Page 334 - The Final Appeal to Mankind
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«The Final Appeal to Mankind» by Nicolai Levashov
Appendix 3. Derivation of the matrix space system formula
One of the states of balance existing in our matrix space is the parity between the
amount of matter out flowing from the space mergence zones and the amount of matter
being synthesized within them. We may represent this balance by the following
formula:
(-)
(+)
(-)
(+)
n1[∫∫χ dmidi - 6∫∫η dmidi] ≡ n2[∫∫χ dmidi - 6∫∫η dmidi] (1)
where:
n1 – equals the number of six-ray space formations.
n2 – equals the number of anti six-ray space formations.
(+)
χ – equals the central area of the matrix space mergence zones – the access route
of primary matters entering our matrix space (which is a six-ray space).
(-)
χ – equals the central area of the matrix space mergence zone, the route of
primary matters exiting our matrix space.
(-)
η – equals the border zones of mergence with other matrix spaces – the route of
primary matters flowing into our matrix space.
(+)
η – equals the “ray” zones of mergence with other matrix spaces – the route for
primary matters exiting our matrix space.
i – equals the quantity of primary matters.
m – equals the mass of primary matters.
After some simple substitutions, we may express the balance equation as follows:
= 0
The above equation holds true when the expressions in brackets equal zero.
(+)
(+)
[n1∫∫χ dmidi – n2∫∫ χ dmidi] – 6[n1∫∫η dmidi – n2∫∫η dmidi] = 0 (2)
(-)
(-)
if
(+)
(-)
n1∫∫χ dmidi – n2∫∫ χ dmidi ≡ 0
(-)
(+)
n1∫∫η dmidi – n2∫∫η dmidi ≡ 0
Maximum stability is attained when n 1=n 2. Under other conditions, matrix space
is unstable. The creation of space formations continues in the matrix space until a
complete balance is achieved.
With the establishment of balance, the system of equations develops as follows:
(+)
(-)
∫∫χ dmidi – ∫∫ χ dmidi ≡ 0
(-)
(+)
∫∫η dmidi – ∫∫η dmidi ≡ 0 (3)
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