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Omar Khayyam
Born: 18 May 1048 in Nishapur, Persia (now Iran)
Died: 4 Dec 1131 in Nishapur, Persia (now Iran)
Omar Khayyam's full name was Ghiyath al-Din Abu'l-Fath Umar ibn
Ibrahim Al-Nisaburi al-Khayyami. A literal translation of the name
al-Khayyami (or al-Khayyam) means 'tent maker' and this may have been
the trade of Ibrahim his father. Khayyam played on the meaning of his
own name when he wrote:-
Khayyam, who stitched the tents of science,
Has fallen in grief's furnace and been suddenly burned,
The shears of Fate have cut the tent ropes of his life,
And the broker of Hope has sold him for nothing!
The political events of the 11th Century played a major role in the
course of Khayyam's life. The Seljuq Turks were tribes that invaded
southwestern Asia in the 11th Century and eventually founded an
empire that included Mesopotamia, Syria, Palestine, and most of Iran.
The Seljuq occupied the grazing grounds of Khorasan and then, between
1038 and 1040, they conquered all of north-eastern Iran. The Seljuq
ruler Toghrïl Beg proclaimed himself sultan at Nishapur in 1038 and
entered Baghdad in 1055. It was in this difficult unstable military
empire, which also had religious problems as it attempted to
establish an orthodox Muslim state, that Khayyam grew up.
Khayyam studied philosophy at Naishapur and one of his fellow
students wrote that he was:-
... endowed with sharpness of wit and the highest natural powers ...
However, this was not an empire in which those of learning, even
those as learned as Khayyam, found life easy unless they had the
support of a ruler at one of the many courts. Even such patronage
would not provide too much stability since local politics and the
fortunes of the local military regime decided who at any one time
held power. Khayyam himself described the difficulties for men of
learning during this period in the introduction to his Treatise on
Demonstration of Problems of Algebra (see for example [1]):-
I was unable to devote myself to the learning of this algebra and the
continued concentration upon it, because of obstacles in the vagaries
of time which hindered me; for we have been deprived of all the
people of knowledge save for a group, small in number, with many
troubles, whose concern in life is to snatch the opportunity, when
time is asleep, to devote themselves meanwhile to the investigation
and perfection of a science; for the majority of people who imitate
philosophers confuse the true with the false, and they do nothing but
deceive and pretend knowledge, and they do not use what they know of
the sciences except for base and material purposes; and if they see a
certain person seeking for the right and preferring the truth, doing
his best to refute the false and untrue and leaving aside hypocrisy
and deceit, they make a fool of him and mock him.
However Khayyam was an outstanding mathematician and astronomer and,
despite the difficulties which he described in this quote, he did
write several works including Problems of Arithmetic, a book on music
and one on algebra before he was 25 years old. In 1070 he moved to
Samarkand in Uzbekistan which is one of the oldest cities of Central
Asia. There Khayyam was supported by Abu Tahir, a prominent jurist of
Samarkand, and this allowed him to write his most famous algebra
work, Treatise on Demonstration of Problems of Algebra from which we
gave the quote above. We shall describe the mathematical contents of
this work later in this biography.
Toghril Beg, the founder of the Seljuq dynasty, had made Esfahan the
capital of his domains and his grandson Malik-Shah was the ruler of
that city from 1073. An invitation was sent to Khayyam from Malik-Shah
and from his vizier Nizam al-Mulk asking Khayyam to go to Esfahan to
set up an Observatory there. Other leading astronomers were also
brought to the Observatory in Esfahan and for 18 years Khayyam led
the scientists and produced work of outstanding quality. It was a
period of peace during which the political situation allowed Khayyam
the opportunity to devote himself entirely to his scholarly work.
During this time Khayyam led work on compiling astronomical tables
and he also contributed to calendar reform in 1079. Cowell quotes The
Calcutta Review No 59:-
When the Malik Shah determined to reform the calendar, Omar was one
of the eight learned men employed to do it, the result was the Jalali
era (so called from Jalal-ud-din, one of the king's names) - 'a
computation of time,' says Gibbon, 'which surpasses the Julian, and
approaches the accuracy of the Gregorian style.'
Khayyam measured the length of the year as 365.24219858156 days. Two
comments on this result. Firstly it shows an incredible confidence to
attempt to give the result to this degree of accuracy. We know now
that the length of the year is changing in the sixth decimal place
over a person's lifetime. Secondly it is outstandingly accurate. For
comparison the length of the year at the end of the 19th century was
365.242196 days, while today it is 365.242190 days.
In 1092 political events ended Khayyam's period of peaceful
existence. Malik-Shah died in November of that year, a month after
his vizier Nizam al-Mulk had been murdered on the road from Esfahan
to Baghdad by the terrorist movement called the Assassins. Malik-Shah's
second wife took over as ruler for two years but she had argued with
Nizam al-Mulk so now those whom he had supported found that support
withdrawn. Funding to run the Observatory ceased and Khayyam's
calendar reform was put on hold. Khayyam also came under attack from
the orthodox Muslims who felt that Khayyam's questioning mind did not
conform to the faith. He wrote in his poem the Rubaiyat :-
Indeed, the Idols I have loved so long
Have done my Credit in Men's Eye much Wrong:
Have drowned my Honour in a shallow cup,
And sold my reputation for a Song.
Despite being out of favour on all sides, Khayyam remained at the
Court and tried to regain favour. He wrote a work in which he
described former rulers in Iran as men of great honour who had
supported public works, science and scholarship.
