The Bonne projection is a pseudoconical equal-area

map projection In cartography, a map projection is any of a broad set of Transformation (function) , transformations employed to represent the curved two-dimensional Surface (mathematics), surface of a globe on a Plane (mathematics), plane. In a map projection, ...

, sometimes called a dépôt de la guerre, modified Flamsteed, or a Sylvanus projection. Although named after Rigobert Bonne (1727–1795), the projection was in use prior to his birth, by Sylvanus in 1511, Honter in 1561, De l'Isle before 1700 and Coronelli in 1696. Both Sylvanus and Honter's usages were approximate, however, and it is not clear they intended to be the same projection. The Bonne projection maintains accurate shapes of areas along the central meridian and the standard parallel, but progressively distorts away from those regions. Thus, it best maps "t"-shaped regions. It has been used extensively for maps of Europe and Asia. The projection is defined as: :

\begin x &= \rho \sin E \\ y &= \cot \varphi_1 - \rho \cos E\end

where :

\begin\rho &= \cot \varphi_1 + \varphi_1 - \varphi \\ E &= \frac  \end

and ''φ'' is the latitude, ''λ'' is the longitude, ''λ''₀ is the longitude of the central meridian, and ''φ''₁ is the standard parallel of the projection. Parallels of latitude are concentric circular arcs, and the scale is true along these arcs. On the central meridian and the standard latitude shapes are not distorted. The inverse projection is given by: :

\begin\varphi &= \cot \varphi_1 + \varphi_1 - \rho \\

\lambda &= \lambda_0 + \frac   \arctan \left(\frac  \right) \end

where :

\rho = \pm \sqrt

taking the sign of ''φ''₁. Special cases of the Bonne projection include the

sinusoidal projection The sinusoidal projection is a pseudocylindrical equal-area map projection, sometimes called the Sanson–Flamsteed or the Mercator equal-area projection. Jean Cossin of Dieppe was one of the first mapmakers to use the sinusoidal, using it in ...

, when ''φ''₁ is zero (i.e. the

Equator The equator is the circle of latitude that divides Earth into the Northern Hemisphere, Northern and Southern Hemisphere, Southern Hemispheres of Earth, hemispheres. It is an imaginary line located at 0 degrees latitude, about in circumferen ...

), and the

Werner projection The Werner projection is a pseudoconic equal-area map projection sometimes called the Stab-Werner or Stabius-Werner projection. Like other heart-shaped projections, it is also categorized as cordiform. ''Stab-Werner'' refers to two originators: ...

, when ''φ''₁ is 90° (i.e. the

North North is one of the four compass points or cardinal directions. It is the opposite of south and is perpendicular to east and west. ''North'' is a noun, adjective, or adverb indicating Direction (geometry), direction or geography. Etymology T ...

South Pole The South Pole, also known as the Geographic South Pole or Terrestrial South Pole, is the point in the Southern Hemisphere where the Earth's rotation, Earth's axis of rotation meets its surface. It is called the True South Pole to distinguish ...

). The Bonne projection can be seen as an intermediate projection in the unwinding of a

into a

Sinusoidal projection The sinusoidal projection is a pseudocylindrical equal-area map projection, sometimes called the Sanson–Flamsteed or the Mercator equal-area projection. Jean Cossin of Dieppe was one of the first mapmakers to use the sinusoidal, using it in ...

; an alternative intermediate would be a Bottomley projection.Between the Sinusoidal projection and the Werner: an alternative to the Bonne
Henry Bottomley 2002

References

External links

Table of examples and properties of all common projections
from radicalcartography.net

* ttp://mathworld.wolfram.com/BonneProjection.html Bonne Projection (wolfram.com) Equal-area projections {{Cartography-stub

See also

References

External links