TOPICS
Search

Authalic Latitude


A parametric latitude which gives a sphere equal surface area relative to an ellipsoid. The authalic latitude is defined by

 beta=sin^(-1)(q/(q_p)),
(1)

where

 q=(1-e^2)[(sinphi)/(1-e^2sin^2phi)-1/(2e)ln((1-esinphi)/(1+esinphi))],
(2)

and q_p is q evaluated at the north pole (phi=90 degrees). Let R_q be the radius of the sphere having the same surface area as the ellipsoid, then

 R_q=asqrt((q_p)/2).
(3)

The series for beta is

beta=phi-(1/3e^2+(31)/(180)e^4+(59)/(560)e^6+...)sin(2phi)+((17)/(360)e^4+(61)/(1260)e^6+...)sin(4phi)-((383)/(45360)e^6+...)sin(6phi)+....
(4)

The inverse formula is found from

 Deltaphi=((1-e^2sin^2phi)^2)/(2cosphi)[q/(1-e^2)-(sinphi)/(1-e^2sin^2phi)+1/(2e)ln((1-esinphi)/(1+esinphi))],
(5)

where

 q=q_psinbeta
(6)

and phi_0=sin^(-1)(q/2). This can be written in series form as

phi=beta+(1/3e^2+(31)/(180)e^4+(517)/(5040)e^6+...)sin(2beta)+((23)/(360)e^4+(251)/(3780)e^6+...)sin(4beta)+((761)/(45360)e^6+...)sin(6beta)+....
(7)

See also

Latitude

Explore with Wolfram|Alpha

References

Adams, O. S. "Latitude Developments Connected with Geodesy and Cartography with Tables, Including a Table for Lambert Equal-Area Meridional Projections." Spec. Pub. No. 67. U. S. Coast and Geodetic Survey, 1921.Snyder, J. P. Map Projections--A Working Manual. U. S. Geological Survey Professional Paper 1395. Washington, DC: U. S. Government Printing Office, p. 16, 1987.

Referenced on Wolfram|Alpha

Authalic Latitude

Cite this as:

Weisstein, Eric W. "Authalic Latitude." From MathWorld--A Wolfram Web Resource. https://mathworld.wolfram.com/AuthalicLatitude.html

Subject classifications