Found the spiral equation ( you have to decide wich one, different kind of spiral exists ) ie: http://mathworld.wolfram.com/ArchimedesSpiral.html that one is presented in polar coordinates. Given so you need to approximate it, for example by lines. This is the way I will go.
So I can post some code just as an example, I wrote in a scratch new wpf application,and I **removed the default grid from the xaml** ( necessary if you want to test soon the code ) :

```
public partial class MainWindow : Window
{
public MainWindow()
{
InitializeComponent();
Path p = new Path();
p.Data = CreateSpiralGeometry(1000, new Point() { X = 200, Y = 180 },Math.PI*10, 100);
p.Stroke = Brushes.Black;
AddChild(p);
}
private PathGeometry CreateSpiralGeometry(int nOfSteps, Point startPoint, double tetha, double alpha)
{
PathFigure spiral = new PathFigure();
spiral.StartPoint = startPoint;
for(int i=0;i<nOfSteps;++i)
{
var t = (tetha/nOfSteps)*i;
var a = (alpha/nOfSteps)*i;
Point to = new Point(){X=startPoint.X+a*Math.Cos(t), Y=startPoint.Y+a*Math.Sin(t)};
spiral.Segments.Add(new LineSegment(to,true));
}
return new PathGeometry(new PathFigure[]{ spiral});
}
}
```

@user310291, could you include some more information in your question, such as What you've tried so far, or where you've got stuck? Is your problem more mathematical in nature, or more XAML/WPF-related? etc. – stakx Feb 6 '11 at 11:35