Born:
about 569 BC in Samos,
Died: about 475 BC
Pythagoras of Samos is often described as the first pure mathematician. He is
an extremely important figure in the development of mathematics yet we know
relatively little about his mathematical achievements. Unlike many later Greek
mathematicians, where at least we have some of the books which they wrote, we
have nothing of Pythagoras's writings. The society which he led, half religious
and half scientific, followed a code of secrecy which certainly means that
today Pythagoras is a mysterious figure.
We do have details of
Pythagoras's life from early biographies which use important original sources
yet are written by authors who attribute divine powers to him, and whose aim
was to present him as a god-like figure. What we present below is an attempt to
collect together the most reliable sources to reconstruct an account of
Pythagoras's life. There is fairly good agreement on the main
events of his life but most of the dates are disputed with different
scholars giving dates which differ by 20 years. Some historians treat all this
information as merely legends but, even if the reader treats it in this way,
being such an early record it is of historical importance.
Pythagoras's father was Mnesarchus ([12] and [13]), while his mother was Pythais [8] and she was a native of
Little is known of
Pythagoras's childhood.
The other two philosophers who were to influence Pythagoras, and to
introduce him to mathematical ideas, were Thales and
his pupil Anaximander who both lived on
In about 535 BC
Pythagoras went to
It is not difficult to
relate many of Pythagoras's beliefs, ones he would later impose on the society
that he set up in
In 525 BC Cambyses II, the king of
... was
transported by the followers of Cambyses as a
prisoner of war. Whilst he was there he gladly associated with the Magoi ... and was instructed in their sacred rites and learnt
about a very mystical worship of the gods. He also reached the acme of
perfection in arithmetic and music and the other mathematical sciences taught
by the Babylonians...
In about 520 BC
Pythagoras left
Pythagoras made a
journey to Crete shortly after his return to
... he
formed a school in the city [of
Pythagoras left Samos and went to southern
... he
tried to use his symbolic method of teaching which was similar in all respects
to the lessons he had learnt in
This was, according to Iamblichus, used in part as an excuse for Pythagoras to
leave
... Pythagoras was
dragged into all sorts of diplomatic missions by his fellow citizens and forced
to participate in public affairs. ... He knew that all the philosophers before
him had ended their days on foreign soil so he decided to escape all political
responsibility, alleging as his excuse, according to some sources, the contempt
the Samians had for his teaching method.
Pythagoras founded a
philosophical and religious school in Croton (now
(1) that at its
deepest level, reality is mathematical in nature,
(2) that philosophy can be used for spiritual purification,
(3) that the soul can rise to union with the divine,
(4) that certain symbols have a mystical significance, and
(5) that all brothers of the order should observe strict loyalty and
secrecy.
Both men and women were
permitted to become members of the Society, in fact several later women
Pythagoreans became famous philosophers. The outer circle of
the Society were known as the akousmatics and
they lived in their own houses, only coming to the Society during the day. They
were allowed their own possessions and were not required to be vegetarians.
Of Pythagoras's actual
work nothing is known. His school practised secrecy
and communalism making it hard to distinguish between the work of Pythagoras
and that of his followers. Certainly his school made outstanding contributions
to mathematics, and it is possible to be fairly certain about some of
Pythagoras's mathematical contributions. First we should be clear in what sense
Pythagoras and the mathematikoi were studying
mathematics. They were not acting as a mathematics research group does in a
modern university or other institution. There were no 'open problems' for them
to solve, and they were not in any sense interested in trying to formulate or
solve mathematical problems.
Rather Pythagoras was
interested in the principles of mathematics, the concept of number, the concept
of a triangle or other mathematical figure and the abstract idea of a proof. As
Brumbaugh writes in [3]:-
It is hard for us today,
familiar as we are with pure mathematical abstraction and with the mental act
of generalisation, to appreciate the originality of
this Pythagorean contribution.
In fact today we have
become so mathematically sophisticated that we fail even to recognise
2 as an abstract quantity. There is a remarkable step from 2 ships + 2 ships =
4 ships, to the abstract result 2 + 2 = 4, which applies not only to ships but
to pens, people, houses etc. There is another step to see that the abstract
notion of 2 is itself a thing, in some sense every bit as real as a ship or a
house.
Pythagoras believed that
all relations could be reduced to number relations. As Aristotle wrote:-
The Pythagorean ... having been
brought up in the study of mathematics, thought that things are numbers ...
and that the whole cosmos is a scale and a number.
This generalisation
stemmed from Pythagoras's observations in music, mathematics and astronomy.
Pythagoras noticed that vibrating strings produce harmonious tones when the
ratios of the lengths of the strings are whole numbers, and that these ratios
could be extended to other instruments. In fact Pythagoras made remarkable
contributions to the mathematical theory of music. He was a fine musician,
playing the lyre, and he used music as a means to help those who were ill.
Pythagoras studied
properties of numbers which would be familiar to mathematicians today, such as
even and odd numbers, triangular numbers, perfect numbers etc. However to
Pythagoras numbers had personalities which we hardly recognise
as mathematics today [3]:-
Each number had its own
personality - masculine or feminine, perfect or incomplete, beautiful or ugly.
