Mathematics-Online course: Preparatory Course Mathematics-Linear Algebra and Geometry-Lines and Planes-Distance Point-Plane

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	Mathematics-Online course: Preparatory Course Mathematics - Linear Algebra and Geometry - Lines and Planes
	Distance Point-Plane

Given a plane with normal vector $\vec{n}$ through point

. Let

be the perpendicular projection of a given point

onto this plane. The so called perpendicular vector of point

onto the plane is given by

$\displaystyle \overrightarrow{XQ} = \frac{\overrightarrow{PQ}\cdot\vec{n}} {\vert\vec{n}\vert^2}\,\vec{n}\,.$

Its length

$\displaystyle d = \frac{\vert\overrightarrow{PQ}\cdot\vec{n}\vert} {\vert\vec{n}\vert}$

is the distance of the plane from

$\includegraphics[width=10cm]{abstand}$

(temporary unavailable)

automatically generated 1/9/2017