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Ibn Qurra Thabit:     more books (24)

Thabit ibn Qurra: Science and Philosophy in Ninth-Century Baghdad (Scientia Graeco-Arabica) by Roshdi Rashed, 2009-09-15 Thabit ibn Qurra Astronome Arabe: Alhazen, Thabit Ibn Qurra, Muhammad Al-Fazari, Al-Battani, Taqi Al-Din, Abu Muhammad Al-Hasan Al-Hamdani, Ibn Al-Banna (French Edition) 826 Births: Saints Cyril and Methodius, Thabit Ibn Qurra, William of Septimania, Al-Mubarrad, Ansgarde of Burgundy Geboren 826: Wilhelm Von Septimanien, Thabit Ibn Qurra, Ansgard Von Burgund (German Edition) 9th-Century Scientists: 9th-Century Mathematicians, Al-Kindi, Banu Musa, Muhammad Ibn Jabir Al-Harrani Al-Battani, Thabit Ibn Qurra Mathématicien Arabe: Alhazen, Al-Kindi, Ibn Tahir Al-Baghdadi, Thabit Ibn Qurra, Muhammad Al-Fazari, Al-Battani, Al-Qalasadi, Ahmad Ibn Yusuf (French Edition) Thabit ibn Qurra: An entry from Gale's <i>Science and Its Times</i> by Judson Knight, 2001 Traducteur Vers L'arabe: Al-Khawarizmi, Hunayn Ibn Ishaq, Thabit Ibn Qurra, Muhammad Al-Fazari, Hassan Koubeissi, Mahmoud Ben Othman (French Edition) 9th-Century Mathematicians: Al-Kindi, Banu Musa, Muhammad Ibn Jabir Al-Harrani Al-Battani, Thabit Ibn Qurra, Abu Ma'shar Al-Balkhi Translators to Syriac: Greek-syriac Translators, Hunayn Ibn Ishaq, Thabit Ibn Qurra, Masawaiyh, Sergius of Reshaina Greek-arabic Translators: Hunayn Ibn Ishaq, Thabit Ibn Qurra, Abd Al-Rahman Al-Sufi, Qusta Ibn Luqa, Al-ajjaj Ibn Yusuf Ibn Maar Abu'l Hasan Thabit ibn Qurra' ibn Marwan al-Sabi al-Harrani: Sabier von Harran, Buchreligion, Hermes Trismegistos, Hermetik, Haus der Weisheit, Aramäische Sprache (German Edition) 901: 901 Deaths, 901 Establishments, Thabit Ibn Qurra, List of State Leaders in 901, Adelaide of Paris, Muhammad Ibn Abi'l-Saj

lists with details

81. Sphaerica - Introduzione
    Translate this page Menelao trovano posto soprattutto all'inizio del terzo libro e si basano in particolaresull'Almagesto di Tolomeo e sul De figura sectore di thabit ibn qurra.  
    http://www.maurolico.unipi.it/edizioni/sphaeric/intro.htm
    
    Extractions: Lingua Versione italiana Sommario generale Il progetto Maurolico Descrizione del progetto Comitato scientifico e collaboratori Il Mauro-TeX ... Help Sphaerica Introduzione Theodosii Sphaericorum Elementorum ex traditione Maurolyci libri Menelai Sphaericorum libri III Maurolyci Sphaericorum libri II Demonstratio tabulae beneficae Tabella sinus recti Tabella foecunda Tabella benefica Sphaericorum epitome De Menelai sphaericorum libro secundo adnotamenta Edizioni Introduzione Euclides Sphaerica Arithmetica et algebra Archimedes Conica Astronomia ... Epistulae Instrumenta Maurolyciana Introduzione Catalogi Bibliographica Biographica Iconographica F r a n c i s c i M a u r o l i c i O p e r a M a t h e m a t i c a 3 ott. 2002 Direttore del volume

82. Sciences Et Savoirs
    Translate this page De Slane, MG (trad.), ibn khallikan's biographical dictionary. mois de Galien, desa traduction par Hunayn B. Ishâq et de son commentaire par thabit B. qurra.  
    http://ourworld.compuserve.com/homepages/Librairie_Avicenne/Sciences.htm

83. Khilafah.com - Saudi Allows U.S. To Use Key Airbase To Bomb Iraq Daily
    a few glorious names without contemporary equivalents in the West Jabir ibn Haiyan,alKindi, al-Khwarizmi, al-Fargani, al-Razi, thabit ibn qurra, al-Battani  
    http://www.khilafah.com/home/category.php?DocumentID=6215&TagID=2

