WebApr 8, 2024 · Aryabhatta Biography. Aryabhata Information. The birthplace and year of Aryabhata are still estimated based on his works and influences. In one of his widely popular works Aryabhatiya, it was mentioned, he was 23 years old when we were 3600 years into Kaliyug, which dates back to 499 CE and thus estimating his birth year to be 476 CE. WebBhaskara II. Bhaskara II is a famous Indian mathematician. He also goes by the name of Bhaskara or Bhaskaracharya, which means Bhaskara the Teacher. Bhaskara is famous for a number of innovations in mathematics. His knowledge of solving equations and number systems were at such a high level that it would take European mathematicians hundreds …
Bhaskara I Biography and Facts - Who-is-who
WebBhaskara has given simple methods to find the squares, square roots, cube, and cube roots of big numbers. He has proved the Pythagoras theorem in only two lines. The famous Pascal Triangle was Bhaskara‟s „Khandameru‟. Bhaskara has given problems on that number triangle. Pascal was born 500 years after Bhaskara. WebBhaskara. 1114-1185. Indian Mathematician and Astronomer. Bhaskara, one of the greatest medieval Indian scholars, pioneered learning in a number of areas, most notably in his approximations of π.Director of the astronomical observatory at Ujjain, he was at the center of scientific activities in the India of his time, and his work in number systems and … cst toolkit caritas.org.au
Bhaskara II Facts for Kids - Education site
WebBhaskara raya ( Bhāskara rāya Makhin) (1690–1785) is widely considered an authority on all questions pertaining to the worship of the Mother Goddess in Shakta tradition of … WebSep 28, 2024 · Bhaskara-i is considered to be one of the three pearls of Indian Astronomy and Mathematics along with Brahmagupta and Madhava Samgramagrama. Who is … WebIn mathematics, Bhaskara I's sine approximation formula is a rational expression in one variable for the computation of the approximate values of the trigonometric sines discovered by Bhaskara I (c. 600 – c. 680), a seventh-century Indian mathematician. [1] This formula is given in his treatise titled Mahabhaskariya. early pictures of dolly parton