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by aleyan 4691 days ago
Obligatory XKCD: http://xkcd.com/977/

I wonder if there is some sort of theorem that describes which fidelities you can get out of a flat projection of the surface of a sphere. For example, a projection could have accurate area ratios or accurately reflect point to point distances but not both.
4 comments
crygin 4691 days ago
Essentially: conformal (angles are equal in different areas of the map -- this is the purpose of Mercator, for sailing), equal-area (regions of the same area are represented equally), contiguous (paths between regions do not leave the map, e.g. not a Goode homolosine, Dymaxion, etc). Pick two.
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baddox 4691 days ago
There is a lot of theory surrounding map projections. I only took an introductory GIS course in college, but it was clear that there is an incredible amount of work behind the scenes there.

http://en.wikipedia.org/wiki/Geographic_information_system

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curiousdannii 4691 days ago
A spherical globe still counts as a projection of our non-spherical planet!
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D9u 4691 days ago
I've always preferred using a globe to get a perspective on the Earth and the various positions of continents and nations.
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BerislavLopac 4691 days ago
http://en.wikipedia.org/wiki/Map_projection
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