A map projection obtained by projecting points 
on the surface of sphere from the sphere's north pole 
to point 
in a plane tangent to the south pole 
(Coxeter 1969, p. 93). In such a projection, great
circles are mapped to circles, and loxodromes
become logarithmic spirals.
Stereographic projections have a very simple algebraic form that results immediately from similarity of triangles. In the above figures, let the stereographic sphere
have radius 
,
and the 
-axis
positioned as shown. Then a variety of different transformation formulas are possible
depending on the relative positions of the projection plane and 
-axis.
The transformation equations for a sphere of radius 
are given by
 |  |  |
(1)
|
 |  | ![k[cosphi_1sinphi-sinphi_1cosphicos(lambda-lambda_0)],](/images/equations/StereographicProjection/Inline14.svg) |
(2)
|
where 
is the central longitude, 
is the central latitude, and
 |
(3)
|
The inverse formulas for latitude 
and longitude 
are then given by
 |  |  |
(4)
|
 |  |  |
(5)
|
where
 |  |  |
(6)
|
 |  |  |
(7)
|
and the two-argument form of the inverse tangent function is best used for this computation.
For an oblate spheroid, 
can be interpreted as the "local radius," defined
by
 |
(8)
|
where 
is the equatorial radius and 
is the conformal latitude.
