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60stars astrology
English version
By Tokyo-Tanuki
60stars Astrology Season 7
168 60stars astrology Season 7 Appendix 3:
Regular Polyhedron from a Bird's Eyes View
1. From Appendix 5 of this season, I will write,
"the number of constellations in a figure",
and
"difference between straight and curved lines".
and so on,
...and I will talk about things that might take me to the hospital.
So the topic of this Appendix 3 is a little better.
Today's story is about
Regular Polyhedron from a Bird's Eye View.
... Of course, this theme is not without the risk of being hospitalized, right?
Today's story is about
Regular Polyhedron from a Bird's Eye View.
... Of course, this theme is not without the risk of being hospitalized, right?
2. Well, as I have said many times, Tanu-chan is arguing about figure theory because it is necessary for the interpretation of the aspects.
........... I'm an amateur, but I can't avoid it.
Now, to get back on track, the regular polyhedron from the human eyes are,
tetrahedron, hexahedron, octahedron, dodecahedron, and icosahedron
There are five of them.
These are the so-called Platonic solids.
From the raccoon dog's point of view, let me add to these five.
A circle ( regular dihedron) and a
a sphere, i.e., a polyhedron larger than ∞ = (∞ (∞ - 1) + 2)
(∞(∞-1)+2)-hedron.
well, this is not a polyhedron because the number of sides is greater than infinity.
According to the genius Mr. Perelman, the universe is closed like a sphere.
According to the genius Mr. Perelman, the universe is closed like a sphere.
If so, it seems to me that we can make one big solid by putting hexagons together (hexagonal super giant solid), but I am not sure if that shape is a regular polyhedron or not.
So, I will leave it aside for now.
3. Now, what would be the number of regular polyhedron from the bird's point of view?
.... I feel like the ambulance is already heading this way, but I'll continue.
Actually, aspect theory is from the bird's point of view.
.... I feel like the ambulance is already heading this way, but I'll continue.
Actually, aspect theory is from the bird's point of view.
Birds love sharp points (“vertices”) because they pick at their food.
Therefore, Aspect Theory also divides the circumference of a three-dimensional object by looking at it from its sharp corners.
On the other hand, birds don't have good eyesight and don't understand complicated things, so they are not familiar with the symmetry of a three-dimensional object, and the point is,
“A three-dimensional figure that looks the same when viewed from the vertices.”
Therefore, Aspect Theory also divides the circumference of a three-dimensional object by looking at it from its sharp corners.
On the other hand, birds don't have good eyesight and don't understand complicated things, so they are not familiar with the symmetry of a three-dimensional object, and the point is,
“A three-dimensional figure that looks the same when viewed from the vertices.”
.....Even so, for example, in a dodecahedron, the pentagons may appear to be upside-down when viewed only from the faces (Fig. on the top of today's blog).
However, birds can understand this much.
But if, for example, we combine a cube and an octahedron (compound polyhedron, right in Fig. 2), the shape looks different at each vertex.
But if, for example, we combine a cube and an octahedron (compound polyhedron, right in Fig. 2), the shape looks different at each vertex.
So, it is not a regular polyhedron for the bird.
(Fig.2)
(Fig.2)
4 Now, in this way, the first thing that is a regular polyhedron from the bird's point of view is Da Vinci's star, the star-shaped octahedron (left in Fig. 2).
If we look at it from above, with the vertex on top, it looks like three rhombuses (diagonal ratio 1:√3) made up of two equilateral triangles attached to each other.
Well, that is why Tanu-chan says that we should include the rhombus in the regular polygon.
.....And if so, perhaps, the great icosahedron would be a regular polygon, too.
From any vertex, you can see about five overlapping regular rhombuses, which are two equilateral triangles attached to each other
(Fig. 3)
Then, the total number of regular polyhedra of human, raccoon dogs, and birds are 9.
Then, the total number of regular polyhedra of human, raccoon dogs, and birds are 9.
I think there may be more regular polyhedra or polyhedron.
........ I am still researching that area a bit.
5. Well, except for circles and spheres, regular polyhedra correspond to star shapes anyway.
This corresponds to the story of the Japanese raccoon dog amateur polyhedron (JRMC) that I wrote about a long time ago, but it would take a long time to explain, so when I have a chance, I'll explain a little more.
...First, let's consider whether we can say that Da Vinci's star is a regular polyhedron from the bird's point of view!
π π π π π
This corresponds to the story of the Japanese raccoon dog amateur polyhedron (JRMC) that I wrote about a long time ago, but it would take a long time to explain, so when I have a chance, I'll explain a little more.
...First, let's consider whether we can say that Da Vinci's star is a regular polyhedron from the bird's point of view!
π π π π π
Today's article is the story about how to think from the bird's point of view.
That's all for todayπ
Tanu-chanπ TOKYO-TANUKIπ
Tanu-chanπ TOKYO-TANUKIπ
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