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Pseudoazimuthal compromise map projection
Winkel tripel projection of the world, 15° graticule
The Winkel tripel projection with
Tissot's indicatrix of deformation
The Winkel tripel projection (Winkel III ), a modified azimuthal
[1]
map projection of the
world , is one of
three projections proposed by German cartographer Oswald Winkel (7 January 1874 – 18 July 1953) in 1921. The projection is the
arithmetic mean of the
equirectangular projection and the
Aitoff projection :
[2] The name tripel (
German for 'triple') refers to Winkel's goal of minimizing three
kinds of distortion : area, direction, and distance.
[3]
Algorithm
x
=
1
2
(
λ
cos
φ
1
+
2
cos
φ
sin
λ
2
sinc
α
)
,
y
=
1
2
(
φ
+
sin
φ
sinc
α
)
,
{\displaystyle {\begin{aligned}x&={\frac {1}{2}}\left(\lambda \cos \varphi _{1}+{\frac {2\cos \varphi \sin {\frac {\lambda }{2}}}{\operatorname {sinc} \alpha }}\right),\\y&={\frac {1}{2}}\left(\varphi +{\frac {\sin \varphi }{\operatorname {sinc} \alpha }}\right),\end{aligned}}}
where λ is the longitude relative to the central meridian of the projection, φ is the latitude, φ 1 is the standard parallel for the
equirectangular projection , sinc is the
unnormalized cardinal sine function, and
α
=
arccos
(
cos
φ
cos
λ
2
)
.
{\displaystyle \alpha =\arccos \left(\cos \varphi \cos {\frac {\lambda }{2}}\right).}
In his proposal, Winkel set
φ
1
=
arccos
2
π
.
{\displaystyle \varphi _{1}=\arccos {\frac {2}{\pi }}.}
A
closed-form
inverse mapping does not exist, and computing the inverse numerically requires the use of
iterative methods .
[4]
Comparison with other projections
David M. Goldberg and
J. Richard Gott III showed that the Winkel tripel fares better against several other projections analyzed against their measures of distortion, producing minimal distance,
Tissot indicatrix ellipticity and area errors, and the least skew of any of the projections they studied.
[5]
By a different metric, Capek's "Q", the Winkel tripel ranked ninth among a hundred map projections of the world, behind the common
Eckert IV projection and
Robinson projections .
[6]
In 1998, the Winkel tripel projection replaced the Robinson projection as the standard projection for world maps made by the
National Geographic Society .
[3] Many educational institutes and textbooks soon followed National Geographic's example in adopting the projection, most of which still utilize it.
[7]
[8]
See also
References
^ Snyder, John P. (1989). An album of map projections . USGS Professional Paper 1453. Washington, D.C.: Government Printing Office. p. 164.
^
Snyder, John P. (1993).
Flattening the Earth: Two Thousand Years of Map Projections . Chicago: University of Chicago Press. pp. 231–232.
ISBN
0-226-76747-7 . Retrieved 2011-11-14 .
^
a
b
"Winkel Tripel Projections" . Winkel.org . Retrieved 2011-11-14 .
^ Ipbüker, Cengizhan; Bildirici, I.Öztug (2002).
"A General Algorithm for the Inverse Transformation of Map Projections Using Jacobian Matrices" (PDF) . Proceedings of the Third International Symposium Mathematical & Computational Applications . Third International Symposium Mathematical & Computational Applications September 4–6, 2002. Konya, Turkey. Selcuk, Turkey. pp. 175–182. Archived from
the original (PDF) on 20 October 2014.
^ Goldberg, David M.; Gott III, J. Richard (2007).
"Flexion and Skewness in Map Projections of the Earth" (PDF) . Cartographica . 42 (4): 297–318.
arXiv :
astro-ph/0608501 .
doi :
10.3138/carto.42.4.297 .
S2CID
11359702 . Retrieved 2011-11-14 .
^ Capek, Richard (2001).
"Which is the best projection for the world map?" (PDF) . Proceedings of the 20th International Cartographic Conference . 5 . Beijing, China: 3084–93. Retrieved 2018-11-15 .
^
"NG Maps Print Collection – World Political Map (Bright Colored)" . National Geographic Society. Retrieved 1 October 2013 . This latest world map ... features the Winkel Tripel projection to reduce the distortion of land masses as they near the poles.
^
"Selecting a Map Projection – National Geographic Education" . National Geographic Society. Archived from
the original on December 1, 2012. Retrieved 1 October 2013 .
External links