What does the Robinson projection do?
The Robinson projection is unique. Its primary purpose is to create visually appealing maps of the entire world. It is a compromise projection; it does not eliminate any type of distortion, but it keeps the levels of all types of distortion relatively low over most of the map.
How do you identify a Robinson projection?
The Robinson projection is a map projection of a world map which shows the entire world at once. It was specifically created in an attempt to find a good compromise to the problem of readily showing the whole globe as a flat image….Formulation.
What type of projection is the Robinson projection?
Robinson is a pseudocylindric projection. The meridians are regularly distributed curves mimicking elliptical arcs. They are concave toward the central meridian and do not intersect the parallels at right angles. The parallels are unequally distributed straight lines.
What does the Robinson projection preserve?
A Pseudocylindrical projection that preserves neither scale nor area, but which presents an aesthetically pleasing view of the entire world.
Why did National Geographic use the Robinson projection?
Robinson, one of the nation’s most respected cartographers. John B. Garver Jr., the society’s chief cartographer, said the Robinson projection provides a more realistic view of the world. Robinson’s approach is a compromise; it allows some exaggeration of size to improve the shapes of landmasses.
Why do many geographers prefer the Robinson projection?
Geographers prefer the Robinson Projection because it shows the size and shape of most of the land quite accurately. The sizes of the oceans and and distances were also very accurate.
Who made the Robinson projection?
Arthur H. Robinson
Cylindrical Projection – Robinson In the 1960s Arthur H. Robinson, a Wisconsin geography professor, developed a projection which has become much more popular than the Mercator projection for world maps.
What does the Lambert projection preserve?
Lambert conformal conic is a conformal map projection. Directions, angles, and shapes are maintained at infinitesimal scale. Scale, area, and distances are increasingly distorted away from the standard parallels, but they are the same along any given parallel and symmetric across the central meridian.