A: Angular Potential:
B: Angular Frequency:
C: Angular Expression:
D: Angular Exception:
E: Angular Repression:
F: Angular Recession:
G: Angular Velocity:
H: Angular Transfer:
I: Angular Limit:
J: Angular Impedance:
K: Angular Position:
L: Angular Axis:
M: Angular Incursion:
N: Angular Regression:
O: Angular Mode:
P: Angular Influence:
Q: Angular Sequence:
R: Angular Order:
S: Angular Relation:
T: Angular Process:
U: Angular Sync:
V: Angular Distinction:
W: Angular Promotion:
X: Angular Phase:
Y: Angular Decay:
Z: Angular Synthesis:
CALCULATING CORRECT 'ANGULAR RECURRENT' FREQUENCY
B: Angular Frequency:
C: Angular Expression:
D: Angular Exception:
E: Angular Repression:
F: Angular Recession:
G: Angular Velocity:
H: Angular Transfer:
I: Angular Limit:
J: Angular Impedance:
K: Angular Position:
L: Angular Axis:
M: Angular Incursion:
N: Angular Regression:
O: Angular Mode:
P: Angular Influence:
Q: Angular Sequence:
R: Angular Order:
S: Angular Relation:
T: Angular Process:
U: Angular Sync:
V: Angular Distinction:
W: Angular Promotion:
X: Angular Phase:
Y: Angular Decay:
Z: Angular Synthesis:
CALCULATING CORRECT 'ANGULAR RECURRENT' FREQUENCY
·
Compare the
baseline 'electron flux' frequency, to the atomic flux frequency.
·
Measure the phase
recurrence patterns between the two frequencies.
·
Find the first
frequency length which repeats a exact equal phase pattern 3 times.
·
Calculate 1/10th
of the total frequency length for these three 'equal' repetitions.
·
Add 2/6th
of this calculated 1/10th, to 1/3rd of the calculated
frequency recurrence.
·
This will give
you the angular frequency, relative to this 3 recurrence pattern.
·
Identify the
first recurrence of frequency to repeat a exact equal phase interval 6 times.
·
Calculate 1/5th
of the total frequency, and divide it evenly between third sections of the
calculated frequency.
·
The result
should be closely comparable with the results from the three frequency
recurrence. Being a almost identical double.
·
Then identify
the first recurrence of frequency to repeat a exact equal phase interval 9
times.
·
There should
not be any identifiable frequency with a length that is comparable to the
results of the 3 and 6 recurrences patterns.
·
The result of
the 9 recurrence pattern should be around 10 times longer than expected.
Sitting somewhere near to a pattern of 90 recurrences, relative to the 6 and 3
that proceeded it.
·
Calculate 1/3rd
of the result and set this figure aside.
·
Calculate 1/12
of the same result and add it to itself.
·
Add the 1/3rd
figure from the previous sum to this total.
·
Calculate 1/12th
of this total and set this figure aside.
·
Subtract 3/12th
from the total. Then add the 1/12th figure from the previous sum to
the result.
·
Divide the
total by 10.
·
The calculated
frequency lengths from the 3, 6 and 9 recurrence patterns, should then
correlate to be identical to within 2 decimal places of each other.
For example: 13,600.4 – 13,600.6 – 13,600.8
For example: 13,600.4 – 13,600.6 – 13,600.8
·
Next,
calculate a sequence of frequency with 3 recurrences of the (singular)
frequency length, which was calculated from the 3 recurrence pattern. Followed
by 9 repetitions of the (singular) frequency length, which was calculated from
the 9 (90) recurrence pattern.
·
Place this
sequence of frequency over the top of a secondary patterned sequence. Composed
of 3 recurrences of the (singular) frequency length, which was calculated from
the 3 recurrence pattern. Followed by 6 repetitions of the (singular) frequency
length, which was calculated from the 6 recurrence pattern. Followed by 3
recurrences of the (singular) frequency length, which was calculated from the 3
recurrence pattern.
·
The two
superimposed frequency sequences should be identical in length.
·
The sequence
created by the two layers will give you the exact phase pattern needed to
identify the recurrence of angular frequency within the atomic. frequency
output.
·
Correlate this
phase pattern to the original atomic frequency output and it will identify
exact reference points relating to its angular frequency, as well as a recurrence
point.
·
Once this
pattern has been identified within the atomic frequency output, divide it by 3.
Regardless of perceivable symmetry, this represents;
One correct:
ANGULAR RECURRENT
of its true atomic:
ANGULAR FREQUENCY (αλ).
One correct:
ANGULAR RECURRENT
of its true atomic:
ANGULAR FREQUENCY (αλ).
·
Correlating
atomic frequency in this way will provide highly-precise figures relating to
angular frequency and recurrence, in comparison to what was provided through
previous methods and instrumentation.
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