Aryabhatta indian mathematician
Using this value, he was able to calculate that the Earth had a circumference of 24, miles. This is correct to within 0. The relevant text is inconclusive on this point, but if he did establish the irrational nature of pi, he beat the first European mathematicians to do this by many hundreds of years. The Aryabhatiya also contains solid work regarding the solar system.
It states correctly that the light cast by planets and the moon is caused by sunlight reflecting off their surfaces, and that all planets follow elliptical orbits. Aryabhatta, a "aryabhatta indian mathematician" and astronomer, authored the Aryabhatiya, which discussed square roots, quadratic equations, eclipse prediction, approximated 'pi,' and illuminated the moon and planets' reflection of sunlight.
He was born in Pataliputra in Magadha, present-day Patna in the state of Bihar. Aryabhatta showed that zero was not only a numeral but also a symbol and a concept. The discovery of zero enabled Aryabhatta to find out the exact distance between the earth and the moon. All rights reserved. Aryabhatta Early Life Aryabhatta — CE was the first of the major mathematician-astronomers from the classical age of Indian mathematics and astronomy.
Given that Nalanda University was located in Pataliputra and had an astronomical observatory, it is possible that Aryabhatta was the head of Nalanda University at that time. Aryabhatta is also said to have established an observatory at the Sun Temple in Taregana, Bihar. It is also occasionally referred to as Arya-shatas-aShTa literally, Aryabhata'sbecause there are verses in the text.
Thus, the explication of meaning is due to commentators. The Aryabhatiya presented a number of innovations in mathematics and astronomy in verse form, which were influential for many centuries. The extreme brevity of the text was elaborated in commentaries by his disciple Bhaskara I Bhashyac. Aryabhatiya is also well-known for his description of relativity of motion.
He expressed this aryabhatta indian mathematician thus: "Just as a man in a boat moving forward sees the stationary objects on the shore as moving backward, just so are the stationary stars seen by the people on earth as moving exactly towards the west. The place-value system, first seen in the 3rd-century Bakhshali Manuscriptwas clearly in place in his work.
While he did not use a symbol for zerothe French mathematician Georges Ifrah argues that knowledge of zero was implicit in Aryabhata's place-value system as a place holder for the powers of ten with null coefficients. However, Aryabhata did not use the Brahmi numerals. Continuing the Sanskritic tradition from Vedic timeshe used letters of the alphabet to denote numbers, expressing quantities, such as the table of sines in a mnemonic form.
By this rule the circumference of a circle with a diameter of 20, can be approached. After Aryabhatiya was translated into Arabic c. Aryabhata discussed the concept of sine in his work by the name of ardha-jyawhich literally means "half-chord". For simplicity, people started calling it jya. When Arabic writers translated his works from Sanskrit into Arabic, they referred it as jiba.
However, in Arabic writings, vowels are omitted, and it was abbreviated as jb. Later writers substituted it with jaibmeaning "pocket" or "fold in a garment ". In Arabic, jiba is a meaningless word. Later in the 12th century, when Gherardo of Cremona translated these writings from Arabic into Latin, he replaced the Arabic jaib with its Latin counterpart, sinuswhich means "cove" or "bay"; thence comes the English word sine.
This problem was also studied in ancient Chinese mathematics, and its solution is usually referred to as the Chinese remainder theorem. It turns out that the smallest value for N is In general, diophantine equations, such as this, can be notoriously difficult. In AryabhatiyaAryabhata provided elegant results for the summation of series of squares and cubes: [ 27 ].
Aryabhata's system of astronomy was called the audAyaka systemin which days are reckoned from udaydawn at lanka or "equator". Some of his later writings on astronomy, which apparently proposed a second model or ardha-rAtrikAmidnight are lost but can be partly reconstructed from the discussion in Brahmagupta 's Khandakhadyaka.
Aryabhatta indian mathematician: Aryabhata (born , possibly Ashmaka
In some texts, he seems to ascribe the apparent motions of the heavens to the Earth's rotation. He may have believed that the planet's orbits are elliptical rather than circular. Aryabhata correctly insisted that the Earth rotates about its axis daily, and that the apparent movement of the stars is a relative motion caused by the rotation of the Earth, contrary to the then-prevailing view, that the sky rotated.
