Ж 60 Stars Astrology: Season Vacation Mini Appendices Part 1: The Rendezvous of Lifes

60stars  Astrology Season  Vacation

English  version

By TOKYO-TANUKI

Ж　60 Stars Astrology: 

Season Vacation Mini Appendices Part 1: 

The Rendezvous of Lifes

1. As I wrote before in the Season 6 off-season article “4 Spirals, Circles, and Polygons,” life, when expressed in two dimensions, is essentially a spiral motion.

The human soul itself is a spiral motion that grows larger.

Spirals have two types: equiangular and algebraic, but the equiangular spiral is fundamental to life.



2. I've written before about those who try to force life into convenient boxes—people who reduce the logarithmic spiral to an algebraic spiral, then to a circle, and then to a polygon. 

But I won't write about that this time.

....Well, Tan-chan dislikes stories about magic and such.

Of course, I don't know how to do it either.

This mini-appendix is about the opposite: how life arises.

The equiangular spiral and the circle have the relationship shown in the illustration below.

Well, if the circumference of the circle is 4a, the length of the spiral becomes a³.

(Fig.1)

3. Now, looking at the specific process of how the spiral grows, it goes like this.

First, in a place with no interference, an object moves in a circular path.

It spins round and round in the same spot. 

People say all sorts of things about this—like the curvature of space, or moving in the direction of the initial force that set it in motion—but well, Tan-chan doesn't know about such complicated things.

....And even if it looks like straight-line motion at first glance, when viewed on a larger scale, it's still circular motion.


Of course, since Tanu-chan is a liberal arts student, all this talk is pure fantasy.

Well, you could also call it nonsense.



4. By the way, when objects with opposite properties come close, one tries to interfere with the other and extends a tentacle toward it.

How would this be expressed mathematically?

As I wrote previously in the simple explanation of circles, the circumference is four times Φ-gon, but a perfect circle is five times Φ-gon (⇒ article).

Following the previous explanation, let's set Φ-gon = 3Φ³ and circle = 15Φ³.

When the circumference is 4a, the spiral length becomes aΦ².

Therefore, if the circumference is 12Φ³, the spiral length becomes 3Φ⁵.

And looking at the illustration, you see two spirals inside the circle, each spiraling in the other's opposite direction.

These spirals influence each other as they whirl around. 

You could say they pull at each other.

In short, if left as is, objects undergoing circular motion pull each other and grow larger.

..........So how much larger do they become?

The difference in growth is the length of the two interfering spirals minus the circumference.

That is,
２×３Φ⁵−１５Φ³＝３０Φ＋１８−３０Φ−１５=３

The total increase of the two spirals is just 3, compared to when it forms a circle.

Compared to the circumference,
2×3Φ⁵−12Φ³＝30Φ＋18−24Φ−12=6Φ＋6=6Φ²
It appears to have increased.

5. Well, it might be a bit hard to grasp,
but the apparent increase is 6Φ².
The actual increase is 3.

So, 6Φ² - 3 = 6Φ + 3 = 3(2Φ + 1) = 3Φ³,

It's like adding one extra Φ-gon, but it's more of a feeling than an actual increase.

Well, you could also say the previously invisible clamp part (3Φ³) of the circle has materialized.

........That's all for today.

Tanu-chan💓　TOKYO-TANUKI💛