Ghiyāth al-Dīn Abū al-Fatḥ ʿUmar ibn Ibrāhīm Nīsābūrī (18 May 1048 – 4 December 1131), commonly known as Omar Khayyam ( fa, عمر خیّام), was a

polymath A polymath ( el, πολυμαθής, , "having learned much"; la, homo universalis, "universal human") is an individual whose knowledge spans a substantial number of subjects, known to draw on complex bodies of knowledge to solve specific pro ...

, known for his contributions to

mathematics Mathematics is an area of knowledge that includes the topics of numbers, formulas and related structures, shapes and the spaces in which they are contained, and quantities and their changes. These topics are represented in modern mathematics ...

astronomy Astronomy () is a natural science that studies celestial objects and phenomena. It uses mathematics, physics, and chemistry in order to explain their origin and evolution. Objects of interest include planets, moons, stars, nebulae, g ...

philosophy Philosophy (from , ) is the systematized study of general and fundamental questions, such as those about existence, reason, knowledge, values, mind, and language. Such questions are often posed as problems to be studied or resolved. ...

, and

Persian poetry Persian literature ( fa, ادبیات فارسی, Adabiyâte fârsi, ) comprises oral compositions and written texts in the Persian language and is one of the world's oldest literatures. It spans over two-and-a-half millennia. Its sources h ...

. He was born in

Nishapur Nishapur or officially Romanized as Neyshabur ( fa, ;Or also "نیشاپور" which is closer to its original and historic meaning though it is less commonly used by modern native Persian speakers. In Persian poetry, the name of this city is wri ...

, the initial

capital Capital may refer to: Common uses * Capital city, a municipality of primary status ** List of national capital cities * Capital letter, an upper-case letter Economics and social sciences * Capital (economics), the durable produced goods used fo ...

of the

Seljuk Empire The Great Seljuk Empire, or the Seljuk Empire was a high medieval, culturally Turko-Persian, Sunni Muslim empire, founded and ruled by the Qïnïq branch of Oghuz Turks. It spanned a total area of from Anatolia and the Levant in the west to ...

. As a scholar, he was contemporary with the rule of the

Seljuk dynasty The Seljuk dynasty, or Seljukids ( ; fa, سلجوقیان ''Saljuqian'', alternatively spelled as Seljuqs or Saljuqs), also known as Seljuk Turks, Seljuk Turkomans "The defeat in August 1071 of the Byzantine emperor Romanos Diogenes by the Turk ...

around the time of the

First Crusade The First Crusade (1096–1099) was the first of a series of religious wars, or Crusades, initiated, supported and at times directed by the Latin Church in the medieval period. The objective was the recovery of the Holy Land from Islamic ...

. As a mathematician, he is most notable for his work on the classification and solution of cubic equations, where he provided geometric solutions by the intersection of conics. Khayyam also contributed to the understanding of the

parallel axiom In geometry, the parallel postulate, also called Euclid's fifth postulate because it is the fifth postulate in Euclid's ''Elements'', is a distinctive axiom in Euclidean geometry. It states that, in two-dimensional geometry: ''If a line segm ...

.Struik, D. (1958). "Omar Khayyam, mathematician". ''The Mathematics Teacher'', 51(4), 280–285. As an astronomer, he calculated the duration of the solar year with remarkable precision and accuracy, and designed the

Jalali calendar The Jalali calendar is a solar calendar, was compiled during the reign of Jalaluddin Malik-Shah I of Seljuk by the order of Nizam al-Mulk and the place of observation were the cities of Isfahan (the capital of the Seljuks), Rey, and Nishapur. ...

, a

solar calendar A solar calendar is a calendar whose dates indicate the season or almost equivalently the apparent position of the Sun relative to the stars. The Gregorian calendar, widely accepted as a standard in the world, is an example of a solar calendar. ...

with a very precise 33-year intercalation cycle''The Cambridge History of Iran'', Volume 4. Cambridge University Press (1975): Richard Nelson Frye that provided the basis for the

Persian calendar The Iranian calendars or Iranian chronology ( fa, گاه‌شماری ایرانی, ) are a succession of calendars invented or used for over two millennia in Iran, also known as Persia. One of the longest chronological records in human history, ...

that is still in use after nearly a millennium. There is a tradition of attributing

poetry Poetry (derived from the Greek '' poiesis'', "making"), also called verse, is a form of literature that uses aesthetic and often rhythmic qualities of language − such as phonaesthetics, sound symbolism, and metre − to evoke meani ...

to Omar Khayyam, written in the form of

quatrain A quatrain is a type of stanza, or a complete poem, consisting of four lines. Existing in a variety of forms, the quatrain appears in poems from the poetic traditions of various ancient civilizations including Persia, Ancient India, Ancient Gree ...

s ('' rubāʿiyāt'' ). This poetry became widely known to the English-reading world in a translation by Edward FitzGerald ('' Rubaiyat of Omar Khayyam'', 1859), which enjoyed great success in the

Orientalism In art history, literature and cultural studies, Orientalism is the imitation or depiction of aspects in the Eastern world. These depictions are usually done by writers, designers, and artists from the Western world. In particular, Orientalist p ...

of the '' fin de siècle''.

Life

Omar Khayyam was born, of Khorasani Persian ancestry, in Nishapur in 1048. In medieval Persian texts he is usually simply called ''Omar Khayyam''. Although open to doubt, it has often been assumed that his forebears followed the trade of tent-making, since ''Khayyam'' means ''tent-maker'' in Arabic.Boyle, J. A., Omar Khayyam: astronomer, mathematician, and poet, Bulletin of the John Rylands Library. 1969; 52(1):30–45. The historian

Bayhaqi Bayhaqi (meaning "from Bayhaq") is a surname. Notable people with the surname include: * Ahmad Bayhaqi (994–1066), Persian Islamic scholar *Abolfazl Beyhaqi (995–1077), Persian secretary, historian, and author *Abu'l-Hasan Bayhaqi Zahir al-D ...

, who was personally acquainted with Omar, provides the full details of his horoscope: "he was Gemini, the sun and Mercury being in the ascendant ...E. D. R., & H. A. R. G. (1929). The Earliest Account of 'Umar Khayyam. Bulletin of the School of Oriental Studies, University of London, 5(3), 467–473. This was used by modern scholars to establish his date of birth as 18 May 1048. Mausoleum of Omar Khayyám

Khayyam's boyhood was spent in Nishapur, a leading metropolis under the Great Seljuq Empire,"The Tomb of Omar Khayyâm", George Sarton, ''Isis'', Vol. 29, No. 1 (Jul. 1938), 15.Edward FitzGerald, ''Rubaiyat of Omar Khayyam'', Ed. Christopher Decker, (University of Virginia Press, 1997), xv; "The Seljuq Turks had invaded the province of Khorasan in the 1030s, and the city of Nishapur surrendered to them voluntarily in 1038. Thus Omar Khayyam grew to maturity during the first of the several alien dynasties that would rule Iran until the twentieth century.". and it had been a major center of the

Zoroastrian religion Zoroastrianism is an Iranian religion and one of the world's oldest organized faiths, based on the teachings of the Iranian-speaking prophet Zoroaster. It has a dualistic cosmology of good and evil within the framework of a monotheistic o ...

