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In order to calculate the amount hidden we may use the Theory of Pythagoras.
 
In order to calculate the amount hidden we may use the Theory of Pythagoras.

Revision as of 23:27, 11 July 2018

Manually Calculating the Amount Hidden by Curvature

In order to calculate the amount hidden we may use the Theory of Pythagoras.

Calc-method.png

Illustration Credit: dizzib | Theory Credit: Pythagoras

Important Equations

To find the distance from the observer's eye to the horizon we first perform the following:

1. d1 = sqrt(h0^2 + 2 * R * h0)

Next, we place that in the following equation to get the amount hidden behind the alleged curvature of the earth:

2. h1 = sqrt((d0 - d1)^2 + R^2) - R

Example 1: Sea Level

To calculate the amount hidden at sea level, over 6.23 miles, with an observer height of 32 inches, we convert to a like unit (ie. km) and perform the following:

R = 6371 km
h0 = 0.0008128 km (32 inches)
d0 = 10.02621 km (6.23 miles)

1. d1 = sqrt(0.0008128^2 + 2×6371×0.0008128) = 3.21818
2. h1 = sqrt((10.02621 - 3.21818)^2 + 6371^2) - 6371 = 0.00363752

0.00363752 km in feet = 11.93412073491 feet hidden

Example 2: Lake Above Sea Level

To calculate the amount hidden by a lake with an altitude 1368 meters, we make a slight adjustment to R and perform the following:

R = 6372.368 km (6371 km + 1368 m)
h0 = 0.0008128 km (32 inches)
d0 = 10.02621 km (6.23 miles)

1. d1 = sqrt(0.0008128^2 + 2×6372.368×0.0008128) = 3.21853
2. h1 = sqrt((10.02621 - 3.21853)^2 + 6372.368^2) - 6372.368 = 0.00363636

0.00363636 km in feet = 11.93031496063 feet hidden