# Calculate 3D vector perpendicular to a plane generated by two vectors

I am new to dealing with 3D, and even simple stuff makes my head spin around. Sorry for the newbie question.

Lets say I have 2 vectors:

``````a(2,5,1)
b(1,-1,3)
``````

These vectors "generate" a plane. How can I get a third vector perpendicular to both a and b?

I can do this in 2D using a vector c(A,B) and turning it into c'(-B,A).

Thanks for the help.

Use the cross product.

That is, a vector perpendicular to `a` and `b` is given by `( a.y*b.z - a.z*b.y, a.z*b.x - a.x*b.z, a.x*b.y - a.y*b.x)`.

You take the cross multiplication of these two vectors to get a third perpendicular vector to the plane they generate:

``````P = A * B
``````

Which is:

``````<xp, yp, zp> = |i   j   k |
|xa  ya  za| // The determinant
|xb  yb  zb|
``````

All what you have to do is to solve this determinant or just look it up in Wikipedia :)

• I like this answer better because it explains where the answer comes from. Not just a random formula to remember. Oct 19 '09 at 23:52

For what it's worth, here's a cross product function from Quake 3, with vec3_t defined as an array of three floats for x, y, and z:

``````void CrossProduct( const vec3_t v1, const vec3_t v2, vec3_t cross ) {
cross = v1*v2 - v1*v2;
cross = v1*v2 - v1*v2;
cross = v1*v2 - v1*v2;
}
``````