# Given 3 points, how do I calculate the normal vector?

Given three 3D points (A,B, & C) how do I calculate the normal vector? The three points define a plane and I want the vector perpendicular to this plane.

Can I get sample C# code that demonstrates this?

• Math has a lot to do with programming. Especially this math, if you're doing anything 3D. Dec 27, 2009 at 18:10
• Give him a break, it's marked C# and .net-3.5. This is a problem that comes up immediately when you start programming 3D apps. Look at the related questions, we usually allow this stuff. Dec 27, 2009 at 18:31
• My decision line is: will the math that is being asked about be implemented in code. As it will, this gets to stay. May 25, 2010 at 6:55
• @NoonSilk: StackOverflow postings are read by other visitors, possibly a long time after they have been written (as you can see by my finding this question six years after your comment). Keeping questions that ought to be closed in a closed state and questions that ought to remain open in an open state is just a part of the usual curating to keep everything tidy for future visitors. Sep 15, 2016 at 10:32

It depends on the order of the points. If the points are specified in a counter-clockwise order as seen from a direction opposing the normal, then it's simple to calculate:

``````Dir = (B - A) x (C - A)
Norm = Dir / len(Dir)
``````

where `x` is the cross product.

If you're using OpenTK or XNA (have access to the Vector3 class), then it's simply a matter of:

``````class Triangle {
Vector3 a, b, c;
public Vector3 Normal {
get {
var dir = Vector3.Cross(b - a, c - a);
var norm = Vector3.Normalize(dir);
return norm;
}
}
}
``````

Form the cross-product of vectors BA and BC. See http://mathworld.wolfram.com/CrossProduct.html.

You need to calculate the cross product of any two non-parallel vectors on the surface. Since you have three points, you can figure this out by taking the cross product of, say, vectors AB and AC.

When you do this, you're calculating a surface normal, of which Wikipedia has a pretty extensive explanation.