Binary Base 1/2, 1/4, 1/8

Binary Base 1/2, 1/4, 1/8:

https://www.dropbox.com/s/esq2pd8vp0au625/Binary%20Simplification

This is a simpler way to determine numbers using 1’s and 0’s.
Intended for NP calculations & other number based systems.
These formats allow for longer calculations using wave and circle ratios over square (power to) functions
The divisors allow for odd numbers to come from even inputs and vice versa:

`#Base 1/2`
`#0 = .5          0 = .5 or 1/2`
`#1 = 1           1 = 0 + 0`
`#2 = 2           2 = 1 + 1`
`#3 = 3           3 = 2 + 1`
`#4 = 4           4 = 2 + 2`
`#5 = 5           5 = 2 + 2 + 1`
`#6 = 6           6 = 4 + 2`
`#7 = 7           7 = 4 + 2 + 1`
`#8 = 8           8 = 4 + 4`
`#9 = 9           9 = 4 + 4 + 1`
`#10 = 10         10 = 4 + 4 + 2`

`#Base 1/2 follows atomic/universal laws`

`#Base 1/4`
`#0 = .25         0 = .25 or 1/4 `
`#1 = .5          1 = 0 + 0`
`#2 = 1           2 = 1 + 1`
`#3 = 1.5         3 = 2 + 1`
`#4 = 2           4 = 2 + 2`
`#5 = 2.5         5 = 2 + 2 + 1`
`#6 = 3           6 = 4 + 2`
`#7 = 3.5         7 = 4 + 2 + 1`
`#8 = 4           8 = 4 + 4`
`#9 = 4.5         9 = 4 + 4 + 1`
`#10 = 5          10 = 4 + 4 + 2`

`#Base 1/4 will help to calculate syncopation and divisions along with dual systems`

`#Base 1/8`
`#0 = .125        0 = .125 or 1/8`
`#1 = .25         1 = 0 + 0`
`#2 = .5          2 = 1 + 1`
`#3 = .75         3 = 2 + 1`
`#4 = 1           4 = 2 + 2`
`#5 = 1.25        5 = 2 + 2 + 1`
`#6 = 1.5         6 = 4 + 2`
`#7 = 1.75        7 = 4 + 2 + 1`
`#8 = 2           8 = 4 + 4`
`#9 = 2.25        9 = 4 + 4 + 1`
`#10 = 2.5        10 = 4 + 4 + 2`

`#Base 1/8 will help to calculate more complex divisions or systems`

‘Using a smaller fraction does not result in greater resolution when using these systems; as they all scale’
‘What it does is allow for easier use at the scaled levels; or when reading 3rd ratios’

#Base 1/8 will help to calculate more complex divisions or systems