Michel Rolle (21 April 1652 – 8 November 1719) was a French

mathematician A mathematician is someone who uses an extensive knowledge of mathematics in their work, typically to solve mathematical problems. Mathematicians are concerned with numbers, data, quantity, structure, space, models, and change. History On ...

. He is best known for Rolle's theorem (1691). He is also the co-inventor in Europe of

Gaussian elimination In mathematics, Gaussian elimination, also known as row reduction, is an algorithm for solving systems of linear equations. It consists of a sequence of operations performed on the corresponding matrix of coefficients. This method can also be used ...

(1690).

Life

Rolle was born in

Ambert Ambert (; Auvergnat: ''Embèrt'') is a commune in the Puy-de-Dôme department in Auvergne in central France. Administration Ambert is the seat of the canton of Ambert and the arrondissement of Ambert. It is a sub-prefecture of the department. ...

, Basse-Auvergne. Rolle, the son of a shopkeeper, received only an elementary education. He married early and as a young man struggled to support his family on the meager wages of a transcriber for notaries and attorney. In spite of his financial problems and minimal education, Rolle studied algebra and

Diophantine analysis In mathematics, a Diophantine equation is an equation, typically a polynomial equation in two or more unknowns with integer coefficients, such that the only solutions of interest are the integer ones. A linear Diophantine equation equates to a c ...

(a branch of number theory) on his own. He moved from Ambert to

Paris Paris () is the capital and most populous city of France, with an estimated population of 2,165,423 residents in 2019 in an area of more than 105 km² (41 sq mi), making it the 30th most densely populated city in the world in 2020. S ...

in 1675. Rolle's fortune changed dramatically in 1682 when he published an elegant solution of a difficult, unsolved problem in Diophantine analysis. The public recognition of his achievement led to a patronage under minister Louvois, a job as an elementary mathematics teacher, and eventually to a short-termed administrative post in the Ministry of War. In 1685 he joined the Académie des Sciences in a very low-level position for which he received no regular salary until 1699. Rolle was promoted to a salaried position in the Academy, a ''pensionnaire géometre,''. This was a distinguished post because of the 70 members of the Academy, only 20 were paid., p. 739. He had then already been given a

pension A pension (, from Latin ''pensiō'', "payment") is a fund into which a sum of money is added during an employee's employment years and from which payments are drawn to support the person's retirement from work in the form of periodic payments ...

Jean-Baptiste Colbert Jean-Baptiste Colbert (; 29 August 1619 – 6 September 1683) was a French statesman who served as First Minister of State from 1661 until his death in 1683 under the rule of King Louis XIV. His lasting impact on the organization of the countr ...

after he solved one of

Jacques Ozanam Jacques Ozanam (16 June 1640, in Sainte-Olive, Ain – 3 April 1718, in Paris) was a French mathematician. Biography Jacques Ozanam was born in Sainte-Olive, Ain, France. In 1670, he published trigonometric and logarithmic tables more accu ...

's problems. He remained there until he died of apoplexy in 1719. While Rolle's forte was always Diophantine analysis, his most important work was a book on the algebra of equations, called ''Traité d'algèbre'', published in 1690. In that book Rolle firmly established the notation for the ''n''th root of a real number, and proved a polynomial version of the theorem that today bears his name. ( Rolle's theorem was named by Giusto Bellavitis in 1846.) Rolle was one of the most vocal early antagonists of calculus – ironically so, because Rolle's theorem is essential for basic proofs in calculus. He strove intently to demonstrate that it gave erroneous results and was based on unsound reasoning. He quarreled so vehemently on the subject that the Académie des Sciences was forced to intervene on several occasions. Among his several achievements, Rolle helped advance the currently accepted size order for negative numbers. Descartes, for example, viewed –2 as smaller than –5. Rolle preceded most of his contemporaries by adopting the current convention in 1691. Rolle died in Paris. No contemporary portrait of him is known.

Work

Rolle was an early critic of

infinitesimal calculus Calculus, originally called infinitesimal calculus or "the calculus of infinitesimals", is the mathematical study of continuous change, in the same way that geometry is the study of shape, and algebra is the study of generalizations of arithm ...

, arguing that it was inaccurate, based upon unsound reasoning, and was a collection of ingenious fallacies, but later changed his opinion. Michel Rolle - Traité d'algèbre

In 1690, Rolle published ''Traité d'Algebre.'' It contains the first ''published'' description in Europe of the

algorithm, which Rolle called the method of substitution Some examples of the method had previously appeared in algebra books, and Isaac Newton had previously described the method in his lecture notes, but Newton's lesson was not published until 1707. Rolle's statement of the method seems not to have been noticed insofar as the lesson for Gaussian elimination that was taught in 18th- and 19th-century algebra textbooks owes more to Newton than to Rolle. Rolle is best known for Rolle's theorem in differential calculus. Rolle had used the result in 1690, and he proved it (by the standards of the time) in 1691. Given his animosity to infinitesimals it is fitting that the result was couched in terms of algebra rather than analysis. Only in the 18th century was the theorem interpreted as a fundamental result in differential calculus. Indeed, it is needed to prove both the mean value theorem and the existence of

Taylor series In mathematics, the Taylor series or Taylor expansion of a function is an infinite sum of terms that are expressed in terms of the function's derivatives at a single point. For most common functions, the function and the sum of its Taylor serie ...

. As the importance of the theorem grew, so did the interest in identifying the origin, and it was finally named ''Rolle's theorem'' in the 19th century. Barrow-Green remarks that the theorem might well have been named for someone else had not a few copies of Rolle's 1691 publication survived.

Critique of infinitesimal calculus

In a criticism of

that predated George Berkeley's, Rolle presented a series of papers at the French academy, alleging that the use of the methods of infinitesimal calculus leads to errors. Specifically, he presented an explicit algebraic curve, and alleged that some of its local minima are missed when one applies the methods of infinitesimal calculus. Pierre Varignon responded by pointing out that Rolle had misrepresented the curve, and that the alleged local minima are in fact singular points with a vertical tangent..

References

Bibliography

* * * * Rolle, Michel (1690). ''Traité d'Algebre''. E. Michallet, Paris. * Rolle, Michel (1691). ''Démonstration d'une Méthode pour resoudre les Egalitez de tous les degrez''.

External links

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Michel Rolle Biography
{{DEFAULTSORT:Rolle, Michel 1652 births 1719 deaths History of calculus Members of the French Academy of Sciences 17th-century French mathematicians 18th-century French mathematicians