Pythagorus (23 page)
It seems that bodies so great must inevitably produce a sound by their movement. Even bodies on Earth do that, although they are not so great in bulk or moving at so high a speed, or so many in number and enormous in size, all moving at a tremendous speed. It is unthinkable that they should fail to produce a noise of surpassing loudness. Taking this as their hypothesis, and also that the speeds of the stars, judging from their distances, are in the ratios of the musical consonances, they affirm that the sound of the stars as they revolve is concordant.
Some heavenly bodies appear to move faster than others. Aristotle wrote that the Pythagoreans had arrived at the idea that the faster the motion, the higher the pitch it produced, and they had taken this into consideration when allowing the ratios of the relative distances between the bodies to correspond to musical intervals. With the full complement of heavenly bodies, the result was a complete octave of the diatonic scale.
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What surprises is that Aristotle or anyone could think the eight notes of the scale heard simultaneously would be harmonious. The sound would not be beautiful. There would be cacophony in the heavens. Humans should be glad they cannot hear it. Pity Pythagoras, who, legend says, could! The explanation cannot be that
harmonia
did not imply audible sound, for Aristotle thought the Pythagoreans believed planetary movement produced actual tones. He never explained how it could be beautiful, but he did give what he thought was the Pythagorean explanation â different from Archytas' â for why ordinary humans do not hear it:
To solve the difficulty that no one is aware of this sound, they account for it by saying that the sound is with us right from birth and has thus no contrasting silence to show it up; for voice and silence are perceived by contrast with each other, and so all mankind is undergoing an experience like that of a coppersmith, who becomes by long habit indifferent to the din around him.
At the time
of Aristotle and in later antiquity, it was generally assumed that if one mentioned âPythagorean mathematics', an educated person would know what that meant, but in fact the meaning was vague, apparently referring to a tradition that thought it inspiring to discover hidden, true relationships of the sort that, once found, seemed inevitable. Since the evidence about what sixth- and fifth-century Pythagorean mathematics were like is so sparse, we are at a loss to know how authentically Pythagorean this so-called Pythagorean mathematics was. To modern eyes, its vestiges seem feeble by comparison with Euclid's
Elements
, which appeared around 300 B.C. Did it really reflect a naive mathematics of Pythagoras himself, and his associates? Or was it âa dilute, popularised selection from what had been originally a rigorous mathematical system'?
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Perhaps it was a hodgepodge of what survived from early, primitive mathematical thought from several sources, mistakenly lumped under the heading âPythagorean'? Maybe a much more authentically Pythagorean, lively
mathematici
heritage had moved through Archytas to influence Euclid, while this older, calcified, fading mathematics limped alongside, still bearing the name âPythagorean'.
There are also differences of opinion about whether there is valid reason to call the five regular solids that Plato featured âPythagorean' solids.
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Â
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The issue is not a simple one, for âknowing about' the solids, or âdiscovering' them, or âtrying to figure them out', are not the same as âgiving them a full mathematical description' or being able to prove that they are the only possible perfect solids. It is uncertain which achievement deserves to be rewarded with having one's name attached to it.
Arguing in favour of early Pythagorean knowledge of the solids is the fact that these shapes were familiar in nature and construction. Cubes (and pyramids, for anyone who had been to Egypt) were familiar building shapes, though pyramids often were five-sided including the base, not four-sided tetrahedra. A dodecahedron dating from at least as early as Pythagoras, apparently Etruscan, has been discovered near Padua. Pyrite crystals appear as cubes and also, in southern Italy and on the isle of Elba, in the form of dodecahedra.
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A fluorite crystal is an octahedron; quartz crystals are pyramids and double pyramids; garnet crystals, dodecahedra. Pythagoras would have known about gems and crystals if his father really was a gem engraver, and someone with a Pythagorean cast of mind would surely have been curious about regular, beautiful shapes that appear without any human intervention. It would have been in keeping for someone obsessed with numbers to try to understand them by means of numbers.
Also favouring an early Pythagorean knowledge of them is that, if the fragment is genuine, fifty to a hundred years after Pythagoras' death Philolaus knew about the five regular solids but was almost certainly not, himself, their discoverer. In the absence of evidence to show who did or did not discover them, it is not far-fetched to think the five regular solids might legitimately be called Pythagorean.
Plato associated four of the five solids with the four elements in his
Timaeus
, as had Philolaus in the fragment that read, âThe bodies in the sphere are five: fire, water, earth, and air, and fifthly the hull of the sphere'
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But had anyone made that association earlier? The scholar Aëtius, of the second century A.D., thought Pythagoras had:
There being five solid figures, called the mathematical solids, Pythagoras says earth is made from the cube, fire from the pyramid, air from the octahedron, and water from the icosahedron, and from the dodecahedron is made the âsphere of the whole'.
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Since âPythagoras says' was used for what Pythagoras' followers said, the attribution should probably be read as âthe Pythagoreans said'. Aëtius got his information from Theophrastus, a pupil of Aristotle who may have been contradicting his teacher, for Aristotle scoffed that the Pythagoreans had ânothing new to add' to knowledge about the elements. However, Aristotle had so little respect for the idea of associating elements with solids that even if irrefutable evidence had existed that the association originated with the Pythagoreans he would still have dismissed it as ânothing new to add'. Little survives of Theophrastus' history of philosophy or of the books he wrote about individual philosophers, but more would have been available when Aëtius was doing his research. However, though Philolaus' fragment associated the elements with the solids, and the solids might have been known to earlier Pythagoreans, the identification of the four elements as fire, water, earth, and air did not originate with them. Philolaus was evidently familiar with the idea from his older contemporary, the Sicilian poet-philosopher Empedocles, born ten years after Pythagoras' death.
