Solving Algebra Problem: Walking on the Earth's Surface

AI Thread Summary
Arnoldo Téllez's problem involves walking one mile south, east, and north, returning to his starting point, which can occur at multiple locations. While the North Pole is one possible starting point, other solutions exist near the South Pole, where specific parallels allow for such a path. These parallels can be located one mile north of circles with circumferences of one mile, one-half mile, and one-third mile, among others. The discussion clarifies that these parallels are situated in the Southern Hemisphere, particularly close to the South Pole. Therefore, Téllez could start at various points that satisfy these conditions near the South Pole.
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Homework Statement


Arnoldo Téllez walked one mile to the south, then one mile to the east, and then one mile to the north, getting back to the point where he started. He could have started in the north pole, but he didn't. Where did he start?
(Taken from ALGEBRA AND TRIGONOMETRY WITH ANALYTIC GEOMETRY: A PROBLEM-SOLVING APPROACH, by Varberg and Fleming.)

Homework Equations



The Attempt at a Solution


He could have started at several different points:
- At any of the points that are one mile to the north from the parallel whose length is one mile (if that parallel exists).
- At any of the points that are one mile to the north from the parallel whose length is one half of a mile (if that parallel exists), thus walking twice over that parallel.
- At any of the points that are one mile to the north from the parallel whose length is one third of a mile (if that parallel exists), thus walking three times over that parallel.
- and so on...

Is the answer correct?
 
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Yes. The parallels specified do exist, with points available one mile to the north - where?
 
Where?

Those points must be part of other parallels, respectively.
 
Sorry, I wasn't clear. Where are the parallels of the required length, given that they must also have points one mile to the north?
 
Those parallels must be on the southern hemispere. I don't know exactly where.
 
Where do you find such short parallels?
 
South Pole?
 
Near the South Pole, that is.
 
Correct! Very near the south pole, in fact. You can essentially ignore the curvature of the Earth to get a good approximation of how far they are from the pole...
 
  • #10
The Antarctic?
 
  • #11
Arnoldo Téllez could have started at any of the points which are one mile to the north from the parallel which is at 1/(2*pi) miles from the South Pole; i.e. he could have started at any of the points which are (1 + 1/(2*pi)) miles from the South Pole.
 
  • #12
Right?
 
  • #13
Sorry analyzer - yes, absolutely correct, for the "once round the pole" version...
 

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