Equal Area:
Equidistant:
Conformal:
The map projection gives people the ability to move the image on a sphere surface to a flat surface. That helps people to have a better general view of the image and enables people to collect data easier from the image. I did experienced the significance of map projection in this map projections exercise. However, we need to pay attention that since the curve of the surface has changed, images can never be exactly the same as the original ones. What we can do is just keep one element the same, such as distance or area, and than use one specific method according to that element. In future, we might be able to create a method which can keep two or more elements exactly the same, which must be able to give people more help than present.
Then, I am going to talk about three kinds of map projections, which are equal area, equidistance and conformal projections. First of all, for the equal area projections, I choose Mollweide projection and Gall Orthographfic, which also known as Gall-Peter projection, to be examples. Although both of them are equal area maps, they still have different features. Mollweide is a pseudo-cylindrical map projection, which has accurate proportions in area. On the other hand, Gall-Peter projection is one specialization of a configurable equal-area map projection known as cylindrical equal-area projection. The standard parallels of the Gall–Peters are 45° N and 45° S.
Secondly, for the equidistance projections, I choose the Plate carree projection, which is an equirectangular projection centered at the equator, and the Azimuthal equidistant projection, whose distances along great circles radiating from centre are conserved. Because those two projections use different method to keep the proportion of distance the same, the exact distance between Washington D.C. and Kabul from two maps are different.
Finally, for the conformal projections, I choose the Mercator projection, whose Rhumb lines are represented by straight segments, and Stereographic projection, in which any circle of a sphere, great and small, maps to a circle or straight line.
P.S. Information is from Wikipedia.
http://en.wikipedia.org/wiki/Map_projection#Conformal
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