المرجع الالكتروني للمعلوماتية
المرجع الألكتروني للمعلوماتية

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Abu Arrayhan Muhammad ibn Ahmad al-Biruni  
  
4943   03:28 مساءاً   date: 16-10-2015
Author : I M Muminov (ed.)
Book or Source : al-Biruni and Ibn Sina : Correspondence
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Born: 15 September 973 in Kath, Khwarazm (now Kara-Kalpakskaya, Uzbekistan)
Died: 13 December 1048 in Ghazna (now Ghazni, Afganistan)

 

Abu Rayhan al-Biruni was born in Khwarazm, a region adjoining the Aral Sea now known as Karakalpakstan. The two major cities in this region were Kath and Jurjaniyya. Al-Biruni was born near Kath and the town were he was born is today called Biruni after the great scholar. He lived both in Kath and in Jurjaniyya as he grew up and we know that he began studies at a very early age under the famous astronomer and mathematician Abu Nasr Mansur. Certainly by the age of seventeen al-Biruni was engaged in serious scientific work for it was in 990 that he computed the latitude of Kath by observing the maximum altitude of the sun.

Other work which al-Biruni undertook as a young man was more theoretical. Before 995 (when he was 22 years old) he had written a number of short works. One which has survived is his Cartography which is a work on map projections. As well as describing his own projection of a hemisphere onto a plane, al-Biruni showed that by the age of 22 he was already extremely well read for he had studied a wide selection of map projections invented by others and he discusses them in the treatise. The comparatively quiet life that al-Biruni led up to this point was to come to a sudden end. It is interesting to speculate on how different his life, and contribution to scholarship, might have been but for the change in his life forced by the political events of 995.

The end of the 10th century and beginning of the 11th century was a period of great unrest in the Islamic world and there were civil wars in the region in which al-Biruni was living. Khwarazm was at this time part of the Samanid Empire which ruled from Bukhara. Other states in the region were the Ziyarid state with its capital at Gurgan on the Caspian sea. Further west, the Buwayhid dynasty ruled over the area between the Caspian sea and the Persian Gulf, and over Mesopotamia. Another kingdom which was rapidly rising in influence was the Ghaznavids whose capital was at Ghazna in Afghanistan, a kingdom which was to play a major role in al-Biruni's life.

The Banu Iraq were the rulers of the Khwarazm region and Abu Nasr Mansur, al-Biruni's teacher, was a prince of that family. In 995 the rule by the Banu Iraq was overthrown in a coup. Al-Biruni fled at the outbreak of the civil war but it is less clear what happened to his teacher Abu Nasr Mansur at this stage. Describing these events later al-Biruni wrote [1]:-

After I had barely settled down for a few years, I was permitted by the Lord of Time to go back home, but I was compelled to participate in worldly affairs, which excited the envy of fools, but which made the wise pity me.

Exactly where al-Biruni went when he fled from Khwarazm is unclear. He might have gone to Rayy (near to where the city of Tehran stands today) at this time, but certainly he was there at some time during the following few years. He writes that he was without a patron when in Rayy, and lived in poverty. al-Khujandi was an astronomer who was working with a very large instrument he had built on the mountain above Rayy to observe meridian transits of the sun near the solstices. He made observations on 16 and 17 June 994 for the summer solstice and 14 and 17 December 994 for the winter solstice. From these values he calculated the obliquity of the ecliptic, and the latitude of Rayy but neither are particularly accurate.

Al-Khujandi discussed these observations, and his large sextant, with al-Biruni who later reported on them in his Tahdid where he claimed that the aperture of the sextant settled by about one span in the course of al-Khujandi's observations due to the weight of the instrument. Al-Biruni is almost certainly correct in pinpointing the cause of al-Khujandi's errors. Since al-Khujandi died in 1000, we can be fairly certain that al-Biruni spent part of the time between 995 and 997 at Rayy. He must also have spent part of this time in Gilan, which is bordered by the Caspian Sea on the north, for around this time he dedicated a work to the ruler of Gilan, ibn Rustam, who had connections with the Ziyarid state.

