Bhaskaracharya information in english

Bijaganita ( Bījagaṇita) was Grahaganita and Golādhyāya. Meaning [ ] Bijaganita, which literally translates to "mathematics ( ganita) using seeds ( bija)", is one of the two main branches of mediaeval Indian mathematics, the other being patiganita, or "mathematics using algorithms. Itderives its name from the fact that it employs algebraic equations ( samikarana) that are compared to plant seeds ( bija) due to their capacity to generate solutions to mathematical problems." Contents [ ] The book is divided into six parts, mainly indeterminate equations, quadratic equations, simple equations, surds. The contents are: • Introduction • On Simple Equations • On Quadratic Equations • On Equations involving indeterminate Questions of the 1st Degree • On Equations involving indeterminate Questions of the 2nd Degree • On Equations involving Rectangles In Bijaganita Bhāskara II refined Translations [ ] The translations or editions of the Bijaganita into English include: • 1817. Algebra, with Arithmetic and mensuration, from the Sanscrit of Brahmegupta and Bháscara • 1813. • 1813. • Two notable Scholars from Varanasi See also [ ] • • References [ ] • • • • Selin, Helaine (1997-07-31). Encyclopaedia of the History of Science, Technology, and Medicine in Non-Western Cultures. Springer Science & Business Media. pp.40–50. 978-0-7923-4066-9. Bibliography [ ] • Plofker, Kim (2009), Mathematics in India, Princeton University Press, 9780691120676 • Poulose, K. G. (1991), K. G. Poulose (ed.),...

Bhaskaracharya The Great Mathematician Bhaskaracharya.A GREAT DISCOVERER (1114 -1183 Before Common Era) Bhaskaracharya was a born genius and an authority in mathematics, especially in algebra and geometry. His famous work Lilavati and Bijaganita remain unparalleled works by substantiating his profound intelligence. His astronomical findings on planetary positions, Occurrences of eclipses and Cosmography written in his treatise titled "Siddhanta Shiromani" [Siddhant Meaning Principle] stun every one. Siddhanta Shirmoani was divided into four parts; Lilavati [Quadratic equations, Cubic equations and Quartic Indeterminate equations] Bijaganita [Algebraic Calculation OR Algebra] Grahaganita [Astronomical(Graha) Calculations(Ganita)] Goladhyaya [Spheres OR Spherical Trigonometry] "Lilavati" is divided into 13 chapters it covers branches of Mathematics, Arithmetic, Algebra, geometry, and a part of Trigonometry and Mensuration. His work includes Properties of ZERO '0' the division and operation rules of '0' The estimation of 'PIE' (22/7;) His Work on Negative Numbers including Surd's Arithmetical Terms Inverse Rule of 'THREE' and of 5, 7, 9, 11 In his book "Surya Siddhant" he wrote on the gravitational force, that helps to keep the planets, the Sun and the moon in their respective orbits much before the world could even waken and realise to these findings. "Kuttaka" the Quadratic Indeterminate equations was given by him in 12th Century well before the European mathematicians got ...

Infinity, as we hear this word our brain instantaneously thinks of something very big and enormous which we can’t visualize. And indeed, infinity is limitless (अनंत). Mathematically, it is represented by the symbol ‘ꝏ’, sometimes called as a lemniscate. If you open Mathematical Books of today, you will find the idea of infinity mentioned in somewhat higher level courses. You won’t, however, find either the infinite or the infinitesimal in an elementary book on algebra, let alone arithmetic! The only thing you may find in an algebra book is a very stern warning about not ever dividing by zero! (Because if you divide any number by zero, you get infinity). On the other hand, in the algebra books of ancient times in India, we find both the infinite and the infinitesimal treated routinely. One such example is Bhaskaracharya Bijaganita (his book on Algebra) and Lilavati (his book on Arithmetic). Bhaskaracharya was a twelfth-century Indian mathematician and astronomer. He was born in Bijapur in Karnataka. While Newton and Leibniz have been credited with differential and integral calculus, there is strong evidence to suggest that Bhaskaracharya was a pioneer in some of the principles of differential calculus. अस्मिन् विकारः खहरे न राशावपि प्रविष्टेष्वपि निःसृतेषु। बहुष्वपि स्यात् लय-सृष्टिकाले अनन्ते अच्युतेभूतगणेषु यद्वत्॥ Transliteration: asmin vikāraḥ khahare na rāśāvapi praviṣṭeṣvapi niḥsṛteṣu bahuṣvapi syāt laya – sṛṣṭikāle anante acyute bhūtagaṇeṣu yadvat English Translation...

