159 60stars Astrology Off Season of season 6 3 Growth Inference, and the Formula Used to Estimate Growth Part 2 Let's make an equation at will!

60stars astrology

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By Tokyo-Tanuki

60stars Astrology Off Season of season 6

 

159 60stars Astrology Off Season of season 6 

3  Growth Inference, and the Formula Used to Estimate Growth 　Part 2 

Let's make an equation at will!

1. Last time, the basic form of the equation that is useful to see the movement of life, or rather the circulation, is the following, with P・Q・R as a coefficient,

" ±Q×(Xⁿ) ± R×(1/Xⁿ) = P "


And I talked about numbers (metallic ratios) that fulfill the most basic one so-called "solution formula", Φ and τ and so on.

a・X  +  c・1/X  =  - b




2.  But this need not be limited to quadratic equations.

It is just the basic form.

In other words, it can be a quartic equation as well.


So, as an example, let's say we have the equation

 

" X⁴-CX²+1=0 "

The solution of this equation is the table at the top of this blog.

At this time, this equation yields the solution,

 " X={√(C+2)+√(C-2)}/√4 "

The solution to this equation also includes Φ or τ etc. , but there are others that do not appear in the metallic ratio.

For example,

When C=4, X=√(√3+2)  (i.e., (√6+√2) / 2 ),

When C=5, X=(√7+√3)/2, 

....etc.

Various interesting numbers appear, and these are also special numbers.

I wrote about " X=(√7+√3) /2 "  a while ago in the explanation of right triangles with angles in the ratio 3-4-7.

3.  So here,  I will write about √(√3+2)  for a moment.

This number is 1.931851....

If you know the length of a side of a regular dodecagon, and this number, you can calculate,

the length of all diagonals, 

the radius of the circumscribed circle, 

the radius of the inscribed circle, 

and the area of a regular dodecagon, 

in about one minute!
(Fig.)

4.  So √ (√3 + 2) is a very interesting and useful number, but, well, not so famous compared to Φ.
 
" ±Q×(Xⁿ) ± R×(1/Xⁿ) = P "

It is very interesting to observe what happens when you put opposites together like this, and if you like calculations, you can have fun with cubic or octic equations, just put in the appropriate numbers at your will !

That's all for today.



Tanu-chan💓 TOKYO-TANUKI💛