We know certain dates in al-Biruni's life with certainty for he describes astronomical events in his works which allow accurate dates and places to be determined. His description of an eclipse of the moon on 24 May 997 which he observed at Kath means that he had returned to his native country by this time. The eclipse was an event that was also visible in Baghdad and al-Biruni had arranged with Abu'l-Wafa to observe it there. Comparing their timings enabled them to calculate the difference in longitude between the cities. We know that al-Biruni moved around frequently during this period for by 1000 he was at Gurgan being supported by Qabus, the ruler of the Ziyarid state. He dedicated his work Chronology to Qabus around 1000 and he was still in Gurgan on 19 February 1003 and 14 August 1003 when he observed eclipses of the moon there. We should record that in the Chronology al-Biruni refers to seven earlier works which he had written: one on the decimal system, one on the astrolabe, one on astronomical observations, three on astrology, and two on history.

By 4 June 1004 al-Biruni was back in his homeland, for on that day he observed another eclipse of the moon from Jurjaniyya. Ali ibn Ma'mun had ruled over Khwarazm and he remained at the court when his brother Abu'l Abbas Ma'mun succeeded him as ruler. Both the Ma'mun brothers married sisters of the ruler Mahmud from the powerful state at Ghazna which would eventually take control of Abu'l Abbas Ma'mun's kingdom.

Both Ali ibn Ma'mun and Abu'l Abbas Ma'mun were patrons of the sciences and supported a number of top scientists at their court. By 1004 Abu'l Abbas Ma'mun was ruler and he provided generous support for al-Biruni's scientific work. Not only did al-Biruni work there but Abu Nasr Mansur, his former teacher also worked there, allowing the pair to renew their collaboration. With Abu'l Abbas Ma'mun's support al-Biruni built an instrument at Jurjaniyya to observe solar meridian transits and he made 15 such observations with the instrument between 7 June 1016 and 7 December 1016.

Wars in the region were to disrupt the scientific work of al-Biruni and Abu Nasr Mansur and eventually both left Khwarazm in about 1017. Mahmud was extending his influence over the region from his base in Ghazna and made a demand of Abu'l Abbas Ma'mun in 1014 to have his name inserted into the Friday prayers. This was a signal that he wanted an end to Ma'mun's rule and he was making a bid for the region to come under his control. After Ma'mun had at least partially agreed to Mahmud's demands, he was killed by his own army for what they considered to be an act of treachery. Following this Mahmud marched his army into the region and gained control of Kath on 3 July 1017. Both al-Biruni and Abu Nasr Mansur left with the victorious Mahmud, perhaps as his prisoners.

There follows a strange period during which there is evidence in al-Biruni's own writings that he suffered great hardships but he also seems to have been supported by Mahmud for some scientific work. Some reports that Mahmud was cruel to al-Biruni may have some basis despite the limited patronage al-Biruni received from the ruler. Some dates and places from this period can again be deduced from descriptions of astronomical events recorded by al-Biruni. He was in Kabul on 14 October 1018 but, despite having no instruments with which to observe, he was able to make an observation with an ingenious instrument he made from materials at hand. At Lamghan, north of Kabul, on 8 April 1019 he observed an eclipse of the sun, writing [2]:-

... at sunrise we saw that approximately one-third of the sun was eclipsed and that the eclipse was waning.

Between 1018 and 1020, supported by Mahmud, al-Biruni made observations from Ghazna which allowed an accurate determination of its latitude. On 17 September 1019 there was a lunar eclipse observed by al-Biruni from Ghazna and [2]:-

He gives precise details of the exact altitude of various well known stars at the moment of first contact.

The relationship between Mahmud and al-Biruni is interesting. It is likely that al-Biruni was essentially a prisoner of Mahmud and was not free to leave. However Mahmud's military excursions into India meant that al-Biruni was taken to that country, and there can have been few experiences that al-Biruni would have enjoyed more. He may have wished for better treatment from Mahmud but al-Biruni's scientific work certainly benefited. From around 1022 Mahmud's armies began to have success in taking control of the northern parts of India and in 1026 his armies marched to the Indian Ocean. Al-Biruni seems only to have been in the northern parts of India, and we are uncertain how many visits he made, but observations he made there enabled him to determine the latitudes of eleven towns around the Punjab and the borders of Kashmir. His most famous work India was written as a direct result of the studies he made while in that country.

