Felices Pascuas #conspiracy curvaturasvariantes.com

Solving Quintic Equations with radicals from a geometrical point of view.

I think quintic functions could by understood as a rotational fractal formed by four entangled (related, intersected, interacting) functions. In this sense the quintic function or equation appears as a complex function formed by intersection of different parts of the functions related by the same kind of symmetry although different signs.

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I bolded in red what would be one of the quintic equations that there are in this picture.

In a first attempt, it could be expressed in this way:
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In (Z, -+Z1) Z is the Zero point at the center of the circumference, and -+Z1 is the first interval Li measured from the Zero point Z in the -+Z coordinate (the bottom right Z coordinate) in the picture below.

By crossing or intersecting the lines of the different functions in their intersection points we would be performing a subtraction (I think the result should represent a trivial zero in the Riemann Z function).

The Li (in red colour) segment is measured from the center of the circumference (the Zero point) until the center of symmetry of the square 0,50 (Inside of the central square 2).
Lr (in blue colour) is measured from Z until the center of symmetry of the square 0,25 (inside of the central square 1)
Li’ (in gold colour) is measured from Z until the center of symmetry of the square 0,75.

The bolded function in the picture above follows the Li intervals that carry the Li symmetry. The Li intervals converge at the power of 5 with the intervals Lr^7 = 0 Lr^7 = 0 of the Lr (in blue) and Li’ (in gold) functions.

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Our mathematics can not be static if we try to explain Nature with them.

On the other hand, I think it is very interesting to remark the points of convergence of Lr^7, Li^5, Li'^4 = 0 because I think they would represent the critical zeros on the Riemann Z function. In this sense, the square area formed with the side measured from the Z convergent point (Lr^7, Li^5, Li'^4) until another Z convergent point (Lr^7, -Li^5, -Li'^4) should be a non-prime number.

Felices Pascuas.

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Confused?

So were we! You can find all of this, and more, on Fundies Say the Darndest Things!

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