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(Top) 1 Official adoption 2 Formulas 2.1 For Sphere 2.2 Lambert equal-area conic 3 See also 4 References 5 External links

Albers projection

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Albers projection of the world with standard parallels 20°N and 50°N.

The Albers projection with standard parallels 15°N and 45°N, with Tissot's indicatrix of deformation

An Albers projection shows areas accurately, but distorts shapes.

The Albers equal-area conic projection, or Albers projection (named after Heinrich C. Albers), is a conic, equal area map projection that uses two standard parallels. Although scale and shape are not preserved, distortion is minimal between the standard parallels.

Official adoption

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The Albers projection is used by some big countries as "official standard projection" for Census and other applications.


Country	Agency
Brazil	federal government, through IBGE, for Census Statistical Grid ^[1]
Canada	government of British Columbia^[2]
Canada	government of the Yukon^[3] (sole governmental projection)
US	United States Geological Survey^[4]
US	United States Census Bureau^[4]

Some "official products" also adopted Albers projection, for example most of the maps in the National Atlas of the United States.^[5]

Formulas

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For Sphere

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Snyder^[5] describes generating formulae for the projection, as well as the projection's characteristics. Coordinates from a spherical datum can be transformed into Albers equal-area conic projection coordinates with the following formulas, where ${R}$ is the radius, $\lambda$ is the longitude, $\lambda _{0}$ the reference longitude, $\varphi$ the latitude, $\varphi _{0}$ the reference latitude and $\varphi _{1}$ and $\varphi _{2}$ the standard parallels:

{\begin{aligned}x&=\rho \sin \theta \\y&=\rho _{0}-\rho \cos \theta \end{aligned}}

where

{\begin{aligned}n&={\tfrac {1}{2}}\left(\sin \varphi _{1}+\sin \varphi _{2}\right)\\\theta &=n\left(\lambda -\lambda _{0}\right)\\C&=\cos ^{2}\varphi _{1}+2n\sin \varphi _{1}\\\rho &={\tfrac {R}{n}}{\sqrt {C-2n\sin \varphi }}\\\rho _{0}&={\tfrac {R}{n}}{\sqrt {C-2n\sin \varphi _{0}}}\end{aligned}}

Lambert equal-area conic

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If just one of the two standard parallels of the Albers projection is placed on a pole, the result is the Lambert equal-area conic projection.^[6]

References

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^ "Grade Estatística" (PDF). 2016. Archived from the original (PDF) on 2018-02-19.

^ "Data Catalogue".

^ "Support & Info: Common Questions". Geomatics Yukon. Government of Yukon. Retrieved 15 October 2014.

^ ^a ^b "Projection Reference". Bill Rankin. Archived from the original on 25 April 2009. Retrieved 2009-03-31.

^ ^a ^b Snyder, John P. (1987). "Chapter 14: ALBERS EQUAL-AREA CONIC PROJECTION". Map Projections – A Working Manual. U.S. Geological Survey Professional Paper 1395. Washington, D.C.: United States Government Printing Office. p. 100. Archived from the original on 2008-05-16. Retrieved 2017-08-28.

^ "Directory of Map Projections". "Lambert equal-area conic".