Based on information in Chapter 7 of 3D Programming For Windows (Charles Petzold), I've attempted to write as helper function that projects a Point3D to a standard 2D Point that contains the corresponding screen coordinates (x,y):

```
public Point Point3DToScreen2D(Point3D point3D,Viewport3D viewPort )
{
double screenX = 0d, screenY = 0d;
// Camera is defined in XAML as:
// <Viewport3D.Camera>
// <PerspectiveCamera Position="0,0,800" LookDirection="0,0,-1" />
// </Viewport3D.Camera>
PerspectiveCamera cam = viewPort.Camera as PerspectiveCamera;
// Translate input point using camera position
double inputX = point3D.X - cam.Position.X;
double inputY = point3D.Y - cam.Position.Y;
double inputZ = point3D.Z - cam.Position.Z;
double aspectRatio = viewPort.ActualWidth / viewPort.ActualHeight;
// Apply projection to X and Y
screenX = inputX / (-inputZ * Math.Tan(cam.FieldOfView / 2));
screenY = (inputY * aspectRatio) / (-inputZ * Math.Tan(cam.FieldOfView / 2));
// Convert to screen coordinates
screenX = screenX * viewPort.ActualWidth;
screenY = screenY * viewPort.ActualHeight;
// Additional, currently unused, projection scaling factors
/*
double xScale = 1 / Math.Tan(Math.PI * cam.FieldOfView / 360);
double yScale = aspectRatio * xScale;
double zFar = cam.FarPlaneDistance;
double zNear = cam.NearPlaneDistance;
double zScale = zFar == Double.PositiveInfinity ? -1 : zFar / (zNear - zFar);
double zOffset = zNear * zScale;
*/
return new Point(screenX, screenY);
}
```

On testing however this function returns incorrect screen coordinates (checked by comparing 2D mouse coordinates against a simple 3D shape). Due to my lack of 3D programming experience I am confused as to why.

The block commented section contains scaling calculations that may be essential, however I am not sure how, and the book continues with the MatrixCamera using XAML. Initially I just want to get a basic calculation working regardless of how inefficient it may be compared to Matrices.

Can anyone advise what needs to be added or changed?