Miller cylindrical projection

The Miller cylindrical projection is a modified Mercator projection, proposed by Osborn Maitland Miller in 1942. The latitude is scaled by a factor of 4⁄5, projected according to Mercator, and then the result is multiplied by 5⁄4 to retain scale along the equator.^[1] Hence: $${\displaystyle \begin{array}{rl}x& =\lambda \\ y& =\frac{5}{4}\ln [\tan (\frac{\pi }{4}+\frac{2\phi }{5})]=\frac{5}{4}{\sinh }^{}(\tan \frac{4\phi }{5})\end{array}}$$ or inversely, $${\displaystyle \begin{array}{rl}\lambda & =x\\ \phi & =\frac{5}{2}{\tan }^{-1}{e}^{\frac{4y}{5}}-\frac{5\pi }{8}=\frac{5}{4}{\tan }^{-1}(\sinh \frac{4y}{5})\end{array}}$$ where λ is the longitude from the central meridian of the projection, and φ is the latitude.^[2] Meridians are thus about 0.733 the length of the equator. In GIS applications, this projection is known as: "ESRI:54003"^[3] and "+proj=mill".^[4] Compact Miller projection is similar to Miller but spacing between parallels stops growing after 55 degrees.^[5] In GIS applications, this projection is known as: "ESRI:54080" and "+proj=comill".^[6]

See also

• List of map projections

References

External links

Wikimedia Commons has media related to Miller cylindrical projection.

• Math formulae information
• Historical information
• Miller projection in proj4

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