Chú thích Surya Siddhanta

  1. 1 2 3 Menso Folkerts, Craig G. Fraser, Jeremy John Gray, John L. Berggren, Wilbur R. Knorr (2017), Mathematics, Encyclopaedia Britannica, Quote: "(...) its Hindu inventors as discoverers of things more ingenious than those of the Greeks. Earlier, in the late 4th or early 5th century, the anonymous Hindu author of an astronomical handbook, the Surya Siddhanta, had tabulated the sine function (...)"
  2. 1 2 P Gangooly (1935, Editor), Translator: Ebenezzer Burgess (1930), Translation of Surya Siddhanta: A Textbook of Hindu Astronomy, University of Calcutta, page 1
  3. 1 2 3 John Bowman (2005). Columbia Chronologies of Asian History and Culture. Columbia University Press. tr. 596. ISBN 978-0-231-50004-3. , Quote: "c. 350-400: The Surya Siddhanta, an Indian work on astronomy, now uses sexagesimal fractions. It includes references to trigonometric functions. The work is revised during succeeding centuries, taking its final form in the tenth century."
  4. Kim Plofker (2009). Mathematics in India. Princeton University Press. tr. 71–72 with footnotes. ISBN 0-691-12067-6
  5. 1 2 Markanday, Sucharit; Srivastava, P. S. (1980). “Physical Oceanography in India: An Historical Sketch”. Oceanography: The Past. Springer New York. tr. 551–561. ISBN 978-1-4613-8092-4. doi:10.1007/978-1-4613-8090-0_50. , Quote: "According to Surya Siddhanta the earth is a sphere."
  6. 1 2 Richard L. Thompson (2007). The Cosmology of the Bhagavata Purana. Motilal Banarsidass. tr. 16, 76–77, 285–294. ISBN 978-81-208-1919-1
  7. Scott L. Montgomery; Alok Kumar (2015). A History of Science in World Cultures: Voices of Knowledge. Routledge. tr. 104–105. ISBN 978-1-317-43906-6
  8. Richard L. Thompson (2004). Vedic Cosmography and Astronomy. Motilal Banarsidass. tr. 10. ISBN 978-81-208-1954-2
  9. Brian Evans (2014). The Development of Mathematics Throughout the Centuries: A Brief History in a Cultural Context. Wiley. tr. 60. ISBN 978-1-118-85397-9
  10. David Pingree (1963), Astronomy and Astrology in India and Iran, Isis, Volume 54, Part 2, No. 176, pages 229-235 with footnotes
  11. Duke, Dennis (2005). “The Equant in India: The Mathematical Basis of Ancient Indian Planetary Models”. Archive for History of Exact Sciences (Springer Nature) 59 (6): 563–576. doi:10.1007/s00407-005-0096-y
  12. Pingree, David (1971). “On the Greek Origin of the Indian Planetary Model Employing a Double Epicycle”. Journal for the History of Astronomy (SAGE Publications) 2 (2): 80–85. Bibcode:1971JHA.....2...80P. doi:10.1177/002182867100200202
  13. Roshen Dalal (2010). Hinduism: An Alphabetical Guide. Penguin Books. tr. 89. ISBN 978-0-14-341421-6. , Quote: "The solar calendar is based on the Surya Siddhanta, a text of around 400 CE."

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WikiPedia: Surya Siddhanta http://adsabs.harvard.edu/abs/1971JHA.....2...80P http://adsabs.harvard.edu/abs/1973JHA.....4....1P http://vedicreserve.mum.edu/jyotish/surya_siddhant... http://sandhi.hss.iitb.ac.in/Sandhi/Mathematics%20... //dx.doi.org/10.1007%2F978-1-4613-8090-0_50 //dx.doi.org/10.1007%2Fs00407-005-0096-y //dx.doi.org/10.1177%2F002182867100200202 //dx.doi.org/10.1177%2F002182867300400102 http://geogebratube.org/student/m26615 https://www.britannica.com/topic/mathematics