84. Indice Analitico
    Translate this page I. ibn Aflah, Jabir ibn qurra, thabit icona urbana immagine cartografica - uso epossesso Imola, vedute instrumentum gnomonicum Internet interpretazione delle  
    http://www.tin.it/veniva/venetie/gtour/index/

85. Amicable Pairs
    Conversely and . The first who gave a rule to construct amicable pairs was theArab mathematician Abul-Hasan thabit ibn qurra (824-901). Footnotes.  
    http://www-maths.swan.ac.uk/pgrads/bb/project/node18.html
    
    Extractions: "Let us mention that the practice of art of talismans has also made us recognise the marvellous virtues of amicable (or sympathetic) numbers. These numbers are 220 and 284. One calls them amicable because the aliquot parts of one when added give a sum equal to the other. Persons who occupy themselves with talismans assure that these numbers have a particular influence in establishing union and friendship between two individuals." The pair 220 and 284 is amicable since:

86. L'infini En Mathématiques
    Translate this page Plus tard, Pappus (vers 300 après JC), Proclus (5e s. après J. C), Al Kindi (9es.) Al Nayrizi (9e -10e s), thabit ibn qurra (9e s.), Avicenne (10e s.), et d  
    http://www.reunion.iufm.fr/recherche/irem/histoire/l'infini_en_mathématiques.
    
    Extractions: Accueil Histoire des mathématiques Philosophie des sciences Axiomatiques ... Informations - Contacts Nous remercions vivement M. Hourya Sinaceur qui nous a généreusement transmis son article sur l'infini mathématique paru dans le "Dictionnaire de Philosophie et d'Histoire des Sciences" et qui nous a accordé l'autorisation de le publier sur notre site. Infini mathématique La préhistoire L’infini offre peu de prise à l'expérience immédiate. Des myriades de brins d'herbe dans un pré, c'est un nombre très grand, mais pas infini. On trouverait une image plus suggestive dans les figures en abyme ou deux miroirs face à face. Mais même dans ces cas on poursuit en imagination un processus dont on ne perçoit effectivement que les premières étapes. L'infini cependant est présent dès qu'il y a mathématique. Les Grecs déjà l'avaient rencontré. Par exemple, Zénon d’Elée (V e siècle avant J. C) avec ses paradoxes sur la divisibilité à l’infini d’un segment de droite, les Pythagoriciens (VI e siècle avant J. C.) avec leur découverte de l’incommensurabilité de la diagonale du carré, Eudoxe (début du IV

87. Jabir_ibn_Aflah
    Both may be based on the work of thabit ibn qurra, or the work of ibn Aflah, Abu'lWafa,and thabit ibn qurra may all be based on some still unknown source.  
    http://homepages.compuserve.de/thweidenfeller/mathematiker/Jabir_ibn_Aflah.htm
    
    Extractions: Died: about 1160 Jabir ibn Aflah is often known by the Latinised form of his name, namely Geber. Although not he was not in the first rank of Arabic mathematicians, he is important in the development of mathematics since his works were translated into Latin, and so became available to European mathematicians, whereas the work of some of the top rank Arabic mathematicians such as Abu'l-Wafa were not translated into Latin. Very little information is available regarding Jabir ibn Aflah's life. That he came from Seville is known from two sources. Firstly he is described as "al-Ishbili" in manuscripts containing his treatises; this means "from Seville". The other source gives us not only the information that he came from Seville, but also a good estimate for the period in which he lived. The information comes from Maimonides. Moses Maimonides, whose Arabic name was Abu 'Imran Musa ibn Maymun ibn 'Ubayd Allah, was a Jewish philosopher, jurist, and physician who was born in Córdoba in 1135. Among many important works he wrote The Guide of the Perplexed in Arabic in which he writes of:- ... ibn Aflah of Seville, whose son I have met ...