.Mehdi Aminrazavi, ''The Wine of Wisdom: The Life, Poetry and Philosophy of Omar Khayyam'', Oneworld Publications (2007) His full name, as it appears in the Arabic sources, was ''Abu’l Fath Omar ibn Ibrahim al-Khayyam''. His gifts were recognized by his early tutors who sent him to study under Imam Muwaffaq Nishaburi, the greatest teacher of the Khorasan region who tutored the children of the highest nobility. Omar made a great friendship with him through the years. Khayyam was also taught by the Zoroastrian mathematician, Abu Hassan Bahmanyar bin Marzban. After studying science, philosophy, mathematics and astronomy at Nishapur, about the year 1068 he traveled to the province of

Bukhara Bukhara ( Uzbek: /, ; tg, Бухоро, ) is the seventh-largest city in Uzbekistan, with a population of 280,187 , and the capital of Bukhara Region. People have inhabited the region around Bukhara for at least five millennia, and the city ...

, where he frequented the renowned library of the

Ark Ark or ARK may refer to: Biblical narratives and religion Hebrew word ''teva'' * Noah's Ark, a massive vessel said to have been built to save the world's animals from a flood * Ark of bulrushes, the boat of the infant Moses Hebrew ''aron'' * ...

. In about 1070 he moved to

Samarkand fa, سمرقند , native_name_lang = , settlement_type = City , image_skyline = , image_caption = Clockwise from the top:Registan square, Shah-i-Zinda necropolis, Bibi-Khanym Mosque, view inside Shah-i-Zinda, ...

, where he started to compose his famous treatise on algebra under the patronage of Abu Tahir Abd al-Rahman ibn ʿAlaq, the governor and

chief judge A chief judge (also known as presiding judge, president judge or principal judge) is the highest-ranking or most senior member of a lower court or circuit court with more than one judge. According to the Federal judiciary of the United States, th ...

of the city.Boris A. Rosenfeld «Umar al-Khayyam» in Helaine Selin, ''Encyclopaedia of the History of Science, Technology, and Medicine in Non-Western Cultures'', Springer-Verlag, 2008, p. 2175-2176 Omar Khayyam was kindly received by the Karakhanid ruler Shams al-Mulk Nasr, who according to Bayhaqi, would "show him the greatest honour, so much so that he would seat marbeside him on his

throne A throne is the seat of state of a potentate or dignitary, especially the seat occupied by a sovereign on state occasions; or the seat occupied by a pope or bishop on ceremonial occasions. "Throne" in an abstract sense can also refer to the mon ...

". In 1073–4 peace was concluded with

Sultan Sultan (; ar, سلطان ', ) is a position with several historical meanings. Originally, it was an Arabic abstract noun meaning "strength", "authority", "rulership", derived from the verbal noun ', meaning "authority" or "power". Later, it c ...

Malik-Shah I Jalāl al-Dawla Mu'izz al-Dunyā Wa'l-Din Abu'l-Fatḥ ibn Alp Arslān (8 August 1055 – 19 November 1092, full name: fa, ), better known by his regnal name of Malik-Shah I ( fa, ), was the third sultan of the Great Seljuk Empire from 1072 t ...

who had made incursions into Karakhanid dominions. Khayyam entered the service of Malik-Shah in 1074–5 when he was invited by the

Grand Vizier Grand vizier ( fa, وزيرِ اعظم, vazîr-i aʾzam; ota, صدر اعظم, sadr-ı aʾzam; tr, sadrazam) was the title of the effective head of government of many sovereign states in the Islamic world. The office of Grand Vizier was first ...

Nizam al-Mulk Abu Ali Hasan ibn Ali Tusi (April 10, 1018 – October 14, 1092), better known by his honorific title of Nizam al-Mulk ( fa, , , Order of the Realm) was a Persian scholar, jurist, political philosopher and Vizier of the Seljuk Empire. Rising fr ...

to meet Malik-Shah in the city of Marv. Khayyam was subsequently commissioned to set up an observatory in

Isfahan Isfahan ( fa, اصفهان, Esfahân ), from its ancient designation ''Aspadana'' and, later, ''Spahan'' in middle Persian, rendered in English as ''Ispahan'', is a major city in the Greater Isfahan Region, Isfahan Province, Iran. It is lo ...

and lead a group of scientists in carrying out precise astronomical observations aimed at the revision of the Persian calendar. The undertaking began probably in 1076 and ended in 1079 when Omar Khayyam and his colleagues concluded their measurements of the length of the year, reporting it as 365.24219858156 days. Given that the length of the year is changing in the sixth decimal place over a person's lifetime, this 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. After the death of Malik-Shah and his vizier (murdered, it is thought, by the

Ismaili Isma'ilism ( ar, الإسماعيلية, al-ʾIsmāʿīlīyah) is a branch or sub-sect of Shia Islam. The Isma'ili () get their name from their acceptance of Imam Isma'il ibn Jafar as the appointed spiritual successor ( imām) to Ja'far al ...

order of Assassins The Order of Assassins or simply the Assassins ( fa, حَشّاشین, Ḥaššāšīn, ) were a Nizārī Ismāʿīlī order and sect of Shīʿa Islam that existed between 1090 and 1275 CE. During that time, they lived in the mountains of P ...

), Omar fell from favor at court, and as a result, he soon set out on his

pilgrimage to Mecca The Hajj (; ar, حَجّ '; sometimes also spelled Hadj, Hadji or Haj in English) is an annual Islamic pilgrimage to Mecca, Saudi Arabia, the holiest city for Muslims. Hajj is a mandatory religious duty for Muslims that must be carried o ...

. A possible ulterior motive for his pilgrimage reported by Al-Qifti, was a public demonstration of his faith with a view to allaying suspicions of skepticism and confuting the allegations of unorthodoxy (including possible sympathy or adherence to Zoroastrianism) levelled at him by a hostile clergy. He was then invited by the new

Sultan Sanjar Senjer ( fa, ; full name: ''Muizz ad-Dunya wa ad-Din Adud ad-Dawlah Abul-Harith Ahmad Sanjar ibn Malik-Shah'') (''b''. 1085 – ''d''. 8 May 1157) was the Seljuq ruler of Khorasan from 1097 until in 1118,astrologer Astrology is a range of divinatory practices, recognized as pseudoscientific since the 18th century, that claim to discern information about human affairs and terrestrial events by studying the apparent positions of celestial objects. Di ...

. He was later allowed to return to Nishapur owing to his declining health. Upon his return, he seems to have lived the life of a recluse.Great Muslim Mathematicians. Penerbit UTM (July 2000): Mohini Mohamed Omar Khayyam died at the age of 83 in his hometown of Nishapur on 4 December 1131, and he is buried in what is now the

Mausoleum of Omar Khayyam A mausoleum is an external free-standing building constructed as a monument enclosing the interment space or burial chamber of a deceased person or people. A mausoleum without the person's remains is called a cenotaph. A mausoleum may be consi ...

. One of his disciples

Nizami Aruzi Ahmad ibn Umar ibn Alī, known as Nizamī-i Arūzī-i Samarqandī ( fa, نظامی عروضی) and also Arudi ("The Prosodist"), was a Persian poet and prose writer who flourished between 1110 and 1161. He is particularly famous for his ''Chahar M ...

relates the story that sometime during 1112–3 Khayyam was in

Balkh ), named for its green-tiled ''Gonbad'' ( prs, گُنبَد, dome), in July 2001 , pushpin_map=Afghanistan#Bactria#West Asia , pushpin_relief=yes , pushpin_label_position=bottom , pushpin_mapsize=300 , pushpin_map_caption=Location in Afghanistan ...

in the company of

Al-Isfizari Abū Ḥātim al-Muẓaffar al-Isfazārī ( fl. late 11th or early 12th century) was an Islamic mathematician, astronomer and engineer from Khurasan. According to the historian and geographer Ibn al-Athir and the polymath Qutb al-Din al-Sh ...

