His studies followed some of the notables in Indian astronomy such as Varahmihara, Aryabhata and Simha. The Sulba Sutras give methods for constructing a , which imply several different approximations of the value of. Hence he could well have been a Brahmin. His book also contained chapters on mathematics, and it was in these chapters that he explained the rules for using zero in mathematical calculations. He illustrates such procedures with story problems such as the following quoted on the St.
One chapter in the middle of the book is devoted to a discussion of previous astronomical treatises. Its simplicity lies in the way it facilitated calculation and placed arithmetic foremost amongst useful inventions. Indians are excellent engineers and where a superb technological inventions is, for sure there is a good Indian somewhere around. He dealt with square, cube, triangle, trapezium, circle and sphere in geometry. The Mo Jing described various aspects of many fields associated with physical science, and provided a small number of geometrical theorems as well. He is known to have considerable influence on Arabic science world too, where he is referred to as Arjehir.
His name Arya Bhatt is a typical north Indian name. Kepler succeeded in formulating mathematical laws of planetary motion. Although most of the contents of the Elements were already known, Euclid arranged them into a single, coherent logical framework. Kepler's calculations were made simpler by the contemporaneous invention of by and. In addition to this, Bhaskara I too mentions him as Aryabhata.
He is certainly wrong when he then claims that zero divided by zero is zero. Islamic mathematics, in turn, developed and expanded the mathematics known to these civilizations. Kankah used the Brahmasphutasiddhanta to explain the Hindu system of arithmetic astronomy. The key significance is Algebra always concludes the factor X required to distribute salary percentage or ratio in which the proper distribution has to be made. The real impact of Brahmagupta's discoveries was felt in the Islamic world, where King Khalif Abbasid al-Mansoor 712—775 invited the Ujjain scholar Kanka to lecture on Brahmagupta's applications of mathematics to astronomy.
It is possible that the concept of speed ,acceleration ,velocity etc was not known nor required at the time of Brahamagupta hence the theorems in these pre texts were not initiated in these directions. Pascal, with his , attempted to use the newly developing probability theory to argue for a life devoted to religion, on the grounds that even if the probability of success was small, the rewards were infinite. The is ascribed to Plato, while a formula for obtaining Pythagorean triples bears his name. Where did Aryabhatta come from? He does this by explaining the illumination of the Moon by the Sun. In addition to giving area formulas and methods for multiplication, division and working with unit fractions, it also contains evidence of other mathematical knowledge, including and ; , and ; and simplistic understandings of both the and namely, that of the number 6. The word is derived from the Latinization of his name, Algoritmi, and the word from the title of one of his works, The Compendious Book on Calculation by Completion and Balancing.
Based on your post it seems he combined his faith with science, which often results into something outstanding. It is said that Newton also had a belief in the art of occult. It therefore appears that Aryabhatta was born, lived, flourished and worked in Magadha. My feeling is that he was a Bihari and a Brahmin at the same time. In chapter 18 of his famous book called Brahmasphutasiddhanta Corrected Treatise of Brahma Brahamagupta describes about Zero as one of the numerals which stood for meaning nothing. The first of his two surviving treatises, according to internal evidence, was written in Bhillamala, now the city of Bhinmal in Rajasthan state.
The are generally credited with the first proof of the theorem. His work on calculus was groundbreaking and much ahead of his times. In fact, there is a lot of confusion about his name too. The entire concept of water drainage and consumption is based upon thousands of spider webs of pipes lying underground across the city. This was the center of all mathematicians and mathematics of India at that time. He also came up with several new ideas in geometry, including a method to calculate the area of a cyclic quadrilateral known as Brahmagupta's Formula.
The son of a mathematician and astronomer, he was trained by his father in the subjects. He gave some properties as follows:- When zero is added to a number or subtracted from a number, the number remains unchanged; and a number multiplied by zero becomes zero. Rules for summing series are also given. Can anyone throw some light on this? His Collection is a major source of knowledge on Greek mathematics as most of it has survived. The most extensive Egyptian mathematical text is the sometimes also called the Ahmes Papyrus after its author , dated to c. In the 16th century, consolidated many of the Kerala School's developments and theorems in the Yukti-bhāṣā. More than that, it seemed to open up the man himself to his peers.
Aryabhatta, the Indian mathematician head of Nalanda University at Kusumpura modern Patna What was his name? He also established a method which would later be called to find the volume of a. At this time, Indian astronomy was quite advanced compared to the work being done in the rest of the world. Georges Ifrah has studied the works of Aryabhatta and found that the counting and mathematical work carried out by him would have been not possible without zero or place value system. While the concept of had to be inferred in the mathematics of many contemporary cultures, the Mayas developed a standard symbol for it. Though about half of the entries are wrong, it is in the Aryabhatiya that the decimal place-value system first appears. But in the internet it is said that they were influenced by babylonian astronomy? This includes the groundbreaking work of both and in the development of infinitesimal during the course of the 17th century. A History of Greek Mathematics.