1. The document discusses number systems, specifically exploring their use in the physical and computational sciences. 2. It establishes definitions and relationships for natural events in Fibonacci number space, noting that a mathematical description of nature should comply with natural conditions of the number one. 3. Examples of natural phenomena are provided, such as the Planck constant and gravitational acceleration, showing how quantities can be defined as dimensionless ratios in this number system.

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 8.1.1
Natural Events in Fibonacci Number Space
Medical Sciences
Posts 1 – 8 have established:
1 𝐷 = (1 +
𝛾∞
𝑓
𝑇𝐷
)
−1
(1 +
𝛾 𝐷
𝑓
𝑇𝐷
)
+1
For natural events, this definition should correlate to the Bernoulli base of natural logarithms:
∫
1
𝑥
𝑑𝑥
𝑒
1
= 1 where lim
𝑛→∞
(1 +
1
𝑛
)
𝑛
= 𝑒
A mathematical description of nature should not be accurate unless the number system complies
with both natural conditions of the number one shown above.
Natural examples:
1
𝑐3
2 =
1
35
2 𝑥 10−16
meter-2 sec+2
h = 6.6260700 E-34 = 6.6260700 x (1∞ − 𝑅 𝐸
𝑓{3}
) x 10-34
meter+2 kg+1 sec-1
𝒘𝒉𝒆𝒓𝒆 𝒂 𝒈 = 𝒈
when g = gEarthSurface <g units: acceleration+1 second+2>
To be rigorous, energy can be defined as a ratio:
𝐸
𝐸 𝐵
= 𝑚𝑉𝐵
Kilogram+1 Meter+3
Define
𝐸 𝑅 = 𝑚3 𝑉3

2. 𝑬 = 𝒎𝑽
Then the dimensionless chemistry of hydrocarbon molecules should be a direct function of mass
and physical size.
𝐶𝐻3
This molecule has unique spatial symmetry:
CHHH
HHHC

3. 3HC-CH3

4. Post 8.1.2 is intended to clarify the significance of CH3 in Fibonacci energy space.