1. Number Systems
Background: Number Systems is a post to explore number systems in general and for use in the
physical and computational sciences.
Post 8.1.11
Natural Events in Fibonacci Number Space
Medical Sciences
𝐸5 > 𝐸3
This is confusing nomenclature. Post 8.1.11 is intended to clarify the nomenclature and the
difference between stereoisomers vs. enantiomers in Fibonacci energy space.
Posts 1 – 8.10 have established:
1 𝐷 = (1 +
𝛾∞
𝑓
𝑇𝐷
)
−1
(1 +
𝛾 𝐷
𝑓
𝑇𝐷
)
+1
∫
1
𝑥
𝑑𝑥
𝑒
1
= 1 where lim
𝑛→∞
(1 +
1
𝑛
)
𝑛
= 𝑒
𝐸
𝐸 𝐵
= 𝑚𝑉𝐵
𝐸 𝐵 = 680 𝑒𝑉𝑘𝑔−1
1 𝐷 = (1 +
𝛾(∞)
𝑓{𝐷}
𝑇𝐷→(𝐷+𝛥2𝐷)
)
−1
(1 +
𝛾(𝐷+𝛥2𝐷)
𝑓{𝐷}
𝑇𝐷→(𝐷+𝛥2𝐷)
)
+1
Define
F = qv X B
To be rigorous
FDF(n) = qvDF(m) X BDF(p)
∫
1
𝑥
𝑒3
1
𝑑𝑥 = 1 𝑤ℎ𝑒𝑟𝑒 lim
𝑛→∞
(1 +
1
𝑛
)
𝑛
= 𝑒3 = 𝑒
𝐸 𝐵 = 680 𝑒𝑉𝑘𝑔−1
2. Define
F = qv X B
F(x, y, z) = F(x, y, z, 0, 0)
v = v(x, y, z) = v(x, y, z, 0, 0)
B = (x, y, z, attribute_1, attribute_2)
F(x, y, z, 0, 0) = qv(x, y, z, 0, 0) X B(x, y, z, 1 , 0)
B(x, y, z, 1, 0) = B(x, y, z, + , - )
B(x, y, z, 1, 0) = B(x, y, z, ↑, ↓ )
F(x, y, z, 0, 0) = qv(x, y, z, 0, 0) X B(x, y, z, ↑, ↓ )
F3(x, y, z, 0, 0) = qv3(x, y, z, 0, 0) X B5(x, y, z, ↑, ↓ )
F3 = qv3 X BD+_1D
↑
F3 = qv3 X B3+_1D
↑
F3 = qv3 X B5)
𝐸5 > 𝐸3
3HC-CH3
Post 8.1.12 is intended to further clarify the nomenclature and the difference between
stereoisomers vs. enantiomers in Fibonacci energy space.