guss said:
Thanks.
Can anyone actually show the calculations behind this? I'm really interested.
There are no closed-form solutions to the issue raised by rcgldr in post #12 and cjameshuff in post #14. This is venturing into the realm of the N-body problem, a problem which does not have a general closed form solution.
That said, there are a handful of special cases of the three body problem that do have an exact closed form solution, and we do know how to solve the N-body problem in general using numerical techniques. Countless journal articles and even entire books have been written on the N-body problem. I'll give a few references at the end of this post. Google phrases such as "three body problem", "Lagrange point", "N-body problem", and "horseshoe orbit" to learn more.
We also know how to address the issue of a single fly-by such as the close encounter with the Moon discussed in post #14. This again is the subject of many journal articles and books. NASA has been using such close encounters, aka gravity assists or gravity slingshots, for quite some time to make its planetary probe missions possible. NASA now has five satellites on an escape trajectory from the solar system: Pioneer 10 & 11, Voyager 1 & 2, and New Horizons. None of these spacecraft were launched from Earth with anything close to solar system escape velocity. These vehicles instead attained escape velocity by using gravity assists.
Animated GIFs of a couple of objects with rather interesting orbits:
Near Earth Object J002E3: http://neo.jpl.nasa.gov/j002e3/j002e3d.gif
This object is rather apropos to the topic at hand. It was the upper stage of the Apollo 12 mission launched in 1969.
Near Earth Object 2002 AA29: http://neo.jpl.nasa.gov/2002aa29/2002aa29a.gif
This object is in a 1:1 resonance with the Earth and has a very cool horseshoe orbit.
Some references:
"Porkchop" is the First Menu Item on a Trip to Mars
http://mars.jpl.nasa.gov/spotlight/porkchopAll.html
NASA uses porkchop plots to plan missions to other planets. A linked set of such plots are needed to plan a sequence of encounters such as with the current New Horizons mission.
Slingshots and Space Shots by Bill Casselman
http://www.ams.org/samplings/feature-column/fcarc-slingshot
This featured AMS column discusses gravity assists and also discusses a rather interesting configuration of the three body problem, Burrau's problem, aka the Pythagorean problem.
Victor Szebehely, Burrau's problem of three bodies
http://www.ncbi.nlm.nih.gov/pmc/articles/PMC335596/pdf/pnas00677-0079.pdf
This 1967 PNAS paper discusses Burrau's problem from the perspective of Newtonian mechanics.
M.J. Valtonen, S. Mikkola, S., & H. Pietila, Burrau's three-body problem in the post-Newtonian approximation
http://adsabs.harvard.edu/abs/1995MNRAS.273..751V
This more recent MNRAS paper discusses Burrau's problem from the perspective of general relativity.
The three-body problem by Mauri J. Valtonen and Hannu Karttunen
http://books.google.com/books?id=dvIXkeS17bAC
As I told you above, entire books have been written on this subject. This is one of them.
