# How can I calculate the area of a bezier curve?

Given the following path (for example) which describes a SVG cubic bezier curve: "M300,140C300,40,500,40,500,140", and assuming a straight line connecting the end points 300,140 to 500,140 (closing the area under the curve), is it possible to calculate the area so enclosed?

Can anyone suggest a formula (or javascript) to accomplish this?

I've been researching this for a while but apparently I'm just not using the right search terms...

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You might get quicker & better answers at math.stackexchange.com –  Ramesh Apr 6 '12 at 8:33
Looking forward to seeing a good answer to this question :) –  mihai Apr 6 '12 at 14:43
It would be good if you clarified your expectations when a) the curve crosses the connecting line (goes "negative", like a 'u'), and b) the curve has a loop (e.g. the cursive letter 'e'), and c) the curve has multiple y values for each x (e.g. the capital letter 'S'). –  Phrogz Apr 6 '12 at 14:59

Convert the path to a polygon of arbitrary precision, and then calculate the area of the polygon.

## Interactive Demo: Area of Path via Subdivision

At its core the above demo uses functions for adaptively subdividing path into a polygon and computing the area of a polygon:

``````// path:      an SVG <path> element
// threshold: a 'close-enough' limit (ignore subdivisions with area less than this)
// segments:  (optional) how many segments to subdivisions to create at each level
// returns:   a new SVG <polygon> element
function pathToPolygonViaSubdivision(path,threshold,segments){
if (!threshold) threshold = 0.0001; // Get really, really close
if (!segments)  segments = 3;       // 2 segments creates 0-area triangles

var points = subdivide( ptWithLength(0), ptWithLength( path.getTotalLength() ) );
for (var i=points.length;i--;) points[i] = [points[i].x,points[i].y];

var doc  = path.ownerDocument;
var poly = doc.createElementNS('http://www.w3.org/2000/svg','polygon');
poly.setAttribute('points',points.join(' '));
return poly;

// Record the distance along the path with the point for later reference
function ptWithLength(d) {
var pt = path.getPointAtLength(d); pt.d = d; return pt;
}

// Create segments evenly spaced between two points on the path.
// If the area of the result is less than the threshold return the endpoints.
// Otherwise, keep the intermediary points and subdivide each consecutive pair.
function subdivide(p1,p2){
var pts=[p1];
for (var i=1,step=(p2.d-p1.d)/segments;i<segments;i++){
pts[i] = ptWithLength(p1.d + step*i);
}
pts.push(p2);
if (polyArea(pts)<=threshold) return [p1,p2];
else {
var result = [];
for (var i=1;i<pts.length;++i){
var mids = subdivide(pts[i-1], pts[i]);
mids.pop(); // We'll get the last point as the start of the next pair
result = result.concat(mids)
}
result.push(p2);
return result;
}
}

// Calculate the area of an polygon represented by an array of points
function polyArea(points){
var p1,p2;
for(var area=0,len=points.length,i=0;i<len;++i){
p1 = points[i];
p2 = points[(i-1+len)%len]; // Previous point, with wraparound
area += (p2.x+p1.x) * (p2.y-p1.y);
}
return Math.abs(area/2);
}
}
``````
``````// Return the area for an SVG <polygon> or <polyline>
// Self-crossing polys reduce the effective 'area'
function polyArea(poly){
var area=0,pts=poly.points,len=pts.numberOfItems;
for(var i=0;i<len;++i){
var p1 = pts.getItem(i), p2=pts.getItem((i+-1+len)%len);
area += (p2.x+p1.x) * (p2.y-p1.y);
}
return Math.abs(area/2);
}
``````

Following is the original answer, which uses a different (non-adaptive) technique for converting the `<path>` to a `<polygon>`.

