Planets Complex Forces 2
The data was taken from page 47 of the book “Cambridge Planetary handbook” ISBN0-521-63280-3.
3. The Solar System’s Motion reworked.
In second table the ratio for the individual planets was taken and then summed rather than their elliptic radii directly.
Now 7.7250316753808 / 9 = 0.85833685282
And 0.85833685282 / 0.8164965809282 = 1.0512436584171
So this method gives a larger error of 5.1%
4. F wave Pattern
The figures "Planetary F wave 1" and "Planetary F wave 2" show a rough guide to how the inclination of the planets can suggest a wave pattern. This is speculative but worth mentioning.
5. Conclusion.
The ratio of the square root of 2 / square root of 3 = 0.81649658092 is not just applicable for our Solar System but should be applicable to any solar system.
I also expect it to work for Binary stars (rotating around each other). In this case the space around the stars may be distorted so any discrepancy in the result could indicate the degree of that distortion.
It is possible that I have just been exceedingly lucky. So I also show that the system around Saturn works to produce a similar ratio. The data for other planets in the solar system is less comprehensive than for Saturn but from what I can discover this law for complex forces seems to hold good.