(one of the scientists who had collaborated with him on the Jalali calendar) when he made a prophecy that "my tomb shall be in a spot where the north wind may scatter roses over it". Four years after his death, Aruzi located his tomb in a cemetery in a then large and well-known quarter of Nishapur on the road to Marv. As it had been foreseen by Khayyam, Aruzi found the tomb situated at the foot of a garden-wall over which pear trees and peach trees had thrust their heads and dropped their flowers so that his tombstone was hidden beneath them.

Mathematics

Khayyam was famous during his life as a

mathematician A mathematician is someone who uses an extensive knowledge of mathematics in their work, typically to solve mathematical problems. Mathematicians are concerned with numbers, data, quantity, structure, space, models, and change. History On ...

. His surviving mathematical works include: ''A commentary on the difficulties concerning the postulates of Euclid's Elements'' (, completed in December 1077), ''On the division of a quadrant of a circle'' (, undated but completed prior to the treatise on algebra), and ''On proofs for problems concerning Algebra'' (, most likely completed in 1079). He furthermore wrote a treatise on the binomial theorem and extracting the n^th root of natural numbers, which has been lost.

Theory of parallels

A part of Khayyam's commentary on Euclid's Elements deals with the

. The treatise of Khayyam can be considered the first treatment of the axiom not based on

petitio principii In classical rhetoric and logic, begging the question or assuming the conclusion (Latin: ') is an informal fallacy that occurs when an argument's premises assume the truth of the conclusion, instead of supporting it. For example: * "Green is t ...

, but on a more intuitive postulate. Khayyam refutes the previous attempts by other mathematicians to ''prove'' the proposition, mainly on grounds that each of them had postulated something that was by no means easier to admit than the Fifth Postulate itself. Drawing upon

Aristotle Aristotle (; grc-gre, Ἀριστοτέλης ''Aristotélēs'', ; 384–322 BC) was a Greek philosopher and polymath during the Classical period in Ancient Greece. Taught by Plato, he was the founder of the Peripatetic school of ...

's views, he rejects the usage of movement in geometry and therefore dismisses the different attempt by

Al-Haytham Ḥasan Ibn al-Haytham, Latinized as Alhazen (; full name ; ), was a medieval mathematician, astronomer, and physicist of the Islamic Golden Age from present-day Iraq.For the description of his main fields, see e.g. ("He is one of the prin ...

.. Excerpt: ''In some sense, his treatment was better than ibn al-Haytham's because he explicitly formulated a new postulate to replace Euclid's rather than have the latter hidden in a new definition.'' Unsatisfied with the failure of mathematicians to prove Euclid's statement from his other postulates, Omar tried to connect the axiom with the Fourth Postulate, which states that all right angles are equal to one another. Khayyam was the first to consider the three distinct cases of acute, obtuse, and right angle for the summit angles of a Khayyam-Saccheri quadrilateral. After proving a number of theorems about them, he showed that Postulate V follows from the right angle hypothesis, and refuted the obtuse and acute cases as self-contradictory. His elaborate attempt to prove the parallel postulate was significant for the further development of geometry, as it clearly shows the possibility of non-Euclidean geometries. The hypotheses of acute, obtuse, and right angles are now known to lead respectively to the non-Euclidean

hyperbolic geometry In mathematics, hyperbolic geometry (also called Lobachevskian geometry or Bolyai–Lobachevskian geometry) is a non-Euclidean geometry. The parallel postulate of Euclidean geometry is replaced with: :For any given line ''R'' and point ''P ...

of Gauss-Bolyai-Lobachevsky, to that of Riemannian geometry, and to

Euclidean geometry Euclidean geometry is a mathematical system attributed to ancient Greek mathematician Euclid, which he described in his textbook on geometry: the '' Elements''. Euclid's approach consists in assuming a small set of intuitively appealing axioms ...

Tusi ''Tusi'', often translated as "headmen" or "chieftains", were hereditary tribal leaders recognized as imperial officials by the Yuan, Ming, and Qing dynasties of China, and the Later Lê and Nguyễn dynasties of Vietnam. They ruled certain e ...

's commentaries on Khayyam's treatment of parallels made its way to Europe.

John Wallis John Wallis (; la, Wallisius; ) was an English clergyman and mathematician who is given partial credit for the development of infinitesimal calculus. Between 1643 and 1689 he served as chief cryptographer for Parliament and, later, the royal ...

, professor of geometry at Oxford, translated Tusi's commentary into Latin. Jesuit geometer

Girolamo Saccheri Giovanni Girolamo Saccheri (; 5 September 1667 – 25 October 1733) was an Italian Jesuit priest, scholastic philosopher, and mathematician. Saccheri was born in Sanremo. He entered the Jesuit order in 1685 and was ordained as a priest in 169 ...

, whose work (''euclides ab omni naevo vindicatus'', 1733) is generally considered the first step in the eventual development of non-Euclidean geometry, was familiar with the work of Wallis. The American historian of mathematics David Eugene Smith mentions that Saccheri "used the same lemma as the one of Tusi, even lettering the figure in precisely the same way and using the lemma for the same purpose". He further says that "Tusi distinctly states that it is due to Omar Khayyam, and from the text, it seems clear that the latter was his inspirer."

The real number concept

This treatise on Euclid contains another contribution dealing with the theory of proportions and with the compounding of ratios. Khayyam discusses the relationship between the concept of ratio and the concept of number and explicitly raises various theoretical difficulties. In particular, he contributes to the theoretical study of the concept of irrational number. Displeased with Euclid's definition of equal ratios, he redefined the concept of a number by the use of a continuous fraction as the means of expressing a ratio. Rosenfeld and Youschkevitch (1973) argue that "by placing irrational quantities and numbers on the same operational scale, hayyambegan a true revolution in the doctrine of number." Likewise, it was noted by D. J. Struik that Omar was "on the road to that extension of the number concept which leads to the notion of the

real number In mathematics, a real number is a number that can be used to measure a ''continuous'' one-dimensional quantity such as a distance, duration or temperature. Here, ''continuous'' means that values can have arbitrarily small variations. Every ...

Geometric algebra

Omar Khayyám's solution of third degree equations

Rashed and Vahabzadeh (2000) have argued that because of his thoroughgoing geometrical approach to algebraic equations, Khayyam can be considered the precursor of Descartes in the invention of

analytic geometry In classical mathematics, analytic geometry, also known as coordinate geometry or Cartesian geometry, is the study of geometry using a coordinate system. This contrasts with synthetic geometry. Analytic geometry is used in physics and enginee ...

.Cooper, G. (2003). ''Journal of the American Oriental Society'', 123(1), 248–249. In ''The Treatise on the Division of a Quadrant of a Circle'' Khayyam applied algebra to geometry. In this work, he devoted himself mainly to investigating whether it is possible to divide a circular quadrant into two parts such that the line segments projected from the dividing point to the perpendicular diameters of the circle form a specific ratio. His solution, in turn, employed several curve constructions that led to equations containing cubic and quadratic terms.

