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The
BRUNARDOT
THEOREM |
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The formula: |
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c2
= 2v2 - s2 describes a Fibonacci
ellipse, where |
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"c"
is the length referred to as the Brunardot chord.
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"v"
is the length referred to as the vector; and, |
"s"
is the length referred to as the soliton; |
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A
Conceptual ellipse (CE) is a Fibonacci ellipse, |
Light, "l"; | ||
the perigee, "p"; | ||
the radius, "r"; |
the soliton, "s"; | ||
the vector, "v"; and, | ||
the
square of the Brunardot chord,
"c." |
Most
notably! . . . four basic components of every Conceptual ellipse, (CE), are
consecutive terms of a Fibonacci series. The components, in
sequence, are: the perigee, "p"; the soliton,
"s"; the vector, "v"; and, the apogee,
"a." |
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A Brunardot
ellipse (BE) is defined as: |
Any Conceptual
ellipse (CE) that has the |
Brunardot
Harmonic Ellipses (BHE) are defined as: |
An
unending series of Brunardot
ellipses (BE) |
Conceptual triangles describe Conceptual ellipses, which describe Conceptual ellipsoids that are generated by a combination of simple and complex sinusoidal oscillations with a diagonal that is a Natural Prime number. Again, when the force, "F," is a Natural integer, the Conceptual ellipsoid becomes a Pulsoid, which underlies the unimetry (geometry) of the first essence of mass. |
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