The India is a massive work covering many different aspects of the country. Al-Biruni describes the religion and philosophy of India, its caste system and marriage customs. He then studies the Indian systems of writing and numbers before going on to examine the geography of the country. The book also examines Indian astronomy, astrology and the calendar.

Al-Biruni studied Indian literature in the original, translating several Sanskrit texts into Arabic. He also wrote several treatises devoted to certain aspects of Indian astronomy and mathematics which were of particular interest to him. Al-Biruni was amazingly well read, having knowledge of Sanskrit literature on topics such as astrology, astronomy, chronology, geography, grammar, mathematics, medicine, philosophy, religion, and weights and measures. See [65] for further details.

Mahmud died in 1030 and he was succeeded by his eldest son Mas'ud, although not before a difficult political situation in which the two sons of Mahmud each tried to follow their father as ruler. Clearly al-Biruni was unsure who would succeed for he chose not to give a dedication in his India which appeared at this time. Better to have no dedication than to choose the wrong one! Mas'ud proved to be a ruler who treated al-Biruni more kindly than his father had done. If al-Biruni had been a virtual prisoner before, he now seems to have become free to travel as he pleased. Mas'ud was murdered in 1040 and succeeded by his son Mawdud who ruled for eight years. By this time al-Biruni was an old man but he continued his enormous output of scientific works right up to the time of his death.

The total number of works produced by al-Biruni during his lifetime is impressive. Kennedy. writing in [1], estimates that he wrote around 146 works with a total of about 13,000 folios (a folio contains about the same amount as a printed page from a modern book). We have mentioned some of the works above, but the range of al-Biruni's works cover essentially the whole of science at his time. Kennedy writes [1]:-

... his bent was strongly towards the study of observable phenomena, in nature and in man. Within the sciences themselves he was attracted by those fields then susceptible of mathematical analysis.

We have mentioned al-Biruni's astronomical observations many time above. It is worth noting that he had a better feel for errors than did Ptolemy. In [66] the author comments that Ptolemy's attitude was to select the observations which he thought most reliable (often that meant fitting in with his theory), and not to tell the reader about observations that he was discarding. Al-Biruni, on the other hand, treats errors more scientifically and when he does chose some to be more reliable than others, he also gives the discarded observations. He was also very conscious of rounding errors in calculations, and always attempted to observe quantities which required the minimum manipulation to produce answers.

One of the most important of al-Biruni's many texts is Shadows which he is thought to have written around 1021. Rosenfel'd has written extensively on this work of al-Biruni (see for example [52], [55], and [59]). The contents of the work include the Arabic nomenclature of shade and shadows, strange phenomena involving shadows, gnomonics, the history of the tangent and secant functions, applications of the shadow functions to the astrolabe and to other instruments, shadow observations for the solution of various astronomical problems, and the shadow-determined times of Muslim prayers. Shadows is an extremely important source for our knowledge of the history of mathematics, astronomy, and physics. It also contains important ideas such as the idea that acceleration is connected with non-uniform motion, using three rectangular coordinates to define a point in 3-space, and ideas that some see as anticipating the introduction of polar coordinates.

The book [5] details the mathematical contributions of al-Biruni. These include: theoretical and practical arithmetic, summation of series, combinatorial analysis, the rule of three, irrational numbers, ratio theory, algebraic definitions, method of solving algebraic equations, geometry, Archimedes' theorems, trisection of the angle and other problems which cannot be solved with ruler and compass alone, conic sections, stereometry, stereographic projection, trigonometry, the sine theorem in the plane, and solving spherical triangles.

Important contributions to geodesy and geography were also made by al-Biruni. He introduced techniques to measure the earth and distances on it using triangulation. He found the radius of the earth to be 6339.6 km, a value not obtained in the West until the 16th century (see [50]). His Masudic canon contains a table giving the coordinates of six hundred places, almost all of which he had direct knowledge. Not all, however, were measured by al-Biruni himself, some being taken from a similar table given by al-Khwarizmi. The author of [27] remarks that al-Biruni seemed to realise that for places given by both al-Khwarizmi and Ptolemy, the value obtained by al-Khwarizmi is the more accurate.

