Seems analogous to the concept of elegance in modern math and science. I'm not sure if we should interpret the characteristic Greek speculation about symmetries as a violation of Occam's Razor -- it's certainly not empirically founded, but it's not clear to me that it'd increase the K-complexity or any of the other usual complexity measures when applied to the rather fuzzily defined Greek models of the world.
The addition of an extra planet, empirically unobserved and claimed to be hidden from observers, just to have the celestial body count add up to a "good" number, seems like a pretty clear Occam's Razor violation to me.
I'm reading a popular science encyclopedia now, particularly chapters about the history of physics. The chapter goes on to evaluate the development of the concept of kinetic energy, starting with Aristotle's (grossly incorrect) explanation of a flying arrow saying that it's kept in motion by the air behind it, and then continuing to medieval impetus theory. Added: The picture below illustrates the trajectory of a flying cannonball as described by Albert of Saxony.
While this model is closer to reality than the original prediction, I still cannot help but think... How could they deviate from observations so strongly?
Yes, yes, hindsight bias.
But if you launch a stream of water out of a slanted tube or sleeve, even if you know nothing about paraboles, you can observe that the curve it follows in the air is symmetrical. Balls such as those used for games would visibly not produce curves like depicted.
Perhaps the idea of verifying theories with experiments was only beginning to coalesce at that time, but what kind of possible thought process could lead one to publish theories so grossly out of touch with everyday observations, even those that you see without making any explicit experiments? Did the authors think something along the lines of "Well, reality should behave this way, and if it doesn't, it's its own fault"?