• cheeseburger@lemmy.ca
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    7 months ago

    10,152 Km between Atlanta and Tbilisi, and ChatGPT gave the pseudocode below as an explanation, which I didn’t double check before making this comment!

    
    # Coordinates for Atlanta, Georgia, USA
    atlanta_coords = (33.7490, -84.3880)
    
    # Coordinates for Tbilisi, Georgia (country)
    tbilisi_coords = (41.7151, 44.8271)
    
    # Calculate the straight line distance through the Earth
    geopy.distance.great_circle(atlanta_coords, tbilisi_coords).km```
    • Gobbel2000
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      7 months ago

      That’s wrong, it calculates the surface distance not the distance through the earth, while claiming otherwise. From the geopy.distance.great_circle documentation:

      Use spherical geometry to calculate the surface distance between points.

      This would be a correct calculation, using the formula for the chord length from here:

      from math import *
      
      # Coordinates for Atlanta, West Georgia
      atlanta_coords = (33.7490, -84.3880)
      # Coordinates for Tbilisi, Georgia
      tbilisi_coords = (41.7151, 44.8271)
      
      # Convert from degrees to radians
      phi = (radians(atlanta_coords[0]), radians(tbilisi_coords[0]))
      lambd = (radians(atlanta_coords[1]), radians(tbilisi_coords[1]))
      
      # Spherical law of cosines
      central_angle = acos(sin(phi[0]) * sin(phi[1]) + cos(phi[0]) * cos(phi[1]) * cos(lambd[1] - lambd[0]))
      chord_length = 2 * sin(central_angle/2)
      
      earth_radius = 6335.439 #km
      print(f"Tunnel length: {chord_length * earth_radius:.3f}km")
      

      A straight tunnel from Atlanta to Tbilisi would be 9060.898km long.

    • gmtom@lemmy.world
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      7 months ago

      Depends what the great circle function does. But chances are it gives you the arc length between the two points, which would give you the shortest distsnce between them on the surface of the earth.

      If you wanted the distance through the earth you would need to work put the central angle of that arc, then use that to work out the remaining edge of the triangle formed between the two cities and the centre of the earth.