Al-Biruni also wrote a treatise on time-keeping, wrote several treatises on the astrolabe and describes a mechanical calendar. He makes interesting observations on the velocity of light, stating that its velocity is immense compared with that of sound. He also describes the Milky Way as

... a collection of countless fragments of the nature of nebulous stars.

Topics in physics that were studied by al-Biruni included hydrostatics and made very accurate measurements of specific weights. He described the ratios between the densities of gold, mercury, lead, silver, bronze, copper, brass, iron, and tin. Al-Biruni displayed the results as combinations of integers and numbers of the form 1/nn = 2, 3, 4, ... , 10.

Many of al-Biruni's ideas were worked out in discussions and arguments with other scholars. He had a long-standing collaboration with his teacher Abu Nasr Mansur, each asking the other to undertake specific pieces of work to support their own. He corresponded with Avicenna, in a rather confrontational fashion, about the nature of heat and light. In [4], eighteen letters which Avicenna sent to al-Biruni in answer to questions that he had posed are given. These letters cover topics such as philosophy, astronomy and physics. Al-Biruni also corresponded with al-Sijzi. The paper [10] contains a letter that al-Biruni wrote to al-Sijzi (translated into English in [63]) which contains proofs of both the plane and spherical versions of the sine theorem. Al-Biruni says were due to his teacher Abu Nasr Mansur.

Finally we should say a little about the personality of this great scholar. In contrast with the works of many others, we find out a lot about al-Biruni from his writings. Despite the fact that no more than one fifth of his works have survived, we get a clear picture of the great scientist. We see a man who was not a great innovator of original theories, mathematical or otherwise, but rather a careful observer who was a leading exponent of the experimental method. He was a great linguist who was able to read first hand an amazing number of the treatises that existed and he clearly saw the development of science as part of a historical process which he is always careful to put in proper context. His writings are therefore of great interest to historians of science.

It appears clear that, despite his many works on astrology, al-Biruni did not believe in the 'science' but used it as a means to support his serious scientific work. A devout Muslim, he did write religious texts to suit his patrons particular sect. He shows no prejudice against different religious sects or races, but he does have strong words to say about various acts they committed. For example the Arab conquerors of Khwarazm destroyed ancient texts - what sin could be worse than that to the scholar as dedicated to learning and history as was al-Biruni. On the Christian faith al-Biruni considered the doctrine of forgiveness, writing in India [1]:-

Upon my life, this is a noble philosophy, but the people of this world are not all philosophers. ... And indeed, ever since Constantine the Victorious became a Christian, both sword and whip have been ever employed.

An indication of the sarcasm that he employed against those he saw to be foolish we give the reply that he made to a religious man who objected to the fact that an instrument which al-Biruni was showing him to determine the time for prayers had Byzantine months engraved on it. Al-Biruni reports in Shadows that he said to him:-

Al-Biruni: Coordinates of Cities

In the book by David A King and Mary Helen Kennedy (eds.), Studies in the Islamic exact sciences. Reprints of papers by E S Kennedy, colleagues and former students (American University of Beirut, 1983) there is an account of survey taken from Coordinates of Cities by al-Biruni.

 

We know that the Hellenistic stade is approximately 600 feet but this was not known to the caliph al-Mamun. As al-Biruni says in his Coordinates of Cities, al-Mamun:-

... read in some Greek books that one degree of the meridian is equivalent to 500 stadia ... However, he found that its actual length [i.e. the stade's] was not sufficiently known to the translators to enable them to identify it with local standards of length.

Thus al-Mamun ordered a new survey to be made on the large, level plain of Sinjar some 70 miles west of Mosul, and two surveying parties participated. Starting from a common location one party travelled due north and the other due south. In the words of al-Biruni:-

Each party observed the meridian altitude of the sun until they found that the change in its meridian altitude had amounted to one degree, apart from the change due to variation in the declination. While proceeding on their paths, they measured the distances they had traversed, and planted arrows at different stages of their paths (to mark their courses). While on their way back, they verified, by a second survey, their former estimates of the lengths of the courses they had followed, until both parties met at the place whence they had departed. They found that one degree of a terrestrial meridian is equivalent to fifty-six miles. He (Habash) claimed that he had heard Khalid dictating that number to Judge Yahya b. Aktham. So he heard of that achievement from Khalid himself.

