Which was the famous work of bhaskaracharya?
Bhaskara is known for his two main works: a ‘Siddhanta’ text, the ‘Siddhanta-siromani’ and a ‘Karana’ text, the ‘Karanakutuhala’. The former is in four parts, viz. (i) Patiganita or Lilavati, (ii) Bijaganita, (iii) Grahaganita, (iv) Goladhyaya. Of these, the first two are usually treated as separate treatises.
What is the contribution of aryabhatta in the field of mathematics?
Aryabhatta is among the mathematicians who brought new deductions and theories in mathematics and astronomy. His contribution to the mathematics is unmatched and cannot be ignored, as he was the one who deduced the approximate value of pi, which he found it to be 3.14.
What is the invention of bhaskaracharya?
He also wrote two astronomical works in the line of Aryabhata’s school, the Mahābhāskarīya and the Laghubhāskarīya. On 7 June 1979 the Indian Space Research Organisation launched Bhaskara I honouring the mathematician….
| Bhāskara I | |
|---|---|
| Occupation | Mathematician; scientist |
| Known for | Bhaskara I’s sine approximation formula |
What was the discovery by Siddhanta Shiromani how it is important nowadays?
He wrote Siddhanta Shiromani and is credited with the discovery of principles of differential calculus and its application in astronomical problems and computations. His works on calculus reportedly predate Newton and Leibniz by over half a millennium.
What did Brahmagupta invent?
| Brahmagupta | |
|---|---|
| Died | c. 668 CE (aged c. 69–70) |
| Known for | Zero Modern number system Brahmagupta’s theorem Brahmagupta’s identity Brahmagupta’s problem Brahmagupta–Fibonacci identity Brahmagupta’s interpolation formula Brahmagupta’s formula |
| Scientific career | |
| Fields | Astronomy, mathematics |
What is his contribution to mathematics?
Srinivasa Ramanujan, the mathematical genius , came to be recognized only posthumously for his incredible contribution to the world of Mathematics. Leaving this world at the young age of 32, Srinivasa Ramanujan (1887-1920) contributed a great deal to mathematics that only a few could overtake in their lifetime.