Archytas of Tarentum: Pythagorean, Philosopher and Mathematician KingCambridge University Press, 23 mag 2005 - 665 pagine Archytas of Tarentum is one of the three most important philosophers in the Pythagorean tradition, a prominent mathematician, who gave the first solution to the famous problem of doubling the cube, an important music theorist, and the leader of a powerful Greek city-state. He is famous for sending a trireme to rescue Plato from the clutches of the tyrant of Syracuse, Dionysius II, in 361 BC. This 2005 study was the first extensive enquiry into Archytas' work in any language. It contains original texts, English translations and a commentary for all the fragments of his writings and for all testimonia concerning his life and work. In addition there are introductory essays on Archytas' life and writings, his philosophy, and the question of authenticity. Carl A. Huffman presents an interpretation of Archytas' significance both for the Pythagorean tradition and also for fourth-century Greek thought, including the philosophies of Plato and Aristotle. |
Dall'interno del libro
Risultati 1-5 di 71
Pagina 14
... argue in the overview of Archytas ' philosophy , however , the evidence for Archytas as an inventor of mechanical ... argues that “ in Plut . Marc . 14.3–6 the connection between Archytas ' mechanics ... and weaponry is made explicit ...
... argue in the overview of Archytas ' philosophy , however , the evidence for Archytas as an inventor of mechanical ... argues that “ in Plut . Marc . 14.3–6 the connection between Archytas ' mechanics ... and weaponry is made explicit ...
Pagina 20
... argues that quoque in line 21 is used inceptively and functions in effect as quotation marks to indicate the quotation of the epitaph . While he provides good examples of quoque used inceptively ( 1984 : 92 ) , these examples come from ...
... argues that quoque in line 21 is used inceptively and functions in effect as quotation marks to indicate the quotation of the epitaph . While he provides good examples of quoque used inceptively ( 1984 : 92 ) , these examples come from ...
Pagina 21
... argues that Horace has given Archytas a death at sea to make a symbolic point ( 1984 : 83 ) . It is also true that we need not take " near the Matine shore " literally as on or near the shore . Tarentum is in an obvious enough sense ...
... argues that Horace has given Archytas a death at sea to make a symbolic point ( 1984 : 83 ) . It is also true that we need not take " near the Matine shore " literally as on or near the shore . Tarentum is in an obvious enough sense ...
Pagina 22
... argues ( 1984 : 75–76 and n . 10 ) that the counting of grains of sand " was a proverbial expression for hybristically attempting the impossible " and uses this as an important point in his argument that lines 1-6 of the ode are ...
... argues ( 1984 : 75–76 and n . 10 ) that the counting of grains of sand " was a proverbial expression for hybristically attempting the impossible " and uses this as an important point in his argument that lines 1-6 of the ode are ...
Pagina 32
... argues that Archytas was a nobody until he studied with Plato . Each of these strands deserves close study . The first strand is represented by texts A5b1 - b13 . The earliest source may be Plato's pupil Hermodorus ( D.L. III . 6 ) in ...
... argues that Archytas was a nobody until he studied with Plato . Each of these strands deserves close study . The first strand is represented by texts A5b1 - b13 . The earliest source may be Plato's pupil Hermodorus ( D.L. III . 6 ) in ...
