Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

Ok so granted, its not a bug, but I am confounded by how to get a perfect circle arc between points via Bézier curve.

I need a shape like this:

enter image description here

So I've been calculating the four corner points like this from the center point, radius and angle with the following formula: (x?,y?)=(x+d cos α,y+d sin α), which in my coffeescript looks something like this:

x1 = centerPointX+outerRadius*Math.cos(currentAngle)
y1 = centerPointY+outerRadius*Math.sin(currentAngle)
x2 = centerPointX+innerRadius*Math.cos(currentAngle)
y2 = centerPointY+innerRadius*Math.sin(currentAngle)
x3 = centerPointX+outerRadius*Math.cos(currentAngle2)
y3 = centerPointY+outerRadius*Math.sin(currentAngle2)
x4 = centerPointX+innerRadius*Math.cos(currentAngle2)
y4 = centerPointY+innerRadius*Math.sin(currentAngle2)

How can I take the information I have and result in a path element with perfect circular curves?

(PS I am newish to SVG and if you want to help me out with the proper syntax for d= that would be cool, but I can always just write it myself. The challenge I would like help with is really more to do with Bézier.

UPDATE / SOLUTION

Using the answer below a guidance below is the function I actually used:

annularSector = (centerX,centerY,startAngle,endAngle,innerRadius,outerRadius) ->               
    startAngle  = degreesToRadians startAngle+180
    endAngle    = degreesToRadians endAngle+180
    p           = [ 
        [ centerX+innerRadius*Math.cos(startAngle),     centerY+innerRadius*Math.sin(startAngle) ]
        [ centerX+outerRadius*Math.cos(startAngle),     centerY+outerRadius*Math.sin(startAngle) ]
        [ centerX+outerRadius*Math.cos(endAngle),       centerY+outerRadius*Math.sin(endAngle) ]
        [ centerX+innerRadius*Math.cos(endAngle),       centerY+innerRadius*Math.sin(endAngle) ] 
    ]
    angleDiff   = endAngle - startAngle
    largeArc    = (if (angleDiff % (Math.PI * 2)) > Math.PI then 1 else 0)
    commands    = []

    commands.push "M" + p[0].join()
    commands.push "L" + p[1].join()
    commands.push "A" + [ outerRadius, outerRadius ].join() + " 0 " + largeArc + " 1 " + p[2].join()
    commands.push "L" + p[3].join()
    commands.push "A" + [ innerRadius, innerRadius ].join() + " 0 " + largeArc + " 0 " + p[0].join()
    commands.push "z"

    return commands.join(" ")   
share|improve this question
    
To be sure, you need a path outlining that shape, correct? Having a single arc along the enter with a very wide and capped linestroke does not suffice...right? –  Phrogz Jul 13 '12 at 23:03
    
Also, note that this is not possible exactly using Bézier quadratic bezier handles only. It can be done exactly using the SVG arc command however. Do you want a Bézier approximation or an exact arc-based solution? –  Phrogz Jul 13 '12 at 23:06
    
@Phrogz yes, outline please. –  Fresheyeball Jul 14 '12 at 6:38
    
Arc works too! As long as its the outline. –  Fresheyeball Jul 14 '12 at 6:39
    
Dear downvoter, care to comment? –  Fresheyeball May 14 '14 at 19:37

1 Answer 1

up vote 11 down vote accepted

Demo: http://phrogz.net/svg/procedural_annular_sector.xhtml

Usage:

annularSector( myPathElement, {
  centerX:100, centerY:150,
  startDegrees:190, endDegrees:230,
  innerRadius:75, outerRadius:100
});

Core function:

// Options:
// - centerX, centerY: coordinates for the center of the circle    
// - startDegrees, endDegrees: fill between these angles, clockwise
// - innerRadius, outerRadius: distance from the center
// - thickness: distance between innerRadius and outerRadius
//   You should only specify two out of three of the radii and thickness
function annularSector(path,options){
  var opts = optionsWithDefaults(options);
  var p = [ // points
    [opts.cx + opts.r2*Math.cos(opts.startRadians),
     opts.cy + opts.r2*Math.sin(opts.startRadians)],
    [opts.cx + opts.r2*Math.cos(opts.closeRadians),
     opts.cy + opts.r2*Math.sin(opts.closeRadians)],
    [opts.cx + opts.r1*Math.cos(opts.closeRadians),
     opts.cy + opts.r1*Math.sin(opts.closeRadians)],
    [opts.cx + opts.r1*Math.cos(opts.startRadians),
     opts.cy + opts.r1*Math.sin(opts.startRadians)],
  ];

  var angleDiff = opts.closeRadians - opts.startRadians;
  var largeArc = (angleDiff % (Math.PI*2)) > Math.PI ? 1 : 0;
  var cmds = [];
  cmds.push("M"+p[0].join());                                // Move to P0
  cmds.push("A"+[opts.r2,opts.r2,0,largeArc,1,p[1]].join()); // Arc to  P1
  cmds.push("L"+p[2].join());                                // Line to P2
  cmds.push("A"+[opts.r1,opts.r1,0,largeArc,0,p[3]].join()); // Arc to  P3
  cmds.push("z");                                // Close path (Line to P0)
  path.setAttribute('d',cmds.join(' '));

  function optionsWithDefaults(o){
    // Create a new object so that we don't mutate the original
    var o2 = {
      cx           : o.centerX || 0,
      cy           : o.centerY || 0,
      startRadians : (o.startDegrees || 0) * Math.PI/180,
      closeRadians : (o.endDegrees   || 0) * Math.PI/180,
    };

    var t = o.thickness!==undefined ? o.thickness : 100;
    if (o.innerRadius!==undefined)      o2.r1 = o.innerRadius;
    else if (o.outerRadius!==undefined) o2.r1 = o.outerRadius - t;
    else                                o2.r1 = 200           - t;
    if (o.outerRadius!==undefined)      o2.r2 = o.outerRadius;
    else                                o2.r2 = o2.r1         + t;

    if (o2.r1<0) o2.r1 = 0;
    if (o2.r2<0) o2.r2 = 0;

    return o2;
  }
}
share|improve this answer
    
Man you went overboard! Thank you! –  Fresheyeball Jul 14 '12 at 18:08
1  
@Fresheyeball You're welcome. Note that I just updated the demo and answer to be slightly cleaner. (Re-order the points so that the final closePath command draws one of the straight lines, and use array.join() instead of string concatenation to get code that is more efficient, less characters, and more clear. –  Phrogz Jul 16 '12 at 16:01
    
Cool, you should also check that end is greater than start, (ie. add 360degrees to end if it's less.) e.g. var _end = (end < start) ? (Math.PI*2) + end : end; –  Slomojo Nov 12 '12 at 12:31
    
(it's probably worth checking how much greater start is than end, or just normalise them to (ie. angle % Math.PI*2) first.) –  Slomojo Nov 12 '12 at 14:13
    
Awesome, works beautifully thanks –  monkeyboy May 12 '13 at 8:18

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.