Bhaskaracharya The Great Mathematician Bhaskaracharya.A GREAT DISCOVERER (1114 -1183 Before Common Era) Bhaskaracharya was a born genius and an authority in mathematics, especially in algebra and geometry. His famous work Lilavati and Bijaganita remain unparalleled works by substantiating his profound intelligence. His astronomical findings on planetary positions, Occurrences of eclipses and Cosmography written in his treatise titled "Siddhanta Shiromani" [Siddhant Meaning Principle] stun every one. Siddhanta Shirmoani was divided into four parts; Lilavati [Quadratic equations, Cubic equations and Quartic Indeterminate equations] Bijaganita [Algebraic Calculation OR Algebra] Grahaganita [Astronomical(Graha) Calculations(Ganita)] Goladhyaya [Spheres OR Spherical Trigonometry] "Lilavati" is divided into 13 chapters it covers branches of Mathematics, Arithmetic, Algebra, geometry, and a part of Trigonometry and Mensuration. His work includes Properties of ZERO '0' the division and operation rules of '0' The estimation of 'PIE' (22/7;) His Work on Negative Numbers including Surd's Arithmetical Terms Inverse Rule of 'THREE' and of 5, 7, 9, 11 In his book "Surya Siddhant" he wrote on the gravitational force, that helps to keep the planets, the Sun and the moon in their respective orbits much before the world could even waken and realise to these findings. "Kuttaka" the Quadratic Indeterminate equations was given by him in 12th Century well before the European mathematicians got ...

Bijaganita ( Bījagaṇita) was Grahaganita and Golādhyāya. Meaning [ ] Bijaganita, which literally translates to "mathematics ( ganita) using seeds ( bija)", is one of the two main branches of mediaeval Indian mathematics, the other being patiganita, or "mathematics using algorithms. Itderives its name from the fact that it employs algebraic equations ( samikarana) that are compared to plant seeds ( bija) due to their capacity to generate solutions to mathematical problems." Contents [ ] The book is divided into six parts, mainly indeterminate equations, quadratic equations, simple equations, surds. The contents are: • Introduction • On Simple Equations • On Quadratic Equations • On Equations involving indeterminate Questions of the 1st Degree • On Equations involving indeterminate Questions of the 2nd Degree • On Equations involving Rectangles In Bijaganita Bhāskara II refined Translations [ ] The translations or editions of the Bijaganita into English include: • 1817. Algebra, with Arithmetic and mensuration, from the Sanscrit of Brahmegupta and Bháscara • 1813. • 1813. • Two notable Scholars from Varanasi See also [ ] • • References [ ] • • • • Selin, Helaine (1997-07-31). Encyclopaedia of the History of Science, Technology, and Medicine in Non-Western Cultures. Springer Science & Business Media. pp.40–50. 978-0-7923-4066-9. Bibliography [ ] • Plofker, Kim (2009), Mathematics in India, Princeton University Press, 9780691120676 • Poulose, K. G. (1991), K. G. Poulose (ed.),...

Infinity, as we hear this word our brain instantaneously thinks of something very big and enormous which we can’t visualize. And indeed, infinity is limitless (अनंत). Mathematically, it is represented by the symbol ‘ꝏ’, sometimes called as a lemniscate. If you open Mathematical Books of today, you will find the idea of infinity mentioned in somewhat higher level courses. You won’t, however, find either the infinite or the infinitesimal in an elementary book on algebra, let alone arithmetic! The only thing you may find in an algebra book is a very stern warning about not ever dividing by zero! (Because if you divide any number by zero, you get infinity). On the other hand, in the algebra books of ancient times in India, we find both the infinite and the infinitesimal treated routinely. One such example is Bhaskaracharya Bijaganita (his book on Algebra) and Lilavati (his book on Arithmetic). Bhaskaracharya was a twelfth-century Indian mathematician and astronomer. He was born in Bijapur in Karnataka. While Newton and Leibniz have been credited with differential and integral calculus, there is strong evidence to suggest that Bhaskaracharya was a pioneer in some of the principles of differential calculus. अस्मिन् विकारः खहरे न राशावपि प्रविष्टेष्वपि निःसृतेषु। बहुष्वपि स्यात् लय-सृष्टिकाले अनन्ते अच्युतेभूतगणेषु यद्वत्॥ Transliteration: asmin vikāraḥ khahare na rāśāvapi praviṣṭeṣvapi niḥsṛteṣu bahuṣvapi syāt laya – sṛṣṭikāle anante acyute bhūtagaṇeṣu yadvat English Translation...

Bijaganita ( Bījagaṇita) was Grahaganita and Golādhyāya. Meaning [ ] Bijaganita, which literally translates to "mathematics ( ganita) using seeds ( bija)", is one of the two main branches of mediaeval Indian mathematics, the other being patiganita, or "mathematics using algorithms. Itderives its name from the fact that it employs algebraic equations ( samikarana) that are compared to plant seeds ( bija) due to their capacity to generate solutions to mathematical problems." Contents [ ] The book is divided into six parts, mainly indeterminate equations, quadratic equations, simple equations, surds. The contents are: • Introduction • On Simple Equations • On Quadratic Equations • On Equations involving indeterminate Questions of the 1st Degree • On Equations involving indeterminate Questions of the 2nd Degree • On Equations involving Rectangles In Bijaganita Bhāskara II refined Translations [ ] The translations or editions of the Bijaganita into English include: • 1817. Algebra, with Arithmetic and mensuration, from the Sanscrit of Brahmegupta and Bháscara • 1813. • 1813. • Two notable Scholars from Varanasi See also [ ] • • References [ ] • • • • Selin, Helaine (1997-07-31). Encyclopaedia of the History of Science, Technology, and Medicine in Non-Western Cultures. Springer Science & Business Media. pp.40–50. 978-0-7923-4066-9. Bibliography [ ] • Plofker, Kim (2009), Mathematics in India, Princeton University Press, 9780691120676 • Poulose, K. G. (1991), K. G. Poulose (ed.),...

