Mahāvīra (mathematician)

Mahavira was a 9th-century Indian Jain mathematician from Gulbarga who asserted that the square root of a negative number did not exist. He gave the sum of a series whose terms are squares of an arithmetical progression and empirical rules for area and perimeter of an ellipse. He was patronised by the great Rashtrakuta king Amoghavarsha.^[1]

Mahavira was the author of Ganit Saar Sangraha. He separated Astrology from Mathematics. He expounded on the same subjects on which Aryabhata and Brahmagupta contended, but he expressed them more clearly. He is highly respected among Indian Mathematicians, because of his establishment of terminology for concepts such as equilateral, and isosceles triangle; rhombus; circle and semicircle. Mahavira's eminence spread in all South India and his books proved inspirational to other Mathematicians in Southern India.^[2] It was translated into Telugu language by Pavuluri Mallana as Saar Sangraha Ganitam.

1 Higher-order equations
2 Formula for cyclic quadrilateral
3 See also
4 References
5 Citations

Higher-order equations

Mahavira solved higher order equations of n degree of the forms: $\ ax^n = q$ and $a \frac{x^n - 1}{x - 1} = p$

Formula for cyclic quadrilateral

Aditya expressed characteristics of a cyclic quadrilateral, like Brahmagupta did previously. He also established equations for the sides and diagonal of Cyclic Quadrilateral.

If sides of Cyclic Quadrilateral are a, b, c, d and its diagonals are x and y while

$\ x = \sqrt {\frac{ad %2B bc}{ab %2B cd} (ac %2B bd)}$

And

$y = \sqrt {\frac{ab %2B cd}{ad %2B bc} (ac %2B bd)}$

Then, $\ xy = ac %2B bd$

References

O'Connor, John J.; Robertson, Edmund F., "Mahavira", MacTutor History of Mathematics archive, University of St Andrews, http://www-history.mcs.st-andrews.ac.uk/Biographies/Mahavira.html .
Bibhutibhusan Datta and Avadhesh Narayan Singh (1962). History of Hindu mathematics: a source book.

Citations

^ Mahavira, School of Mathematics and Statistics, University of St Andrews, Scotland
^ Mahavira, Encyclopædia Britannica

Indian mathematics

Mathematicians

Ancient	Apastamba · Baudhayana · Katyayana · Manava · Pāṇini · Pingala · Yajnavalkya

Classical	Āryabhaṭa I · Āryabhaṭa II · Bhāskara I · Bhāskara II · Melpathur Narayana Bhattathiri · Brahmadeva · Brahmagupta · Brihaddeshi · Halayudha · Jyeṣṭhadeva · Mādhava of Sañgamāgrama · Mahāvīra · Mahendra Sūri · Munishvara · Parameshvara · Achyuta Pisharati · Jagannatha Samrat · Nilakantha Somayaji · Śrīpati · Sridhara · Gangesha Upadhyaya · Varāhamihira · Sankara Variar · Virasena

Modern	Shreeram Shankar Abhyankar · A. A. Krishnaswami Ayyangar · Amiya Charan Banerjee · Raj Chandra Bose · Satyendra Nath Bose · Harish-Chandra · Subrahmanyan Chandrasekhar · D. K. Ray-Chaudhuri · Sarvadaman Chowla · Narendra Karmarkar · Prasanta Chandra Mahalanobis · Jayant Narlikar · Vijay Kumar Patodi · Srinivasa Ramanujan · Calyampudi Radhakrishna Rao · S. N. Roy · Sharadchandra Shankar Shrikhande · Navin M. Singhi · Mathukumalli V. Subbarao · S. R. Srinivasa Varadhan

Treatises

Āryabhaṭīya · Bakhshali manuscript · Brāhmasphuṭasiddhānta · Karanapaddhati · Paulisa Siddhanta · Paitamaha Siddhanta · Romaka Siddhanta · Sadratnamala · Śulba Sūtras · Surya Siddhanta · Tantrasamgraha · Vasishtha Siddhanta · Veṇvāroha · Yuktibhāṣā · Yavanajataka

Centers

Kerala school of astronomy and mathematics · Ujjain · Yantra Mantra (Jaipur, Delhi)

Influences

Babylonian mathematics · Greek mathematics · Islamic mathematics

Influenced

Chinese mathematics · Islamic mathematics · European mathematics

Mahāvīra (mathematician)

Contents

Higher-order equations

Formula for cyclic quadrilateral

See also

References

Citations