An easy way to do this without getting too involved in maths is to measure the period that elapses from the time you first sight the aircraft until it is overhead. Jet airliners travelling at full speed cover about 8 miles per minute (about a mile every 8 seconds).

Ignoring visibility, refraction or terrestrial features (mountains, valleys) at 6.5 miles the horizon would be about 250 miles away. Typically visibility rare exceeds 100 miles so Judge J probably has the right approach for calculating the apparent distance of an observed commercial jetliner.

Pythagoras said, �Sum of squared sides of right triangle = hypotenuse squared�.

The Earth�s radius (Er ~4000 miles) plus an elevation (H) is the hypotenuse of a right triangle formed by Er and D (the distance to the horizon).

Alternatively Er ^2 + D ^2 = (Er+H) ^2

Example: radius of Earth squared = 4,000^2 = 16,000,000
(radius plus altitude of jet) squared = 4,006.5^2 = 16,052,042
Square root of difference = distance = sqrt(52,042) =
228 miles to horizon

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