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Draft:Thien Khoi's theorem

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The Thien Khoi theorem is one of the most recent theories out there, proving the existence of the number of planes of symmetry in a sphere. His theory states that there is no such thing as an infinite amount of planes/lines of symmetry. In fact, there were always a finite amount that we just didn't discover. The theorem also suggests that the amount of planes of symmetry are always inside the 3D shape. Thien Khoi's theorem is written like this below:

                      Failed to parse (SVG (MathML can be enabled via browser plugin): Invalid response ("Math extension cannot connect to Restbase.") from server "http://localhost:6011/wiki.riteme.site/v1/":): {\displaystyle T = lim t --> ∞ [(3/4πR) x (t - (t - 360))]}

The limit represents that as the t gets bigger and bigger to infinity but not at infinity, the inversed area of the sphere represents the volume of the sphere, as the theorem states the planes of symmetry can only exist in the shape, finally the final section states that the planes of symmetry depends on the angle of the plane from the diameter.

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