The solution of cubic equations

Khayyam seems to have been the first to conceive a general theory of cubic equations and the first to geometrically solve every type of cubic equation, so far as positive roots are concerned. The treatise on algebra contains his work on cubic equations. It is divided into three parts: (i) equations which can be solved with compass and straight edge, (ii) equations which can be solved by means of

conic section In mathematics, a conic section, quadratic curve or conic is a curve obtained as the intersection of the surface of a cone with a plane. The three types of conic section are the hyperbola, the parabola, and the ellipse; the circle is a ...

s, and (iii) equations which involve the

inverse Inverse or invert may refer to: Science and mathematics * Inverse (logic), a type of conditional sentence which is an immediate inference made from another conditional sentence * Additive inverse (negation), the inverse of a number that, when a ...

of the unknown. Khayyam produced an exhaustive list of all possible equations involving lines, squares, and cubes. He considered three binomial equations, nine trinomial equations, and seven tetranomial equations. For the first and second degree polynomials, he provided numerical solutions by geometric construction. He concluded that there are fourteen different types of cubics that cannot be reduced to an equation of a lesser degree. For these he could not accomplish the construction of his unknown segment with compass and straight edge. He proceeded to present geometric solutions to all types of cubic equations using the properties of conic sections.Deborah A. Kent, & David J. Muraki (2016). "A Geometric Solution of a Cubic by Omar Khayyam … in Which Colored Diagrams Are Used Instead of Letters for the Greater Ease of Learners". ''The American Mathematical Monthly'', 123(2), 149–160. The prerequisite lemmas for Khayyam's geometrical proof include Euclid VI, Prop 13, and Apollonius II, Prop 12. The positive root of a cubic equation was determined as the abscissa of a point of intersection of two conics, for instance, the intersection of two

parabola In mathematics, a parabola is a plane curve which is mirror-symmetrical and is approximately U-shaped. It fits several superficially different mathematical descriptions, which can all be proved to define exactly the same curves. One descri ...

s, or the intersection of a parabola and a circle, etc.Kennedy, E. (1958). "Omar Khayyam". ''The Mathematics Teacher'', Vol. 59, No. 2 (1966), pp. 140–142. However, he acknowledged that the arithmetic problem of these cubics was still unsolved, adding that "possibly someone else will come to know it after us". This task remained open until the sixteenth century, where algebraic solution of the cubic equation was found in its generality by Cardano, Del Ferro, and

Tartaglia Tartaglia may refer to: *Tartaglia (commedia dell'arte), Commedia dell'arte stock character *Angelo Tartaglia (1350 or 1370–1421), Italian condottiero * Niccolò Fontana Tartaglia (1499/1500–1557), Venetian mathematician and engineer *Ivo Tarta ...

in Renaissance Italy. In effect, Khayyam's work is an effort to unify algebra and geometry.The Mathematics Teacher, 25(4), 238–241. (1932). This particular geometric solution of cubic equations has been further investigated by M. Hachtroudi and extended to solving fourth-degree equations. Although similar methods had appeared sporadically since

Menaechmus :''There is also a Menaechmus in Plautus' play, ''The Menaechmi''.'' Menaechmus ( el, Μέναιχμος, 380–320 BC) was an ancient Greek mathematician, geometer and philosopher born in Alopeconnesus or Prokonnesos in the Thracian Chersones ...

, and further developed by the 10th-century mathematician Abu al-Jud, Khayyam's work can be considered the first systematic study and the first exact method of solving cubic equations. Mathematical Masterpieces: Further Chronicles by the Explorers, p. 92 The mathematician Woepcke (1851) who offered translations of Khayyam's algebra into French praised him for his "power of generalization and his rigorously systematic procedure."E. H. Whinfield, ''The Quatrains of Omar Khayyam'', Psychology Press (2000)

Binomial theorem and extraction of roots

In his algebraic treatise, Khayyam alludes to a book he had written on the extraction of the

n

th root of the numbers using a law he had discovered which did not depend on geometric figures. This book was most likely titled ''The difficulties of arithmetic'' (), and is not extant. Based on the context, some historians of mathematics such as D. J. Struik, believe that Omar must have known the formula for the expansion of the binomial

(a+b)^n

, where is a positive integer. The case of power 2 is explicitly stated in Euclid's elements and the case of at most power 3 had been established by Indian mathematicians. Khayyam was the

who noticed the importance of a general binomial theorem. The argument supporting the claim that Khayyam had a general binomial theorem is based on his ability to extract roots. One of Khayyam's predecessors, Al-Karaji, had already discovered the triangular arrangement of the coefficients of binomial expansions that Europeans later came to know as Pascal's triangle; Khayyam popularized this triangular array in Iran, so that it is now known as Omar Khayyam's triangle.

Astronomy

In 1074–5, Omar Khayyam was commissioned by Sultan Malik-Shah to build an observatory at Isfahan and reform the

. There was a panel of eight scholars working under the direction of Khayyam to make large-scale astronomical observations and revise the astronomical tables. Recalibrating the calendar fixed the first day of the year at the exact moment of the passing of the Sun's center across vernal equinox. This marks the beginning of spring or Nowrūz, a day in which the Sun enters the first degree of Aries before noon. The resultant calendar was named in Malik-Shah's honor as the Jalālī calendar, and was inaugurated on 15 March 1079. The

observatory An observatory is a location used for observing terrestrial, marine, or celestial events. Astronomy, climatology/meteorology, geophysical, oceanography and volcanology are examples of disciplines for which observatories have been constructed. ...

itself was disused after the death of Malik-Shah in 1092. The Jalālī calendar was a true

where the duration of each month is equal to the time of the passage of the Sun across the corresponding sign of the

Zodiac The zodiac is a belt-shaped region of the sky that extends approximately 8° north or south (as measured in celestial latitude) of the ecliptic, the apparent path of the Sun across the celestial sphere over the course of the year. The pa ...

. The calendar reform introduced a unique 33-year intercalation cycle. As indicated by the works of Khazini, Khayyam's group implemented an intercalation system based on quadrennial and quinquennial

leap years A leap year (also known as an intercalary year or bissextile year) is a calendar year that contains an additional day (or, in the case of a lunisolar calendar, a month) added to keep the calendar year synchronized with the astronomical year or ...

. Therefore, the calendar consisted of 25 ordinary years that included 365 days, and 8 leap years that included 366 days. The calendar remained in use across

Greater Iran Greater Iran ( fa, ایران بزرگ, translit=Irān-e Bozorg) refers to a region covering parts of Western Asia, Central Asia, South Asia, Xinjiang, and the Caucasus, where both Iranian culture and Iranian languages have had a s ...

from the 11th to the 20th centuries. In 1911 the Jalali calendar became the official national calendar of

Qajar Iran Qajar Iran (), also referred to as Qajar Persia, the Qajar Empire, '. Sublime State of Persia, officially the Sublime State of Iran ( fa, دولت علیّه ایران ') and also known then as the Guarded Domains of Iran ( fa, ممالک م ...

. In 1925 this calendar was simplified and the names of the months were modernized, resulting in the modern Iranian calendar. The Jalali calendar is more accurate than the

Gregorian calendar The Gregorian calendar is the calendar used in most parts of the world. It was introduced in October 1582 by Pope Gregory XIII as a modification of, and replacement for, the Julian calendar. The principal change was to space leap years d ...

of 1582, with an error of one day accumulating over 5,000 years, compared to one day every 3,330 years in the Gregorian calendar. Moritz Cantor considered it the most perfect calendar ever devised. One of his pupils Nizami Aruzi of Samarcand relates that Khayyam apparently did not have a belief in astrology and divination: "I did not observe that he (''scil.'' Omar Khayyam) had any great belief in astrological predictions, nor have I seen or heard of any of the great cientistswho had such belief." While working for Sultan Sanjar as an astrologer he was asked to predict the weather – a job that he apparently did not do well. George Saliba (2002) explains that the term , used in various sources in which references to Omar's life and work could be found, has sometimes been incorrectly translated to mean astrology. He adds: "from at least the middle of the tenth century, according to Farabi's enumeration of the sciences, that this science, , was already split into two parts, one dealing with astrology and the other with theoretical mathematical astronomy."