### Interactive Demo: http://phrogz.net/svg/area_of_path.xhtml

At its core the above demo uses functions for approximating a path with a polygon and computing the area of a polygon.

``````// Calculate the area of an SVG polygon/polyline
function polyArea(poly){
var area=0,pts=poly.points,len=pts.numberOfItems;
for(var i=0;i<len;++i){
var p1 = pts.getItem(i), p2=pts.getItem((i+len-1)%len);
area += (p2.x+p1.x) * (p2.y-p1.y);
}
return Math.abs(area/2);
}

// Create a <polygon> approximation for an SVG <path>
function pathToPolygon(path,samples){
if (!samples) samples = 0;
var doc = path.ownerDocument;
var poly = doc.createElementNS('http://www.w3.org/2000/svg','polygon');

// Put all path segments in a queue
for (var segs=[],s=path.pathSegList,i=s.numberOfItems-1;i>=0;--i)
segs[i] = s.getItem(i);
var segments = segs.concat();

var seg,lastSeg,points=[],x,y;
if (s.pathSegType == SVGPathSeg.PATHSEG_CLOSEPATH){

}else{
if (s.pathSegType%2==1 && s.pathSegType>1){
x+=s.x; y+=s.y;
}else{
x=s.x; y=s.y;
}
var last = points[points.length-1];
if (!last || x!=last[0] || y!=last[1]) points.push([x,y]);
}
};
for (var d=0,len=path.getTotalLength(),step=len/samples;d<=len;d+=step){
var seg = segments[path.getPathSegAtLength(d)];
var pt  = path.getPointAtLength(d);
if (seg != lastSeg){
lastSeg = seg;
while (segs.length && segs[0]!=seg) addSegmentPoint( segs.shift() );
}
var last = points[points.length-1];
if (!last || pt.x!=last[0] || pt.y!=last[1]) points.push([pt.x,pt.y]);
}
for (var i=0,len=points.length;i<len;++i) points[i] = points[i].join(',');
poly.setAttribute('points',points.join(' '));
return poly;
}
``````
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See my edit for a working example of this. –  Phrogz Apr 6 '12 at 20:14
WoW! Good job man! –  mihai Apr 6 '12 at 20:23
actually your solution is innovative, of course it has no chance against to closed form solutions but you may write an optimized code and compare with a solution by numerical integration methods which follows similar approach with yours. –  Semih Ozmen Apr 6 '12 at 22:00
+1 for calc-free. –  Harold Apr 6 '12 at 23:18
This is a fine quick and dirty brute force solution. But if you want more exact precision, this is not suitable: try to set extra samples to 100 and make a tight curve (curve that has a high curvature area somewhere). You see that in this part there are not enough samples. The solution is then to increase the sample size from 100 to 200 or 500, but this makes the code slow when there are tens of curves. Better, faster and more precise solution is eg. an adaptive curve splitting, that produces more samples on tight parts and less in looser parts of the curve. –  Timo Jun 7 '13 at 12:13

Firstly, I am not so familier with bezier curves, but I know that they are continuous functions. If you ensure that your cubic curve does not intersect itself, you may integrate it in closed form (I mean by using analytic integrals) on the given enclosing domain ([a-b]) and subtract the area of triangle that is formed by the the end joining straight line and X axis. In case of intersection with the Bezier curve and end joining straight line, you may divide into sections and try to calculate each area separately in a consistent manner..

For me suitable search terms are "continuous function integration" "integrals" "area under a function" "calculus"

OF course you may generate discrete data from your bezier curve fn and obtain discrete X-Y data and calculate the integral approximately.

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I hesitated to just make a comment or a full reply. But a simple Google search of "area bezier curve" results in the first three links (the first one being this same post), in :

http://objectmix.com/graphics/133553-area-closed-bezier-curve.html

that provides the closed form solution, using the divergence theorem. I am surprised that this link has not been found by the OP.

Copying the text in case the website goes down, and crediting the author of the reply Kalle Rutanen:

An interesting problem. For any piecewise differentiable curve in 2D, the following general procedure gives you the area inside the curve / series of curves. For polynomial curves (Bezier curves), you will get closed form solutions.

Let g(t) be a piecewise differentiable curve, with 0 <= t <= 1. g(t) is oriented clockwise and g(1) = g(0).

Let F(x, y) = [x, y] / 2

Then div(F(x, y)) = 1 where div is for divergence.

Now the divergence theorem gives you the area inside the closed curve g (t) as a line integral along the curve:

int(dot(F(g(t)), perp(g'(t))) dt, t = 0..1) = (1 / 2) * int(dot(g(t), perp(g'(t))) dt, t = 0..1)

perp(x, y) = (-y, x)

where int is for integration, ' for differentiation and dot for dot product. The integration has to be pieced to the parts corresponding to the smooth curve segments.

Now for examples. Take the Bezier degree 3 and one such curve with control points (x0, y0), (x1, y1), (x2, y2), (x3, y3). The integral over this curve is:

I := 3 / 10 * y1 * x0 - 3 / 20 * y1 * x2 - 3 / 20 * y1 * x3 - 3 / 10 * y0 * x1 - 3 / 20 * y0 * x2 - 1 / 20 * y0 * x3 + 3 / 20 * y2 * x0 + 3 / 20 * y2 * x1 - 3 / 10 * y2 * x3 + 1 / 20 * y3 * x0 + 3 / 20 * y3 * x1 + 3 / 10 * y3 * x2

Calculate this for each curve in the sequence and add them up. The sum is the area enclosed by the curves (assuming the curves form a loop).

If the curve consists of just one Bezier curve, then it must be x3 = x0 and y3 = y0, and the area is:

Area := 3 / 20 * y1 * x0 - 3 / 20 * y1 * x2 - 3 / 20 * y0 * x1 + 3 / 20 * y0 * x2 - 3 / 20 * y2 * x0 + 3 / 20 * y2 * x1

Hope I did not do mistakes.

--
Kalle Rutanen
http://kaba.hilvi.org

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thanks - that's really nice of you @finnw :) –  WhitAngl Apr 7 '13 at 1:47