「Pythagorean」の共起表現一覧(1語右で並び替え)
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but Publius Vatinius, the other best-known | Pythagorean among his political contemporaries, was a f |
e surviving fragment of On Piety concerns a | Pythagorean analogy between numbers and objects; the va |
taphysics and cosmology combined Platonist, | Pythagorean and Stoic ideas. |
His status as a | Pythagorean, and his general concern and respect for So |
point, begetting lines or finiteness, etc. | Pythagorean and Platonic philosophers like Plotinus and |
Iamblichus calls him a | Pythagorean, and, according to Themistius, Plato reckon |
The writings attributed to Theano were: | Pythagorean Apophthegms, Female Advice, On Virtue, On P |
He was called a | Pythagorean by Clement of Alexandria and Cicero, was sa |
s the first Chinese classic text to use the | Pythagorean comma, and to precisely analyze 12-tone tun |
Italy and part of Magna Graecia where many | Pythagorean communities existed. |
re competing according to ethical-religious | Pythagorean concepts by abstaining from sexual intercou |
Phillipas, secretly a member of the | Pythagorean cult plots with them to kill Alexander duri |
urned computer scientist against an ancient | Pythagorean cult. |
A | Pythagorean cup looks like a normal drinking cup, excep |
A | Pythagorean cup (also known as a Pythagoras cup, a Gree |
hat wine and meat harm the mind conforms to | Pythagorean dietary practice. |
Regarding the | Pythagorean divisions of the octave mentioned above, th |
nus, and implies that Xenophilus taught him | Pythagorean doctrine. |
lus (died 45 BCE) made an attempt to revive | Pythagorean doctrines, but the most important members o |
He may have married Myia, a | Pythagorean herself or possibly Pythagoras' daughter. |
ed visually or auditorially, reflecting the | Pythagorean idea that all things were numbers. |
ahe and for a decade tried to establish the | Pythagorean ideal by finding a match between the sizes |
eration of Pythagoreans, and he is the only | Pythagorean known to have lived in Athens in the 4th ce |
He wrote a work On the | Pythagorean Life, in which he emphasized, among other t |
has been much discussion as to whether the | Pythagorean literature which was widely published at th |
e Greco-Roman mysteries and late Orphic and | Pythagorean literature and influenced Gnostic forms of |
Representation of the | Pythagorean monad. |
r's essays, Ancient Temple Architecture and | Pythagorean Number as Form, Color, and Light from the e |
d to combine his doctrine of Ideas with the | Pythagorean number-theory, and identified the Good with |
He is identified as a | Pythagorean of the 4th century BCE, and as a supporter |
hat the triples (a, b, c) and (a, d, e) are | Pythagorean, one must prove that a, b, and d are ration |
Melissa was a | Pythagorean philosopher and mathematician from the 6th |
-CHEHK-rah-tees) was, according to Plato, a | Pythagorean philosopher from the ancient Greek town of |
φιλος; 4th century BC) of Chalcidice, was a | Pythagorean philosopher and musician, who lived in the |
For the | Pythagorean philosopher, see Cronius the Pythagorean. |
Democrates (Greek: Δημοκράτης) a | Pythagorean philosopher, concerning whom little is know |
Acrion was a Locrian and a | Pythagorean philosopher. |
arissa (1st-century BC) was a physician and | Pythagorean philosopher. |
4th century BCE) of Iasos, in Caria, was a | Pythagorean philosopher. |
ns of later writers, which attempt to apply | Pythagorean philosophy to a woman's life. |
he addicted himself partly to the study of | Pythagorean philosophy, partly to the science of medici |
Calliphon of Croton (6th century BC) was a | Pythagorean physician. |
A | Pythagorean prime is prime number of the form 4n + 1. |
The first few | Pythagorean primes are |
Pythagorean Record is what a team's expected record is | |
s one of those who might have inherited the | Pythagorean School after Pythagoras' death. |
e on board a ship, as a result of which his | Pythagorean shipmates toss him overboard; while one wri |
urkert featured Androcydes in his stemma of | Pythagorean symbola, the gnomic utterances or maxims th |
ed passages from Hesiod in interpreting the | Pythagorean symbols. |
of the imperfection of the intervals in the | Pythagorean system, and a desire to retain as much puri |
q are odd primes, at least one of which is | Pythagorean, then p is a quadratic residue mod q if and |
From the | Pythagorean theorem applied to the two right-angled tri |
Geometric proof of the | Pythagorean theorem from the Zhou Bi Suan Jing |
geometry, and extended the treatment of the | Pythagorean theorem as first presented in 800 BC by Bau |
lated using the relativistic version of the | pythagorean theorem which has a different sign for the |
De Moivre's theorem - parallelogram rule - | Pythagorean theorem - similar triangles - trigonometric |
roblems that required an application of the | Pythagorean theorem to calculate the distance between t |
ith catheti measuring √2 and √3 (again, the | Pythagorean theorem proves this). |
By using the | Pythagorean theorem, they reduced geometric problems to |
question may suggest some knowledge of the | Pythagorean theorem, though the papyrus only shows a st |
rmal Euclidean geometry, triangles obey the | Pythagorean theorem, which states that the square dista |
rtues" of the pentecontad calendar with the | Pythagorean theorem, further describing the number fift |
which can be viewed as a version of the | Pythagorean theorem. |
osceles triangle the theorem reduces to the | Pythagorean theorem. |
In 1959 he discovered a new proof of the | Pythagorean theorem. |
ins one of the first recorded proofs of the | Pythagorean Theorem. |
a right angle according to the converse of | Pythagorean theorem. |
smates and teacher an original proof of the | Pythagorean theorem. |
The | Pythagorean Theorem: A 4,000-Year History, 2007, Prince |
The Triad is a | Pythagorean title for the number three. |
ho knew nothing of him except that he was a | Pythagorean, took on himself the risk of a voyage to Cy |
es that he was a major source for the later | Pythagorean tradition, and he is also of interest in st |
goras to the Turba philosophorum: Egypt and | Pythagorean Tradition,” Journal of the Warburg and Cour |
the primes that can be the hypotenuse of a | Pythagorean triangle. |
Main article: | Pythagorean triple |
pt 1 are the third term of a Leg-Hypotenuse | Pythagorean triple (for example, 3-4-5, 5-12-13). |
which gives Euclid's formula for a | Pythagorean triple. |
or in other words, the largest number in a | Pythagorean triple. |
ula is a fundamental formula for generating | Pythagorean triples given an arbitrary pair of positive |
ht-angled triangles, whose sidelengths form | Pythagorean triples with rational entries. |
Using Euclid's formula for generating | Pythagorean triples, the sides must be in the ratio |
iangles whose sides are of integer lengths, | Pythagorean triples, possess angles that are never rati |
a, or the quasi-monastic rule governing the | Pythagorean way of life. |
s (also transliterated as Androkydes) was a | Pythagorean whose work On Pythagorean Symbols survives |
Pythagorean women philosophers believed they were makin | |
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