Other works

He has a short treatise devoted to Archimedes' principle (in full title, ''On the Deception of Knowing the Two Quantities of Gold and Silver in a Compound Made of the Two''). For a compound of gold adulterated with silver, he describes a method to measure more exactly the weight per capacity of each element. It involves weighing the compound both in air and in water, since weights are easier to measure exactly than volumes. By repeating the same with both gold and silver one finds exactly how much heavier than water gold, silver and the compound were. This treatise was extensively examined by

Eilhard Wiedemann Eilhard Ernst Gustav Wiedemann (1 August 1852, in Berlin – 7 January 1928, in Erlangen) was a German physicist and historian of science. He was the son of physicist Gustav Heinrich Wiedemann (1826–1899), and an older brother to Egyptologist Al ...

who believed that Khayyam's solution was more accurate and sophisticated than that of Khazini and Al-Nayrizi who also dealt with the subject elsewhere. Another short treatise is concerned with

music theory Music theory is the study of the practices and possibilities of music. ''The Oxford Companion to Music'' describes three interrelated uses of the term "music theory". The first is the " rudiments", that are needed to understand music notation (k ...

in which he discusses the connection between music and arithmetic. Khayyam's contribution was in providing a systematic classification of musical scales, and discussing the mathematical relationship among notes, minor, major and

tetrachords In music theory, a tetrachord ( el, τετράχορδoν; lat, tetrachordum) is a series of four notes separated by three intervals. In traditional music theory, a tetrachord always spanned the interval of a perfect fourth, a 4:3 frequency propo ...

Poetry

Chayyam guyand kasan behescht ba hur chosch ast2

The earliest allusion to Omar Khayyam's poetry is from the historian

Imad ad-Din al-Isfahani Muhammad ibn Hamed Isfahani (1125 – 20 June 1201) ( fa, محمد ابن حامد اصفهانی), more popularly known as Imad ad-din al-Isfahani ( fa, عماد الدین اصفهانی) ( ar, عماد الدين الأصفهاني), was ...

, a younger contemporary of Khayyam, who explicitly identifies him as both a poet and a scientist (, 1174).Ali Dashti (translated by L. P. Elwell-Sutton), ''In Search of Omar Khayyam'', Routledge Library Editions: Iran (2012) One of the earliest specimens of Omar Khayyam's Rubiyat is from Fakhr al-Din Razi. In his work (ca. 1160), he quotes one of his poems (corresponding to quatrain LXII of FitzGerald's first edition). Daya in his writings (, ca. 1230) quotes two quatrains, one of which is the same as the one already reported by Razi. An additional quatrain is quoted by the historian Juvayni (, ca. 1226–1283). In 1340 Jajarmi includes thirteen quatrains of Khayyam in his work containing an anthology of the works of famous Persian poets (), two of which have hitherto been known from the older sources.Edward Denison Ross, ''Omar Khayyam'', Bulletin of the School Of Oriental Studies London Institution (1927) A comparatively late manuscript is the Bodleian MS. Ouseley 140, written in

Shiraz Shiraz (; fa, شیراز, Širâz ) is the fifth-most-populous city of Iran and the capital of Fars Province, which has been historically known as Pars () and Persis. As of the 2016 national census, the population of the city was 1,565,572 p ...

in 1460, which contains 158 quatrains on 47 folia. The manuscript belonged to William Ouseley (1767–1842) and was purchased by the Bodleian Library in 1844. Inscript in Morića Han

There are occasional quotes of verses attributed to Omar in texts attributed to authors of the 13th and 14th centuries, but these are of doubtful authenticity, so that skeptical scholars point out that the entire tradition may be

pseudepigraphic Pseudepigrapha (also anglicized as "pseudepigraph" or "pseudepigraphs") are falsely attributed works, texts whose claimed author is not the true author, or a work whose real author attributed it to a figure of the past.Bauckham, Richard; "Pseu ...

. Hans Heinrich Schaeder in 1934 commented that the name of Omar Khayyam "is to be struck out from the history of Persian literature" due to the lack of any material that could confidently be attributed to him. De Blois (2004) presents a bibliography of the manuscript tradition, concluding pessimistically that the situation has not changed significantly since Schaeder's time. Five of the quatrains later attributed to Omar are found as early as 30 years after his death, quoted in '' Sindbad-Nameh''. While this establishes that these specific verses were in circulation in Omar's time or shortly later, it doesn't imply that the verses must be his. De Blois concludes that at the least the process of attributing poetry to Omar Khayyam appears to have begun already in the 13th century. Edward Granville Browne (1906) notes the difficulty of disentangling authentic from spurious quatrains: "while it is certain that Khayyam wrote many quatrains, it is hardly possible, save in a few exceptional cases, to assert positively that he wrote any of those ascribed to him". In addition to the Persian quatrains, there are twenty-five Arabic poems attributed to Khayyam which are attested by historians such as al-Isfahani,

Shahrazuri Shams al-Din Muhammad ibn Mahmud Shahrazuri was a 13th-century Muslim physician, historian and philosopher. He was of Kurdish origin. It appears that he was alive in AD 1288. However, it is also said that he died in the same year. Shahrazuri was ...

(, ca. 1201–1211), Qifti (, 1255), and

Hamdallah Mustawfi Hamdallah Mustawfi Qazvini ( fa, حمدالله مستوفى قزوینی, Ḥamdallāh Mustawfī Qazvīnī; 1281 – after 1339/40) was a Persian official, historian, geographer and poet. He lived during the last era of the Mongol Ilkhanate, a ...

(, 1339).

Boyle Boyle is an English, Irish and Scottish surname of Gaelic, Anglo-Saxon or Norman origin. In the northwest of Ireland it is one of the most common family names. Notable people with the surname include: Disambiguation * Adam Boyle (disambiguation) ...

and Frye (1975) emphasize that there are a number of other

Persian scholar The following is a non-comprehensive list of Iranian scientists, engineers, and scholars who lived from antiquity up until the beginning of the modern age. For the modern era, see List of contemporary Iranian scientists, scholars, and engineers ...

s who occasionally wrote quatrains, including Avicenna, Ghazzali, and Tusi. He concludes that it is also possible that for Khayyam poetry was an amusement of his leisure hours: "these brief poems seem often to have been the work of scholars and scientists who composed them, perhaps, in moments of relaxation to edify or amuse the inner circle of their disciples". The poetry attributed to Omar Khayyam has contributed greatly to his popular fame in the modern period as a direct result of the extreme popularity of the translation of such verses into English by Edward FitzGerald (1859). FitzGerald's '' Rubaiyat of Omar Khayyam'' contains loose translations of quatrains from the Bodleian manuscript. It enjoyed such success in the fin de siècle period that a bibliography compiled in 1929 listed more than 300 separate editions, and many more have been published since.

Philosophy

Khayyam considered himself intellectually to be a student of

Avicenna Ibn Sina ( fa, ابن سینا; 980 – June 1037 CE), commonly known in the West as Avicenna (), was a Persian polymath who is regarded as one of the most significant physicians, astronomers, philosophers, and writers of the Islamic ...

.Nasr, S. H., & Aminrazavi, M. (2007). ''Anthology of philosophy in Persia: from Zoroaster to Omar Khayyam''. According to Al-Bayhaqi, he was reading the metaphysics in Avicenna's '' the Book of Healing'' before he died. There are six philosophical papers believed to have been written by Khayyam. One of them, ''On existence'' (), was written originally in Persian and deals with the subject of existence and its relationship to universals. Another paper, titled ''The necessity of contradiction in the world, determinism and subsistence'' (), is written in Arabic and deals with

free will Free will is the capacity of agents to choose between different possible courses of action unimpeded. Free will is closely linked to the concepts of moral responsibility, praise, culpability, sin, and other judgements which apply only to ac ...

and

determinism Determinism is a philosophical view, where all events are determined completely by previously existing causes. Deterministic theories throughout the history of philosophy have developed from diverse and sometimes overlapping motives and cons ...

