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.

I have several points, and I try to draw Bezier curve using code below

 PathFigure pf = new PathFigure(points.From, ps, false); //ps - list of Bezier segments
    PathFigureCollection pfc = new PathFigureCollection();
    pfc.Add(pf);
    var pge = new PathGeometry();
    pge.Figures = pfc;
    Path p = new Path();
    p.Data = pge;
    p.Stroke = new SolidColorBrush(Color.FromRgb(244, 111, 011));

My Bezier segments look like this

  • 1,2,3 points - first segment
  • 3,4,5 points - second
  • 5,6,7.. ..

But I got this strange curve (here is 3 big (Nodes) and 7 small ellipse (is my points)):

enter image description here

share|improve this question
    
I see it's natural to have this figure, can you post a link with the desired curve ? –  DotNeter Dec 19 '12 at 8:52
    
Or, maybe, you want to draw a single segment with 7 control points ? –  DotNeter Dec 19 '12 at 8:54
add comment

2 Answers 2

up vote 9 down vote accepted

The line you're getting is the union of three distinct Bezier curves - one for each group of three points. (One for each "Bezier segment"?)

If you want a single smooth curve, you need to pass your 9 (or more) points as a single collection of points (single "Bezier segment"?), not as groups of three points.

Edit: Apparently BezierSegment only supports three points, so no wonder this doesn't work. Even 'PolyBezierSegment' just gives a collection of Bezier segments rather than a single smooth Bezier...

So since WPF doesn't give you anything useful, I knocked something together using the maths here. It's a numeric solution, but it seems to be pretty performant even with enough points to look nice and smooth:

PolyLineSegment GetBezierApproximation(Point[] controlPoints, int outputSegmentCount)
{
    Point[] points = new Point[outputSegmentCount + 1];
    for (int i = 0; i <= outputSegmentCount; i++)
    {
        double t = (double)i / outputSegmentCount;
        points[i] = GetBezierPoint(t, controlPoints, 0, controlPoints.Length);
    }
    return new PolyLineSegment(points, true);
}

Point GetBezierPoint(double t, Point[] controlPoints, int index, int count)
{
    if (count == 1)
        return controlPoints[index];
    var P0 = GetBezierPoint(t, controlPoints, index, count - 1);
    var P1 = GetBezierPoint(t, controlPoints, index + 1, count - 1);
    return new Point((1 - t) * P0.X + t * P1.X, (1 - t) * P0.Y + t * P1.Y);
}

Using this,

private void Grid_Loaded(object sender, RoutedEventArgs e)
{
    Point[] points = new[] { 
            new Point(0, 200),
            new Point(0, 0),
            new Point(300, 0),
            new Point(350, 200),
            new Point(400, 0)
        };
    var b = GetBezierApproximation(points, 256);
    PathFigure pf = new PathFigure(b.Points[0], new[] { b }, false);
    PathFigureCollection pfc = new PathFigureCollection();
    pfc.Add(pf);
    var pge = new PathGeometry();
    pge.Figures = pfc;
    Path p = new Path();
    p.Data = pge;
    p.Stroke = new SolidColorBrush(Color.FromRgb(255, 0, 0));
    ((Grid)sender).Children.Add(p);
}

gives

enter image description here

share|improve this answer
add comment

Since each of your curves has one control point (a point that influences the curve but isn't necessarily on the curve), you're using quadratic Bézier curves.

If you want to draw two quadratic curves that share an endpoint, and you want the joint to appear smooth, the control points on each side of the shared endpoint must be collinear with the endpoint. That is, the two control points and the endpoint between them must all lie on a straight line. Example:

quadratics with smooth joints

The solid black discs are the endpoints. The hollow circles are the control points. The solid black line is the curve. The dotted lines show that each endpoint is collinear (on a straight line with) the control point on either side.

share|improve this answer
add comment

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.