Azimuthal equidistant projection

Polar azimuthal equidistant projection

Emblem of the United Nations containing an approximate polar azimuthal equidistant projection. Compare the relative sizes of Australia and north Africa with those in the previous render.

The azimuthal equidistant projection is an azimuthal map projection. It has the useful properties that all points on the map are at proportionately correct distances from the center point, and that all points on the map are at the correct azimuth (direction) from the center point. A useful application for this type of projection is a polar projection which shows all meridians (lines of longitude) as straight, with distances from the pole represented correctly. The flag of the United Nations contains an example of a polar azimuthal equidistant projection.

It is useful for showing airline distances from center point of projection and for seismic and radio work.

Distances and directions to all places are true only from the center point of projection. Distances are correct between points along straight lines through the center. All other distances are incorrect. Distortion of areas and shapes increases with distance from the center point.

History

While it may have been used by ancient Egyptians for star maps in some holy books,^[1] the earliest text describing the azimuthal equidistant projection is an 11th-century work by al-Biruni.^[2]

The projection appears in many Renaissance maps, and Gerardus Mercator used it for an inset of the north polar regions in sheet 13 and legend 6 of his well-known 1569 map. In France and Russia this projection is named "Postel projection" after Guillaume Postel, who used it for a map in 1581.^[3] Many modern star chart planispheres use the polar azimuthal equidistant projection.

Comparison of the Azimuthal equidistant projection and some azimuthal projections centred on 90° N at the same scale, ordered by projection altitude in Earth radii. (click for detail)

Mathematical definition

A point on the globe is chosen to be special in the sense that mapped distances and azimuths from that point to any other point will be correct. That point, (φ₁, λ₀), will project to the center of a circular projection, with φ referring to latitude and λ referring to longitude. All points along a given azimuth will project along a straight line from the center, and the angle θ that line subtends from the vertical is the azimuth angle. The distance from the center point to another projected point is given as ρ. By this description, then, the point on the globe specified by (θ,ρ) will be projected to Cartesian coordinates:

x=\rho \sin \theta ,\qquad y=-\rho \cos \theta

The relationship between the coordinates (θ,ρ) of the point on the globe, and its latitude and longitude coordinates (φ, λ) is found as follows. The great circle distance ρ between two points (φ₁, λ₀) and (φ, λ) on the sphere is given by:^[4]

\cos \rho =\sin \varphi _{1}\sin \varphi +\cos \varphi _{1}\cos \varphi \cos \left(\lambda -\lambda _{0}\right)

The azimuth from the first to the second point is given by:

\tan \theta ={\frac {\cos \varphi \sin \left(\lambda -\lambda _{0}\right)}{\cos \varphi _{1}\sin \varphi -\sin \varphi _{1}\cos \varphi \cos \left(\lambda -\lambda _{0}\right)}}

When the center point is the north pole, these formulas greatly simplify to:

\rho ={\frac {\pi }{2}}-\varphi ,\qquad \theta =\lambda

Applications

In the case of radio, this projection allows for directional antenna aiming, especially in the case of HF communications. An operator can point the antenna, usually by an electric rotator, simply locating the target in the map and rotating the antenna to the angle indicated by the map. The map should be centered as nearly as possible to the actual antenna location.

References

↑ SNYDER, John P. (1997). Flattening the earth: two thousand years of map projections. University of Chicago Press. ISBN 0-226-76747-7. , p.29
↑ David A. KING (1996), "Astronomy and Islamic society: Qibla, gnomics and timekeeping", in Roshdi Rashed, ed., Encyclopedia of the History of Arabic Science, Vol. 1, p. 128–184 [153]. Routledge, London and New York.
↑ Snyder 1997, p. 29
↑ Snyder, John P. (1989). An Album of Map Projections (PDF). p. 228.

External links

Table of examples and properties of all common projections, from radicalcartography.net
Online Azimuthal Equidistant Map Generator
An interactive Java Applet to study the metric deformations of the Azimuthal Equidistant Projection.
GeographicLib provides a class for performing azimuthal equidistant projections centered at any point on the ellipsoid.
Animated US National Weather Service Wind Data for Azimuthal equidistant projection.

Map projection

History
List
Portal

By surface

Cylindrical

Mercator-conformal	Gauss–Krüger Transverse Mercator

Equal-area	Balthasart Behrmann Gall–Peters Hobo–Dyer Lambert Smyth equal-surface Trystan Edwards

Cassini Central Equirectangular Gall stereographic Miller Space-oblique Mercator Web Mercator

General perspective	Gnomonic Orthographic Stereographic

Equidistant Lambert equal-area

Bonne	Sinusoidal Werner

Bottomley	Sinusoidal Werner

Cylindrical	Balthasart Behrmann Gall–Peters Hobo–Dyer Lambert cylindrical equal-area Smyth equal-surface Trystan Edwards

Tobler hyperelliptical	Collignon Mollweide

Albers Briesemeister Eckert II Eckert IV Eckert VI Hammer Lambert azimuthal equal-area Quadrilateralized spherical cube

Equidistant in
some aspect

Gnomonic

Gnomonic

Loxodromic

Retroazimuthal
(Mecca or Qibla)

Planar	Gnomonic Orthographic Stereographic

Central cylindrical

Polyhedral

See also

Latitude Longitude Tissot's indicatrix

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