Φ²⁷ 60 Stars Astrology: Season Essays - Extra: Tanuｰchan's Unfinished Obsessions - Part 1

60stars  Astrology Season  Essay

English  version

By TOKYO-TANUKI

Φ²⁷ 60Stars Astrology: Season Essays - Extra: Tanuｰchan's Unfinished Obsessions - Part 1

1.  You know, in the "Season Essay" , I wrote about how the world is made up of 1, 2, and 5, and also about numbers like 12, 20, 120, and so on, based on those relationships, referencing  " The Lord of the Rings".

Well, I couldn't write it as coolly as I'd hoped, and I couldn't pack in all the content either...

...Writing essay-style prose is really quite difficult, you know.

2. Also, when discussing integers earlier, I initially planned to write about "Perfect Numbers" . 

But then I suddenly became fascinated with "Twin Primes" and started writing about them. 

....One day, however, I had a very scary dream, so I stopped.

Reading books about prime numbers makes time fly by so quickly—that's scary too.

Still, there were a few more things I wanted to write about, so I'll just add a brief extra section.

I figured this much should be okay.




3. As I wrote in the section about twin primes, twin primes can probably be classified into 12 types.

And there are three types of prime numbers: 

eight types of completely solo primes, 

twelve types of twin primes, 

and primes that are twin primes but sometimes appear solo.

.....And I wrote that within each group, there is a cycle of 120×n.

This 120-period cycle means, for example, if you take the perfect solo prime 37 and add 120 to it, any prime number that appears at that position is also a solo prime. 

Of course, with such a small sample size, it's unclear if this is correct!

Well, everyone should give it a try!

There's no basis for this—it's all Tanu-chan's wild imagination!

4. So, what I wanted to write about is the internal cycle within 120.

Tanu-chan thinks 1, 2, and 5 aren't prime numbers, and 3 is borderline, ...........so according to Tanu-chan, prime numbers probably start at 7.

And speaking of solo primes, the complete set of solo primes up to 120, as I wrote before, is:

7, 23, 37, 53, 67, 83, 97, 113

That's eight of them.

Now, if you fold this at 60:

7, 23, 37, 53
113, 97, 83, 67

This way, pairs like 7 and 113, or 23 and 97, sum to 60.

In other words, if you fold the sequence of numbers at 60 as the turning point, they align perfectly.

......But then,

Could it be that a solo prime, when folded, finds its counterpart—a kind of twin prime?

It could be thought of that way.


For example, if 37 and 83 are a set,
2 × 41 + 1 = 83
4 × 9 + 1 = 37

So, they might be considered a special “non-ZF91” group.

.....I actually wanted to do some research and fantasize about it, but I had a scary dream so I stopped.

If you figure out something, let Tanu-chan know!

 

⇑　

The group of solitary primes (7, 23, 37, 53, 67, 83, 97, 113—which are not twin primes—and the numbers obtained by adding 120n to these) can be seen to be beautifully aligned when visualized. 





Tanu-chan💓　TOKYO-TANUKI💛