example-twenty-one
EXAMPLE 21. THE INNER SOLAR SYSTEM BODIES – THEIR MOVEMENTS SYNCHRONIZED WITH EARTH’S ROTATION AND REVOLUTION.
In this example, directly following the name of any planet or satellite will be the orbital period – op, or the rotation period – rp (expressed in Earth days) of that planet or satellite. (Note:- Earth’s sidereal rotation period – ie:- rotation in relation to the fixed stars = 0.9972697 Earth days, and The Earth Year = 365.256 Earth days.)
(A). The Inner Solar System NON-Planetary Bodies are:- The Sun (rp 24.66225), The Moon (rp 27.32166), and (The Two Mars Satellites) Phobos (rp 0.3189)and Deimos (rp 1.2624). The SUM of their rotation periods = 53.56526 Earth days. During TWICE this time period, Earth rotates (in relation to The Sun) 107 rotations + a residual angle of 47.0 degrees.
(B). There are Four Inner Solar System FAST-ROTATING Bodies, and Four Inner Solar System SLOW-ROTATING Bodies. The Four Inner Solar System FAST-ROTATING Bodies are:- Earth (op 365.256), Mars (op 686.980), and (The Two Mars Satellites) Phobos (op 0.3189) and Deimos (op 1.2624). The SUM of their orbital periods = 1053.82 Earth days. During this time period, Earth revolves 2 revolutions + a residual angle of 318.7 degrees.
(C). The Four Inner Solar System FAST-ROTATING Bodies are:- Earth (rp 0.9972697), Mars (rp 1.02596), and (The Two Mars Satellites) Phobos (rp 0.3189) and Deimos (rp 1.2624). The SUM of their rotation periods = 3.6058 Earth days. During this time period, Earth rotates (sidereally, ie:- in relation to the fixed stars) 3 rotations + a residual angle of 221.6 degrees.
(D). There are Four Inner Solar System SLOW-ROTATING Bodies:- Mercury (op 87.9694), Venus (op 224.695), The Sun (op 24.66225), and The Moon (op 27.32166). The SUM of their orbital periods = 364.648 Earth days. During this time period, Earth revolves an angle of 359.4 degrees.
(E). There are Three Inner Solar System Satellites:- The Moon (op 27.32166), and The Two Mars Satellites – Phobos (op 0.3189) and Deimos (op 1.2624). The SUM of their orbital periods = 28.90301 Earth days. During this time period, Earth rotates (sidereally – ie:- in relation to the fixed stars) 28 rotations + a residual angle of 353.6 degrees.
(F). There are Four Inner Solar System Planets:- Mercury (op 87.9694), and Venus (op 224.695), and Earth (op 365.256), and Mars (op 686.980) The SUM of their orbital periods = 1364.90056 Earth days. During this time period, Earth revolves 3 revolutions + a residual angle of 265.7 degrees.
(G). During One Earth Day, The Four Inner Solar System NON-Planetary Bodies, which are:- The Sun (rp 24.66225), The Moon (rp 27.32166), and The Two Mars Satellites – Phobos (rp 0.3189), and Deimos (rp 1.2624) rotate altogether a total of 4 rotations + a residual angle of 1.8 degrees.
(H). During One Earth Year, The Sun (op 24.66225) (Note:- The Sun’s “orbital period” is the length of time taken for a point on The Sun’s equator to perform one single revolution round The Sun’s centre.) and The Four Inner Solar System Planets ie:- Mercury (op 87.9694), and Venus (op 224.695), and Earth (op 365.256), and Mars (op 686.980) revolve altogether a total of 22 revolutions + a residual angle of 43.1 degrees.
(I). During One Earth Day, The Four Inner Solar System Planets ie:- Mercury (rp 58.6462) and Venus (rp 243.0187) and Earth (rp 0.9972697), Mars (rp 1.02596) rotate altogether a total of 1 rotation + a residual angle of 359.5 degrees.
Sample calculations:- (A). 53.56526 x 2 = 107.1305 rotations of Earth (in relation to the Sun), and 0.1305 x 360 = 46.98 degrees. That is 107 rotations + a residual angle of 46.98 degrees.
(B). (1053.82 ÷ 365.256) = 2.88515 revolutions of Earth, ie:- 2 revolutions + (0.88515 x 360) = 318.7 degrees.
(C). 3.6058 ÷ 0.9972697 = 3.615 rotations of Earth (in relation to the fixed stars), ie:- 3 rotations + (0.615 x 360) = 221.6 degrees.
When you depict each of these nine residual angles as a (single line) radius, the nine 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 residual 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 planets and satellites.) Once again, these residual angles all (mysteriously) “hug” the octants. “Something else” (other than Newtonian Physics) is influencing and dictating the movements of these celestial bodies.
To verify numerical data, go to Appendix 2. Section 9 for Inner Solar System Non-Planetary Bodies. Section 3 for fast and slow rotating Inner Solar System bodies, and for The Earth Year, and for Earth sidereal rotation. Section 1 for The Sun. Section 3 for all other data. (Note:- Numerical data verification is only available in the book.)