Searching Rudolf Steiner Lectures (by Bn/GA Number) Matches
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Query was: euclid
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 Title: Lecture: Mathematics and Occultism.
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 added to that which we call “Euclidian.” Euclid expresses by
 of Euclid about a circle, a triangle or about the relations of
 Title: Lecture: Mathematics and Occultism.
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 added to that which we call “Euclidian.” Euclid expresses by
 of Euclid about a circle, a triangle or about the relations of
 Title: Spiritual Teachings of Soul/World: Course V: Lecture IV: Is Theosophy Buddhist Propaganda?
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 knows but to teach the old Euclid or the old Descartes.
 Title: Where/How/Spirit: Lecture IV: Bible and Wisdom I
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 usual school geometry, the Euclidean geometry, was written down
 in its first beginnings by Euclid, the great mathematician.
 he still learning after the elementary book of Euclid? One
 which you have gained in such a way, you can move up to Euclid
 himself, and then he appreciates the work of Euclid who found
 Title: Lecture: Buddha and Christ
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 the fact that elementary geometry is also to be found in Euclid; and
 geometry of perpetrating ‘Euclidism,’ so is it
 Title: Metaporphoses/Soul One: Lecture 8: Buddha and Christ
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 Euclid. Just as it would be absurd to accuse a geometry teacher of practising
 “Euclidism”, so is it absurd to bring a charge of Buddhism
 produce a replica of Euclid, so a teacher of Theosophy is not required to
 Title: Answers to Big Questions: Lecture I: The Nature of Spiritual Science and Its Significance for the Present
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 case: in our Euclidean geometry, one can draw only one parallel
 Title: Lecture: The Bible and Wisdom.
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 — Euclid's Geometry. Anyone who understands something of Geometry today
 Euclid he will recognise his teachings to be true. In the same sense a man who
 Title: for Renewal: Lecture I: Anthroposophy and Natural Science
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 internally. Take for instance a simple example of Euclidean
 Title: Lecture: The Position of Anthroposophy among the Sciences
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 — Euclidean geometry, at first — is nothing more than an
 Title: Lecture: Anthroposophy and the Visual Arts
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 place, Euclidean geometry — we set out, as you all know, from a
 analytical geometry, as one constructs Euclidean space. One can,
 Title: Theosophy/Rosicrucian: Lecture I: The New Form of Wisdom
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 rudiments of geometry today know about Euclid? Nevertheless it is
 Euclid's geometry that is being taught. Only much later, when the
 form in which it was originally given to mankind by Euclid, as little
 Title: Gospel of John (Basle): Lecture I
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 documents. The best expounder of Euclid's Geometry is one who
 Title: Gospel of John: Lecture I: The Doctrine of the Logos
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 Euclid, the old geometrician, first gave us that geometry
 geometry absolutely dependent upon this book of Euclid? I ask
 knowing the least thing about this first book in which Euclid
 these geometrical facts quite apart from this Euclidian book,
 work by Euclid, he then understands how to appreciate it
 anything about the first book of Euclid.
 the parallel of the geometry of Euclid. Will the best
 result were such a person to attempt to translate Euclid,
 philologist would explain the geometry of Euclid. But from
 document as the geometrician to Euclid. He has brought with
 Title: Gospel of John: Lecture IX: The Prophetical Documents and the Origin of Christianity
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 geometry itself, what do they know of the geometry of Euclid,
 Title: Apocalypse of John: Introductory Lecture
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 Euclid. It contains for the first time in a
 geometry of Euclid. And then he tests them as the modern
 geometrician tests the geometry of Euclid; he can prize and
 Euclid — one who can translate the words and give the
 explanations of Euclid's geometry by a
 was imparted to mankind through Euclid. We recognize what
 Title: Spiritual Hierarchies: Lecture 1
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 reflection in the physical world. Just as the geometry of Euclid has
 Title: Lecture: The Wisdom Contained in Ancient Documents and in the Gospels
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 than Euclid. And further back, behind all this, a modern man can only
 Title: Karma of Untruthfulness II: Lecture Twenty Five
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 Euclid's postulate of parallels was challenged. When are two lines
 Title: Festivals: Christmas: Lecture V: The Proclamations to the Magi and the Shepherds
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 It was Euclid
 geometry presented to mankind by Euclid had already been cultivated
 Title: Lecture: The Two Christmas Annunciations.
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 our geometry and mathematics. Euclid was the first to give geometry to
 Euclid gave in the way of geometry had already lived in the Mysteries
 Title: Materialism/Anthroposophy: Lecture XVII
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 triangle in ancient Egypt prior to Euclid and the way people
 thought of it after Euclid's time. The abstract triangle was
 later on. Euclid signified the decadence of Egyptian
 Title: Evolution of Consciousness: Lecture III: InitiationKnowledge  New and Old
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 early youth we have learnt to look upon the old truths of Euclid as
 Title: Esoteric Lesson: Berlin, 1903 or 1904
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 the laws of space without referring to Euclid's geometry book. But
 Title: Esoteric Lesson: Berlin, December 1904
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 the laws of space without referring to Euclid's geometry book. But
 Title: Light Course: Tenth Lecture
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 carry out the proof. Now in the whole of Euclid's Geometry there is
 besides the ordinary geometry handed down to us from Euclid other
 Euclidean Geometry which we ourselves think out. Might it not be
 Euclidean geometry and all the formulae thereof?
 Title: Astronomy Course: Lecture I
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 the theory of functions, or, say, with nonEuclidean
 that can be understood today of nonEuclidean geometry. I
 in nonEuclidean geometry, then we should be in the realm of
 Title: Astronomy Course: Lecture VII
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 To what extent is ‘Euclidean space’ — the
 definition of Euclidean space. I might also call it
 on this assumption. Now as regards this Euclidean — or,
 of our Euclidean Mathematics would be at most a kind of
 Euclidean space it does, no doubt (Euclidean space, that is
 of Euclidean space to a coordinate system that is inherently
 different idea of space from the rigid one of Euclid. For it
 neither Euclidean, nor any abstractly conceived space of
 it is in such a space and not in the rigid space of Euclid
 Euclidean idea of space. But this reform will be in a
 Title: Astronomy Course: Lecture X
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 abstract Euclidean plane. I must look upon it as a surface
 Title: Astronomy Course: Lecture XI
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 rigid forms of curve in a rigid Euclidean space, would help
 Title: Astronomy Course: Lecture XV
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 bodies. Yet neither shall I find a mere empty Euclidean
 Title: Astronomy Course: Lecture XVI
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 Euclidean space.
 only looks to us plainly Euclidean. We think it nicely there,
 Title: Origins/Natural Science: Lecture III
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 mathematician starts from the concepts of Euclidean geometry, the
 nonEuclidean geometry.)
 the three perpendicular dimensions of Euclidean space. Man would have
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