. The titles of his other works are ''On being and necessity'' (), ''The Treatise on Transcendence in Existence'' (), ''On the knowledge of the universal principles of existence'' (), and ''Abridgement concerning natural phenomena'' ().

Religious views

A literal reading of Khayyam's quatrains leads to the interpretation of his philosophic attitude toward life as a combination of pessimism,

nihilism Nihilism (; ) is a philosophy, or family of views within philosophy, that rejects generally accepted or fundamental aspects of human existence, such as objective truth, knowledge, morality, values, or meaning. The term was popularized by I ...

Epicureanism Epicureanism is a system of philosophy founded around 307 BC based upon the teachings of the ancient Greek philosopher Epicurus. Epicureanism was originally a challenge to Platonism. Later its main opponent became Stoicism. Few writings by ...

fatalism Fatalism is a family of related philosophical doctrines that stress the subjugation of all events or actions to fate or destiny, and is commonly associated with the consequent attitude of resignation in the face of future events which are t ...

, and

agnosticism Agnosticism is the view or belief that the existence of God, of the divine or the supernatural is unknown or unknowable. (page 56 in 1967 edition) Another definition provided is the view that "human reason is incapable of providing sufficien ...

. This view is taken by

Iranologists Iranian studies ( fa, ايران‌شناسی '), also referred to as Iranology and Iranistics, is an interdisciplinary field dealing with the research and study of the civilization, history, literature, art and culture of Iranian peoples. It ...

such as Arthur Christensen, H. Schaeder, Richard N. Frye, E. D. Ross,Ross, E. (1898). Al-Musaffariyé: Containing a Recent Contribution to the Study of 'Omar Khayyām. Journal of the Royal Asiatic Society of Great Britain and Ireland, 349–366.

E. H. Whinfield Edward Henry Whinfield (1836–1922) was a translator of Persian literature. He wrote the first well-commented English translations of Hafez and Rumi, as well as a side-by-side translation of 500 quatrains of the Rubáiyát of Omar Khayyám ...

and

George Sarton George Alfred Leon Sarton (; 31 August 1884 – 22 March 1956) was a Belgian-born American chemist and historian. He is considered the founder of the discipline of the history of science as an independent field of study. His most influential work ...

. Conversely, the Khayyamic quatrains have also been described as mystical

Sufi Sufism ( ar, ''aṣ-ṣūfiyya''), also known as Tasawwuf ( ''at-taṣawwuf''), is a mystic body of religious practice, found mainly within Sunni Islam but also within Shia Islam, which is characterized by a focus on Islamic spirituality, r ...

poetry. In addition to his Persian quatrains, J. C. E. Bowen (1973) mentions that Khayyam's Arabic poems also "express a pessimistic viewpoint which is entirely consonant with the outlook of the deeply thoughtful rationalist philosopher that Khayyam is known historically to have been."J. C. E. Bowen. (1973). The Rubāՙiyyāt of Omar Khayyam: A Critical Assessment of Robert Graves' and Omar Ali Shah's Translation. Iran, 11, 63–73. Edward FitzGerald emphasized the religious skepticism he found in Khayyam. In his preface to the ''Rubáiyát'' he claimed that he "was hated and dreaded by the Sufis", and denied any pretense at divine allegory: "his Wine is the veritable Juice of the Grape: his Tavern, where it was to be had: his ''Saki'', the Flesh and Blood that poured it out for him."

Sadegh Hedayat Sadegh Hedayat ( fa, صادق هدایت ; 17 February 1903 – 9 April 1951) was an Iranian writer and translator. Best known for his novel ''The Blind Owl'', he was one of the earliest Iranian writers to adopt literary modernism in their caree ...

is one of the most notable proponents of Khayyam's philosophy as agnostic skepticism, and according to Jan Rypka (1934), he even considered Khayyam an

atheist Atheism, in the broadest sense, is an absence of belief in the existence of deities. Less broadly, atheism is a rejection of the belief that any deities exist. In an even narrower sense, atheism is specifically the position that there no ...

. Hedayat (1923) states that "while Khayyam believes in the transmutation and transformation of the human body, he does not believe in a separate soul; if we are lucky, our bodily particles would be used in the making of a jug of wine." Omar Khayyam's poetry has been cited in the context of New Atheism, such as in ''

The Portable Atheist ''The Portable Atheist: Essential Readings for the Nonbeliever'' (2007) is an anthology of atheist and agnostic thought edited by Christopher Hitchens. Going back to the early Greeks, Hitchens introduces selected essays of past and present philo ...

'' by Christopher Hitchens. Al-Qifti (ca. 1172–1248) appears to confirm this view of Omar's philosophy. In his work ''The History of Learned Men'' he reports that Omar's poems were only outwardly in the Sufi style, but were written with an anti-religious agenda. He also mentions that he was at one point indicted for impiety, but went on a pilgrimage to prove he was pious. The report has it that upon returning to his native city he concealed his deepest convictions and practised a strictly religious life, going morning and evening to the place of worship. In the context of a piece entitled ''On the Knowledge of the Principles of Existence'', Khayyam endorses the Sufi path. Csillik (1960) suggests the possibility that Omar Khayyam could see in Sufism an ally against orthodox religiosity.Csillik, B. (1960). "The Real 'Omar Khayyām'". Acta Orientalia Academiae Scientiarum Hungaricae, 10(1), 59–77. Retrieved from https://www.jstor.org/stable/23682646 Other commentators do not accept that Omar's poetry has an anti-religious agenda and interpret his references to wine and drunkenness in the conventional metaphorical sense common in Sufism. The French translator J. B. Nicolas held that Omar's constant exhortations to drink wine should not be taken literally, but should be regarded rather in the light of Sufi thought where rapturous intoxication by "wine" is to be understood as a metaphor for the enlightened state or divine rapture of '' baqaa''. The view of Omar Khayyam as a Sufi was defended by Bjerregaard (1915), Idries Shah (1999), and Dougan (1991) who attributes the reputation of hedonism to the failings of FitzGerald's translation, arguing that Omar's poetry is to be understood as "deeply esoteric". On the other hand, Iranian experts such as Mohammad Ali Foroughi and

Mojtaba Minovi Mojtaba Minovi ( fa, مجتبی مینوی; February 1903 Tehran – January 1977, Tehran), was an Iranian historian, literary scholar and professor of Tehran University. He was a participant in the Ferdowsi Millenary celebrations in 1934 in Tehr ...

rejected the hypothesis that Omar Khayyam was a Sufi. Foroughi stated that Khayyam's ideas may have been consistent with that of Sufis at times but there is no evidence that he was formally a

. Aminrazavi (2007) states that "Sufi interpretation of Khayyam is possible only by reading into his ''Rubāʿīyyāt'' extensively and by stretching the content to fit the classical Sufi doctrine." Furthermore, Frye (1975) emphasizes that Khayyam was intensely disliked by a number of celebrated Sufi mystics who belonged to the same century. This includes Shams Tabrizi (spiritual guide of

Rumi Jalāl al-Dīn Muḥammad Rūmī ( fa, جلال‌الدین محمد رومی), also known as Jalāl al-Dīn Muḥammad Balkhī (), Mevlânâ/Mawlānā ( fa, مولانا, lit= our master) and Mevlevî/Mawlawī ( fa, مولوی, lit= my ma ...

), Najm al-Din Daya who described Omar Khayyam as "an unhappy philosopher, atheist, and materialist", and Attar who regarded him not as a fellow-mystic but a free-thinking scientist who awaited punishments hereafter.

