require('Imager') define π = Num.pi
var (w, h) = (400, 400) var img = %O<Imager>.new(xsize => w, ysize => h)
for Θ in (0 .. 52*π -> by(0.025)) {
img.setpixel( x => floor(cos(Θ / π)*Θ + w/2), y => floor(sin(Θ / π)*Θ + h/2), color => [255, 0, 0] )
}
img.write(file => 'Archimedean_spiral.png')</lang> Output image: Archimedean spiral
Stata
<lang stata>clear all scalar h=_pi/40 set obs 400 gen t=_n*h gen x=(1+t)*cos(t) gen y=(1+t)*sin(t) line y x</lang>
Tcl
This creates a little Tk GUI where you can interactively enter values for `a` and `b`. The spiral will be re-drawn automatically thanks to `trace`:
<lang Tcl>package require Tk
- create widgets
canvas .canvas frame .controls
ttk::label .legend -text " r = a + b θ " ttk::label .label_a -text "a =" ttk::entry .entry_a -textvariable a ttk::label .label_b -text "a =" ttk::entry .entry_b -textvariable b button .button -text "Redraw" -command draw
- layout
grid .canvas .controls -sticky nsew grid .legend - -sticky ns -in .controls grid .label_a .entry_a -sticky nsew -in .controls grid .label_b .entry_b -sticky nsew -in .controls grid .button - -sticky ns -in .controls
- make the canvas resize with the window
grid columnconfigure . 0 -weight 1 grid rowconfigure . 0 -weight 1
- spiral parameters:
set a .2 set b .05
proc draw {} {
variable a variable b
# make sure inputs are valid: if {![string is double $a] || ![string is double $b]} return if {$a == 0 || $b == 0} return
set w [winfo width .canvas] set h [winfo height .canvas] set r 0 set pi [expr {4*atan(1)}] set step [expr {$pi / $w}] for {set t 0} {$r < 2} {set t [expr {$t + $step}]} { set r [expr {$a + $b * $t}] set y [expr {sin($t) * $r}] set x [expr {cos($t) * $r}]
# transform to canvas co-ordinates set y [expr {entier((1+$y)*$h/2)}] set x [expr {entier((1+$x)*$w/2)}] lappend coords $x $y } .canvas delete all set id [.canvas create line $coords -fill red]
}
- draw whenever parameters are changed
- ";#" so extra trace arguments are ignored
trace add variable a write {draw;#} trace add variable b write {draw;#}
wm protocol . WM_DELETE_WINDOW exit ;# exit when window is closed
update ;# lay out widgets before trying to draw draw vwait forever ;# go into event loop until window is closed</lang>
VBA
<lang vb>Private Sub plot_coordinate_pairs(x As Variant, y As Variant)
Dim chrt As Chart Set chrt = ActiveSheet.Shapes.AddChart.Chart With chrt .ChartType = xlXYScatter .HasLegend = False .SeriesCollection.NewSeries .SeriesCollection.Item(1).XValues = x .SeriesCollection.Item(1).Values = y End With
End Sub Public Sub main()
Dim x(1000) As Single, y(1000) As Single a = 1 b = 9 For i = 0 To 1000 theta = i * WorksheetFunction.Pi() / 60 r = a + b * theta x(i) = r * Cos(theta) y(i) = r * Sin(theta) Next i plot_coordinate_pairs x, y
End Sub</lang>
Wren
<lang ecmascript>import "graphics" for Canvas, Color import "dome" for Window
class Game {
static init() { Window.title = "Archimedean Spiral" __width = 400 __height = 400 Canvas.resize(__width, __height) Window.resize(__width, __height) var col = Color.red spiral(col) }
static spiral(col) { var theta = 0 while (theta < 52 * Num.pi) { var x = ((theta/Num.pi).cos * theta + __width/2).truncate var y = ((theta/Num.pi).sin * theta + __height/2).truncate Canvas.pset(x, y, col) theta = theta + 0.025 } }
static update() {}
static draw(dt) {}
}</lang>
XPL0
Looks a lot like the C++ image. <lang XPL0>real A, B, R, T, X, Y; [SetVid($12); \set 640x480 graphics A:= 0.0; B:= 3.0; T:= 0.0; Move(320, 240); \start at center of screen repeat R:= A + B*T;
X:= R*Cos(T); Y:= R*Sin(T); Line(fix(X)+320, 240-fix(Y), 4\red\); T:= T + 0.03; \increase angle (Theta)
until T >= 314.159; \50 revs ]</lang>
Yabasic
<lang Yabasic>5 OPEN WINDOW 320, 200 : WINDOW ORIGIN "CC" 10 LET A=1.5 20 LET B=0.7 30 FOR T=0 TO 30*PI STEP 0.05 40 LET R=A+B*T 50 LINE TO R*COS(T),R*SIN(T) 60 NEXT T</lang>
zkl
Uses the PPM class from http://rosettacode.org/wiki/Bitmap/Bresenham%27s_line_algorithm#zkl <lang zkl>fcn archimedeanSpiral(a,b,circles){
w,h:=640,640; centerX,centerY:=w/2,h/2; bitmap:=PPM(w+1,h+1,0xFF|FF|FF); // White background
foreach deg in ([0.0 .. 360*circles]){ rad:=deg.toRad(); r:=rad*b + a; x,y:=r.toRectangular(rad); bitmap[centerX + x, centerY + y] = 0x00|FF|00; // Green dot } bitmap.writeJPGFile("archimedeanSpiral.jpg");
}(0,5,7);</lang>
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