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 Given a plane
and a point
and a vector from the plane to the point is given by
Projecting
Dropping the absolute value signs gives the signed distance,
which is positive if This can be expressed particularly conveniently for a plane specified in Hessian normal form by the simple equation
where Given three points
Then the distance from a point
where
as it must since all points are in the same plane, although this is far from obvious based on the above vector equation.
Gellert, W.; Gottwald, S.; Hellwich, M.; Kästner, H.; and Künstner, H. (Eds.). VNR Concise Encyclopedia of Mathematics, 2nd ed. New York: Van Nostrand Reinhold, 1989.  CITE THIS AS: Weisstein, Eric W. "Point-Plane Distance." From MathWorld--A Wolfram Web Resource. http://mathworld.wolfram.com/Point-PlaneDistance.html |
LINK: http://mathworld.wolfram.com/Point-PlaneDistance.html
![]()
, the ![v=[a; b; c],](http://mathworld.wolfram.com/images/equations/Point-PlaneDistance/NumberedEquation2.gif)
![w=-[x-x_0; y-y_0; z-z_0].](http://mathworld.wolfram.com/images/equations/Point-PlaneDistance/NumberedEquation3.gif)
onto 
gives the distance 
from the point to the plane as 
is on the same side of the plane as the normal vector 
and negative if it is on the opposite side. 
is the unit normal vector. Therefore, the distance of the plane from the origin is simply given by 
(Gellert et al. 1989, p. 541). 
for 
, 2, 3, compute the unit normal 
to the plane containing the three points is given by 
is any of the three points. Expanding out the coordinates shows that 