Seyyed Hossein Nasr Seyyed Hossein Nasr (; fa, سید حسین نصر, born April 7, 1933) is an Iranian philosopher and University Professor of Islamic studies at George Washington University. Born in Tehran, Nasr completed his education in Iran and the Unite ...

argues that it is "reductive" to use a literal interpretation of his verses (many of which are of uncertain authenticity to begin with) to establish Omar Khayyam's philosophy. Instead, he adduces Khayyam's interpretive translation of

's treatise ''Discourse on Unity'' (), where he expresses orthodox views on Divine Unity in agreement with the author. S. H. Nasr, 2006, Islamic Philosophy from Its Origin to the Present, Chapter 9., pp. 165–183 The prose works believed to be Omar's are written in the

Peripatetic Peripatetic may refer to: *Peripatetic school The Peripatetic school was a school of philosophy in Ancient Greece. Its teachings derived from its founder, Aristotle (384–322 BC), and ''peripatetic'' is an adjective ascribed to his followers. ...

style and are explicitly theistic, dealing with subjects such as the existence of God and

theodicy Theodicy () means vindication of God. It is to answer the question of why a good God permits the manifestation of evil, thus resolving the issue of the problem of evil. Some theodicies also address the problem of evil "to make the existence o ...

. As noted by Bowen these works indicate his involvement in the problems of metaphysics rather than in the subtleties of Sufism. As evidence of Khayyam's faith and/or conformity to Islamic customs, Aminrazavi mentions that in his treatises he offers salutations and prayers, praising God and

Muhammad Muhammad ( ar, مُحَمَّد; 570 – 8 June 632 CE) was an Arab religious, social, and political leader and the founder of Islam. According to Islamic doctrine, he was a prophet divinely inspired to preach and confirm the mon ...

. In most biographical extracts, he is referred to with religious honorifics such as , ''The Patron of Faith'' (), and ''The Evidence of Truth'' (). He also notes that biographers who praise his religiosity generally avoid making reference to his poetry, while the ones who mention his poetry often do not praise his religious character. For instance, Al-Bayhaqi's account, which antedates by some years other biographical notices, speaks of Omar as a very pious man who professed orthodox views down to his last hour.Meyerhof, M. (1948). 'Alī al-Bayhaqī's Tatimmat Siwān al-Hikma: A Biographical Work on Learned Men of the Islam. Osiris, 8, 122–217. On the basis of all the existing textual and biographical evidence, the question remains somewhat open, and as a result Khayyam has received sharply conflicting appreciations and criticisms.

Reception

The various biographical extracts referring to Omar Khayyam describe him as unequalled in scientific knowledge and achievement during his time. Many called him by the epithet ''King of the Wise'' ( ar, ملك الحکماء).

(d. 1300) esteems him highly as a mathematician, and claims that he may be regarded as "the successor of Avicenna in the various branches of philosophic learning". Al-Qifti (d. 1248), even though disagreeing with his views, concedes he was "unrivalled in his knowledge of natural philosophy and astronomy". Despite being hailed as a poet by a number of biographers, according to Richard N. Frye "it is still possible to argue that Khayyam's status as a poet of the first rank is a comparatively late development." Thomas Hyde was the first European to call attention to Omar and to translate one of his quatrains into Latin (''Historia religionis veterum Persarum eorumque magorum'', 1700). Western interest in Persia grew with the

movement in the 19th century. Joseph von Hammer-Purgstall (1774–1856) translated some of Khayyam's poems into German in 1818, and Gore Ouseley (1770–1844) into English in 1846, but Khayyam remained relatively unknown in the West until after the publication of Edward FitzGerald's '' Rubaiyat of Omar Khayyam'' in 1859. FitzGerald's work at first was unsuccessful but was popularised by Whitley Stokes from 1861 onward, and the work came to be greatly admired by the

Pre-Raphaelites The Pre-Raphaelite Brotherhood (later known as the Pre-Raphaelites) was a group of English painters, poets, and art critics, founded in 1848 by William Holman Hunt, John Everett Millais, Dante Gabriel Rossetti, William Michael Rossetti, Jame ...

. In 1872 FitzGerald had a third edition printed which increased interest in the work in America. By the 1880s, the book was extremely well known throughout the English-speaking world, to the extent of the formation of numerous "Omar Khayyam Clubs" and a "fin de siècle cult of the Rubaiyat". Khayyam's poems have been translated into many languages; many of the more recent ones are more literal than that of FitzGerald.''The Great Umar Khayyam: A Global Reception of the Rubaiyat'' (AUP – Leiden University Press) by A. A. Seyed-Gohrab, 2012. FitzGerald's translation was a factor in rekindling interest in Khayyam as a poet even in his native Iran.Simidchieva, M. (2011). FitzGerald's Rubáiyát and Agnosticism. In A. Poole, C. Van Ruymbeke, & W. Martin (Eds.), FitzGerald's Rubáiyát of Omar Khayyám: Popularity and Neglect (pp. 55–72). Anthem Press.

in his ''Songs of Khayyam'' (''Taranehha-ye Khayyam'', 1934) reintroduced Omar's poetic legacy to modern Iran. Under the

Pahlavi dynasty The Pahlavi dynasty ( fa, دودمان پهلوی) was the last Iranian royal dynasty, ruling for almost 54 years between 1925 and 1979. The dynasty was founded by Reza Shah Pahlavi, a non-aristocratic Mazanderani soldier in modern times, who ...

, a new

monument A monument is a type of structure that was explicitly created to commemorate a person or event, or which has become relevant to a social group as a part of their remembrance of historic times or cultural heritage, due to its artistic, hist ...

of white marble, designed by the architect Houshang Seyhoun, was erected over his tomb. A statue by

Abolhassan Sadighi Abolhassan Sadighi ( fa, ابوالحسن صدیقی) (5 October 1894 – 11 December 1995) was an Iranian sculptor and painter and was known as Master Sadighi. He was a student of Ghaffari. The statue of Ferdowsi in the Ferdowsi square, the sta ...

was erected in

Laleh Park Laleh Park (Pârk-e Laleh, formerly called Park-e Farah after Farah Diba), is a large recreation area of the Iranian capital Tehran. ''Laleh'' (لاله) is the Persian word for tulip, which is also a popular symbol in Iranian culture. The park ...

Tehran Tehran (; fa, تهران ) is the largest city in Tehran Province and the capital of Iran. With a population of around 9 million in the city and around 16 million in the larger metropolitan area of Greater Tehran, Tehran is the most popul ...

in the 1960s, and a bust by the same sculptor was placed near Khayyam's mausoleum in Nishapur. In 2009, the state of Iran donated a pavilion to the United Nations Office in Vienna, inaugurated at Vienna International Center. In 2016, three statues of Khayyam were unveiled: one at the

University of Oklahoma , mottoeng = "For the benefit of the Citizen and the State" , type = Public research university , established = , academic_affiliations = , endowment = $2.7billion (2021) , pr ...

