Notice first how 9 repeats itself always. This is the master key of all numbers, we can think of it as zero, the point from which all numbers emerge. Just as zero divides positive from negative, 9 creates two polarities embodied in 3 and 6. The 3-6-9 and 6-3-9 cycle can be thought of as clockwise and counter-clockwise, or electricity and magnetism. We can also see the other pairs which add up to 9: 1 and 8, 2 and 7, 4 and 5, run backwards from each other. We will call these inverts. So 8 could be thought of as -1, 7 as -2, etc.

These 6 remaining numbers can also be depicted as a doubling/halving circuit on the lazy infinity shape on this wheel. Following one way we have doubling or powers of two: 1, 2, 4, 8, 7, 5, 1... equivalent to 1, 2, 4, 8, 16, 32, 64... The other way is halving, or inverse powers of two: 1, 5, 7, 8, 4, 2, 1 ... expressing 1, .5, .25, .125, .625, etc. Start from any number and this holds true.

If we divide the numbers into three triangles, we get three families of numbers. Any magic square (http://en.wikipedia.org/wiki/Magic_square ) of nine will give you one of these families diagonally.

Now we turn to the Fibonacci wheel. The Fibonacci numbers were known in India as far as the 6th century, but Italian mathematician Leonardo Fibonacci introduced them to the West in the 12th century. They are formed by adding two consecutive numbers in the series to get the next one. The first few are 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144... We see this series everywhere in nature, including the geneology of bees, the growth of pinecones and sunflowers, and even the relative orbit of Earth and Venus http://www.takayaiwamoto.com/Earth_Moon_Sun/Harmony_Planets.html. The Fibonacci series can be thought of as a whole number expression of the all-important Golden Ratio, as the ratio between numbers in the series comes closer to approximating phi = 1.61803399...Watch what happens when we run the Fibonacci series as Rodin numbers. We get a sequence of 24 numbers, then the sequence repeats! We can run these numbers round a 24-sided wheel, where we see very interesting symmetries.

9 is 0, and 1 and 8 are the points of maximum potential. So the Fibonacci Series maps out a sine wave. Does this give us an insight into the true spiraling nature of the wave?

This 24 number circle can also be divided into 4 hexagrams.

Note first the 3-6-9 and 6-3-9 triangles in a pair, and also this 1-1-1 and 8-8-8 (the only triangles which do not correspond to the three number families) hexagram at a 90 degree angle to the first hexagram. Then at the two askew angles, we have 1-4-7 clockwise paired with 2-5-8 counter-clockwise, and vice versa, giving us a doubling hexagram and halving hexagram respectively. These two sets of hexagrams can also be looked at as two 12-sided objects, one with mirror numbers horizontally, and inverse numbers vertically, the other mirrors itself vertically with invert pairs horizontally.

It is very interesting to me that all these symmetries should come out of the Fibonacci Series, reinforcing the ideas of the invert pairs, three number families, and the six doubling/halving numbers. In my previous post, Template for Universal Mathematics I showed how this 24-numbered circle can also be used to map particle physics, prime numbers, crystallization, the nesting of all platonic solids, and more. I welcome review/criticism/comments/questions. Peace to everybody out there and try not to let numbers drive you crazy.

I like this a lot, I actually have a spreadsheet I made with the solfeggio codes that end up using the 111,222,333,444,555,666,777,888,999 as its center column from which all other numbers originate and to which they eventually return, that goes along with this.

ReplyDeleteI liked this lot too. While reading this i realized another speciality with 9. (Considering only the whole numbers)

ReplyDeleteI & II. Take any number, add or subtract 9 to it. The Rodin no. to the original and the summed up or deduced one is still same.

eg. 25+9=34

individually, for 25, 2+5=7, and for 34, 3+4=7

eg, 25-9=16

individually, for 25, 2+5=7, and for 16, 1+6=7

III. Similar is if you multiply the no. of your choice with 9, you are always going to get a number whose Rodin corresponding is 9.

eg. 25*9=225

and the Rodin correspondant to 225 is 2+2+5=9

We cant try out the same or similar pattern with division as dividing a no. by 9 is not always a whole no. and it may come some irrational values at times to add up.

But the no. 9 is still interesting :D

Last week I began looking at this Fibonacci pattern of 24 repeating number powers. I drew up many of the same pictures and made the connection with Rodin's work, and the doubling sequence of the non-3-6-9 numbers of the Enneagram. I was just about to post about it on my blog (Circumsolatious) and decided to see what others had published on these matters, and I found this post. I hadn't seen the sin curve or the parallel numbers. It's all pretty amazing. I began researching this because I have long been a student of the book 'The Gnostic Circle' (by Patrizia Norelli-Bachelet) which illuminates how the circle of 9 and 12 (enneagram and zodiac) function in terms of Time and Evolution. I've always been surprised that the Fibonacci sequence seems to be studied disconnected from Time. The Gnostic Circle makes the needed connection between sacred geometry and the geometry of time .... but not specifically with regard to the Fibonacci sequence/cycle. Anyway, I really haven't made much headway on the Fibonacci sequence and time, but these patterns are interesting in terms of electromagnetic fields and such ... though I am not a physicist and don't understand as I would like to about all this. This thread seems to have gone cold. It seems like there is still a lot of 'unpacking' of this pattern so that it can be better explained, understood and utilized.

ReplyDelete