Everything about Coplanarity totally explained
In
geometry, a
set of points in space is
coplanar if the points all lie in the same geometric
plane. For example, three distinct points are always coplanar; but four points in space are
usually not coplanar.
Points can be shown to be coplanar by determining that the
scalar product of a
vector that's
normal to the plane and a vector from any point on the plane to the point being tested is 0. To put this another way, if you've a set of points which you want to determine are coplanar, first construct a vector for each point to one of the other points (by using the
distance formula, for example). Secondly, construct a vector which is
perpendicular (normal) to the plane to test (for example, by computing the
cross product of two of the vectors from the first step). Finally, compute the
dot product (which is the same as the scalar product) of this vector with each of the vectors you created in the first step. If the result of each dot product is 0, then all the points are coplanar.
Distance geometry provides a solution to the problem of determining if a set of points is coplanar, knowing only the distances between them.
Properties
If three 3-
dimensional vectors
.
Further Information
Get more info on 'Coplanarity'.
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