Birth date: 
Birth place: 
Date of death: 
Place of death: 
about 1380 
Kashan, Iran 
22 June 1429 
Samarkand, Transoxania (now Uzbek) 
Details of Jamshid alKashi's life and works are better known than many others from this period although details of his life are sketchy. One of the reasons we is that he dated many of his works with the exact date on which they were completed, another reason is that a number of letters which he wrote to his father have survived and give fascinating information. AlKashi was born in Kashan which lies in a desert at the eastern foot of the Central Iranian Range. At the time that alKashi was growing up Timur (often known as Tamburlaine) was conquering large regions. He had proclaimed himself sovereign and restorer of the Mongol empire at Samarkand in 1370 and, in 1383, Timur began his conquests in Persia with the capture of Herat. Timur died in 1405 and his empire was divided between his two sons, one of whom was Shah Rokh. While Timur was undertaking his military campaigns, conditions were very difficult with widespread poverty. alKashi lived in poverty, like so many others at this time, and devoted himself to astronomy and mathematics while moving from town to town. Conditions improved markedly when Shah Rokh took over after his father's death. He brought economic prosperity to the region and strongly supported artistic and intellectual life. With the changing atmosphere, alKashi's life also improved markedly. The first event in alKashi's life which we can date accurately is his observation of an eclipse of the moon which he made in Kashan on 2 June 1406. It is reasonable to assume that alKashi remained in Kashan where he worked on astronomical texts. He was certainly in his home town on 1 March 1407 when he completed Sullam Alsama the text of which has survived. The full title of the work means The Stairway of Heaven, on Resolution of Difficulties Met by Predecessors in the Determination of Distances and Sizes (of the heavenly bodies). At this time it was necessary for scientists to obtain patronage from their kings, princes or rulers. AlKashi played this card to his advantage and brought himself into favour in the new era where patronage of the arts and sciences became popular. His Compendium of the Science of Astronomy written during 141011 was dedicated to one of the descendants of the ruling Timurid dynasty. Samarkand, in Uzbekistan, is one of the oldest cities of Central Asia. The city became the capital of Timur's empire and Shah Rokh made his own son, Ulugh Beg , ruler of the city. Ulugh Beg , himself a great scientist, began to build the city into a great cultural centre. It was to Ulugh Beg that AlKashi dedicated his important book of astronomical tables Khaqani Zij which was based on the tables of Nasir alTusi . In the introduction alKashi says that without the support of Ulugh Beg he could not have been able to complete it. In this work there are trigonometric tables giving values of the sine function to four sexagesimal digits for each degree of argument with differences to be added for each minute. There are also tables which give transformations between different coordinate systems on the celestial sphere , in particular allowing ecliptic coordinates to be transformed into equatorial coordinates . See for a detailed discussion of this work. The Khaqani Zij also contains : ... detailed tables of the longitudinal motion of the sun, the moon, and the planets. AlKashi also gives the tables of the longitudinal and latitudinal parallaxes for certain geographical latitudes, tables of eclipses, and tables of the visibility of the moon.
AlKashi had certainly found the right patron in Ulugh Beg since he founded a university for the study of theology and science at Samarkand in about 1420 and he sought out the best scientists to help with his project. Ulugh Beg invited AlKashi to join him at this school of learning in Samarkand, as well as around sixty other scientists including Qadi Zada . There is little doubt that alKashi was the leading astronomer and mathematician at Samarkand and he was called the second Ptolemy by an historian writing later in the same century. Letters which alKashi wrote in Persian to his father, who lived in Kashan, have survived. These were written from Samarkand and give a wonderful description of the scientific life there. In 1424 Ulugh Beg began the construction of an observatory in Samarkand and, although the letters by alKashi are undated they were written at a time when construction of the observatory had begun. The contents of one of these letters has only recently been published, see . In the letters alKashi praises the mathematical abilities of Ulugh Beg but of the other scientists in Samarkand, only Qadi Zada earned his respect. Ulugh Beg led scientific meetings where problems in astronomy were freely discussed. Usually these problems were too difficult for all except alKashi and Qadi Zada and on a couple of occasions only alKashi succeeded. It is clear that alKashi was the best scientist and closest collaborator of Ulugh Beg at Samarkand and, despite alKashi's ignorance of the correct court behaviour and lack of polished manners, he was highly respected by Ulugh Beg . After AlKashi's death, Ulugh Beg described him as (see for example ): ... a remarkable scientist, one of the most famous in the world, who had a perfect command of the science of the ancients, who contributed to its development, and who could solve the most difficult problems.
