Editing 2893: Sphere Tastiness

Jump to: navigation, search

Warning: You are not logged in. Your IP address will be publicly visible if you make any edits. If you log in or create an account, your edits will be attributed to your username, along with other benefits.

The edit can be undone. Please check the comparison below to verify that this is what you want to do, and then save the changes below to finish undoing the edit.
Latest revision Your text
Line 12: Line 12:
 
This comic graphs the tastiness vs. the size of four roughly spherical objects: {{w|melons}}, {{w|grapes}}, {{w|Earth|Earth}} and the {{w|Moon}}. Based on the the fact that melons and grapes are (in this context) relatively small and tasty to most people, and that planetary scale bodies are relatively large and made mostly of rocks and metals generally considered not remotely tasty,{{cn}} [[Randall]] postulates the existence of an intermediate body, one which is approximately 800 meters in diameter and "tastes okay".
 
This comic graphs the tastiness vs. the size of four roughly spherical objects: {{w|melons}}, {{w|grapes}}, {{w|Earth|Earth}} and the {{w|Moon}}. Based on the the fact that melons and grapes are (in this context) relatively small and tasty to most people, and that planetary scale bodies are relatively large and made mostly of rocks and metals generally considered not remotely tasty,{{cn}} [[Randall]] postulates the existence of an intermediate body, one which is approximately 800 meters in diameter and "tastes okay".
  
This is the second comic in a row to feature fruit, graphs and predictions (after [[2892: Banana Prices]]), and continues the theme of a logarithmic axis scale to facilitate plotting a linear regression. Here the line is interpolated between known data, rather than extrapolated beyond it. Such interpolation is quite common in scientific analysis, and is often useful, but this example clearly leads to a ludicrous conclusion. Using such ridiculous analyses to show the dangers of flawed and/or sloppy methodology is a common theme in xkcd.
+
This is the second comic in a row to feature fruit, graphs and predictions (after [[2892: Banana Prices]]), and continues the theme of a logarithmic axis scale to facilitate plotting a linear regression. Here the line is interpolated between known data, rather than extrapolated beyond it. Such interpolation is quite common in scientific analysis, and is often useful, but this example clearly leads to a ludicrous conclusion. Using such ridiculous analyses to show the dangers of flawed and/or sloppy methodology is a common theme in XKCD.
  
 
There are multiple ways in which this analysis is flawed, and therefore why the conclusion is unsupportable:
 
There are multiple ways in which this analysis is flawed, and therefore why the conclusion is unsupportable:

Please note that all contributions to explain xkcd may be edited, altered, or removed by other contributors. If you do not want your writing to be edited mercilessly, then do not submit it here.
You are also promising us that you wrote this yourself, or copied it from a public domain or similar free resource (see explain xkcd:Copyrights for details). Do not submit copyrighted work without permission!

To protect the wiki against automated edit spam, we kindly ask you to solve the following CAPTCHA:

Cancel | Editing help (opens in new window)