: : Громадное спасибо Владимир Привалов!
: :
: Keine Ursache :)
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: : Я должен осмыслить и опробовать Ваши идеи, на это мне нужно некоторое время.
: :
: Идей полно( денег бы столько, сколько идей :)) , толку мало только.
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: : Если Вас интересуют альтернативные взгляды на Структуру Солнечной системы, то можете полюбопытствовать здесь:
: :
: Это все астрологией отдает. Чем ближе к математике, тем интересней.
http://groups-beta.google.com/group/sci.astro/msg/...
ближе к математике:
1.3. Formula for pairs of conjugate gravitational correlations.
We shall name "pairs of conjugate gravitational correlations" the
following pairs of values that can be identified on the previous graph:
33,5 39,8 24,3 10,13
We shall now consider relating of sums of those pairs of conjugate
gravitational correlations with squares of natural numbers:
33+5=62+2 39+8=72-2 24+3=52+2 10+13=52-2
+2 -2 +2 -2
From these relations, a common formula for the sums of the pairs
of conjugate direct and reverse gravitational correlations can be
established:
(value of reverse correlation)+(value of direct correlation)=n2 +/- 2
To some extent, this formula is analog to Balmer's formula for
spectral series of the Hydrogen atom. The analysis of the chained series
of conjugate gravitational correlations clearly reveals here a periodic
alternance of the sign before number 2.
1.4. Gravitational correlations for groups of four planets.
For a long time astronomers have been aware of dynamic relations
in celestial bodies in groups of four, in the stable gravitational
system which the Solar System presents us with. On this specific
criterion and on some other dynamic criterions stemming from celestial
mechanics, we can select two groups of four planets in the Solar System.
The planets of the Terrestrial group are: Earth, Venus, Mars and
Mercury. The planets of the Jovian group are: Jupiter, Saturn, Neptune
and Uranus. The empirical facts discovered here indirectly confirm the
existence of further relations.
For the group of planets Earth, Venus, Mars and Mercury
((n2 + 2);(n ^ 2 - 2)) the relationship is established in the
following manner:
( 33 + 5) + (39 + 8) = 6 ^ 2 + 7 ^ 2 = 9 ^ 2 + 2 ^ 2 = 85
For the group of planets Jupiter, Saturn, Neptune and Uranus
((n ^ 2 + 2); (n ^ 2 - 2)) the relationship is established in the
following manner:
( 10 + 13) + (24 + 3) = 5 ^ 2 + 5 ^ 2 = 7 ^ 2 + 1 ^ 2 = 50
In each of the groups considered, there is a higher pair
(n ^ 2-2) and lower pair of planets (m ^ 2 + 2). Therefore, a
possibility seems to exist to derivate various combinations of these
pairs to obtain mixed combinations from these two groups of four
planets. In our particular case, only the combination of the two lower
pairs ((n ^ 2 + 2); (m ^ 2 + 2)) Neptune, Uranus, Mars and Mercury,
forming a mixed group, allows a correlation to be determined:
( 33 + 5) + (24 + 3) = 7 ^ 2 + 4 ^ 2 = 8 ^ 2 + 1 ^ 2 = 65
Some conclusions:
The considered relations can be expressed as the following formula:
(sum values of all correlations of the given group) = k2+l2=m2+n2
What is remarkable in these correlations by groups of four planets, is
that the sum of the pairs of conjugate gravitationnal correlations are
equal in each case to natural numbers (50, 65, 85) which are the first
terms of a sequence of natural numbers, which are the sum of two pairs
of squares of natural numbers. Please look Diophantus's theorem of a
number theory (III, 19). Here is the beginning of this series:
! ! !
number 1 25 50 65 85 100 125 130 145 169 170 185 200 205 221 225 250 260
1 1 5 7 8 9 10 11 11 12 13 13 13 14 14 14 15 15 16
pair 0 0 1 1 2 0 2 3 1 0 1 4 2 3 5 0 5 2
2 0 4 5 7 7 8 10 9 9 12 11 11 10 13 11 12 13 14
pair 1 3 5 4 6 6 5 7 8 5 7 8 10 6 10 9 9 8
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: Болтаться на форуме мне очень накладно, да и мало кому интересен мой бред. Пишите лучше мелом. На ваш мэйл письма что-то не идут.
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