Sommario
3 | |
44 | |
The authenticity question | 91 |
Fragment 1 | 103 |
Fragment 2 | 162 |
Testimonia for Archytas life writings | 255 |
Moral philosophy and character | 283 |
The duplication of the cube A14 and A15 | 342 |
Metaphysics | 483 |
Physics | 508 |
Miscellaneous testimonia | 570 |
Spurious writings and testimonia | 595 |
Archytas name | 619 |
Select index of Greek words and phrases | 638 |
General index | 651 |
Music | 402 |
Altre edizioni - Visualizza tutto
Archytas of Tarentum: Pythagorean, Philosopher and Mathematician King Carl Huffman Anteprima non disponibile - 2005 |
Archytas of Tarentum: Pythagorean, Philosopher and Mathematician King Carl Huffman Anteprima non disponibile - 2010 |
Parole e frasi comuni
anecdote appears Archytas of Tarentum argues argument Aristotle Aristotle's Aristoxenus arithmetic assertion astronomy Athenaeus authenticity Blass Burkert calculation Cicero clear clearly commentary concords connection context cube definitions Democritus Diogenes Diogenes Laertius Dionysius discussion Doric doubling the cube Düring equality Eratosthenes Eudemus Eurytus evidence fifth fourth century Fragment geometry Greek harmonic Hippasus Hippocrates Iamblichus interval later lines logistic manuscripts mathematical mean mechanics motion nature Nicomachus octave parallel passage Philolaus philosophical pitch Plato pleasure pleonexia Plutarch Polyarchus Porphyry predecessors presented problem proof proportion pseudo-Pythagorean Ptolemy Pythagoras Pythagorean quotation ratios reference Republic says sciences seems sense Socrates solution sound stereometry Stobaeus suggests that Archytas superparticular superparticular ratio testimonium tetrachord theory things Timaeus tradition treatise Ἀρχύτας γὰρ δὲ διὰ εἰς ἐκ ἐν ἐπὶ καὶ μὲν οἱ ὅτι περὶ πρὸς τὰ τε τὴν τῆς τὸ τοῖς τὸν τοῦ τοὺς τῷ τῶν ὡς
Brani popolari
Pagina 270 - Sunt ista ut dicis; sed audisse te credo Tubero, Platonem Socrate mortuo primum in Aegyptum discendi causa, post in Italiam et in Siciliam contendisse, ut Pythagorae inventa perdisceret...
Pagina 270 - Quare 87 hoc videndum est, possitue nobis hoc ratio philo30 sophorum dare. Pollicetur certe. Nisi enim id faceret, cur Plato Aegyptum peragravit, ut a sacerdotibus barbaris numeros et caelestia acciperet? cur post Tarentum ad Archytam? cur ad reliquos Pythagoreos, Echecratem , Timaeum , Arionem Locros , ut , cum к Socratem expressisset , adiungeret Pythagoreorum disciplinam eaque, quae Socrates repudiabat, addisceret?
Pagina 123 - For it is clear that these studies are like ladders and bridges that carry our minds from things apprehended by sense and opinion to those comprehended by the mind and understanding, and from those material, physical things, our foster-brethren known to us from childhood, to the things with which we are unacquainted, foreign to our senses, but in their immateriality and eternity more akin to our souls, and above all to the reason which is in our souls.
Pagina 257 - But those individuals bus vero natura tantum tribuit sollertiae, acuminis, memoriae, ut possint geometriam, astrologiam, musicen ceterasque disciplinas penitus habere notas, praetereunt officia architectorum et efficiuntur mathematici. Itaque faciliter contra eas disciplinas disputare possunt, quod pluribus telis disciplinarum sunt armati. Hi autem inveniuntur raro, ut aliquando fuerunt Aristarchus Samius, Philolaus et Archytas Tarentini, Apollonius Pergaeus, Eratosthenes Cyrenaeus, Archimedes et...
Pagina 271 - Ш vit, unde proficeret, et ad Pythagorae disciplinam se contulit. quam etsi ratione diligenti et magnifica instructam videbat, rerum tamen continentiam et castitatem magis cupiebat imitari et, quod Pythagoreorum ingenium adiutum disciplinis aliis sentiebat, ad Theodorum Cyrenas , ut geometriam disce- 10 ret, est profectus et astrologiam adusque Aegyptum ivit petitum, ut inde prophetarum etiam ritus addisceret.
Pagina 263 - Apollo ; poscis ab invita verba pigenda lyra. certa feram certis auctoribus, aut ego vates nescius aerata signa movere pila.
Pagina 358 - And this he proved by showing that the squares on the diameters have the same ratios as the...
Pagina 151 - I formed my judgments, learning from the common nature of all and the particular nature of the individual, from the disease, the patient, the regimen prescribed and the prescriber — for these make a diagnosis more...
Pagina 257 - Hence they can readily take up positions against those arts because many are the artistic weapons with which they are armed. Such men, however, are rarely found, but there have been such at times; for example, Aristarchus of Samos, Philolaus and Archytas of Tarentum, Apollonius of Perga, Eratosthenes of Cyrene...
Pagina 463 - PROPOSITION 8 If between two numbers there fall numbers in continued proportion with them, then, however many numbers fall between them in continued proportion, so many will also fall in continued proportion between the numbers which have the same ratio with the original numbers.
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