Conformal Conic with Tissot's Indicatrices of Distortion

A Lambert conformal conic projection (LCC) is a conic map projection used for

aeronautical chart An aeronautical chart is a map designed to assist in the navigation of aircraft, much as nautical charts do for watercraft, or a roadmap does for drivers. Using these charts and other tools, pilots are able to determine their position, safe alt ...

s, portions of the State Plane Coordinate System, and many national and regional mapping systems. It is one of seven projections introduced by

Johann Heinrich Lambert Johann Heinrich Lambert (, ''Jean-Henri Lambert'' in French; 26 or 28 August 1728 – 25 September 1777) was a polymath from the Republic of Mulhouse, generally referred to as either Swiss or French, who made important contributions to the subject ...

in his 1772 publication ''Anmerkungen und Zusätze zur Entwerfung der Land- und Himmelscharten'' (Notes and Comments on the Composition of Terrestrial and Celestial Maps). Conceptually, the projection seats a

cone A cone is a three-dimensional geometric shape that tapers smoothly from a flat base (frequently, though not necessarily, circular) to a point called the apex or vertex. A cone is formed by a set of line segments, half-lines, or lines con ...

over the sphere of the Earth and projects the surface conformally onto the cone. The cone is unrolled, and the

parallel Parallel is a geometric term of location which may refer to: Computing * Parallel algorithm * Parallel computing * Parallel metaheuristic * Parallel (software), a UNIX utility for running programs in parallel * Parallel Sysplex, a cluster of ...

that was touching the sphere is assigned unit scale. That parallel is called the ''reference parallel'' or ''standard parallel''. By scaling the resulting map, two parallels can be assigned unit scale, with scale decreasing between the two parallels and increasing outside them. This gives the map two standard parallels. In this way, deviation from unit scale can be minimized within a region of interest that lies largely between the two standard parallels. Unlike other conic projections, no true secant form of the projection exists because using a secant cone does not yield the same scale along both standard parallels.

Use

Pilot An aircraft pilot or aviator is a person who controls the flight of an aircraft by operating its directional flight controls. Some other aircrew members, such as navigators or flight engineers, are also considered aviators, because they a ...

s use

s based on LCC because a straight line drawn on a Lambert conformal conic projection approximates a great-circle route between endpoints for typical flight distances. The US systems of VFR (

visual flight rules In aviation, visual flight rules (VFR) are a set of regulations under which a pilot operates an aircraft in weather conditions generally clear enough to allow the pilot to see where the aircraft is going. Specifically, the weather must be better ...

)

sectional chart {{short description, Type of aeronautical chart In United States aviation, a sectional chart, often called a sectional for short, is a type of aeronautical chart designed for air navigation under visual flight rules (VFR). In Australia, Canada an ...

s and

terminal area chart In United States and Canada aviation, terminal area charts are aeronautical charts intended for navigation under Visual Flight Rules that depict areas surrounding major airports, primarily those with Class B airspace. Overview Like the VFR sect ...

s are drafted on the LCC with standard parallels at 33°N and 45°N. The European Environment Agency and the INSPIRE specification for coordinate systems recommends using this projection (also named ETRS89-LCC) for conformal pan-European mapping at scales smaller or equal to 1:500,000. In

Metropolitan France Metropolitan France (french: France métropolitaine or ''la Métropole''), also known as European France (french: Territoire européen de la France) is the area of France which is geographically in Europe. This collective name for the European ...

, the official projection is Lambert-93, a Lambert conic projection using RGF93 geodetic system and defined by references parallels that are 44°N and 49°N. The National Spatial Framework for India uses Datum WGS84 with a LCC projection and is a recommended NNRMS standard. Each state has its own set of reference parameters given in the standard. The

U.S. National Geodetic Survey The National Geodetic Survey (NGS) is a United States federal agency that defines and manages a national coordinate system, providing the foundation for transportation and communication; mapping and charting; and a large number of applications ...

's "State Plane Coordinate System of 1983" uses the Lambert conformal conic projection to define the grid-coordinate systems used in several states, primarily those that are elongated west to east such as

Tennessee Tennessee ( , ), officially the State of Tennessee, is a landlocked state in the Southeastern region of the United States. Tennessee is the 36th-largest by area and the 15th-most populous of the 50 states. It is bordered by Kentucky to th ...

. The Lambert projection is relatively easy to use: conversions from

geodetic Geodesy ( ) is the Earth science of accurately measuring and understanding Earth's figure (geometric shape and size), orientation in space, and gravity. The field also incorporates studies of how these properties change over time and equivale ...

(

latitude In geography, latitude is a coordinate that specifies the north– south position of a point on the surface of the Earth or another celestial body. Latitude is given as an angle that ranges from –90° at the south pole to 90° at the north pol ...

longitude Longitude (, ) is a geographic coordinate that specifies the east– west position of a point on the surface of the Earth, or another celestial body. It is an angular measurement, usually expressed in degrees and denoted by the Greek lette ...

) to State Plane Grid coordinates involve trigonometric equations that are fairly straightforward and which can be solved on most scientific calculators, especially programmable models. The projection as used in CCS83 yields maps in which scale errors are limited to 1 part in 10,000.

History

The Lambert conformal conic is one of several map projection systems developed by

, an 18th-century Swiss mathematician, physicist, philosopher, and astronomer.

Transformation

Coordinates from a spherical

datum In the pursuit of knowledge, data (; ) is a collection of discrete values that convey information, describing quantity, quality, fact, statistics, other basic units of meaning, or simply sequences of symbols that may be further interpreted. ...

can be transformed into Lambert conformal conic projection coordinates with the following formulas, where ''λ'' is the longitude, ''λ'' the reference longitude, ''φ'' the latitude, ''φ'' the reference latitude, ''R'' the radius of the Earth and ''φ'' and ''φ'' the standard parallels: :

\end

where :

\begin
n &= \frac \\
\rho &= RF \cot^ \left(\tfrac14 \pi + \tfrac12 \varphi\right) \\
\rho_0 &= RF \cot^ \left(\tfrac14 \pi + \tfrac12 \varphi_0\right) \\
F &= \frac
\end

If one standard parallel is used (i.e.

\varphi_1 = \varphi_2

), the formula for ''n'' above is indeterminate, but then

n=\sin(\varphi_1)

. Formulae for ellipsoidal datums are more involved.

References

External links

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

* [http://www.ngs.noaa.gov/PUBS_LIB/ManualNOSNGS5.pdf This document from the U.S. National Geodetic Survey describes the State Plane Coordinate System of 1983, including details on the equations used to perform the Lambert Conformal Conic and Mercator map projections of CCS83]
Lambert Conformal Conic to Geographic Transformation Formulae
from Land Information New Zealand {{Authority control Map projections Conformal projections

Use

History

Transformation

See also

References

External links