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174 60 Stars Astrology Season 7 Appendix 6 The Division of Figures Part 2 The Division of a Circle (Very Brief Explanation)
60stars astrology
English version
By Tokyo-Tanuki
60stars Astrology Season 7
174 60 Stars Astrology Season 7 Appendix 6
The Division of Figures Part 2
The Division of Circles (Very Brief Explanation)
1. Now, in the previous article, I explained the divisions around polygons.
Then, maybe the question would arise, “Then why is the circumference of a circle divided into 60 segments (divisions) ?”
Some people say that a circle is a polygon with an infinite number of corners, so why not an infinite number of segments of a circle?
I can hear such a voice, and I understand that feeling.
I understand it well.
2. But that's not correct.
For a portion of the circle (90×n)°/360° = n/4, the number of constellation segments(divisions) around the circle is,
Whatever the detailed reason or theory,
T(C) = Tc(90n/360) = n x 15
Therefore, for example, the number of constellation segments(divisions) in half of the circle is,
Tc (2/4) = 180°/360° x 15 = 30
....Anyway, let's put logic aside.
3. Then,
"Is a curve made up of 15 constellations, with 90 degrees as one Unit ?"
I know some of you may think that, but that is not quite true.
I know some of you may think that, but that is not quite true.
I will explain it when I have a chance, maybe !
....In this article, I'll just say a few words;
A regular circle is completed in four directions, if you think of it in terms of angles, so in that sense it is the same as a rectangle.
Both have 60 constellations(divisions).
So, then, if we have a 90-degree curve, we have 15 constellations?
So, then, if we have a 90-degree curve, we have 15 constellations?
....It is reasonable to think so!
...But circles are counted differently from polygons, which are made of straight lines!
And of course, it's Tanu-chan's delusion, but the units for counting curves are,
It is not an integer 1, 2, 3, 4 ......
rather than, I think,
It is (1+) Ξ¦, Ξ¦²......
In addition, it is difficult to say whether there can be a semicircle or quarter circle that is isolated from the circle.
In other words,
(1) The number of constellations (divisions) in a curve line that is part of a circle
(2) The number of constellations (divisions) in an curve line arc that is not part of a circle.
Tanu-chan thinks these (1) and (2) are not the same, maybe slightly different.
Of course, this is my idea, or my DELUSION.
4. By the way, about polygons, to a point(0-gon), we direct four directions in a straight line as 90 degrees each.
As long as the directions are specified sequentially, a square is formed.
The number of constellations (divisions) around the figure(a square) is,
Tn (polygon=οΌ) = Tn (4) = 3n (n + 1) = 3 x 4 x (4 + 1) =60
There are60 constellation segments (divisions).
Well, so, in this case, the quadrilateral has 60 constellation segments, as well as the circle, in common.
.....Perhaps they are good friends.
However, the circle can be divided into 60 zodiacal divisions, and if we consider the 12 zodiacal signs as one "Zodiac", the entire circle can be divided into 60 divided by 12 = 5 "Zodiac" s .
In this sense, the circle could possibly be good friends with the pentagon.
Well, so, in this case, the quadrilateral has 60 constellation segments, as well as the circle, in common.
.....Perhaps they are good friends.
However, the circle can be divided into 60 zodiacal divisions, and if we consider the 12 zodiacal signs as one "Zodiac", the entire circle can be divided into 60 divided by 12 = 5 "Zodiac" s .
In this sense, the circle could possibly be good friends with the pentagon.
Because, the pentagon has five directions, and as a shape, it is divided into five parts.
The pentagon is Tn (P = 5) = 3 x 5 x (5 + 1) = 90
The number of constellations is different between a pentagon and a circle, though.
....Focusing on these properties of quadrilaterals and pentagons, some people may think,
"Can't we successfully convert a circle and a polygon, or something like that?"
5. I wrote in a post in twitter before, there are at least several people for whom a Pyramid looks like a sphere.
5. I wrote in a post in twitter before, there are at least several people for whom a Pyramid looks like a sphere.
...Then, perhaps polygons and circles can be converted by a certain method?
...And perhaps it is also possible to convert a spiral into a circle or a polygon?
That's how it comes to be !
π π π π
6 . Yes, Tanu-chan is a humanities student.
...And perhaps it is also possible to convert a spiral into a circle or a polygon?
That's how it comes to be !
π π π π
6 . Yes, Tanu-chan is a humanities student.
So all of the above is my fantasy!
But I don't want to go to the hospital yet.
.....But with only this, maybe you say,
“This doesn't even make sense of the polygon, the equation Tn = 3n (n + 1)!”
“Don't cheat me with the picture drawn by aliens!”
....So I will write just one more appendix to this series.
I'll explain a bit why " Tn = 3n (n + 1) " is the formula for the number of constellations(divisions) with a polygon.
π π π π π π
By the way, Mr. Lautrec changed the world of art, and Mr. John Lennon changed the world of music!
We could say that Mr. John Lennon changed the world.
It is not only politicians who change the world!
It is possible for ordinary people, or perhaps even small animals!
Of course, you can skip the next installment!
π π π π π π
By the way, Mr. Lautrec changed the world of art, and Mr. John Lennon changed the world of music!
We could say that Mr. John Lennon changed the world.
It is not only politicians who change the world!
It is possible for ordinary people, or perhaps even small animals!
Of course, you can skip the next installment!
It'll be a terrible delusion!
Tanu-chanπ TOKYO-TANUKIπ
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