This feeling modern mathematics has deliberately eliminated, but we still find
overtones of it in fiction and poetry. Ten was the very best number: it
contained in itself the first four integers - one, two, three, and four [1 + 2 + 3 + 4 = 10]
- and these written in dot notation formed a perfect triangle.
Of course today we
particularly remember Pythagoras for his famous geometry theorem.
After [Thales,
etc.] Pythagoras transformed the study of geometry into a liberal
education, examining the principles of the science from the beginning and
probing the theorems in an immaterial and intellectual manner: he it was who
discovered the theory of irrational and the construction of the cosmic figures.
Again Proclus, writing of geometry, said:-
I emulate the
Pythagoreans who even had a conventional phrase to express what I mean "a
figure and a platform, not a figure and a sixpence", by which they implied
that the geometry which is deserving of study is that which, at each new
theorem, sets up a platform to ascend by, and lifts the soul on high instead of
allowing it to go down among the sensible objects and so become subservient to
the common needs of this mortal life.
Heath [7] gives a list
of theorems attributed to Pythagoras, or rather more generally to the
Pythagoreans.
(i) The sum of the
angles of a triangle is equal to two right angles.
(ii) The theorem of
Pythagoras - for a right angled triangle the square on the hypotenuse is equal
to the sum of the squares on the other two sides. We should note here that to
Pythagoras the square on the hypotenuse would certainly not be thought of as a
number multiplied by itself, but rather as a geometrical square constructed on
the side. To say that the sum of two squares is equal to a third square meant
that the two squares could be cut up and reassembled to form a square identical
to the third square.
(iii) Constructing
figures of a given area and geometrical algebra. For example they solved
equations such as a (a - x) = x2 by
geometrical means.
(iv)
The
discovery of irrationals. This is certainly attributed to the Pythagoreans but
it does seem unlikely to have been due to Pythagoras himself. This went against
Pythagoras's philosophy the all things are numbers, since by a number he meant
the ratio of two whole numbers. However, because of his belief that all things
are numbers it would be a natural task to try to prove that the hypotenuse of
an isosceles right angled triangle had a length corresponding to a number.
(v) The five regular
solids. It is thought that Pythagoras himself knew how to construct the first
three but it is unlikely that he would have known how to construct the other
two.
(vi)
In
astronomy Pythagoras taught that the Earth was a sphere at the centre of the
Universe. He also recognised that the orbit of the
Moon was inclined to the equator of the Earth and he was one of the first to realise that Venus as an evening star was the same planet
as Venus as a morning star.
Primarily, however,
Pythagoras was a philosopher. In addition to his beliefs about numbers,
geometry and astronomy described above, he held [2]:-
... the following philosophical
and ethical teachings: ... the dependence of the dynamics of world structure on
the interaction of contraries, or pairs of opposites; the viewing of the soul
as a self-moving number experiencing a form of metempsychosis, or successive
reincarnation in different species until its eventual purification (particularly through
the intellectual life of the ethically rigorous Pythagoreans); and the
understanding ...that all existing objects were fundamentally composed of form
and not of material substance. Further Pythagorean doctrine ...
identified the brain as the locus of the soul; and prescribed certain secret
cultic practices.
In [3] their practical
ethics are also described:-
In their ethical
practices, the Pythagorean were famous for their mutual friendship,
unselfishness, and honesty.
Pythagoras's Society at
Croton was not unaffected by political events despite his desire to stay out of
politics. Pythagoras went to
Cylon, a Crotoniate
and leading citizen by birth, fame and riches, but otherwise a difficult,
violent, disturbing and tyrannically disposed man, eagerly desired to
participate in the Pythagorean way of life. He approached Pythagoras, then an
old man, but was rejected because of the character defects just described. When
this happened Cylon and his friends vowed to make a
strong attack on Pythagoras and his followers. Thus a powerfully aggressive
zeal activated Cylon and his followers to persecute
the Pythagoreans to the very last man. Because of this Pythagoras left for Metapontium and there is said to have ended his days.
This seems accepted by
most but Iamblichus himself does not accept this
version and argues that the attack by Cylon was a
minor affair and that Pythagoras returned to Croton. Certainly the Pythagorean
Society thrived for many years after this and spread from Croton to many other
Italian cities. Gorman [6] argues that this is a strong reason to believe that
Pythagoras returned to Croton and quotes other evidence such as the widely
reported age of Pythagoras as around 100 at the time of his death and the fact
that many sources say that Pythagoras taught Empedokles
to claim that he must have lived well after 480 BC.
The evidence is unclear
as to when and where the death of Pythagoras occurred. Certainly the
Pythagorean Society expanded rapidly after 500 BC, became political in nature
and also spilt into a number of factions. In 460 BC the Society [2]:-
... was
violently suppressed. Its meeting houses were everywhere sacked and burned;
mention is made in particular of "the house of
Article by: J J O'Connor and E F Robertson
January 1999
MacTutor History of Mathematics
[http://www-history.mcs.st-andrews.ac.uk/Biographies/Pythagoras.html]