Sun's Jet Ring
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No-one has suggested how Brownian Motion in a sphere works. To show it is possible to take this chaotic/random motion (Brownian Motion ) I use a circle in one plane and just aplly this to all 3 planes.
I have covered this before by linking this with Loop Quantum Gravity.
In figure "Brownian Motion 1"
We have a standard intergral for a line curve that is a circle.
You don not need to know the maths but here is how I interpret this result:
1> Since we need to split the circle into 2 halves this ties in with my assertion of a 2 phase wave.
2> The circle has a radius r of 2 and there are two ways we can look at this.
3> The radius of 2 can be considered as of arbitrary units.
4> We could relate r to a unit circle radius R = 2r and 4 = 4 r^2.
5> I believe this integration needs to use a radius of 2 to allow the use of substitution and a radius of 1 would not produce a result that was a multiple of pi.
6> We want a solution that gives us a contour of 2*pi. Now implied is that the radius doubles. This can mean the core should be taken as a radius of 1 and the Jet Ring with a radius of 2 but I believe the Jet Ring can moves to and fro towards the surface of the Sun.
7> I prefer to interpret this has saying that there is enough 'capacity' to move into 4D where distances double.
8> Note the substitution even takes linear distance x and turns it into a sinusoidal wave form!
9> The result is negative. So the Jet Stream would probably be counter rotative with the Sun but I do not believe there is any evidence for a rotation of the Sun at any level.
