Brahmagupta was an Ancient Indian astronomer and mathematician who lived from AD to AD. He was born in the city of Bhinmal in Northwest India. Brahmagupta, whose father was Jisnugupta, wrote important works on mathematics and astronomy. In particular he wrote Brahmasphutasiddhanta Ⓣ, in The field of mathematics is incomplete without the generous contribution of an Indian mathematician named, Brahmagupta. Besides being a great.

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The rift between the mathematicians was created based on their varying ways of applying mathematics to physical world. The operations of multiplication and evolution the taking of rootsas well as unknown quantities, were represented by abbreviations of appropriate words. He also had a profound and direct influence on Islamic and Byzantine astronomy. The additive is equal to the product of the additives.

The product of a negative and a positive is negative, of two negatives positive, and of positives positive; the product of zero and a negative, of zero and a positive, or of two zeros is zero. However, he lived and worked there for a good part of his life.

Discover some of the most interesting and trending topics of He is the author of two early works on mathematics and astronomy: In addition to his work on solutions to general linear equations and quadratic equations, Brahmagupta went yet further by considering systems of simultaneous equations set of equations containing multiple variablesand solving quadratic equations with two unknowns, something which was not even considered in the West until a thousand years later, when Fermat was considering similar problems in In Brahmagupta’s case, the disagreements stemmed largely from the choice of astronomical parameters and theories.

Mathematics portal Astronomy portal Biography portal India portal. In mathematics, his contribution to geometry was especially significant. He is also known as Aryabhata I or Aryabhata the Elder to distinguish him from a 10th-century Indian mathematician….

A negative minus zero is negative, a positive [minus zero] positive; zero [minus zero] is zero. Lalla and Bhattotpala in the 8th and 9th centuries wrote commentaries on the Khanda-khadyaka. Given the lengths of the sides of any cyclic quadrilateral, Brahmagupta gave an approximate and mathematickan exact formula for the figure’s area.


It also contained the first clear description of the quadratic formula the solution of the quadratic equation.

Bharmagupta assumed the position of an astronomer at Brahmapaksha school. An orthodox Hindu, he took care not to antagonize his own religious leaders but was very bitter in criticizing the ideas advanced by rival astronomers hailing from the Jain religion. He also described the rules of operations on negative numbers which come quite close to the modern mahtematician of numbers.

His mathemativian eighteen sines are,,,, The texts composed by Brahmagupta were composed in elliptic verse in Sanskritas was common practice in Indian mathematics. He gave formulas for the braumagupta and areas of other geometric figures as well, and the Brahmagupta’s theorem named after him states that if a cyclic quadrilateral has perpendicular diagonals, then the perpendicular diagonal to a side from the point of intersection of the diagonals always bisects the opposite side.

Its perpendicular is the lower portion of the [central] perpendicular; the upper portion of the [central] perpendicular is half of the sum of the [sides] perpendiculars diminished by the lower [portion of the central perpendicular]. Babylonian mathematics Chinese mathematics Greek mathematics Islamic mathematics European mathematics. As a young man he studied astronomy extensively.

The accurate [values] are the square-roots from the squares of those two multiplied by ten.

He first describes addition and subtraction. The base decreased and increased by the difference between the squares of the sides divided by the base; when divided by two they are the true segments.

According to himself, Brahmagupta was born in CE and was the follower of Shaivism. In other projects Wikimedia Commons Wikisource. He also gave rules for dealing with five types of combinations of fractions.

Whatever is the square-root of the rupas multiplied by the square [and] increased by the square of half the unknown, diminish that by half the unknown [and] divide [the remainder] by its square.


Brahmagupta – Mathematician Biography, Contributions and Facts

The great 7th Century Indian mathematician and astronomer Brahmagupta wrote some important works on both mathematics mathematiciann astronomy.

He explains that since the Moon is closer to the Earth than the Sun, the degree of the illuminated part of the Moon depends on the relative positions of the Sun and the Moon, and this can be computed from the size of the angle between the two bodies. Number theory in the East. The field of mathematics is incomplete without the generous contribution of an Indian mathematician named, Brahmagupta.

Later, Brahmagupta moved to Ujjainwhich was also a major centre for astronomy. He posed the challenge to find mathematicina perfect square that, when multiplied by 92 and increased by 1, yields another bahmagupta square. That of which [the square] is the square is [its] square-root. The square-root of the sum of the two products of the sides and opposite sides of a non-unequal quadrilateral is the diagonal.


He further gave rules of using zero brahmaghpta negative and positive numbers. Unfortunately, our editorial approach may not be able to accommodate all contributions. Not much is known about his early life. The two square-roots, divided by the additive or the subtractive, are the additive rupas.

Diminish bahmagupta the middle [number] the square-root of the rupas multiplied by four times the square and increased by the square of the middle [number]; divide the remainder by twice the square. Brahmagupta then goes on to give the sum of the squares and cubes of the first n integers.

Subtract the colors different from the first color. Keep Exploring Britannica Albert Einstein. The Nothing That Is: He was of the view that the Moon is closer to the Earth than the Sun based on its power of waxing and waning.