Again one sees an Islamic side to this project in the involvement of a jurist, for the law was the Islamic religious law and in this case the jurist was the chief justice of Basra, Yahya b. Aktham. Al-Biruni goes on to say that a second result was also obtained by the survey, namely 56 2/3 miles/degree, and in fact al-Biruni uses this value in his own computations later on.


 

  1. E S Kennedy, Biography in Dictionary of Scientific Biography (New York 1970-1990). 
    http://www.encyclopedia.com/doc/1G2-2830900460.html
  2. Biography in Encyclopaedia Britannica. 
    http://www.britannica.com/eb/article-9015394/al-Biruni

Books:

  1. E S Kennedy, A commentary upon Biruni's 'Kitab Tahdid al-Amakin' : An 11th century treatise on mathematical geography (Beirut, 1973).
  2. I M Muminov (ed.), al-Biruni and Ibn Sina : Correspondence (Russian) (Tashkent, 1973).
  3. B A Rozenfel'd, M M Rozhanskaya and Z K Skolovskaya, Abu'l-Rayhan al-Biruni (973-1048) (Russian) (Moscow, 1973).
  4. H U Sadykov, Biruni and his work on astronomy and mathematical geography (Russian) (Moscow, 1953).
  5. H M Said (ed.), al-Biruni commemorative volume : Proceedings of the International Congress held in Karachi, November 26-December 12, 1973 (Karachi, 1979).
  6. S H Sirazdinov and G P Matvievskaja, al-Biruni and his mathematical works (Russian) (Moscow, 1978).
  7. F Zikrillaev, Al-Biruni's works on physics (Russian) (Tashkent, 1973).

Articles:

