There are six
auxiliary latitudes that have applications to special problems in geodesy, geophysics and the theory of map projections: •
Geocentric latitude • Parametric (or reduced) latitude • Rectifying latitude •
Authalic latitude • Conformal latitude • Isometric latitude The definitions given in this section all relate to locations on the reference ellipsoid but the first two auxiliary latitudes, like the geodetic latitude, can be extended to define a three-dimensional
geographic coordinate system as discussed
below. The remaining latitudes are not used in this way; they are used
only as intermediate constructs in map projections of the reference ellipsoid to the plane or in calculations of geodesics on the ellipsoid. Their numerical values are not of interest. For example, no one would need to calculate the authalic latitude of the Eiffel Tower. The expressions below give the auxiliary latitudes in terms of the geodetic latitude, the semi-major axis, , and the eccentricity, . (For inverses see
below.) The forms given are, apart from notational variants, those in the standard reference for map projections, namely "Map projections: a working manual" by J. P. Snyder. Derivations of these expressions may be found in Adams and online publications by Osborne and Bessel who solved problems for geodesics on the ellipsoid by transforming them to an equivalent problem for spherical geodesics by using this smaller latitude. Bessel's notation, , is also used in the current literature. The parametric latitude is related to the geodetic latitude by: The parametric latitude is not used in the theory of map projections. Its most important application is in the theory of ellipsoid geodesics, (
Vincenty, Karney).
Rectifying latitude The
rectifying latitude, , is the meridian distance scaled so that its value at the poles is equal to 90 degrees or radians: :\mu(\phi) = \frac{\pi}{2}\frac{m(\phi)}{m_\mathrm{p}} where the meridian distance from the equator to a latitude is (see
Meridian arc) :m(\phi) = a\left(1 - e^2\right)\int_0^\phi \left(1 - e^2 \sin^2 \phi'\right)^{-\frac{3}{2}}\, d\phi'\,, and the length of the meridian quadrant from the equator to the pole (the
polar distance) is :m_\mathrm{p} = m\left(\frac{\pi}{2}\right)\,. Using the rectifying latitude to define a latitude on a sphere of radius :R = \frac{2m_\mathrm{p}}{\pi} defines a projection from the ellipsoid to the sphere such that all meridians have true length and uniform scale. The sphere may then be projected to the plane with an
equirectangular projection to give a double projection from the ellipsoid to the plane such that all meridians have true length and uniform meridian scale. An example of the use of the rectifying latitude is the
equidistant conic projection. (Snyder, Section 16). :\begin{align} \chi(\phi) &= 2\tan^{-1}\left[ \left(\frac{1 + \sin\phi}{1 - \sin\phi}\right) \left(\frac{1 - e\sin\phi}{1 + e\sin\phi}\right)^e\right ]^\frac{1}{2} - \frac{\pi}{2} \\[2pt] &= 2\tan^{-1}\left[ \tan\left(\frac{\phi}{2} + \frac{\pi}{4}\right) \left(\frac{1 - e\sin\phi}{1 + e\sin\phi}\right)^\frac{e}{2} \right] - \frac{\pi}{2} \\[2pt] &= \tan^{-1}\left[\sinh\left(\sinh^{-1}(\tan\phi) - e\tanh^{-1}(e\sin\phi)\right)\right] \\ &= \operatorname{gd}\left[\operatorname{gd}^{-1}(\phi) - e\tanh^{-1}(e\sin\phi)\right] \end{align} where is the
Gudermannian function. (See also
Mercator projection.) The conformal latitude defines a transformation from the ellipsoid to a sphere of
arbitrary radius such that the angle of intersection between any two lines on the ellipsoid is the same as the corresponding angle on the sphere (so that the shape of
small elements is well preserved). A further conformal transformation from the sphere to the plane gives a conformal double projection from the ellipsoid to the plane. This is not the only way of generating such a conformal projection. For example, the 'exact' version of the
Transverse Mercator projection on the ellipsoid is not a double projection. (It does, however, involve a generalisation of the conformal latitude to the complex plane).
Isometric latitude The
isometric latitude, , is used in the development of the ellipsoidal versions of the normal
Mercator projection and the
Transverse Mercator projection. The name "isometric" arises from the fact that at any point on the ellipsoid equal increments of and longitude give rise to equal distance displacements along the meridians and parallels respectively. The
graticule defined by the lines of constant and constant , divides the surface of the ellipsoid into a mesh of squares (of varying size). The isometric latitude is zero at the equator but rapidly diverges from the geodetic latitude, tending to infinity at the poles. The conventional notation is given in Snyder (page 15): • The other, more useful, approach is to express the auxiliary latitude as a series in terms of the geodetic latitude and then invert the series by the method of
Lagrange reversion. Such series are presented by Adams who uses Taylor series expansions and gives coefficients in terms of the eccentricity. gives series for the conversions between all pairs of auxiliary latitudes in terms of the third flattening, . Karney establishes that the truncation errors for such series are consistently smaller that the equivalent series in terms of the eccentricity. The series method is not applicable to the isometric latitude and one must find the conformal latitude in an intermediate step.
Numerical comparison of auxiliary latitudes The plot to the right shows the difference between the geodetic latitude and the auxiliary latitudes other than the isometric latitude (which diverges to infinity at the poles) for the case of the WGS84 ellipsoid. The differences shown on the plot are in arc minutes. In the Northern hemisphere (positive latitudes),
θ ≤
χ ≤
μ ≤
ξ ≤
β ≤
ϕ; in the Southern hemisphere (negative latitudes), the inequalities are reversed, with equality at the equator and the poles. Although the graph appears symmetric about 45°, the minima of the curves actually lie between 45° 2′ and 45° 6′. Some representative data points are given in the table below. The conformal and geocentric latitudes are nearly indistinguishable, a fact that was exploited in the days of hand calculators to expedite the construction of map projections. To first order in the flattening
f, the auxiliary latitudes can be expressed as
ζ =
ϕ −
Cf sin 2
ϕ where the constant
C takes on the values [, , , 1, 1] for
ζ = [
β,
ξ,
μ,
χ,
θ]. ==Latitude and coordinate systems==