The plane spanned by the three points 
, 
, and 
on a curve as 
. Let 
be a point on the osculating plane, then
![[(z-x),x^',x^('')]=0,](/images/equations/OsculatingPlane/NumberedEquation1.svg) |
where ![[A,B,C]](/images/equations/OsculatingPlane/Inline6.svg)
denotes the scalar triple product. The osculating
plane passes through the tangent. The intersection of the osculating plane with the
normal plane is known as the (principal) normal
vector. The vectors 
and 
(tangent vector and normal
vector) span the osculating plane.