  1. Kh F Abdulla-zade, al-Biruni's letter to Abu Said (Russian), Izv. Akad. Nauk Tadzhik. SSR Otdel. Fiz.-Mat. Khim. i Geol. Nauk (3)(89) (1983), 16-19.
  2. A Abdurahmonov, Some theorems of trigonometry in the works of al-Biruni (Uzbek), in Collection dedicated to the 1000th anniversary of the birth of al-Biruni (Tashkent, 1973), 159-169.
  3. S M Ahmad, al-Biruni as a synthesizer and transmitter of scientific knowledge, Indian J. History Sci. 10 (2) (1975), 244-248, 253.
  4. M Ahmad, R Behari and B V Subbarayappa, al-Biruni : an introduction to his life and writings on the Indian sciences, Indian J. History Sci. 10 (2) (1975), 98-110.
  5. A Ahmedov, Special questions of spherical astronomy and mathematics in al-Biruni's 'Canon Mas'uda' (Uzbek), in Collection dedicated to the 1000th anniversary of the birth of al-Biruni (Tashkent, 1973), 111-122.
  6. A Ahmedov and B A Rozenfel'd, 'Cartography' - one of Biruni's first essays to have reached us (Russian), in Mathematics in the East in the Middle Ages (Tashkent, 1978), 127-153.
  7. al-Biruni, Abu'l-Rayhan Muhammad ibn Ahmad Abu'l-Rayhan al-Biruni's own list of his works (Uzbek), in Collection dedicated to the 1000th anniversary of the birth of al-Biruni (Tashkent, 1973), 230-243.
  8. A R Amir-Moéz, Khayyam, al-Biruni, Gauss, Archimedes, and quartic equations, Texas J. Sci. 46 (3) (1994), 241-257.
  9. A R Amir-Moéz, and J C Aghayani, al-Biruni, al-Tusi, and Newton, Texas J. Sci. 32 (4) (1980), 289-292.
  10. M S Asimov, al-Biruni's astronomical treatise in the Dari language, Indian J. History Sci. 10 (2) (1975), 254-256, 277.
  11. M N Atagarryev, Application of stereographic projection to determination of the Qibla azimuth : al-Biruni, al-Chagmini and al-Turkumani (Russian), Istor.-Mat. Issled. 29 (1985), 44-47, 345.
  12. A K Bag, al-Biruni on Indian arithmetic, Indian J. History Sci. 10 (2) (1975), 174-184, 242-243.
  13. R B Baratov, Biruni - great scientist of the Orient (Russian), Izv. Akad. Nauk Tadzik. SSR Otdel. Fiz.-Mat. i Geolog.-Him. Nauk (3) (49) (1973), 3-5.
  14. J L Berggren, The origins of al-Biruni's 'method of the Zijes' in the theory of sundials, Centaurus 28 (1) (1985), 1-16.
  15. J L Berggren, al-Biruni on plane maps of the sphere : Including an Arabic text, J. Hist. Arabic Sci. 6 (1-2) (1982), 47-112.
  16. J L Berggren, A coincidence of Pappos' Book VIII with al-Biruni's Tahdid, J. Hist. Arabic Sci. 2 (1) (1978), 137-142.
  17. D J Boilot, L'oeuvre d'al-Beruni. Essai Bibliographique, Mélanges de l'Institut dominicain d'études orientales 2 (1955), 161-256.
  18. P G Bulgakov, al-Biruni and al-Khwarizmi (Russian), in Mathematics and astronomy in the works of scientists of the medieval East (Tashkent, 1977), 117-122; 140.
  19. P G Bulgakov, The life and works of al-Biruni (Russian), Voprosy Istor. Estestvoznan. i Tehn. (2-3)(47-48) (1974), 68-75, 221.
  20. P G Bulgakov and A A Ahmedov, al-Biruni and al-Kindi on the theory of parallels (Russian), Obshchestv. Nauki v Uzbek. (8) (1977), 30-36.
  21. U Cassina, La trisezione dell'angolo in Al Biruni, Period. Mat. (4) 21 (1941), 77-87.
  22. U Cassina, Sulle equazioni cubiche di Al Biruni, Period. Mat. (4) 21 (1941), 3-20.
  23. B Chatterjee, Al-Biruni and Brahmagupta, Indian J. History Sci. 10 (2) (1975), 161-165.
  24. A Dallal, Biruni's 'Book of pearls concerning the projection of spheres', Z. Gesch. Arab.-Islam. Wiss. 4 (1987/88), 81-138
  25. A E-A Hatipov and A Pulatov, Abu'l-Rayhan al-Biruni (Russian), Questions on the history of mathematics and astronomy I, Trudy Samarkand. Gos. Univ. (N.S.) Vyp. 229 (1972), 8-15.
  26. F I Haddad, D Pingree and E S Kennedy, al-Biruni's treatise on astrological lots, Z. Gesch. Arab.-Islam. Wiss. 1 (1984), 9-54.
  27. D R Hill, Al-Biruni's mechanical calendar, Annals of Science 42 (1985),139-163.
  28. D R Hill, al-Biruni's mechanical calendar, Ann. of Sci. 42 (2) (1985), 139-163.
  29. U I Karimov, Abu'l-Rayhan al-Biruni (life and works) (Uzbek), in Collection dedicated to the 1000th anniversary of the birth of al-Biruni (Tashkent, 1973), 19-31.
  30. B M Kedrov, The great Central Asiatic scholar-encyclopedist al-Biruni (Russian), Voprosy Istor. Estestvoznan. i Tehn. (2-3)(47-48) (1974), 60-68, 221.
  31. E S Kennedy, Al-Biruni on determining the meridian, Math. Teacher 56 (1963), 635-637.
  32. E S Kennedy and Y Id, A letter of al-Biruni : Habash al-Hasib's analemma for the gibla, Historia Math. 1 (1) (1974), 3-11.
  33. E S Kennedy and M-T Debarnot, Two mappings proposed by Biruni, Z. Gesch. Arab.-Islam. Wiss. 1 (1984), 145-147.
  34. M S Khan, Aryabhata I and al-Biruni, Indian J. Hist. Sci. 12 (2) (1977), 237-244.
  35. M S Khan, A select bibliography of Soviet publications on Al-Biruni, Janus 62 (4) (1975), 279-288.
  36. M S Khan, An examination of al-Biruni's knowledge of Indian astronomy, in History of oriental astronomy (Cambridge, 1987), 139-145.
  37. V B Mainkar, Metrology in al-Biruni's 'India', Indian J. History Sci. 10 (1975), 224-229, 243.
  38. G P Matvievskaja, The mathematical and astronomical legacy of al-Biruni, and the history of its study (Russian), Izv. Akad. Nauk UzSSR Ser. Fiz.-Mat. Nauk 17 (4) (1973), 4-10, 97.
  39. K Munirov, On a Tashkent manuscript copy of al-Biruni's 'Astrology' (Uzbek), in Collection dedicated to the 1000th anniversary of the birth of al-Biruni (Tashkent, 1973), 123-129.
  40. B K Nayar, al-Biruni and science communication in Sanskrit, Indian J. History Sci. 10 (2) (1975), 249-252.
  41. K Norhudzaev, al-Biruni and the science of geodesy (Uzbek), in Collection dedicated to the 1000th anniversary of the birth of al-Biruni (Tashkent, 1973), 145-158.
  42. L Richter-Bernburg, al-Biruni's 'Maqala Fitastih al-suwar wa-tabtikh al-kuwar' : a translation of the preface with notes and commentary, J. Hist. Arabic Sci. 6 (1-2) (1982), 113-122.
  43. B A Rosenfel'd and L G Utseha, Some mathematical discoveries in al-Biruni's 'Shadows', J. Hist. Arabic Sci. 4 (2) (1980), 332-336.
  44. S Roy, al-Biruni and Hindu speculations on gravitation, Indian J. History Sci. 10 (2) (1975), 218-223.
  45. B A Rozenfel'd, The 'Densimetry' of al-Biruni (Russian), Voprosy Istor. Estestvoznan. i Tekhn. (1) (1985), 91-95.
  46. B A Rozenfel'd, Some questions on the mathematics of variable quantities in al-Biruni 's treatise on shadows (Russian), Istor.-Mat. Issled. 23 (1978), 226-230, 358.
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الجبر أحد الفروع الرئيسية في الرياضيات، حيث إن التمكن من الرياضيات يعتمد على الفهم السليم للجبر. ويستخدم المهندسون والعلماء الجبر يومياً، وتعول المشاريع التجارية والصناعية على الجبر لحل الكثير من المعضلات التي تتعرض لها. ونظراً لأهمية الجبر في الحياة العصرية فإنه يدرّس في المدارس والجامعات في جميع أنحاء العالم. ويُعجب الكثير من الدارسين للجبر بقدرته وفائدته الكبيرتين، إذ باستخدام الجبر يمكن للمرء أن يحل كثيرًا من المسائل التي يتعذر حلها باستخدام الحساب فقط.وجاء اسمه من كتاب عالم الرياضيات والفلك والرحالة محمد بن موسى الخورازمي.