88. Introduction
    thabit ibn qurra He established a school of translators in whichhe and his family worked. Astronomical translation within Islam  
    http://www.peddie.org/princip/espana97/web/Sp-PMP/2)f.htm
    
    Extractions: AT THE PEDDIE SCHOOL Medieval Islamic Astronomy The Spanish Connection An overview Introduction My initial search for information regarding the topic of "Medieval Islamic Astronomy," was almost entirely fruitless. Every single text I looked into referred to a "general lack of innovation and intellectual discourse" during the medieval period. Historian after historian described this time as unscientific and unenlightened; an epoch best forgotten by any self-respecting scholar. They went on to discuss the contrast between the medieval period and the golden ages of Rome and Greece as one would discuss the difference between a fallow field and a field at harvest. The apparent intellectual gap that these texts addressed extinguished any hope I had of finding information on my topic. However, even after this initial disappointment, one question remained: I knew that the Islamic world, especially in Spain, was flourishing during this era. How, then, is this gap possible? Did Islam contribute nothing to the course of scientific learning? Upon Further Inspection. . .

89. Uczony Heretyk - Nowinki Matematyczne - Wirtualny Wszech¶wiat
    Tabit ibn qurra (ok. 826901). Dokladna data urodzin Tabita ibn Qurry (Thabitibn qurra) nie jest znana; miesci sie w przedziale lat 824-836.  
    http://www.wiw.pl/nowinki/matematyka/200102/20010219-001.asp
    
    Extractions: W iw.pl Na bie¿±co: I nformacje C o nowego Matematyka i przyroda: A stronomia B iologia ... odelowanie rzeczywisto¶ci Humanistyka: F ilozofia H istoria ... ztuka Czytaj: B iblioteka D elta ... ielcy i wiêksi Przydatne: S ³owniki C o i gdzie studiowaæ ... szech¶wiat w obrazkach Jeste¶ tutaj: Wirtualny Wszech¶wiat Informacje Nowinki 2000-2002 Matematyka Jeste¶ tutaj nowinka: Tabit Ibn Qurra (ok. 826-901) Dok³adna data urodzin Tabita Ibn Qurry (Thabit ibn Qurra) nie jest znana; mie¶ci siê w przedziale lat 824-836. Wiadomo natomiast, ¿e Tabit pochodzi³ z Harranu w Górnej Mezopotamii (obecnie Turcja), gdzie podobno w m³odo¶ci para³ siê wymian± pieniêdzy. Miasto to by³o o¶rodkiem kultu astralnego: cz³onkowie tamtejszej sekty sabijczyków utrzymywali, ¿e jako pierwsi uprawiali ziemiê, budowali miasta i... rozwinêli naukê. Dzieje Harranu tak siê potoczy³y, ¿e jego mieszkañcy przyswoili sobie jêzyk grecki w epoce hellenistycznej, a po podboju przez Arabów - arabski, zachowuj±c jednak ojczysty aramejski wraz z religi± przodków. Niemniej wolnomy¶licielskie pogl±dy Tabita sprawi³y, ¿e popad³ w konflikt z sabijczykami i opu¶ci³ Harran. Wêdruj±c spotka³ na swej drodze matematyka Muhammada Ibn Musê Ibn Shakira (jednego ze s³ynnych trzech braci Banu Musa), na którym g³êbia wiedzy matematycznej i filozoficznej Ibn Qurry, jak równie¿ jego bieg³o¶æ w jêzykach wywar³y olbrzymie wra¿enie. Muhhamad zaprosi³ go do Bagdadu, gdzie pod rz±dami dynastii Abbasydów rozkwita³a nauka. Najwybitniejszym jej patronem by³ kalif Al-Mamun, który za³o¿y³ Dom M±dro¶ci (

90. Uczony Heretyk - Nowinki Matematyczne - Wirtualny Wszechœwiat
    Tabit ibn qurra ok. 826901 Dokladna data urodzin Tabita ibn Qurry Thabitibn qurra nie jest znana; miesci sie w przedziale lat 824-836.  
    http://www.wiw.pl/fiszki/nowinki-matematyka-200102-20010219-001.html

91. Biography-center - Letter Q
    Quinquaud, Charles Eugene www.whonamedit.com/doctor.cfm/1105.html; qurra, thabitibn wwwhistory.mcs.st-and.ac.uk/~history/Mathematicians/thabit.html.  
    http://www.biography-center.com/q.html
    
    Extractions: random biography ! Any language Arabic Bulgarian Catalan Chinese (Simplified) Chinese (Traditional) Croatian Czech Danish Dutch English Estonian Finnish French German Greek Hebrew Hungarian Icelandic Indonesian Italian Japanese Korean Latvian Lithuanian Norwegian Polish Portuguese Romanian Russian Serbian Slovak Slovenian Spanish Swedish Turkish 18 biographies Qalasadi, Abu'l al-

