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60stars Astrology Season Essay
English version
By TOKYO-TANUKI
Φ⁵ 60stars Astrology Season Essay
Φ⁵ "The Basic ?"
1.That is, the world, for now, is basically described by the Fusion-Generation Formula:
±Q×(Xᵐ) ± R×(1/Xⁿ) = ±P
(m, n, Q, R, P are real numbers)
........if you want to keep that world going!
By the way, what values are P, Q, R?
In truth, any real numbers are acceptable.
But that is too abstract, hard to grasp.
But that is too abstract, hard to grasp.
So let us consider objective elements— "time and space—plus one’s own interest", that is, subjectivity: 0, 1, 2, 3.
Time and space arose from objectivity originally, so perhaps "3" is not in basic numbers, maybe.
But let us consider them basic for now.
But let us consider them basic for now.
Because with only “1” and “2”,
the “2” may be just two “1”s,
or
or
“1” and “2” may both exist together?
.....The rule is unclear.
If “3” exists, it is the latter.
........And, of course I am from the humanities, it is okay if this is vague or just a bit illogical.
2. So, leaving aside exponents "m" and "n" for later,
the Fusion-Generation Formula simplified is:
±QX ± P·1/X = ±R
That is:
±QX² ± RX ± P = 0
Now, plugging in 0, 1, 2, then 3 into P, Q, R,
the numbers that come out are among the first to appear in numbers.
This equation becomes:
X² − X + 1 = 0
X² − X − 1 = 0
...
2X² + X − 2 = 0
...
−2X² − 3X + 1 = 0
...
etc.
Thus, solving ±QX² ± RX ± P = 0,
This equation becomes:
X² − X + 1 = 0
X² − X − 1 = 0
...
2X² + X − 2 = 0
...
−2X² − 3X + 1 = 0
...
etc.
Thus, solving ±QX² ± RX ± P = 0,
soon the golden ratio Φ = (√5+1)/2 appears.
In terms of real solutions, after ±1, 0, ±2, ±1/2, Φ comes quickly.
Therefore, Φ can be called a basic number of this world.
It appears earlier and more often than the silver ratio (√2+1).
Well, they are related numbers though.
There are many basic numbers,
but Φ stands out because it includes √5.
Well, they are related numbers though.
There are many basic numbers,
but Φ stands out because it includes √5.
Later, when plugging 3 into coefficients P, Q, R,
numbers like 3 and √3 appear, but not more frequently than Φ.
numbers like 3 and √3 appear, but not more frequently than Φ.
So, "1", "2", "5",
in truth these three numbers are the "Main Actors" of the world of numbers.
3. By the way, when Q and R are both 0, X disappears.
in truth these three numbers are the "Main Actors" of the world of numbers.
3. By the way, when Q and R are both 0, X disappears.
(0·X²) ± (0·X) = ±P
Only ±P = 0 remains.
Only ±P = 0 remains.
Normally one does not think deeply about this.
Since X has vanished, there is no need to solve.
...But in fact, a small crack has appeared in the world.
Add or subtract zero to zero and it remains zero, so no problem, right?
Add or subtract zero to zero and it remains zero, so no problem, right?
...Everyone thinks so.
Since X² and X are gone somewhere!
...But if P is "1" or "−2" ...?
(to be continued)
Tanu-chan💓 TOKYO-TANUKI💛
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