Railroad tracks are perfectly flat for thousands of miles , which is impossible on a curved surface.
If train tracks are being laid over an “ oblate-spheroid ,” then the tracks must gradually curve by varying degrees - but they don’t.
There are highly complex formulas used to ensure that trains make... View MoreIf train tracks are being laid over an “ oblate-spheroid ,” then the tracks must gradually curve by varying degrees - but they don’t.
There are highly complex formulas used to ensure that trains make precise turns, but none to account for the ‘ natural curvature of the earth’
Airplanes should logically have to lower their trajectory periodically to avoid moving further and further away from the earth. An airplane traveling 500 miles per hour on a globe would have to dip t... View MoreAirplanes should logically have to lower their trajectory periodically to avoid moving further and further away from the earth. An airplane traveling 500 miles per hour on a globe would have to dip their nose about a mile every five minutes to avoid flying off into the atmosphere, but no such corrections occur.
According to Pythagorean Geometry, the formula for earth’s curvature is 8 inches multiplied by every mile, squared. For example, one mile would see 8 inches of curvature. 8 multiplied by one mile sq... View MoreAccording to Pythagorean Geometry, the formula for earth’s curvature is 8 inches multiplied by every mile, squared. For example, one mile would see 8 inches of curvature. 8 multiplied by one mile squared (one mile squared equals 1) is 8.
Two miles would see 32 inches of curvature; three miles 72 inches of curvature (6 feet); four miles would see 128 inches of curvature; 5 miles would see 200 inches of curvature, and 6 miles would see 288 inches (24 feet) of curvature; and so on.
The math should be easily testable; however no such curve can be demonstrated.
If the earth is curved by 24 feet over six miles, as the formula says it should, then surveyors, engineers, architects, and any other professions which rely on precise measurements must factor-in the curve.
Bridges, tunnels, canals, and railroads, which stretch over vast stretches of land and sea, would have to account for curvature…
But they don’t.
“Common sense is what tells us the earth is flat.”
– Albert Einstein
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