Draft: Three Body Problems

Three Body Problem.
Three Body Problem
The Three Body Problem has multiple problems. Some have inclusive status in their Shared State. I'll use my Ezekiel's Wheels Within Wheels Dark Formula to solve these problems. There are two , maybe more, categories central to this problem. A linear, or recurring, transition from minimum XY's length to its maximum. The other category fluctuates between minimum and maximum like a wave pattern. I display them in ways easy to comprehend. My labeling to identify multiple points for minimum to maximum becomes quickly convoluting due to some structural overlaps between rotational bodies. These static naming become more confounding, when you realize these bodies can rotate clockwise or counter-clockwise. I change minimum and maximum functions to Now(n) and Next(n) functions and use numeral values to indicate order of magnitude from minimum to maximum. This way, you can organize and recognize each phase of transition from 1 to 8. This means, cycles can make full clockwise and counter-clockwise cycles plus alternating cycles without confusion. Each phase might require different ratios for X and total X values. Y can substitute X depending on which quarter during the cycle. I use 100% instead of 360 degrees, so that's 4 quarters. Whatever modulus percentiles you need to track (charge or discharge) these minimum to maximum values, I allow usage. Notice in one of my circular examples, I use Mirage Median Distances(extra radiuses in A) to track frequency changes by other bodies(C and B) like a clock. Those, Mirage Median Distances, can also map changes for minimum to maximum XY's length values like A's median distance using Ezekiel's Wheels Within Wheels Dark Formula. Those are cycling problems that I've solved. Other problems are within their Shared State. I understand a two body linear problem, but three bodies require additional logics. These logical gauges can apply to degradation and amplification frequencies. If you want, you can consider these directional values as heat transferring to the Shared State which creates a temperature I call Median Distance. Contributing Elements' conflict within their Shared State can promote some to heat dominance(Time's directional potential) due to changes in median distances. Compatibility: 2D AreaCompatibility: 1 to 2 Dimension .

Extras: Compatibility: 0.5 Plus 1 DimensionCompatibility: 0.5 Dimension

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