, one in Nishapur and one in Florence, Italy. Over 150

composer A composer is a person who writes music. The term is especially used to indicate composers of Western classical music, or those who are composers by occupation. Many composers are, or were, also skilled performers of music. Etymology and Def ...

s have used the ''Rubaiyat'' as their source of inspiration. The earliest such composer was Liza Lehmann. FitzGerald rendered Omar's name as "Tentmaker", and the anglicized name of "Omar the Tentmaker" resonated in English-speaking popular culture for a while. Thus,

Nathan Haskell Dole Nathan Haskell Dole (August 31, 1852 – May 9, 1935) was an American editor, translator, and author. A writer and journalist in Philadelphia, New York, and Boston, he translated many of the works of Leo Tolstoy and books of other Russians; nove ...

published a novel called ''Omar, the Tentmaker: A Romance of Old Persia'' in 1898. ''Omar the Tentmaker of Naishapur'' is a historical novel by John Smith Clarke, published in 1910. "Omar the Tentmaker" is also the title of a 1914 play by

Richard Walton Tully Richard Walton Tully (May 7, 1877 – February 1, 1945) was an American playwright. Biography Tully was born on May 7, 1877 in Nevada City, California. Tully was married to another playwright Eleanor Gates until he divorced her in 1914. His b ...

in an oriental setting, adapted as a

silent film A silent film is a film with no synchronized recorded sound (or more generally, no audible dialogue). Though silent films convey narrative and emotion visually, various plot elements (such as a setting or era) or key lines of dialogue may, w ...

in 1922. US General Omar Bradley was given the nickname "Omar the Tent-Maker" in World War II.

The Moving Finger quatrain

The quatrain by Omar Khayyam known as "The Moving Finger", in the form of its translation by the English poet Edward Fitzgerald is one of the most popular quatrains in the

Anglosphere The Anglosphere is a group of English-speaking nations that share historical and cultural ties with England, and which today maintain close political, diplomatic and military co-operation. While the nations included in different sources vary, t ...

. It reads: The title of the novel " The Moving Finger" written by

Agatha Christie Dame Agatha Mary Clarissa Christie, Lady Mallowan, (; 15 September 1890 – 12 January 1976) was an English writer known for her 66 detective novels and 14 short story collections, particularly those revolving around fiction ...

and published in 1942 was inspired by this quatrain of the translation of '' Rubaiyat of Omar Khayyam'' by Edward Fitzgerald.

Martin Luther King Martin Luther King Jr. (born Michael King Jr.; January 15, 1929 – April 4, 1968) was an American Baptist minister and activist, one of the most prominent leaders in the civil rights movement from 1955 until his assassination in 1968 ...

also cites this quatrain of Omar Khayyam in one of his speeches " Beyond Vietnam: A Time to Break Silence": In one of his apologetic speeches about the

Clinton–Lewinsky scandal The Clinton–Lewinsky scandal was a sex scandal involving Bill Clinton, the president of the United States, and Monica Lewinsky, a White House intern. Their sexual relationship lasted between 1995 and 1997. Clinton ended a televised speech in ...

Bill Clinton William Jefferson Clinton (né Blythe III; born August 19, 1946) is an American politician who served as the 42nd president of the United States from 1993 to 2001. He previously served as governor of Arkansas from 1979 to 1981 and again ...

, the 42nd president of the US, also cites this quatrain.

Other popular culture references

The French-Lebanese writer

Amin Maalouf Amin Maalouf (; ar, أمين معلوف; born 25 February 1949) is a Lebanese-born French"Amin ...

based the first half of his historical fiction novel ''

'' on Khayyam's life and the creation of his Rubaiyat. The sculptor

Eduardo Chillida Eduardo Chillida Juantegui, or Eduardo Txillida Juantegi in Basque (10 January 1924 – 19 August 2002), was a Spanish Basque sculptor notable for his monumental abstract works. Early life and career Born in San Sebastián (Donostia) to Ped ...

produced four massive iron pieces titled ''Mesa de Omar Khayyam'' (Omar Khayyam's Table) in the 1980s. The

lunar crater Lunar craters are impact craters on Earth's Moon. The Moon's surface has many craters, all of which were formed by impacts. The International Astronomical Union currently recognizes 9,137 craters, of which 1,675 have been dated. History The w ...

Omar Khayyam was named in his honour in 1970, as was the

minor planet According to the International Astronomical Union (IAU), a minor planet is an astronomical object in direct orbit around the Sun that is exclusively classified as neither a planet nor a comet. Before 2006, the IAU officially used the term ''minor ...

3095 Omarkhayyam discovered by

Soviet The Soviet Union,. officially the Union of Soviet Socialist Republics. (USSR),. was a List of former transcontinental countries#Since 1700, transcontinental country that spanned much of Eurasia from 1922 to 1991. A flagship communist state, ...

astronomer Lyudmila Zhuravlyova in 1980.

Google Google LLC () is an American Multinational corporation, multinational technology company focusing on Search Engine, search engine technology, online advertising, cloud computing, software, computer software, quantum computing, e-commerce, ar ...

has released two Google Doodles commemorating him. The first was on his 964th birthday on 18 May 2012. The second was on his 971st birthday on 18 May 2019.

Gallery

File:005-a-Ruby-kindles-in-the-vine-810x1146.jpg, "A Ruby kindles in the vine", illustration for FitzGerald's '' Rubaiyat of Omar Khayyam'' by

Adelaide Hanscom Leeson Adelaide Hanscom Leeson (25 November 1875 – 19 November 1931) was an early 20th-century artist and photographer who published some of the first books using photography to illustrate literary works. Life Early years Adelaide Marquand Hanscom ...

(c. 1905). File:At the Tomb of Omar Khayyam - by Jay Hambidge.jpg, "At the Tomb of Omar Khayyam" by Jay Hambidge (1911). File:Persian Scholar pavilion in Viena UN (Omar Khayyam).jpg, The statue of Khayyam in United Nations Office in Vienna as a part of Persian Scholars Pavilion donated by

Iran Iran, officially the Islamic Republic of Iran, and also called Persia, is a country located in Western Asia. It is bordered by Iraq and Turkey to the west, by Azerbaijan and Armenia to the northwest, by the Caspian Sea and Turkmeni ...

. File:Hakim Omar Khayam - panoramio.jpg, A statue of Omar Khayyam in

. Made by

. File:Bucureşti - Omar Khayam 3.jpg, Statue of Omar Khayyam in

Bucharest Bucharest ( , ; ro, București ) is the capital and largest city of Romania, as well as its cultural, industrial, and financial centre. It is located in the southeast of the country, on the banks of the Dâmbovița River, less than north o ...

File:آرامگاه خیام نیشابور Mausoleum of Omar Khayyam.jpg, alt=Mausoleum of Omar Khayyam in Neyshabur, Iran. Some of his rubáiyáts are used as calligraphic (taliq script) decoration on the exterior body of his mausoleum.,

. Some of his rubáiyáts are used as calligraphic (taliq script) decoration on the exterior body of his mausoleum. File:Madrid - Ciudad Universitaria, Monumento a Omar Jayyam 1.jpg, Monument to Omar Khayyam in Ciudad Universitaria of

Madrid Madrid ( , ) is the capital and most populous city of Spain. The city has almost 3.4 million inhabitants and a metropolitan area population of approximately 6.7 million. It is the second-largest city in the European Union (EU), and ...

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PDF version

Umar Khayyam
in the ''

Stanford Encyclopedia of Philosophy The ''Stanford Encyclopedia of Philosophy'' (''SEP'') combines an online encyclopedia of philosophy with peer-reviewed publication of original papers in philosophy, freely accessible to Internet users. It is maintained by Stanford University. E ...

''
The illustrated Rubáiyát of Omar Khayyám
at

Internet Archive The Internet Archive is an American digital library with the stated mission of "universal access to all knowledge". It provides free public access to collections of digitized materials, including websites, software applications/games, music, ...

. {{DEFAULTSORT:Khayyam, Omar 1048 births 1131 deaths 11th-century Iranian astronomers 11th-century Persian-language poets 12th-century astronomers 12th-century Persian-language writers 12th-century Iranian mathematicians 12th-century Persian-language poets Algebra Mathematicians from Nishapur 12th-century Iranian astronomers 11th-century Persian-language writers Iranian philosophers Persian physicists Persian spiritual writers Philosophers from Nishapur Scholars from the Seljuk Empire Poets from the Seljuk Empire