¶ Brouwer’s Theorem
← Brouwer’s Theorem | Brouwer’s Theorem →
Index Entry
Brouwer’s Theorem:
“Brouwer’s theorem shows that when x number of points are stirred randomly on a plane, it can be proved mathematically-- when the stirring is stopped-- that one of the points was always at the center of the total stirring, and was therefore never disturbed in respect to all the others. It is also demonstrable that any plane surface suitable for stirring things upon, must be part of a system that has an obverse surface polarly opposite to that used for the stirring; and the two produce poles in any bestirred complex system.”
¶ Citations
