Petro Kosoboutskyy scite author profile

This paper studies regularities of proportional division, on the basis of which we show the possibility of effective application of the golden section method to modeling regularities of atomic systems and positioning of elements of noble gases of the periodic table. It is illustrated that by partial reconstruction of the Mendeleev tables, the elements of noble gases can be arranged along lines whose slope tangents in the coordinate system “the atomic number – the relative atomic mass” are in close agreement with the sequence of inverse Fibonacci numbers. It was shown that given the correct slope of axes, slope tangents of the corresponding lines does not change.

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Regularities of Numbers in the Fibonachi Triangle Constructed on the Degree Transformations of a Square Three Members

Kosoboutskyy¹,

Karkulovska²,

Losynska³

2021

CDSTP

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In this paper, it is shown that the Fibonacci triangle is formed from the elements of power transformations of a quadratic trinomial. It is binary structured by domains of rows of equal lengths, in which the sum of numbers forms a sequence of certain numbers. This sequence coincides with the transformed bisection of the classical sequence of Fibonacci numbers. The paper substantiates Pascal's rule for calculating elements in the lines of a Fibonacci triangle. The general relations of two forgings of numbers in lines of a triangle of Fibonacci for arbitrary values are received

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Petro Kosoboutskyy

Method of Statistical Imitation, Its Creator S. Ulam and Basic Principles of Application for Random Processes Modeling

Modeling of Atomic Systems and Positioning of Elements of Noble Gases of the Periodic Table by Proportional Division Method

Regularities of Numbers in the Fibonachi Triangle Constructed on the Degree Transformations of a Square Three Members

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