Characteristics of Projections

 

Some projections are imbued with characteristics that tell us if certain types of measurements (e.g. measurements of distance, area, etc.) are accurate on the projected map. Some of these characteristics include the following:

 

Type of Projection

Characteristic of Projection

Drawbacks

Example Projections

Equal Area

A equal area projection is when the area of any given part of the map is preserved. This means that the any object that covers the same area on the Earth as any other part of the map will be the same size.

 

For example, if a one inch diameter circle on the map covers a 100 mile diameter circle on the Earth's surface, then we know that a one inch diameter circle anywhere else on the map is known to cover another 100 mile diameter circle on the Earth.

 

In maps of smaller regions, shapes may not be obviously distorted.

In order for a projection to be equal area, however, consistency in the shapes, scales, and/or angles across the map must be sacrificed.

 

Meridians and parallels may not intersect at right angles.

Albers Equal Area, Bonne, Eckert IV, Eckert VI, Lambert Azimuthal Equal Area, Mollweide, and Sinusoidal

Conformal

A conformal projection preserves local shapes. This means that when the local angles for points on the map are represented accurately. This means that the angles between any given point and any nearby points are accurate, but are not necessarily accurate for widely separated points on the map.

 

A side effect is that conformal projections preserve the precise perpendicular intersections between parallels and meridians on the map. When mapping smaller areas, relative shape is preserved.

In order for a projection to be conformal, however, consistency in the surface areas, shapes, and/or scales across the map must be sacrificed. An area enclosed by a series of arcs may be greatly distorted.

Hotine Oblique Mercator, Lambert Conformal Conic, Mercator, Oblique Mercator, State Plane Coordinate System, Transverse Mercator, and Universal Transverse Mercator

Equidistant

A equidistant projection is when the scale between at least one specific origin point on the map with respect to every other point on the map is represented accurately.

In order for a projection to be equidistant, however, consistency in the surface areas, shapes, and/or angles across the map must be sacrificed.

Azimuthal Equidistant, Equidistant Cylindrical, Equidistant Conic, and Cassini

Azimuthal

A azimuthal projection is when the direction of (or angle to) all points on the map are accurate with respect to the center point of the projection.

In order for a projection to be azimuthal, areas, shapes, and angles may be sacrificed at areas not close to the center of the map.

Azimuthal Equidistant, Gnomonic, Lambert Azimuthal Equal Area, Orthographic, and Stereographic

Other

Some projections try to minimize the effects of all distortions and as a result do not minimize any one distortion in particular.

 

Polyconic, Robinson and Robinson-Sterling, Unprojected Lat/Long, and Van der Grinten

 

 

In addition to the characteristics described above, some projections have highly specialized characteristics that may be useful in certain applications. For example, on maps made with a Mercator projection, all lines of constant direction (rhumb lines) are known to be straight, thereby making such maps very desirable as navigational charts.

 

See Also

What is a Coordinate System

What is a Map Projection

Type of Projections

Ellipsoids

Datums