-
Cartesian coordinates,
which are the
signed distances from the
point to
three mutually perpendicular planes. More generally, n
Cartesian coordinates specify...
- \varphi } in the
formulae shown in the
table above. ^β
Defined in
Cartesian coordinates as ∂ i A ⊗ e i {\displaystyle \partial _{i}\mathbf {A} \otimes \mathbf...
- same
meaning as in
Cartesian coordinates is
added to the r and θ
polar coordinates giving a
triple (r, θ, z).
Spherical coordinates take this a step further...
-
sphere that is
described in
Cartesian coordinates with the
equation x2 + y2 + z2 = c2 can be
described in
spherical coordinates by the
simple equation r...
- with
Cartesian coordinates and, more generally, to
affine coordinates (see
Affine space § Relationship
between barycentric and
affine coordinates). Barycentric...
-
projective geometry, just as
Cartesian coordinates are used in
Euclidean geometry. They have the
advantage that the
coordinates of points,
including points...
-
lines may be curved.
These coordinates may be
derived from a set of
Cartesian coordinates by
using a
transformation that is
locally invertible (a one-to-one...
- {\displaystyle (x,y)} be the
standard Cartesian coordinates, and ( r , θ ) {\displaystyle (r,\theta )} the
standard polar coordinates. x = r cos θ y = r sin ...
-
specifying either the point's
Cartesian coordinates (called
rectangular or
Cartesian form) or the point's
polar coordinates (called
polar form). In polar...
-
between cylindrical and
Cartesian coordinates, it is
convenient to ****ume that the
reference plane of the
former is the
Cartesian xy-plane (with equation...
