晿（ syo-u ） 60 Stars Astrology Season 7 Mini Appendix 2 It's Hard to Discuss the " Circle ! "

60stars astrology

English version

By Tokyo-Tanuki

60stars Astrology Season 7

晿（ syo-u ） 60 Stars Astrology Season 7 Mini Appendix 2   

It's Hard to Discuss the " Circle ! "

1. Well, Tanu-chan, I really wanted to talk about the "circle", too.

Actually, I tried to write about five articles as a mini-appendix once, but I can't write well, so I have to postpone it for now.

I don't know when I will be able to write about it on my blog.

2.  Before I explain circles out of the blue, we have to talk about straight lines and curved lines, don't we?

So let me explain this point a little bit.

A curve arises from a 1-gon (straight line).

Since a 1-gon is a line in one direction, it arises before a curve that has two directions.

Of course, a 1-gon appears after a point (0-gon).

.....So, how can we create a curve?

This is not an exact description, but just to give you an image.

3.   If two 1-gons closely approach each other to a distance of zero, the number of constellations in two 1-gons is 6 x 2 = 12.

（because 1-gon=6 constellations)

So, if we bend this, does it immediately become a curve?

If you put a clamp in the bend, the straight line becomes a refracted line.

But this does not make it a curve.

4.  At this point, when the straight lines cooperate and try to fuse together to become one line, a curve is created.

This is called a “Φ - gon .”

“What do you mean " lines 'cooperate "  ???”

“Tanu-chan, you better go to the hospital ASAP!”

...I hear such voices, don't you?

Well, let me continue the explanation for a moment

The Φ-gon is the beginning of a curve, but it is also a kind of straight line.

So we can use the polygonal formula Tn = 3n (n + 1) for Φ-gon.

Then the number of constellations (segments) around Φ-gon is,

T(Φ) = 3Φ(Φ+1) = 3Φ³.

This is compared to the sum of two straight lines (2 x 6 = 12),

3Φ³-12 = 3/Φ³ = 0.7082039....

There is a slight increase.

Dividing the perimeter of the Φ-gon by this increased portion (3/Φ³) as one unit,

3Φ³÷3/Φ³=Φ⁶.

In other words, " Φ - gon " is represented by " Φ⁶ " , if 3/Φ³ is taken as one unit.

(1/Φ³ is the value of √5-2=0.2360679....)

5.  And if you want to make a simple circle by attaching curves, not from a golden spiral, etc,

It's an image of gathering several of these curves (Φ⁶) together to make a circle.　　

Well, it is a little bit difficult to imagine when it is said so.

🌟　🌟　🌟

However, it is not the same as the case of polygons.

At any rate, circles do not have diagonals to begin with, so they are distinguished from polygons that are at least quadrilaterals.

Thus, about circles,

"What is a circle?, or circles ?"  

is a big definitional question.

In addition to such a big question, there are many other questions,

...“What is the relationship between a circle and a triangle?”

...."What is the relationship between a circle and a golden spiral?"

...And so on.　

So, it is difficult to explain well.

Tanu-chan is a humanities student, you know.

At first, I was going to explain the circle from the point that no matter how many polygonal angles you add, it will never be a circle, but the explanation became more complicated, so I decided to restart the story.

6.　By the way, the picture at the top of today's blog is a famous “trompe l'oeil” picture, in which multiple circles appear to be spirals, which is an illusion of the eye.

Try to count them.

.... Well, so, if I were to write about circles, I would probably have so many articles that I would not be able to write enough even if I used an entire season.

Besides, there are a number of things that Tanu-chan doesn't understand, so even I don't know when the articles will be done!

.... And of course, the most important thing to keep in mind is that all the above is Tanu-chan's delusion.

Don't say “Φ-gon” in front of a school teacher.

Of course, you shouldn't say it in front of a doctor either!

....That's all for today.

I have no plans at all yet for season 8 or anything else.

For the time being, I think I will be making corrections and supplements to the articles I have written so far.

Possibly I will write an article explaining the picture I wrote on Twitter, as a offshoot of Season 7, or something.

Anyway, I wish everyone in the world to have a peaceful summer solstice in 2025!

Tanu-chan💓 TOKYO-TANUKI💛