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This 19th century French mathematician did very innovative work with equations and quadratic forms He correspondended at length with other mathematicians and often contributed to their work His wo?
Charles Hermite
What was Diophantine's Contribution To Mathematics?
His name was actually Diophantus. The Diophantine equation was named after his work with similar problems dealing with how to solve quadratic equations.He was the first mathematician to recognize fractions as positive inetegers.He wrote Arithmetica, one of the first books on algebra.He was considered the father of algebra.In mathematics, a Diophantine equation (named for Diophantus of Alexandria, a third century Greek mathematician) is a polynomial equation where the variables can only take on integer values. Although you may not realize it, you have seen Diophantine equations before: one of the most famous Diophantine equations is:
WHO IS A 2ND century astronomer and mathematician?
ptolemy
Who is the most famous mathematician in the 21st century?
Grigori Perelman
French mathematician did innovative work in the 19th century?
charles hermite
19th century french mathematician did very innovative work with equations and quadratic forms?
Perhaps it is either Joseph Fourier or Pierre-Simon Laplace.
This 19th century French mathematician did very innovative work with equations and quadratic forms He correspondended at length with other mathematicians and often contributed to their work His wo?
Charles Hermite
What 19th century french mathematician did very innvoative work with equations?
Hermite
What mathematician is known as the father of algebra?
The mathematician known as the father of algebra is Al-Khwarizmi, a Persian scholar who lived during the 9th century. His seminal work, "Al-Kitab al-Mukhtasar fi Hisab al-Jabr wal-Muqabala," laid the foundations for algebra as a distinct mathematical discipline. The term "algebra" itself is derived from "al-Jabr," one of the operations he described in solving equations. His contributions significantly influenced mathematics and introduced systematic methods for solving linear and quadratic equations.
Who is a eleventh century mathematician?
a mathematician from the 11th century would be Omar Khayyam.
Who found quadratic equation?
The Babylonians, as early as 1800 BC (displayed on Old Babylonian clay tablets) could solve a pair of simultaneous equations of the form: : which are equivalent to the equation:[1] : The original pair of equations were solved as follows: # Form # Form # Form # Form # Find by inspection of the values in (1) and (4).[2] In the Sulba Sutras in ancient India circa 8th century BCE quadratic equations of the form ax2 = c and ax2 + bx = c were explored using geometric methods. Babylonian mathematicians from circa 400 BCE and Chinese mathematicians from circa 200 BCE used the method of completing the square to solve quadratic equations with positive roots, but did not have a general formula. Euclid, the Greek mathematician, produced a more abstract geometrical method around 300 BCE. In 628 CE, Brahmagupta gave the first explicit (although still not completely general) solution of the quadratic equation: : " To the absolute number multiplied by four times the [coefficient of the] square, add the square of the [coefficient of the] middle term; the square root of the same, less the [coefficient of the] middle term, being divided by twice the [coefficient of the] square is the value. (Brahmasphutasiddhanta (Colebrook translation, 1817, page 346)[2] " This is equivalent to: :The Bakhshali Manuscript dated to have been written in India in the 7th century CE contained an algebraic formula for solving quadratic equations, as well as quadratic indeterminate equations (originally of type ax/c = y). Mohammad bin Musa Al-kwarismi (Persia, 9th century) developed a set of formulae that worked for positive solutions. Abraham bar Hiyya Ha-Nasi (also known by the Latin name Savasorda) introduced the complete solution to Europe in his book Liber embadorum in the 12th century. Bhāskara II (1114-1185), an Indian mathematician-astronomer, gave the first general solution to the quadratic equation with two roots.[3] The writing of the Chinese mathematician Yang Hui (1238-1298 AD) represents the first in which quadratic equations with negative coefficients of 'x' appear, although he attributes this to the earlier Liu Yi. The Babylonians, as early as 1800 BC (displayed on Old Babylonian clay tablets) could solve a pair of simultaneous equations of the form: : which are equivalent to the equation:[1] : The original pair of equations were solved as follows: # Form # Form # Form # Form # Find by inspection of the values in (1) and (4).[2] In the Sulba Sutras in ancient India circa 8th century BCE quadratic equations of the form ax2 = c and ax2 + bx = c were explored using geometric methods. Babylonian mathematicians from circa 400 BCE and Chinese mathematicians from circa 200 BCE used the method of completing the square to solve quadratic equations with positive roots, but did not have a general formula. Euclid, the Greek mathematician, produced a more abstract geometrical method around 300 BCE. In 628 CE, Brahmagupta gave the first explicit (although still not completely general) solution of the quadratic equation: : " To the absolute number multiplied by four times the [coefficient of the] square, add the square of the [coefficient of the] middle term; the square root of the same, less the [coefficient of the] middle term, being divided by twice the [coefficient of the] square is the value. (Brahmasphutasiddhanta (Colebrook translation, 1817, page 346)[2] " This is equivalent to: :The Bakhshali Manuscript dated to have been written in India in the 7th century CE contained an algebraic formula for solving quadratic equations, as well as quadratic indeterminate equations (originally of type ax/c = y). Mohammad bin Musa Al-kwarismi (Persia, 9th century) developed a set of formulae that worked for positive solutions. Abraham bar Hiyya Ha-Nasi (also known by the Latin name Savasorda) introduced the complete solution to Europe in his book Liber embadorum in the 12th century. Bhāskara II (1114-1185), an Indian mathematician-astronomer, gave the first general solution to the quadratic equation with two roots.[3] The writing of the Chinese mathematician Yang Hui (1238-1298 AD) represents the first in which quadratic equations with negative coefficients of 'x' appear, although he attributes this to the earlier Liu Yi.
What is the history of the quadratic formula?
Ah, the quadratic formula is like a happy little tree in the world of mathematics. It has been around for centuries, helping us solve those tricky quadratic equations with ease. Just like a painter mixes colors on their palette, mathematicians over time refined and developed this formula to make our lives a little brighter and our math a little easier.
What was Diophantine's Contribution To Mathematics?
His name was actually Diophantus. The Diophantine equation was named after his work with similar problems dealing with how to solve quadratic equations.He was the first mathematician to recognize fractions as positive inetegers.He wrote Arithmetica, one of the first books on algebra.He was considered the father of algebra.In mathematics, a Diophantine equation (named for Diophantus of Alexandria, a third century Greek mathematician) is a polynomial equation where the variables can only take on integer values. Although you may not realize it, you have seen Diophantine equations before: one of the most famous Diophantine equations is:
Who is that mathematician in the 17th century who wrote the exponent after the unknown?
The mathematician in the 17th century who wrote the exponent after the unknown is Herigone.
How old is the quadratic formula?
200 century
WHO IS A 2ND century astronomer and mathematician?
ptolemy
Which mathematician was born in the fifth century BC?
One ancient Greek mathematician was Euclid.
