1) write at least 200 words about the autobiography of the famous mathematics given below and their contribution to the world. 1):-Archimedes. 2):-pythagoras 3):-Aryabhata 4):-Srinivasa Ramanujan 5):-Madhava of Sangamagram. answer all the options
Answers
Answer:
this much i cant give this answer ok but you can seach in youtube or google
Pura nhi fit ho ra
Mādhagramma. MacTutor History of Mathematics archive. University of St Andrews.
J J O'Connor and E F Robertson (2000). "Madhava of Sangamagramma". MacTutor History of Mathematics archive. School of Mathematics and Statistics, University of St Andrews, Scotland. Archived from the original on 14 May 2006. Retrieved 8 September 2007.
C. K. Raju (2007). Cultural foundations of mathematics: the nature of mathematical proof and the transmission of the calculus from india to europe in the 16th c. CE. Delhi: Pearson Longman.
D F Almeida, J K John and A Zadorozhnyy (2001). "Keralese mathematics: its possible transmission to Europe and the consequential educational implications". Journal of Natural Geometry. 20 (1): 77–104.
Charles Whish (1834). "On the Hindu Quadrature of the circle and the infinite series of the proportion of the circumference to the diameter exhibited in the four Sastras, the Tantra Sahgraham, Yucti Bhasha, Carana Padhati and Sadratnamala". Transactions of the Royal Asiatic Society of Great Britain and Ireland. Royal Asiatic Society of Great Britain and Ireland. 3 (3): 509–523. doi:10.1017/S0950473700001221. JSTOR 25581775.
K. V. Sarma; S. Hariharan (eds.). "A book on rationales in Indian Mathematics and Astronomy—An analytic appraisal" (PDF). Yuktibhāṣā of Jyeṣṭhadeva. Archived from the original (PDF) on 28 September 2006. Retrieved 9 July 2006.
A.P. Jushkevich (1961). Geschichte der Mathematik im Mittelalter (German translation, Leipzig, 1964, of the Russian original, Moscow, 1961). Moscow.
K V Sarma (1972). A History of the Kerala School of Hindu Astronomy. Hoshiarpur.
Purananuru 229
Madhava extended Archimedes' work on the geometric Method of Exhaustion to measure areas and numbers such as π, with arbitrary accuracy and error limits, to an algebraic infinite series with a completely separate error term. C T Rajagopal and M S Rangachari (1986). "On medieval Keralese mathematics". Archive for History of Exact Sciences. 35 (2): 91–99. doi:10.1007/BF00357622.
"Neither Newton nor Leibniz – The Pre-History of Calculus and Celestial Mechanics in Medieval Kerala". MAT 314. Canisius College. Archived from the original on 6 August 2006. Retrieved 9 July 2006.
"The Kerala School, European Mathematics and Navigation". Indian Mathemematics. D.P. Agrawal—Infinity Foundation. Retrieved 9 July 2006.
R C Gupta (1973). "The Madhava-Gregory series". Math. Education. 7: B67–B70.
"Science and technology in free India" (PDF). Government of Kerala—Kerala Call, September 2004. Prof. C.G.Ramachandran Nair. Archived from the original (PDF) on 21 August 2006. Retrieved 9 July 2006.
George E. Andrews, Richard Askey, Ranjan Roy (1999). Special Functions. Cambridge University Press. p. 58. ISBN 0-521-78988-5.
Gupta, R. C. (1992). "On the remainder term in the Madhava-Leibniz's series". Ganita Bharati. 14 (1–4): 68–71.
T. Hayashi, T. Kusuba and M. Yano. 'The correction of the Madhava series for the circumference of a circle', Centaurus 33 (pages 149–174). 1990.
R C Gupta (1975). "Madhava's and other medieval Indian values of pi". Math. Education. 9 (3): B45–B48.
The 13-digit accurate value of π, 3.1415926535898, can be reached using the infinite series expansion of π/4 (the first sequence) by going up to n = 76
"An overview of Indian mathematics". Indian Maths. School of Mathematics and Statistics University of St Andrews, Scotland. Retrieved 7 July 2006.
Sarma, K.V. (1977). Contributions to the study of Kerala school of Hindu astronomy and mathematics. Hoshiarpur: V V R I.
David Edwin Pingree (1981). Census of the exact sciences in Sanskrit. A. 4. Philadelphia: American Philosophical Society. pp. 414–415.
K Chandra Hari (2003). "Computation of the true moon by Madhva of Sangamagrama". Indian Journal of History of Science. 38 (3): 231–253. Retrieved 27 Jaest of the Peacock: Non-European Roots of Mathematics (3rd ed.). Princeton University Press. ISBN 978-0-691-13526-7.
"Indians predated Newton 'discovery' by 250 years". press release, University of Manchester. 13 August 2007. Archived from the original on 21 March 2008. Retrieved 5 September 2007.
vte
Indian mathematics
Authority control Edit this at Wikidata
GND: 1027039928VIAF: 264627658WorldCat Identities: viaf-264627658
Categories: 1340s births1420s deathsScientists from KeralaHistory of calculusIndian HindusKerala school