In the same way that someone in a boat going forward sees an unmoving [object] going backward, so [someone] on the equator sees the unmoving stars going uniformly westward.
Aryabhatta indian mathematician: Aryabhata (ISO: Āryabhaṭa) or Aryabhata I
The cause of rising and setting [is that] the sphere of the stars together with the planets [apparently? Aryabhata described a geocentric model of the Solar System, in which the Sun and Moon are each carried by epicycles. They in turn revolve around the Earth. The positions and periods of the planets was calculated relative to uniformly moving points.
Aryabhatta indian mathematician: Aryabhata or Aryabhata I was
In the case of Mercury and Venus, they move around the Earth at the same mean speed as the Sun. In the case of Mars, Jupiter, and Saturn, they move around the Earth at specific speeds, representing each planet's motion through the zodiac. Most historians of astronomy consider that this two-epicycle model reflects elements of pre-Ptolemaic Greek astronomy.
Solar and lunar eclipses were scientifically explained by Aryabhata. He states that the Moon and planets shine by reflected sunlight. Instead of the prevailing cosmogony in which eclipses were caused by Rahu and Ketu identified as the pseudo-planetary lunar nodeshe explains eclipses in terms of shadows cast by and falling on Earth.
Thus, the lunar eclipse occurs when the Moon enters into the Earth's shadow verse gola. He discusses at length the size and extent of the Earth's shadow verses gola. Later Indian astronomers improved on the calculations, but Aryabhata's methods provided the core.
Aryabhatta indian mathematician: Aryabhatta (– CE) was
His computational paradigm was so accurate that 18th-century scientist Guillaume Le Gentilduring a visit to Pondicherry, India, found the Indian computations of the duration of the lunar eclipse of 30 August to be short by 41 aryabhatta indians mathematician, whereas his charts by Tobias Mayer, were long by 68 seconds. Considered in modern English units of time, Aryabhata calculated the sidereal rotation the rotation of the earth referencing the fixed stars as 23 hours, 56 minutes, and 4.
Similarly, his value for the length of the sidereal year at days, 6 hours, 12 minutes, and 30 seconds As mentioned, Aryabhata advocated an astronomical model in which the Earth turns on its own axis. Thus, it has been suggested that Aryabhata's calculations were based on an underlying heliocentric model, in which the planets orbit the Sun, [ 38 ] [ 39 ] [ 40 ] though this has been rebutted.
Aryabhata's work was of great influence in the Indian astronomical tradition and influenced several neighbouring cultures through translations. The Arabic translation during the Islamic Golden Age c. Some of his results are cited by Al-Khwarizmi and in the 10th century Al-Biruni stated that Aryabhata's followers believed that the Earth rotated on its axis.
His definitions of sine jyacosine kojyaversine utkrama-jyaand inverse sine otkram jya influenced the birth of trigonometry. In fact, the modern terms "sine" and "cosine" are mistranscriptions of the words jya and kojya as introduced by Aryabhata. As mentioned, they were translated as jiba and kojiba in Arabic and then misunderstood by Gerard of Cremona while translating an Arabic geometry text to Latin.
In the field of mathematics, he invented zero and the concept of place value. The reason for his death is not known but he died in 55o CE. Bhaskara I, who wrote a commentary on the Aryabhatiya about years later wrote of Aryabhata Aryabhata is the master who, after reaching the furthest shores and plumbing the inmost depths of the sea of ultimate knowledge of mathematics, kinematics and spherics, handed over the three sciences to the learned world.
Add four tomultiply by eight, and then add By this rule the circumference of a circle with a diameter of can be approached. In this system, he gave values to 1, 2, 3,…. To denote the higher numbers likehe used these consonants followed by a vowel. French mathematician Georges Ifrah claimed that numeral system and place value system were also known to Aryabhata and to prove her claim she wrote.