1 result for (book:tes9 AND session:449 AND stemmed:unpredict)
[... 25 paragraphs ...]
There is an instability and still unpredictable activity inherent in the integers (pause), but shows more strongly, or appears, after the 9th power.
This instability isn’t noticeable here, even after the 9th power, but it exists. The unpredictability seems to result in the dissolution of quadrants under certain conditions. The value of the integers would seem to dissolve (pause) at the speed of light, but it is precisely here that the minus numbers take over and become, or take on, the value of the positive numbers.
[... 11 paragraphs ...]
Now, with him the date 1936. And unless I’m balled up I think 1936 is the year he published or initiated some of his theories. Correctly interpreted, they would lead as mentioned earlier to an unsuspected unpredictability of integers under certain conditions, and the unpredictability is the clue that would lead to the thus-far hidden values. (Pause.)
[... 19 paragraphs ...]
There is a basic unpredictability. Find it. Grouped generally under the values of the simple 7, plus and minus the magnitude of the 7 as it goes through the zero, brings you a multidimensional concept that equates with truth.
[... 5 paragraphs ...]
(Steady, rather fast pace.) Known values operate up to a point, then the unpredictable nature of the psi factor undermines accepted tenets, and the equation seems to fail. Group your forces under the protection of the 9th power.
Here at the 9th power there is balance with the minus 9, but only for a moment. The unpredictability then enters in, flying the banners of a divided house. The atom lives in the unpredictable factor where the integers meet and fall apart. Here there is the development of new powers, and the negative functions come to the fore.
[... 6 paragraphs ...]