Infinity, as we hear this word our brain instantaneously thinks of something very big and enormous which we can’t visualize. And indeed, infinity is limitless (अनंत). Mathematically, it is represented by the symbol ‘ꝏ’, sometimes called as a lemniscate. If you open Mathematical Books of today, you will find the idea of infinity mentioned in somewhat higher level courses. You won’t, however, find either the infinite or the infinitesimal in an elementary book on algebra, let alone arithmetic! The only thing you may find in an algebra book is a very stern warning about not ever dividing by zero! (Because if you divide any number by zero, you get infinity). On the other hand, in the algebra books of ancient times in India, we find both the infinite and the infinitesimal treated routinely. One such example is Bhaskaracharya Bijaganita (his book on Algebra) and Lilavati (his book on Arithmetic). Bhaskaracharya was a twelfth-century Indian mathematician and astronomer. He was born in Bijapur in Karnataka. While Newton and Leibniz have been credited with differential and integral calculus, there is strong evidence to suggest that Bhaskaracharya was a pioneer in some of the principles of differential calculus. अस्मिन् विकारः खहरे न राशावपि प्रविष्टेष्वपि निःसृतेषु। बहुष्वपि स्यात् लय-सृष्टिकाले अनन्ते अच्युतेभूतगणेषु यद्वत्॥ Transliteration: asmin vikāraḥ khahare na rāśāvapi praviṣṭeṣvapi niḥsṛteṣu bahuṣvapi syāt laya – sṛṣṭikāle anante acyute bhūtagaṇeṣu yadvat English Translation...

Bhaskaracharya The Great Mathematician Bhaskaracharya.A GREAT DISCOVERER (1114 -1183 Before Common Era) Bhaskaracharya was a born genius and an authority in mathematics, especially in algebra and geometry. His famous work Lilavati and Bijaganita remain unparalleled works by substantiating his profound intelligence. His astronomical findings on planetary positions, Occurrences of eclipses and Cosmography written in his treatise titled "Siddhanta Shiromani" [Siddhant Meaning Principle] stun every one. Siddhanta Shirmoani was divided into four parts; Lilavati [Quadratic equations, Cubic equations and Quartic Indeterminate equations] Bijaganita [Algebraic Calculation OR Algebra] Grahaganita [Astronomical(Graha) Calculations(Ganita)] Goladhyaya [Spheres OR Spherical Trigonometry] "Lilavati" is divided into 13 chapters it covers branches of Mathematics, Arithmetic, Algebra, geometry, and a part of Trigonometry and Mensuration. His work includes Properties of ZERO '0' the division and operation rules of '0' The estimation of 'PIE' (22/7;) His Work on Negative Numbers including Surd's Arithmetical Terms Inverse Rule of 'THREE' and of 5, 7, 9, 11 In his book "Surya Siddhant" he wrote on the gravitational force, that helps to keep the planets, the Sun and the moon in their respective orbits much before the world could even waken and realise to these findings. "Kuttaka" the Quadratic Indeterminate equations was given by him in 12th Century well before the European mathematicians got ...

Bijaganita ( Bījagaṇita) was Grahaganita and Golādhyāya. Meaning [ ] Bijaganita, which literally translates to "mathematics ( ganita) using seeds ( bija)", is one of the two main branches of mediaeval Indian mathematics, the other being patiganita, or "mathematics using algorithms. Itderives its name from the fact that it employs algebraic equations ( samikarana) that are compared to plant seeds ( bija) due to their capacity to generate solutions to mathematical problems." Contents [ ] The book is divided into six parts, mainly indeterminate equations, quadratic equations, simple equations, surds. The contents are: • Introduction • On Simple Equations • On Quadratic Equations • On Equations involving indeterminate Questions of the 1st Degree • On Equations involving indeterminate Questions of the 2nd Degree • On Equations involving Rectangles In Bijaganita Bhāskara II refined Translations [ ] The translations or editions of the Bijaganita into English include: • 1817. Algebra, with Arithmetic and mensuration, from the Sanscrit of Brahmegupta and Bháscara • 1813. • 1813. • Two notable Scholars from Varanasi See also [ ] • • References [ ] • • • • Selin, Helaine (1997-07-31). Encyclopaedia of the History of Science, Technology, and Medicine in Non-Western Cultures. Springer Science & Business Media. pp.40–50. 978-0-7923-4066-9. Bibliography [ ] • Plofker, Kim (2009), Mathematics in India, Princeton University Press, 9780691120676 • Poulose, K. G. (1991), K. G. Poulose (ed.),...