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The question whether the Pythagoreans thought of a point as having magnitude seems trivial, but it is related to the question of who first knew about the solids. Zeno, one of the Eleatics, reputedly scorned the Pythagoreans for naively thinking that a point had dimensions like a pebble and that two points (pebbles) touching one another made a line, but that way of thinking made the pyramid easy to âdiscover' by building a little pebble structure. The Pythagorean preoccupation with the numbers 1, 2, 3, and 4 makes it difficult to believe they did not extend their progression past making a triangle with three pebbles to building a little pyramid with four, or better yet a larger one with 10, the perfect number.
Speusippus, Plato's pupil and nephew, attributed the pointâlineâsurfaceâsolid progression to Pythagoreans before Archytas. It was a more primitive way of arriving at a solid than Archytas' use of âmovement'. Even the use of movement may have come before Archytas, and leads easily to a square and cube. An example appears in a reference from the Sceptic philosopher Sextus Empiricus, who flourished at the turn of the second to the third century A.D. He called this a âscheme of the Pythagoreans': âSome say that body is formed from one point. This point by flowing produces a line, the line by flowing makes a surface, and this when moved into depth generates a body in three dimensions.'
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The sophistication of geometry in a Pythagorean community a little more than a century after Pythagoras' death â as witness Archytas' solution for doubling the cube â makes it ludicrous to insist that earlier Pythagoreans could not have discovered the five regular solids. Nevertheless, the man who first arrived at a complete mathematical understanding of them was not a Pythagorean. He was Theaetetus, a friend of Plato who was killed in 369 B.C. Whatever was known about the regular solids earlier, Theaetetus, with his description of the octahedron and the icosahedron, finished the job.
In the end, in spite of differing viewpoints about the solids and the âPythagorean mathematics' of late antiquity, there is widespread consensus that the first Pythagoreans opened up a new way of thinking about, appreciating, and using numbers, representing a watershed and having very long lasting impact. Their profound musical/mathematical discovery was as modern as tomorrow's science news, as timeless as any discovery ever made, but most of the true mathematical connections and relationships in nature were hidden too deep for them to find. Even Kepler, in the sixteenth century A.D., with a Pythagorean certainty that such relationships existed, spent a good part of his lifetime searching for them on too superficial a level and was surprised when he had to admit that nature followed her own far cleverer mathematics, not his. In spite of the Pythagorean faith in the power of numbers, they had no inkling of how far numbers would lead humankind. Working out the implications of their discovery would take centuries.
Along with Aristotle,
three other authors who lived during the latter part of the fourth century B.C. were the earliest and most reliable sources used by Porphyry and Iamblichus. They were Heracleides Ponticus, of Plato's Academy, and Aristoxenus of Tarentum and Dicaearchus of Messina, both Aristotle's pupils. Heracleides Ponticus, like Plato, wrote dialogues. He used the character âPythagoras' as a spokesman, telling stories about his former lives and calling himself
philosophos
, lover of wisdom. Other Pythagoreans in the dialogues, Hicetas and Ecphantus, taught that the Earth rotates.
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Heracleides believed that the Earth rotates, and that this makes it appear to humans as though the stars are moving.
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Dicaearchus was Porphyry's and Iamblichus' source about Pythagoras' arrival in Croton and his success among the young men, the city rulers, and the women. Dicaearchus claimed that in his own time the memory of the revolts that ended Pythagorean rule was still vivid in Magna Graecia. He revered Pythagoras as a moral teacher and social reformer, but he believed in no sort of immortality and scorned the idea that anyone could remember former lives, joking that Pythagoras had been a beautiful courtesan in one reincarnation. A man of extensive learning and a scientist with an independent turn of mind, an admirer of Pythagoras and yet not an unqualified admirer, Dicaearchus had his ear to the ground at a time when the oral record could be extremely trustworthy, in the region where Pythagoras had lived and flourished â all of which increases the likelihood that what he reported was genuine.
Aristoxenus, like Dicaearchus, did not toe the Pythagorean line precisely. He dismissed the idea of the soul being more than a harmony of the body's various components, and his music theory took a different direction from Archytas'. The information Porphyry and Iamblichus attributed to Aristoxenus probably came from his biography of Pythagoras â thought to have been the first written â but neither Porphyry nor Iamblichus ever actually saw Aristoxenus' and Dicaearchus' books.
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The information they took from them came indirectly, through other writers who lived during the centuries in between.
After Aristotle there were no attempts in antiquity to draw a distinction between pre-Platonic Pythagorean doctrine and Plato. Beginning with Plato's pupils Speusippus and Xenocrates, no one for centuries would make a distinction between Platonism and Pythagoreanism at all. Almost without exception, everyone would accept what Plato taught in his
Timaeus
and his âoral doctrine' (reported by Aristotle) as the teaching of the early Pythagoreans. In the eyes of the educated world, Plato
was
a Pythagorean.
By the turn
of
the centur
y
in 300 B.C., the world of classical Greece, of Plato and Aristotle, and of strong and often warring city-states like Athens, Sparta, and Thebes had ended.
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The rise of a power from the north â the kingdom of Philip the Great of Macedonia â was heralding a new era. Less than forty years after Philip had become king of Macedonia in 359, his son (traditionally Aristotle's pupil) Alexander the Great had conquered not only Greece but also Egypt and the entire Persian empire to the east, as far as present-day Afghanistan, Pakistan, and the Indus River. The culture and learning of Greece and its colonies and of the conquered peoples mixed and, to an impressive extent, enriched one another.
