Womb as Paradise Lost
Dissertation 2015. Womb as Paradise Lost - Regained by the Energy of Life.
My name is Dr. Gideon Benavraham, professor-emeritus Clinical Hermeneutics. "What happens in a human being fundamentally during the proces of prenatal development (Fetal Programming) and what are the consequences to distortions and diseases later on life?" Research tools: Mindlink-Tesla-Transformation Technology (MTTT) as diagnosticum with PEMF and music frequencies as treatment methods. A RCT-double blind and placebo-controlled research, with statistics.
Dissertation 2015. Womb as Paradise Lost - Regained by the Energy of Life.
My name is Dr. Gideon Benavraham, professor-emeritus Clinical Hermeneutics. "What happens in a human being fundamentally during the proces of prenatal development (Fetal Programming) and what are the consequences to distortions and diseases later on life?" Research tools: Mindlink-Tesla-Transformation Technology (MTTT) as diagnosticum with PEMF and music frequencies as treatment methods. A RCT-double blind and placebo-controlled research, with statistics.
32Womb as Paradise Lost – Foetal ProgrammingThetic Part 1 – Philosophical IntroductionThetic Part
33Womb as Paradise Lost – Foetal ProgrammingThetic Part 1 – Philosophical IntroductionPart 1Philosophical IntroductionCracked Octave – Culture in a basic CrisisCultural Tonic: densification of language and music“Numbers are a universal mediumfor the embedding of patterns of any sort,and that for reason, statements seeminglyabout numbers alone, can in fact encode statementsabout other universes of discourse”Douglas HofstadterIntroduction of Gödel’s Proof 1010 Hofstadter in his introduction on Gödel’s Proof. “In 1931 Kurt Gödel proved two important theorems about such attempts.(1) A consistency theorem (consistency here means freedom from contradiction): Not all axiomatic systems can beproven to be consistent by appealing only to the theorems and axioms of the axiomatic system itself. (2) A completenesstheorem: Within any consistent axiomatic system there are statements that can be neither proved nor disproved althoughthey are in fact true. Gödel's results are profound, for they not only showed that a complex domain, such as arithmetic,cannot be fully constructed by an axiomatic approach, but they also stimulated new modes of thinking. For example, thecompleteness theorem draws a clear line between truth and provability.Besides traditional views of Gödel's work, Hofstadter emphasizes that Gödel was the first to demonstrate that any patterncan be reduced to numbers: his proofs depend on such mappings. Today we not only take such mappings for granted, butwe are hardly aware that we continuously invoke them. We word process, we create and view images, we compose andplay music, we calculate, we simulate, we communicate, we design—and all those many patterns are ultimately mappedinto numbers—ones and zeroes deep in some computer's hardware. So not only are Gödel's proofs important, but hismethod of proof was seminal and prophetic”, Macatea Book Review 2005.
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Womb as Paradise Lost – Foetal Programming
Thetic Part 1 – Philosophical Introduction
Part 1
Philosophical Introduction
Cracked Octave – Culture in a basic Crisis
Cultural Tonic: densification of language and music
“Numbers are a universal medium
for the embedding of patterns of any sort,
and that for reason, statements seemingly
about numbers alone, can in fact encode statements
about other universes of discourse”
Douglas Hofstadter
Introduction of Gödel’s Proof 10
10 Hofstadter in his introduction on Gödel’s Proof. “In 1931 Kurt Gödel proved two important theorems about such attempts.
(1) A consistency theorem (consistency here means freedom from contradiction): Not all axiomatic systems can be
proven to be consistent by appealing only to the theorems and axioms of the axiomatic system itself. (2) A completeness
theorem: Within any consistent axiomatic system there are statements that can be neither proved nor disproved although
they are in fact true. Gödel's results are profound, for they not only showed that a complex domain, such as arithmetic,
cannot be fully constructed by an axiomatic approach, but they also stimulated new modes of thinking. For example, the
completeness theorem draws a clear line between truth and provability.
Besides traditional views of Gödel's work, Hofstadter emphasizes that Gödel was the first to demonstrate that any pattern
can be reduced to numbers: his proofs depend on such mappings. Today we not only take such mappings for granted, but
we are hardly aware that we continuously invoke them. We word process, we create and view images, we compose and
play music, we calculate, we simulate, we communicate, we design—and all those many patterns are ultimately mapped
into numbers—ones and zeroes deep in some computer's hardware. So not only are Gödel's proofs important, but his
method of proof was seminal and prophetic”, Macatea Book Review 2005.