Given a line made up of several points, how do I make the line smoother/ curvier/ softer through adding intermediate points -- while keeping the original points completely intact and unmoved?

To illustrate, I want to go from the above to the below in this illustration:

enter image description here

Note how in the above picture, if we start at the bottom there will be a sharper right turn. In the bottom image however, this sharp right turn is made a bit "softer" by adding an intermediate point which is positioned in the middle of the two points, and using averages of the angles of the other lines. (Differently put, imagine the lines a race car would drive, as it couldn't abruptly change direction.) Note how, however, none of the original points was "touched", I just added more points.

Thanks!! For what it's worth, I'm implementing this using JavaScript and Canvas.


with each edge (e1 & e2) adjacent to each 'middle' edge (me) do

  • let X = half length of 'me'
  • find the 2 points X distance beyond the ends touching 'me' of e1 and e2 (see below)
  • let these 2 points become bezier control points.
  • use DeCasteljau algorithm (example here) to find midpoint of of cubic bezier (2 control points and each end of 'me')
  • insert new 'midpoint' between me's two coordinates.


FloatPoint ExtendLine(const FloatPoint A, const FloatPoint B, single distance)
  FloatPoint newB;
  float lenAB =  sqrt((A.x - B.x) * (A.x - B.x) + (A.y - B.y) * (A.y - B.y));
  newB.X = B.x - (B.x - A.x) / lenAB * distance;
  newB.Y = B.Y - (B.Y - A.Y) / lenAB * distance;
  return newB;

The following code found elsewhere here does the job for me, in the specific context of JavaScript-Canvas which I'm using -- but please see Angus' answer for a more general approach:

var max = points.length;
var i = 0;
context.moveTo(points[i].x, points[i].y);
for (i = 1; i < max - 2; i++) {
    var xc = (points[i].x + points[i + 1].x) * .5;
    var yc = (points[i].y + points[i + 1].y) * .5;
    context.quadraticCurveTo(points[i].x, points[i].y, xc, yc);
context.quadraticCurveTo(points[max - 2].x, points[max - 2].y, points[max - 1].x,points[max - 1].y);
  • What you're doing there is just creating a quadratic bezier curve based on your (control) vertices, also known as CV Curve. If this works for you, feel free to accept your own answer. :] – Xavier Ho Apr 19 '12 at 23:36
  • It does work in my specific case, thanks again for your comments! OK, I will go ahead and mark this as answer then. – Philipp Lenssen Apr 20 '12 at 9:30

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