藠（ra-kkyo） 60 Stars Astrology Season Holiday "An Extra" 9 Tanu-chan's Concerns, Part 5 "71.777..." and the Secret Box Part 3

60 STARS ASTROLOGY

SEASON HOLIDAYS "An Extra"

ENGLISH VERSION

藠（ra-kkyo） 60 Stars Astrology   

Season Holiday  "An Extra" 9   

Tanu-chan's Concerns, Part 5    

"71.777..." and the Secret Box  Part  3

1.　Now, about "the stone coffin （sarcophagus）" in the King's Chamber inside the Great Pyramid, its size is according to Chat−GPT ( Miss Yuna ), my friend,

the most reliable figure is

the outer dimensions are approximately 97.8 × 227.6 × depth 104.9 (cm)

the inner dimensions are approximately 68.1 × 198.4 × depth 87.1 (cm)

And the ratio of the inner dimensions is approximately 1:√φ:√2 (√φ³).  

As I mentioned before, the sum of the squares of the lengths of the edges and diagonals formed inside "the stone coffin (sarcophagus)" may indicate the circumference of a circle.  

.....Now, the question is what the outer dimensions indicate.  

2. The outer dimensions of the sarcophagus are approximately 97.8 × 227.6 × depth 104.9 (cm) for the outer dimensions, and approximately 68.1 × 198.4 × depth 87.1 (cm) for the inner dimensions. 

The outer dimensions, relative to the inner dimensions, are as follows

Height ratio: 0.681:0.978 ≒ 1:1.44

Width ratio: 1.984:2.276 ≒ 1.147

Depth ratio: 1.049:0.871 ≒ 1.20

In other words, when comparing the height, width, and depth of the outer and inner sides,   

the height is 3 to the cube root (×1.4422495...)  

the width is √3 to the fourth root (×1.14720269...)  

and the depth is √3 to the cube root (×1.2009369...).  

I also drew this in a picture before.

.....You might think these are awkward numbers, but they are not awkward at all.

∛3 × ∜√3 × ∛√3 = √3^(2/3 + 1/4 + 1/3) = √3^(15/12) = √3^(5/4)

= 1.987013346421.....   

Let's try calculate various things using this number!   

3.  Multiplying the ratio of the outer size of the stone coffin to the inner size,

∛3 × ∜√3 × ∛√3 = √3^(2/3+1/4+1/3) = √3^(15/12) = √3^(5/4)

= 1.987013346421...

When this is multiplied by (2 × 2 × 2) = 2³ ,

1.987013346421.....^8 = 243 = 3^5.

This 243 is  "243 ÷ 3⁷ = 0.1111111... = (1 ÷ 90) × 10"

...which connects to "the Da Vinci number".   

Additionally, when multiplied by 2^2^2,     

1.987013346421.....^16 = 59049 = 3^10 = 243^2    is the result, of course.    

...People may have forgotten about "the Da Vinci number", so I will repost the drawing I made in the past post for X (Twitter).

4. Looking back at my past posts, I realized;

Although I had written about the Da Vinci number,

I had not clearly stated that it is a unit of measurement for circles, so I will make the drawing again.

Anyway...a circle is represented by 360 degrees（360°）.

Following the general method of expressing the circumference of a circle as Φ²,  the circumference can also be expressed as Φ⁶, which is its power.  

When the circumference is set to 360° = 4Φ⁶ = 71.777...,  

1 degree is expressed as  4Φ⁶ ÷ 360 =Φ⁶× 0.011111111........

Considering this value in relation to the ratio shown in Da Vinci's painting,   (√5—2)/2, or (√5—Φ—1/2), as the standard (Da Vinci number = "d"),   

it is expressed as 1 degree = (d⁻²)/(4Φ⁶).  

.....By the way, as mentioned previously, multiplying the ratio of the inner and outer edge lengths of the sarcophagus yields √3^(5/4), and raising this to the 8th power results in 234.

And, 

0.01111... = 243 ÷ 3⁷ ÷ 10

Therefore, since 360 degrees of the circumference can be expressed as 0.011111... × 32,400, it is easy to perform the conversion using √3^(5/4).

Yes, in other words, the circumference of 360 degrees can be expressed fairly simply using either the ratio of Φ(d = (√5 - 2)/2), or the ratio of the cube root of 3 (√3^(5/4)).  

Although it is a bit tedious, both the inner and outer edges of the pyramid's sarcophagus can be converted using units that indicate the circumference.  

5. Regarding the sarcophagus (stone coffin) in the King's Chamber of the Pyramid of Khufu, there is a theory that the outer side is about twice the size of the inner side (volume).

However, the inner and outer sides are not just “about twice” the size, but rather indicate a precise ratio that signifies something, I believe.

Additionally, the stone coffin (sarcophagus) frequently uses numbers like √3^(1/3) or √2Φ², which are powers of numbers.

The idea that the world is made of numbers of powers is now widely accepted across various fields of study, but the people who built the pyramids △ were truly remarkable!

6.  By the way, Tanu-chan's main passion for exponents right now isn't just about pyramid numbers or Fermat numbers like (2^2^n) + 1.   

I'm also fascinated by the “addition” of exponents like √5, 3², or ∛√11.   

The coolest one, I think, is:

√3＋√3＋√3＝√3×√3×√3＝（√3^√3）^√3

Yes. No matter how you do, it will be 3√3. 

.....too much very cool !

Of course, 

3^（1/Φ）＋3^（1/Φ）＋3^（1/Φ）＝3^（（1＋Φ）/Φ）

＝3^Φ

It also looks very cool!

Anyway that is All for today!

Next time truly we'll go into "Season Vacation" !

.....Maybe........!

Tanu-chan💓　　TOKYO-TANUKI💛