Malik-Shah's third son Sanjar, who was governor of Khorasan, became
the overall ruler of the Seljuq empire in 1118. Sometime after this
Khayyam left Esfahan and travelled to Merv (now Mary, Turkmenistan)
which Sanjar had made the capital of the Seljuq empire. Sanjar
created a great centre of Islamic learning in Merv where Khayyam
wrote further works on mathematics.
The paper [18] by Khayyam is an early work on algebra written before
his famous algebra text. In it he considers the problem:-
Find a point on a quadrant of a circle in such manner that when a
normal is dropped from the point to one of the bounding radii, the
ratio of the normal's length to that of the radius equals the ratio
of the segments determined by the foot of the normal.
Khayyam shows that this problem is equivalent to solving a second
problem:-
Find a right triangle having the property that the hypotenuse equals
the sum of one leg plus the altitude on the hypotenuse.
This problem in turn led Khayyam to solve the cubic equation x3 +
200x = 20x2 + 2000 and he found a positive root of this cubic by
considering the intersection of a rectangular hyperbola and a circle.
An approximate numerical solution was then found by interpolation in
trigonometric tables. Perhaps even more remarkable is the fact that
Khayyam states that the solution of this cubic requires the use of
conic sections and that it cannot be solved by ruler and compass
methods, a result which would not be proved for another 750 years.
Khayyam also wrote that he hoped to give a full description of the
solution of cubic equations in a later work [18]:-
If the opportunity arises and I can succeed, I shall give all these
fourteen forms with all their branches and cases, and how to
distinguish whatever is possible or impossible so that a paper,
containing elements which are greatly useful in this art will be
prepared.
Indeed Khayyam did produce such a work, the Treatise on Demonstration
of Problems of Algebra which contained a complete classification of
cubic equations with geometric solutions found by means of
intersecting conic sections. In fact Khayyam gives an interesting
historical account in which he claims that the Greeks had left
nothing on the theory of cubic equations. Indeed, as Khayyam writes,
the contributions by earlier writers such as al-Mahani and al-Khazin
were to translate geometric problems into algebraic equations
(something which was essentially impossible before the work of al-Khwarizmi).
However, Khayyam himself seems to have been the first to conceive a
general theory of cubic equations. Khayyam wrote (see for example [9]
or [10]):-
In the science of algebra one encounters problems dependent on
certain types of extremely difficult preliminary theorems, whose
solution was unsuccessful for most of those who attempted it. As for
the Ancients, no work from them dealing with the subject has come
down to us; perhaps after having looked for solutions and having
examined them, they were unable to fathom their difficulties; or
perhaps their investigations did not require such an examination; or
finally, their works on this subject, if they existed, have not been
translated into our language.
Another achievement in the algebra text is Khayyam's realisation that
a cubic equation can have more than one solution. He demonstrated the
existence of equations having two solutions, but unfortunately he
does not appear to have found that a cubic can have three solutions.
He did hope that "arithmetic solutions" might be found one day when
he wrote (see for example [1]):-
Perhaps someone else who comes after us may find it out in the case,
when there are not only the first three classes of known powers,
namely the number, the thing and the square.
The "someone else who comes after us" were in fact del Ferro,
Tartaglia and Ferrari in the 16th century. Also in his algebra book,
Khayyam refers to another work of his which is now lost. In the lost
work Khayyam discusses the Pascal triangle but he was not the first
to do so since al-Karaji discussed the Pascal triangle before this
date. In fact we can be fairly sure that Khayyam used a method of
finding nth roots based on the binomial expansion, and therefore on
the binomial coefficients. This follows from the following passage in
his algebra book (see for example [1], [9] or [10]):-
The Indians possess methods for finding the sides of squares and
cubes based on such knowledge of the squares of nine figures, that is
the square of 1, 2, 3, etc. and also the products formed by
multiplying them by each other, i.e. the products of 2, 3 etc. I have
composed a work to demonstrate the accuracy of these methods, and
have proved that they do lead to the sought aim. I have moreover
increased the species, that is I have shown how to find the sides of
the square-square, quatro-cube, cubo-cube, etc. to any length, which
has not been made before now. the proofs I gave on this occasion are
only arithmetic proofs based on the arithmetical parts of Euclid's
"Elements".
In Commentaries on the difficult postulates of Euclid's book Khayyam
made a contribution to non-euclidean geometry, although this was not
his intention. In trying to prove the parallels postulate he
accidentally proved properties of figures in non-euclidean
geometries. Khayyam also gave important results on ratios in this
book, extending Euclid's work to include the multiplication of
ratios. The importance of Khayyam's contribution is that he examined
both Euclid's definition of equality of ratios (which was that first
proposed by Eudoxus) and the definition of equality of ratios as
proposed by earlier Islamic mathematicians such as al-Mahani which
was based on continued fractions. Khayyam proved that the two
definitions are equivalent. He also posed the question of whether a
ratio can be regarded as a number but leaves the question unanswered.
Outside the world of mathematics, Khayyam is best known as a result
of Edward Fitzgerald's popular translation in 1859 of nearly 600
short four line poems the Rubaiyat. Khayyam's fame as a poet has
caused some to forget his scientific achievements which were much
more substantial. Versions of the forms and verses used in the
Rubaiyat existed in Persian literature before Khayyam, and only about
120 of the verses can be attributed to him with certainty. Of all the
verses, the best known is the following:-
The Moving Finger writes, and, having writ,
Moves on: nor all thy Piety nor Wit
Shall lure it back to cancel half a Line,
Nor all thy Tears wash out a Word of it.
Article by: J J
O'Connor and E F Robertson
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