Electromagnetic Acceleration

The theory of the Electromagnetic Accelerator (EA) states that there is a mechanism to the universe that pulls, pushes, or deflects light upwards. All light curves upwards over very long distances. The Electromagnetic Accelerator has been adopted as a modern alternative to the perspective theory proposed in Earth Not a Globe.

Sunrise and sunset happen as result of these upwardly curving light rays.



The above illustration depicts rays from the sun which intersect with the earth. Other rays not depicted may miss the earth and make a "u-turn" back into space.

It is believed that the bending of light does not simulate or match the globe curvature. Instead, the bending occurs more gradually over a greater distance. This is why observers can see further than they should in the classic Flat Earth water convexity experiments that take place on shorter ranges near sea level, and why the dip of the horizon at higher altitudes over longer ranges sits higher than the globe earth prediction but lower than a planar prediction (See: Evidence for Electromagnetic Acceleration).

=Mechanism=

One may point out that it would be quite unreasonable to assert that a particle or wave in motion would travel forever through the universe in a perfectly straight line, unperturbed by any of the variety of forces or phenomena which fills existence. Get into a car and attempt to drive in a perfectly straight line down a highway without turning the steering wheel left or right. It is a near impossible thing to do. The car is affected by the slope and texture of the terrain, alignment of your wheels, the wind, &c. An apparently straight heading turns into a curved one. When it comes to bullets, airplanes, et all, it is expected that bodies never realistically travel straightly. Straight line trajectories rarely, if ever, occur in nature.

While the mechanism which affects light over long distances is not known, the cosmological theme of upwards acceleration fits in with this Flat Earth model.

Approximation
As there has been a long wait for a conclusive equation describing the Electromagnetic Acceleration theory, an approximate formula for large-scale bending has been proposed by Parsifal. This is a limit of a more complex (and not yet final) expression as x approaches infinity, so this will only work when y is much greater than x - that is to say, when the vertical distance travelled is much greater than the horizontal distance travelled. Put another way, its accuracy will improve the closer the light ray is to vertical. Therefore, while it is not valid for short-range experiments, it can give an idea of how much sunlight would bend on its way to the Earth, for instance.

Where (0,0) is understood to be the point at which the light ray is horizontal (that is, the derivative of this function is zero).

Definition of terms:

x, y - co-ordinates in the plane of the light ray, where y is increasing in the direction of fastest decreasing Dark Energy potential, and x is increasing in the direction of the component of propagation of the ray which is perpendicular to y.

c - the speed of light in a vacuum.

β - the Bishop constant, named in honour of the great Flat Earth zetetic Dr. Tom Bishop, which defines the magnitude of the acceleration on a horizontal light ray due to Dark Energy. When the theory is complete, attempts will be made to measure this experimentally.

Articles of Interest

 * Light Bends Itself Around Corners - Physicsworld.com
 * Stanford Researchers Use Synthetic Magnetism to Control Light

=Terrestrial=

Clouds Lit From Underside
Rays which miss the earth will turn back up into space, and may hit the underside of clouds before sunrise or after sunset, giving them a reddish glow.



Horizon Dip
The Electromagnetic Accelerator predicts that at high altitudes where one can see further into the distance, the horizon will dip below eye level. Light which travels parallel from the limits of vision will be pulled upwards and miss the eye of the observer. The rays the observer will see are those rays which are transmitted at a lower angle and pulled upwards to meet the observer, resulting in a horizon which is slightly below eye level.



=Celestial=

Nearside Always Seen
A consequence of this paradigm of upwardly bending light is that the observer will always see the nearside (underside) of the celestial bodies. The below image depicts the extremes of the Moon's rising and setting. The image of the nearside face of the moon is bent upwards around the moon and faces the observers to either side of it.



Lunar Phases
When one observes the phases of the Moon they are seeing the Moon's day and night, a shadow created from the Sun illuminating half of the spherical moon at any one time. As depicted in the previous section, due to EA we are always observing the nearside (or underside) of the moon.

The curved rays of the Sun results in the phases upon the Moon's surface. The plane of the Moon's route is at an inclination to the plane of the Sun's ecliptic, with its highest side opposite from the sun. When the Moon is far from the Sun and higher than it, the Full Moon occurs. When the Moon is closer to the Sun and lower than it, the New Moon occurs1. The Moon moves at a slightly slower rate than the Sun across the sky, causing the range of phases. The time between two Full Moons, or between successive occurrences of the same phase, is about 29.53 days (29 days, 12 hours, 44 minutes) on average.

Sample large-scale sun ray diagram (side view):





Moon Position Table
Compare the above with the following table from Cornell University (Archive), which provides a rule-of-thumb summation for when the Moon rises and sets during its phases:

1 Around the time of the New Moon the Moon is not technically seen. According to Kean University (Archive):

=See Also=


 * Evidence for Electromagnetic Acceleration
 * Sunrise and Sunset
 * The Equinox
 * Magnification of the Sun at Sunset