Osculating plane
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A space curve, Frenet–Serret frame, and the osculating plane (spanned by T and N).
In mathematics, particularly in differential geometry, an osculating plane is a plane in a Euclidean space or affine space which meets a submanifold at a point in such a way as to have a second order of contact at the point. The word osculate is from the Latin osculatus which is a past participle of osculari, meaning to kiss. An osculating plane is thus a plane which "kisses" a submanifold.
The osculating plane in the geometry of Euclidean space curves can be described in terms of the Frenet-Serret formulas as the linear span of the tangent and normal vectors.[1]
See also
- Normal plane (geometry)
- Osculating circle
- Differential geometry of curves § Special Frenet vectors and generalized curvatures
References
- ↑ Do Carmo, Manfredo. Differential Geometry of Curves and Surfaces (2nd ed.). pp. 18. ISBN 978-0486806990.
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