Quite often people become priests to escape poverty but Carré preferred to fall into indigence rather than become a priest.Carré could not remain at university without the financial support of his father so he was forced to leave and seek employment. However, he was fortunate for he managed to avoid poverty by becoming an amanuensis to the philosopher Nicolas Malebranche who was professor of mathematics at the Congregation of the Oratory in Paris. In particular, Carré now had a home, living with Malebranche who became his friend as well as his employer. The group which Malebranche had built up at the Oratory in Paris was the leading one in France at the time containing mathematicians such as Pierre Varignon, Guillaume De l'Hôpital and Charles René Reyneau. It was in this remarkable atmosphere of learning and scholarship that Carré, who was in many ways a country lad lacking in the ways of sophisticated Paris, was taught mathematics and metaphysics by Malebranche. He spent seven years as Malebranche's secretary which gave Carré the equivalent of a university education. He then remained in Paris, becoming a popular teacher giving private lessons. However, he was rather unusual in that the majority of his pupils were women who, unable to obtain a university education, turned to private lessons. Many of his female pupils were nuns. Carré :-
... employed himself in teaching mathematics and philosophy at Paris. In this new employment he had several pupils of the fair sex, for whose talents he seems to have entertained a very uncommon, or rather an extravagant degree of respect, when he estimated female genius as higher than that or the other sex. The language of Carré being rather unpolished and ungrammatical, one of his fair pupils offered to give him lessons in French, in return for his philosophical instructions. Carré cheerfully accepted the offer, and often acknowledged himself greatly indebted to the instructions which he then received.At this stage, Carré seems to have been interested mainly in philosophy and, other than teaching mathematics, did not take much interest in current mathematical research. However, on 4 February 1699, Pierre Varignon admitted him as one of his éleves in the Academy of Sciences. This stimulated Carré's interest in mathematics and, from this time on, he began working hard on writing a calculus text. This book was, in particular, devoted to applications of the integral calculus. The book entitled Une methode pour Ia mesure des surfaces, la dimension des solides, leurs centres de pesanteur, de percussion et d'oscillation par l'application du calcul intégral Ⓣ, was published in 1700. His Preface to this work begins as follows:-
Never has Science grown as in the century which we are in, and we can say that we have only made so much progress, especially in mathematics, that we have in all ages except through the studies of the most sublime minds. Also they have brought us to such a degree of perfection, it will require in the future a man of rare and extraordinary genius to make new discoveries. The greatest achievement we have made until now is probably the Differential Calculus, which consists as one knows in descending to quantities with infinitely small differences to discover their nature, and the nature of those variables of which they are differences.However, the book did contain errors (most of which were corrected in a second edition) and one of these errors is discussed in detail in . The formula for the centre of oscillation of a rigid compound pendulum, originally derived by Huygens in his Horologium oscillatorium Ⓣ (1673), requires certain integrations to be performed. Early authors of calculus texts discussed the problem and computed the value of the centre of oscillation for several solids. In Une methode pour Ia mesure des surfaces Ⓣ, the first French textbook on the integral calculus, Carré made a mistake in calculating the integral for the moment of inertia of a cone suspended from its vertex, a mistake that led to an incorrect expression for the centre of oscillation of the cone. This error was only one of several which he made in this book. Although leading mathematicians such as Johann Bernoulli were aware of weaknesses in Carré's book, his error was never publicly identified and indeed was carried over into the textbooks Treatise on Fluxions, or an Introduction to Mathematical Philosophy (1704) by Charles Hayes (1678-1760), and The Method of Fluxions, both Direct and Inverse (1730) by Edmund Stone. Lenore Feigenbaum explains that the story of Carré's mistake and the subsequent propagation of his error in eighteenth-century calculus textbooks :-
... is instructive in several regards: first, in showing how some of the methods of the calculus were interpreted and absorbed during the early 18th century; second, in shedding light on the nature of the textbook industry of the time; and finally, in providing us with a modicum of historical sympathy when we find our own students making the same kind of mistakesGeorge Campbell translated Carré's book into English as Method for finding the mensuration of surfaces, the dimension of solids, their centres of gravity, percussion and oscillation and the manuscript was owned by Robert Venables. It was later bought by John Thomas Graves, professor at University College London, and is now in the library of University College, being bequeathed with the rest of Graves' library in 1870.
Between 1701 and 1705, Carré published over a dozen papers on a variety of mathematical and physical subjects: Méthode pour la rectification des lignes courbes par les tangentes Ⓣ (1701); Solution du problème proposé aux Géomètres dans les mémoires de Trévoux, des mois de Septembre et d'Octobre Ⓣ (1701); Réflexions ajoutées par M Carré à la Table des Equations Ⓣ (1701); Observation sur la cause de la réfraction de la lumière Ⓣ (1702); Pourquoi les marées vont toujours en augmentant depuis Brest jusqu'à Saint-Malo, et en diminuant le long des côtes de Normandie Ⓣ (1702); Nombre et noms des instruments de musique Ⓣ (1702); Observations sur la vinaigre qui fait rouler de petites pierres sur un plan incline Ⓣ (1703); Observation sur la rectification des caustiques par réflexions formées par le cercle, la cycloïde ordinaire, et la parabole, et de leurs développées, avec la mesure des espaces qu'elle renferment Ⓣ (1703); Méthode pour la rectification des courbes Ⓣ (1704); Observation sur ce qui produit le son Ⓣ (1704); Examen d'une courbe formée par le moyen du cercle Ⓣ (1705); Expériences physiques sur la réfraction des balles de mousquet dans l'eau, et sur la résistance de ce fluide Ⓣ (1705); and Problème d'hydrodynamique sur la proportion des tuyaux pour avoir une quantité d'eau déterminée Ⓣ. (1705)
This level of activity led to him being admitted to the Academy of Sciences as an Associate Mechanician on 15 February 1702 and being promoted to Pensioner on 18 August 1706. This provided him with an income which allowed him to devote himself entirely to his academic studies during the final five years of his life. At age 46 he suffered an attack of dyspepsia from which he died in 1711.
Article by: J J O'Connor and E F Robertson