# How to return all points along a bezier curve?

I posted a previous question about generating a bezier curve based on only the start and end points, and I was able thanks to the answers in that create a bezier curve using the information I have.

This is the code that allows me to draw the types of curve that I want on a form.

``````private void Form1_Paint(object sender, System.Windows.Forms.PaintEventArgs e)
{
Random rnd = new Random();
Point startp = new Point(rnd.Next(0, this.Width), rnd.Next(0, this.Height));
Point endp = new Point(rnd.Next(0, this.Width), rnd.Next(0, this.Height));
int xMod = 0;
int yMod = 0;
if (startp.X > endp.X) {
xMod = -1;
} else {
xMod = 1;
}
if (startp.Y > endp.Y) {
yMod = 1;
} else {
yMod = -1;
}
Point control1p = new Point(endp.X + (rnd.Next(20, 50) * xMod), endp.Y + (rnd.Next(20, 50) * yMod));
Point control2p = new Point(endp.X + (rnd.Next(5, 20) * xMod), endp.Y + (rnd.Next(5, 20) * yMod));
Point[] pts = {
startp,
control1p,
control2p,
endp
};
Pen dashed_pen = new Pen(Color.Black, 0);
dashed_pen.DashStyle = Drawing2D.DashStyle.Dash;
for (int i = 0; i <= 2; i++) {
e.Graphics.DrawLine(dashed_pen, pts(i), pts(i + 1));
}
e.Graphics.SmoothingMode = Drawing2D.SmoothingMode.HighQuality;
Pen bez_pen = new Pen(Color.Black, 3);
e.Graphics.DrawBezier(bez_pen, pts(0), pts(1), pts(2), pts(3))
}
``````

Is there a way, or can someone help me with returning all the points that form the curve? I'd like for each point of a curve calculated from those points to be returned in an array of points, but I'm having no luck figuring it out, and haven't been able to find a similar solution on stackoverflow or google in general.

Thanks.

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Please don't use tags in header. –  Brian Rasmussen Oct 28 '10 at 5:18

What you want to do is to convert a Bezier Curve (Cubic from the looks of it) into a `Polyline`

Use the Equation on this page...Value of `t` should be between `0 to 1`...Calculate all values of `Bx(t)` and `By(t)` by using the equation for values of t in increments of `"0, 0.01, 0.02....1"` (Convert them to `integers` of course) The smaller your increments, the more accurate your points will be.

Here's a C Sample of the DeCasteljau Algorithm (almost the same procedure, but its a bit optimized i believe) :)

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Perfect algorithm for creating smooth Bezier curve with optimal number of points is described by Maxim Shemanarev on Anti-Grain Geometry page: Adaptive Subdivision of Bezier Curves.

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It may help if you use a lerp or float t derivatives in-between the draw bezier. I've found it helps with accuracy; considering the number of float calcs .

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