# Converting a Vector Normal and Position to a parametric equation

Let's say I have the following:

``````float nx;
float ny;
float nz;
``````

Three components of a normalized vector. And also the following:

``````float px;
float py;
float pz;
``````

A point in space. These represent the position and normal of a camera. How would I get the three line equations:

``````float x = ti + tx*t
float y = tj + ty*t
float z = tk + tz*t
``````

Or more specifically, the constants required (called ti,tj,tk,tx,ty,tz in this case) from the normal and position? nx does not seem to equal tx (I've done some fooling around with planes and directions) so I'm a bit baffled as to how to translate one into another. All of the information necessary is definitely present, but I'm at a loss as to the math required.

Note the following:

`````` nx = (float)(-Math.cos(yawpos)*Math.cos(pitchpos));
ny = (float)(Math.sin(yawpos)*Math.cos(pitchpos));
nz = (float)(-Math.sin(pitchpos)));
``````
-
If you want `(x,y,z)` to be a point on the ray from the camera along the normal, then yes, tx=nx. What makes you think otherwise? –  Beta May 3 '12 at 12:30
the normals are an equation for a plane, not a ray. ;) EDIT: also, testing reveals that it isn't quite right. –  RiverC May 3 '12 at 13:13
Maybe I'm misunderstanding, but at any time, your camera's position is `(px, py, pz)`, so how can `(x, y, z)` depend on the normal? I guess I just don't really get what you're trying to do here (and I'm probably not the only one). –  Torious May 3 '12 at 13:52
You want `(x,y,z)` to describe points in the plane through the camera and normal to n? –  Beta May 3 '12 at 14:32
Actually, I think your response was correct -- My other math (calculations of intersections between lines and planes) was incorrect. –  RiverC May 3 '12 at 15:29
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