CHAPTER EIGHT. CLOSE-TO-PERFECT WHOLE NUMBERS IN THE SOLAR SYSTEM.
The next collection of examples OF “Impossible Configurations” involves close-to-perfect WHOLE NUMBERS.
(A). During one Mars orbital period, The Sun and Moon rotate altogether a total of 52.99968 rotations.
(B). During One Eclipse Year, The Three Prograde Primary Satellites of The Four Giant Planets revolve altogether a total of 109.9999139 revolutions. On average, only 1 randomly generated number in 5807 randomly generated numbers will be this close to a PERFECT WHOLE NUMBER.
1 ÷ [(1 minus 0.9999139) x 2] = 5807
(C). Jupiter’s Primary (ie:- largest) Satellite is Ganymede. The bodies inferior to Ganymede are:- Jupiter, Metis, Adrastea, Amalthea, Thebe, Io, and Europa.
TWICE the SUM of the rotation periods of these seven bodies = 14.99922 Earth days.
and During TWO Earth days, these seven bodies rotate 26.9999005 rotations.
On average, only 1 randomly generated number in 5025 randomly generated numbers will be this close to a PERFECT WHOLE NUMBER.
1 ÷ [(1 minus 0.9999005) x 2] = 5025
and During TWO Sun Oscillation Periods, these seven bodies rotate altogether a total of 2.999989 rotations. On average, only 1 randomly generated number in 45,454 randomly generated numbers will be this close to a PERFECT WHOLE NUMBER.
1 ÷ [(1 minus 0.999989) x 2] = 45,454
(D). The SUM of the sidereal and synodic rotation periods of The INNERMOST Satellites of the Inner Solar System = 186.0000178 Earth days. On average, only 1 randomly generated number in 28,089 randomly generated numbers will be this close to a PERFECT WHOLE NUMBER.
1 ÷ (0.0000178 x 2) = 28,089
(E). The Directed Number SUM of the orbital periods of The Primary Satellites of The four Giant planets = 25.99998857 Earth sidereal days. On average, only 1 randomly generated number in 43,747 randomly generated numbers will be this close to a PERFECT WHOLE NUMBER.
1 ÷ [(1 minus 0.99998857) x 2] = 43,747
(F). The SUM of the synodic revolution periods of Uranus’ Five Large satellites = 30.2563551 Earth days. The Earth Year exceeds this by 335.0000049 Earth days. On average, only 1 randomly generated number in 102,000 randomly generated numbers will be this close to a PERFECT WHOLE NUMBER.
1 ÷ (0.0000049 x 2) = 102,000
To verify the above time periods, go to APPENDIX EIGHT.