يعتبر علم المثلثات Trigonometry علماً عربياً ، فرياضيو العرب فضلوا علم المثلثات عن علم الفلك كأنهما علمين متداخلين ، ونظموه تنظيماً فيه لكثير من الدقة ، وقد كان اليونان يستعملون وتر CORDE ضعف القوسي قياس الزوايا ، فاستعاض رياضيو العرب عن الوتر بالجيب SINUS فأنت هذه الاستعاضة إلى تسهيل كثير من الاعمال الرياضية.

تعتبر المعادلات التفاضلية خير وسيلة لوصف معظم المـسائل الهندسـية والرياضـية والعلمية على حد سواء، إذ يتضح ذلك جليا في وصف عمليات انتقال الحرارة، جريان الموائـع، الحركة الموجية، الدوائر الإلكترونية فضلاً عن استخدامها في مسائل الهياكل الإنشائية والوصف الرياضي للتفاعلات الكيميائية.
ففي في الرياضيات, يطلق اسم المعادلات التفاضلية على المعادلات التي تحوي مشتقات و تفاضلات لبعض الدوال الرياضية و تظهر فيها بشكل متغيرات المعادلة . و يكون الهدف من حل هذه المعادلات هو إيجاد هذه الدوال الرياضية التي تحقق مشتقات هذه المعادلات.