Let me see if I can draw this as an ascii picture
So heres the earth (hypothetically) as a globe.
..,,,----'''''''''----,,,
(...................)
..'''----.....----''''
Ok so we want to know what the "curvature" is over a distance such as 100 miles
But that definition does not represent what we think it does.
At a glance we think curvature measures top-most first comma (,) to the top-most last apostrophe (')
..,,,----'''''''''----,,,
(...................)
..'''----.....----''''
It isnt.
So I will draw a line to show what curvature actually measures:
..,,,----'''''''|---,,,
(...................)
..'''----.....----''''
Curvature is the distance between the same first comma (,) to the bottom point of the pipe (|)
The bottom point of the pipe digs deep within the surface at a 90 degree pie.
Edit
I will attempt to illustrate this again but written
Imagine a pumpkin pie.
The outer crust is round and completes a circle of crust around the pie.
Now cut a slice of the pie thin or thick.
You make two cuts and are left with 1 side round and 2 sides triangular on a straight line
What we want to measure is the point of one side of the crust to the other side of the crust on the rounded side.
However, we have accidentally measured the "curvature" which is the distance the cut crust starts on a 90 angle deep below the crust towards the pointed side.
We actually want to measure what ( I think) is defined as "horizon dip"
Definitely the pumpkin pie analogy worked better for me!
So are you saying this formula is incorrect?
No the formala is probably correct for curvature
Im saying we want the bulge not the curvature
There’s no bulge because there’s no curvature.
A body of water at rest ALWAYS finds its level, that why you can skate on frozen lakes. That’s why the Bolivian salt flats act as a mirror or the sky. That’s why we can see land far away, that should be ‘behind the horizon’.
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