The mathematician Veda who proposed the famous Vedic formula is from which country

Veda was born in 1540 in Wetnay, Poitou, in eastern France. He studied law in his early years and worked as a lawyer in the French parliament, Veda was not a full-time mathematician, but he enjoyed studying mathematics in between his political career and in his spare time, and made many important contributions, becoming the greatest mathematician of his time.

Veda was the first to consciously and systematically use letters to represent numbers, and many improvements were made to mathematical notation. His Introduction to Analysis, written in 1591, was the earliest work on symbolic algebra. It was he who established the principles and methods of symbolic algebra, systematized algebra at that time, and used algebra as an analytical method.

As a result, he earned the title of "Father of Algebra". He also wrote a number of mathematical treatises, such as the Mathematical Code (1579) and the Mathematical Laws Applied to Triangles (1579). Veda's writings contain all the mathematics of the Renaissance in a unique form.

It is a pity that the text of Veda's work was relatively obscure and could not be widely disseminated at the time. After his death, it was compiled and published in 1646 as the Vedic Anthology. Veda died in Paris in 1603 at the age of 63.

Here are two fun facts about Veda:

Fight with Rohm

The Belgian mathematician Rohm once proposed a problem of 45 equations to challenge mathematicians from all over the world. The king of France gave the problem to Veda, who came up with a solution at the time, and when he returned home, he quickly came up with another 22 solutions. The answer was announced, which shocked the mathematical community.

Veda replied to Rohmon with another question. It took him days of hard thinking and meditation to solve it, but Veda did it easily, and won honor for his country, which is evident in his mathematical attainments.

Veda's "magic".

In the war between France and Spain, the French were always well aware of Spain's military dynamics and could always strike first militarily, so they defeated Spain in less than two years. The poor king of Spain was very confused and incomprehensible to the "unpredictable prophets" of the French in the war, believing that the French had used "magic". It turned out that it was Veda who used his exquisite mathematical methods to successfully decipher the Spanish military code and win the initiative in the war for his homeland.

In addition, Veda designed and improved the calendar. All of this reflects Veda's profound skills as a great mathematician.

François Vedt.

French: Fran ois viète; 1540 BC 13 December 1603), a French mathematician, one of the most influential mathematicians of the sixteenth century, is revered as the "father of algebra". He was the first mathematician to introduce algebraic notation for systems and to make improvements to equation theory.

Vedic. As a result of his many important contributions, Veda became one of the most prominent French mathematicians of the sixteenth century. Veda was born in 1540 in Poitou, France, in present-day Fontenay, Vendée-le-comte)]。

Died in Paris on December 13, 1603. He studied law at a young age and worked as a lawyer. Later, he engaged in political activities and served as a member of the Huaiqingqing Parliament.

In the war against Spain, he deciphered the code of the enemy army for **. Veda was also devoted to the study of mathematics, and was the first to consciously and systematically use letters to represent known numbers, unknowns, and their exponentiations, bringing about major advances in the study of algebraic theory. Veda discussed the various rational transformations of the roots of equations and discovered the relationship between the roots of equations and the coefficients (hence the unary quadratic equations).

The difference in the conclusion of the relationship between roots and coefficients is called the "Vedic theorem."

Veda pursued mathematics as a hobby, but he completed great works on algebra and trigonometry. His Mathematical Laws Applied to Triangles (1579) was one of Veda's earliest mathematical treatises, and probably the first systematic work in Western Europe to deal with six methods of solving plane and spherical triangles by triangular functions.

He is known as the father of modern algebraic notation. Veda also wrote a special article"Amputation", a preliminary discussion of sine, cosine.

The general formula for tangent strings, the first application of algebraic transformations to trigonometry. Considering the equation with the doubling angle, he gives a function that expresses cos(nx) as cos(x) and gives that when n 11 is equal to any positive integer.

The doubling angle expression of . Finish.

Vedic theorem:

Vedder's theorem explains the relationship between roots and coefficients in a quadratic equation.

In 1615, the French mathematician François Vedt established the relationship between the roots of equations and the coefficients in his work "On the Identification and Revision of Equations", and proposed this theorem.

Because Veda first developed this relationship between the roots and the coefficients of modern number equations, people call this relationship Veda's theorem.

Veda's theorem explains the relationship between roots and coefficients in a univariate nth order equation. The French mathematician Veda was the first to discover this relationship between the roots and coefficients of modern number equations, so people call this relationship Vedt's theorem. History is interesting, Veda arrived at this theorem in the 16th century, and proved it by relying on the fundamental theorem of algebra, which was only first substantially demonstrated by Gauss in 1799.

The Vedic theorem has a wide range of applications in equation theory.

The theorem in a quadratic equation, i.e., x1+x2=-b a

x1•x2=c/a

It is the relationship between the unary quadratic equations x1 and x2 and abc.