example-twenty-nine
EXAMPLE 29. THE SATURN SATELLITES – THEIR MOVEMENTS SYNCHRONIZED WITH THE EARTH DAY.
Here are the names and orbital periods of Saturn’s Eight LARGE Satellites:- Mimas 0.942421813 and Enceladus 1.370217855 and Tethys 1.887802160 and Dione 2.736914742 and Rhea 4.517500436 and Titan 15.94542068 and Hyperion 21.2766088 and Iapetus 79.3301825 Also, Saturn’s rotation period = 0.44401 Earth days.
(A). During One Earth day, Saturn rotates 2 rotations + a residual angle of 90.8 degrees.
(B). During TWO Earth days, Mimas revolves 2 revolutions + a residual angle of 43.99 degrees.
(C). During One Enceladus revolution, Earth rotates in relation to The Sun 1 rotation + a residual angle of 133.3 degrees.
(D). During One Tethys revolution, Earth rotates in relation to The Sun 1 rotation + a residual angle of 319.6 degrees.
(E). During One Dione revolution, Earth rotates in relation to The Sun 2 rotation + a residual angle of 265.3 degrees.
(F). During One Rhea revolution, Earth rotates in relation to The Sun 4 rotation + a residual angle of 186.3 degrees.
(G). During TWO Earth days, Titan revolves an angle of 45.2 degrees.
(H). During EIGHT Earth days, Hyperion revolves an angle of 135.4 degrees.
Iapetus “fails” The Octant Rule.
Sample calculation:- (H). 8 ÷ 21.2766088 = 0.376 revolutions of Hyperion, and 0.376 x 360 = 135.4 degrees.
When you depict each of these eight angles as a (single line) radius, the eight radiuses look like this:-
The material on this web site is also available in the book Astronomy - The Dishonest Science, by Roger Elliott (available on Amazon
Once again, it is glaringly, blindingly obvious that these angles are NOT randomly distributed, as they absolutely SHOULD be if Newtonian Physics alone governed the movements of celestial bodies. (The gravitational field of Earth is insufficiently strong to alter or affect the orbital periods of distant satellites.) Once again, these angles all (mysteriously) “hug” the octants. “Something else” (other than Newtonian Physics) is influencing and dictating the movements of these satellites.
However, it could be argued that these satellites (which are relatively close to one another) can easily influence the movements of one another by gravitational attraction and “tidal friction”, and that being the case, their movements could be synchronized with the movements of Earth purely by chance. This argument is undermined by the fact that ALL the satellites of (just about) EVERY planet have their movements synchronized with the movements of Earth.
To verify numerical data, go to Appendix 2. Section 2 for Saturn rotation period, and Section 12 for Saturn Large Satellites. (Note:- Numerical data verification is only available in the book.)