92. Scientists & Scholars
    Mohammad Bin Musa alKhawarizmi died 840. Yaqub ibn Ishaq al-Kindi 800. Thabitibn qurra 836. Ali ibn Rabban al-Tabari 838. Abu Abdullah al-Battani 858.  
    http://www.islamia.com/History/muslim_scientists_&_scholars.htm
    
    Extractions: The following is taken from and linked to http://www.ummah.net Jabir Ibn Haiyan died 803 Mohammad Bin Musa al-Khawarizmi died 840 Yaqub Ibn Ishaq al-Kindi Thabit Ibn Qurra Ali Ibn Rabban al-Tabari Abu Abdullah al-Battani ... Abul Hasan Ali al-Masu'di died 957 Abu al-Qasim al-Zahrawi Abul Wafa Muhammad al-Buzjani Abu Ali Hasan Ibn al-Haitham Abu al-Hasan al-Mawardi ... Ibn al-Baitar died 1248 Nasir al-Din al-Tusi Jalal al-Din Rumi Ibn al-Nafis Ibn Khaldun ... Ibn Sina - doctor of doctors El Zahrawi - father of surgery Ibn Battuta - the great traveller

93. History 935 B.C.
    philosophy. . Author References Ibrahim, ibn Sinan ibn Thabitibn qurra http//www.cwi.nl/~keesh/Iran/Maths/qurra.htm. Mac  
    http://faculty.oxy.edu/jquinn/home/Math490/Timeline/935BC.html
    
    Extractions: 935 B.C. At the age of twenty-seven, Ibrahim ibn Sinan, was the only known mathematician in the year 935 BC. He was born in the city of Baghdad in 908 BC, where he also died at the age of thirty-eight. Ibrahim ibn Sinan’s interests were in geometry, especially tangents to circles, astronomy, and mathematical philosophy. He also wrote several books on geometry, including On Drawing the Three Conic Sections , which explains the constructions of the ellipse, hyperbola, and parabola. By studying the geometry of the shadows of the sun, Sinan tried to describe what he thought was the motion of the sun. The most famous work of Ibrahim ibn Sinan was the quadrature of the parabola. From this problem, Sinan developed a method of integration that was more general than the previously defined technique by Archimedes. His book, On the Measurement of the Parabola , introduces a theorem that states that the area of a segment of a parabola is four-thirds times the area of the triangle inscribed in that parabola. Ibrahim ibn Sinan translated many Greek mathematical and philosophical works. Because of his work in mathematical philosophy, he has been labeled the "foremost Arab mathematician to treat mathematical philosophy." Author References:

94. The Mathematics Of Islam, Part 2
    In this lecture, the topics consisted of alKhwarizmi (750-850), thabit ibnQurra (830-890), Abu-Sahl al-Kuhi (early 900s), ibn al-Haytham (965-1039  
    http://public.csusm.edu/public/DJBarskyWebs/330CollageOct01.html
    
    Extractions: The presentation given today by Dr. Barsky generated an overall theme that the works of the mathematicians of Islam during the period of (965-1039) seemed to show traces of calculus, despite the fact that calculus came about later in time. In this lecture, the topics consisted of al-Khwarizmi (750-850), Thabit ibn Qurra (830-890), Abu-Sahl al-Kuhi (early 900s), ibn al-Haytham (965-1039), Mohammed's Flight from Mecca (622), the Battle of Tours (732), the period of Caliphates, the Fall of Baghdad to Seljuk Turks (1055), the beginning of the first Crusade (1096), the arrival of the Mongols under Ghengis Khan (early 1200s), al-Khwarizmi's truncated pyramid problem, Mishnat ha-Middot, and ibn al-Haytham's volume of a paraboloid calculations. We did not have a mathematician of the day, instead we talked about our papers that will be due October 8. We then covered more of the history of Islamic mathematics. We focused on al-Khwarizmi (750-850), Thabit ibn Qurra (830-890), Abu-Sahl al-Kuhi (early 900s), and ibn al-Haytham (965-1039). We concentrated on problems from al-Khwarizmi and ibn al-Haytham, which mainly dealt with finding volumes. I really enjoyed the lecture about the volume of a parabola from ibn al-Haytham. I have previously seen the symbol for (the sum of), but I usually stopped at that point because I did not understand, or I felt like it was too complicated. I understand the logic behind finding the circumscribed volume, and inscribed volume of the parabola. I can see that the difference between the two is the volume of the bottom disk of the circumscribed volume. I see that the (sum symbol) is included in equations that are interested in finding the sum of the differences between two estimates which will give you the solution to a problem. I also see that as you take the sum of the differences you are reaching the limit which is related to the volume of the parabola.

