IN PROGRESS.
The first TOE formula was based on the primary (1st) class of perpetual motion machines.
Here I aim to find a second TOE based on a second perpetual motion formula.
...
Min ball bearing mass = greater than (long-end leverage + 1) / 2
The first TOE formula was based on the primary (1st) class of perpetual motion machines.
Here I aim to find a second TOE based on a second perpetual motion formula.
...
Min ball bearing mass = greater than (long-end leverage + 1) / 2
Max ball bearing mass = less than long end leverage +1.
Max ball bearing mass = # categories in this case.Min ball bearing mass = # deductions in this case.
# deductions = greater than (long-end leverage + 1) / 2
# categories = less than long end leverage + 1
# deductions = (max categories) / 2
...
(In the case of perpetual motion...)
Or, given the evidence so far, in the case of these types of devices, the influence will be < 1.
...
So...
# results = verbs / 2 or efficiency is < 1 in the 2nd class of perpetual motion machines.
If efficiency < 1 (= Set 0 is 'acted on').
Results = verbs / 2, or equation becomes passive in the 2nd class of perpetual motion machines.
CONTINUED SOON.
(Verbs - 1) / 2 = D ^ results - D
Test case:
RSwivel: Results = 1.25, Verbs = 2.5
Dimensions = 3
(2.5 - 1 = 1.5) / 2 = 0.75 = 3 ^ 1.25 = 3.75 - 3 = 0.75, excellent.
NIBW6: Results = 2, Verbs = 4
Dimensions = 3
(4 - 1 = 3) / 2 = 1.5 = 3 ^ 2 = 9 - 3 = 6, no
If they balance or repeat eachother or one is infinite of the other?
(Verbs - 1) / 2 = D ^ results - 0.5 - verbs
RSwivel: Results = 1.25, Verbs = 2.5
Dimensions = 3
(2.5 - 1 = 1.5) / 2 = 0.75 = 3 ^ 1.25 = 3.75 - 0.5 - 2.5 = 0.75, excellent.
NIBW6: Results = 2, Verbs = 4
Dimensions = 3
(4 - 1 = 3) / 2 = 1.5 = 3 ^ 2 = 9 - 0.5 - 4 = 1.5, excellent.
Escher: No ball mass listed, hence passive.
Escher Delta: No ball mass listed, hence passive.
DSSMM: Results = 1, Verbs = >2
Dimensions = 3
(2 - 1 = 1) / 2 = 0.5 = 3 ^ 1 = 3 - 0.5 - 2 = 0.5, excellent.
...
(Verbs - 1) / 2 = D ^ results - 0.5 - verbs
Verbs + (verbs - 1) / 2 = D ^ results - 0.5
Verbs + 0.5 + ((verbs - 1) / 2) = D ^ results
R root of (Verbs + 0.5 + ((verbs - 1)/2)) = D, where R = Results
... That is in the case of the 2nd class of perpetual motion machines, where the exception is if Set 0 is passive (that is, if there is no lever).
....
The solution then is simply in simplified form, Dimensions.
Dimensions =
R root of (Verbs + 0.5 + ((Verbs - 1)/2),
Where R = results.
...
Note this may assume 3rd dimension.
...
Proofs of Everything
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