Although alKashi had done some fine work before joining Ulugh Beg at Samarkand, his best work was done while in that city. He produced his Treatise on the Circumference in July 1424, a work in which he calculated 2π to nine sexagesimal places and translated this into sixteen decimal places. This was an achievement far beyond anything which had been obtained before, either by the ancient Greeks or by the Chinese (who achieved 6 decimal places in the 5^{th} century). It would be almost 200 years before van Ceulen surpassed AlKashi's accuracy with 20 decimal places. AlKashi's most impressive mathematical work was, however, The Key to Arithmetic which he completed on 2 March 1427. The work is a major text intended to be used in teaching students in Samarkand, in particular alKashi tries to give the necessary mathematics for those studying astronomy, surveying, architecture, accounting and trading. The authors of describe the work as follows: In the richness of its contents and in the application of arithmetical and algebraic methods to the solution of various problems, including several geometric ones, and in the clarity and elegance of exposition, this voluminous textbook is one of the best in the whole of medieval literature; it attests to both the author's erudition and his pedagogical ability.
DoldSamplonius has discussed several aspects of alKashi's Key to Arithmetic in , , and . (see also ). For example the measurement of the muqarnas refers to a type of decoration used to hide the edges and joints in buildings such as mosques and palaces. The decoration resembles a stalactite and consists of threedimensional polygons, some with plane surfaces, and some with curved surfaces. AlKashi uses decimal fractions in calculating the total surface area of types of muqarnas. The qubba is the dome of a funerary monument for a famous person. AlKashi finds good methods to approximate the surface area and the volume of the shell forming the dome of the qubba. We mentioned above alKashi's use of decimal fractions and it is through his use of these that he has attained considerable fame. The generally held view that Stevin had been the first to introduce decimal fractions was shown to be false in 1948 when P Luckey (see ) showed that in the Key to Arithmetic alKashi gives as clear a description of decimal fractions as Stevin does. However, to claim that alKashi is the inventor of decimal fractions, as was done by many mathematicians following the work of Luckey, would be far from the truth since the idea had been present in the work of several mathematicians of alKaraji 's school, in particular alSamawal . Rashed (see or ) puts alKashi's important contribution into perspective. He shows that the main advances brought in by alKashi are: (1) The analogy between both systems of fractions; the sexagesimal and the decimal systems. (2) The usage of decimal fractions no longer for approaching algebraic real numbers, but for real numbers such as π.
Rashed also writes (see or ): ... AlKashi can no longer be considered as the inventor of decimal fractions; it remains nonetheless, that in his exposition the mathematician, far from being a simple compiler, went one step beyond alSamawal and represents an important dimension in the history of decimal fractions.
There are other major results in the work of alKashi which were pointed out by Luckey. He found that alKashi had an algorithm for calculating nth roots which was a special case of the methods given many centuries later by Ruffini and Horner . In later work Rashed shows (see for example or ) that AlKashi was again describing methods which were present in the work of mathematicians of alKaraji 's school, in particular alSamawal . The last work by alKashi was The Treatise on the Chord and Sine which may have been unfinished at the time of his death and then completed by Qadi Zada . In this work alKashi computed sin 1 to the same accuracy as he had computed π in his earlier work. He also considered the equation associated with the problem of trisecting an angle , namely a cubic equation . He was not the first to look at approximate solutions to this equation since alBiruni had worked on it earlier. However, the iterative method proposed by alKashi was : ... one of the best achievements in medieval algebra. ... But all these discoveries of alKashi's were long unknown in Europe and were studied only in the nineteenth and twentieth centuries by ... historians of science....
Let us end with one final comment on the alKashi's work in astronomy. We mentioned earlier the astronomical tables Khaqani Zij produced by alKashi. It is worth noting that Ulugh Beg also produced astronomical tables and sine tables, and it is almost certain that these tables were based on alKashi's tables and almost certainly produced with alKashi's help.
Source:School of Mathematics and Statistics University of St Andrews, Scotland