95. Teoremadepitagoras
    Translate this page La segunda escena se basa en la demostración que Meavilla (1989) atribuye a ThabitIbn qurra, matemático árabe del s.IX y se caracteriza por ser el puzzle  
    http://almez.pntic.mec.es/~jdec0000/geometria_dinamica_del_triangulo/teorema_de_
    
    Extractions: Teorema de Pitágoras E n un triángulo rectángulo, la suma de los cuadrados de los catetos (b y c) es igual al cuadrado de la hipotenusa (a): a =b +c Los números a b y c que verifican esta relación se llaman ternas pitagóricas o números pitagóricos en alusión al estudio que de ellos hicieron Pitágoras y sus discípulos. Los antecedentes históricos de este teorema se remontan a las civilizaciones babilónica y egipcia en el segundo milenio a.J.C. El papiro Rhind y el de Moscú confirman la existencia de tablas de número pitagóricos en esa época. Tras las inundaciones del Nilo, los agrimensores egipcios construían triángulos rectángulos de catetos 3 y 4 y de hipotenusa 5, mediante una cuerda de 12 nudos para parcelar el terreno. Euclides demuestra el Teorema de Pitágoras en la proposición 47 del Libro I de los Elementos En los triángulos rectángulos el cuadrado sobre el ángulo opuesto al ángulo recto es equivalente a los cuadrados sobre los lados que forman el ángulo recto En la proposición 48 demuestra que si el cuadrado construido sobre uno de los lados de un triángulo es equivalente a los cuadrados, juntos, de los otros dos lados, el ángulo formado por esos dos lados es recto, es decir, el recíproco de la Proposición 47.

96. îÏ×ÁÑ áÓÔÒÏÌÏÇÉÞÅÓËÁÑ üÎÃÉËÌÏÐÅÄÉÑ
    The summary for this Russian page contains characters that cannot be correctly displayed in this language/character set.  
    http://encyclopedia.astrologer.ru/cgi-bin/guard/S/Sabit.html

97. The History Of Mathematics - Library Center For E-courses
    The summary for this Hebrew page contains characters that cannot be correctly displayed in this language/character set.  
    http://www-lib.haifa.ac.il/www/mesila/math/sites.htm

98. CONTENTS
    The summary for this Gujarati page contains characters that cannot be correctly displayed in this language/character set.  
    http://www.ias-worldwide.org/contents_noble.htm
    
    Extractions: Academy Publishes " Personalities Noble" CONTENTS Abu Abdullah al-Battani Abu Raihan al-Biruni Abu Wafa Muhammad al-Buzjani Abu al-Naser al-Farabi Al-Farghani Abu Hamid al- Ghazali Al- Idrissi Ibn al-Bitar Abu Ali Hassan Ibn al-Haitham Ibn Al-Nafis Ibn Khaldun Ibn Rushd Ibn Sina Abu Marwan Ibn Zuhr Jabir Ibn Haiyan Mohammad Bin Musa al-Khawarizmi Omer al-Khayyam Yaqub Ibn Ishaq al-Kindi Abu al-Hassan Ali al-Mas'udi Abu al-Hassan al-Mawardi Mohammad Ibn Zakariya al- Razi Jalal Al- Din Rumi Ali Ibn Rabban al-Tabari Thabit Ibn Qurra Nasir al-Din al- Tusi Abu al-Qasim al-Zahrawi

99. What Is Islam
    This picture indicates Imam Khomeini in a certain place before hisreturn to Iran in 1979.What is the exact name of this place?  
    http://www.tebyan.net/english/tebyan.htm
    
    Extractions: The koran Collection of Quran Study Of Quran ... The Qur'an and Modern Science Tajweed Text of Quran in different language English German French Bosnian ... Turkish History Of Iran Geography of Iran Iranian Cities Isfahan Shiraz Literature Mowlana Jalaluddin Rumi Attar Language Iranian Scientists Abu l'Hasan Ali ibn Ahmad Al-Nasawi Ibn Sina Biruni Biography of Prophet (1) ... Ahl-ul-bayt Companions Abu Dharr Al-Ghifari Salman

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