Vincenzo Riccati

 ( 1707 Births ) 

Vincenzo Riccati (Castelfranco Veneto, 11 January 1707 – Treviso, 17 January 1775) was a Venetian Catholic priest, mathematician, and physicist. He is credited with introducing hyperbolic functions.Bradley, Robert E.; D'Antonio, Lawrence A.; Sandifer, Charles Edward. Euler at 300: an appreciation. Mathematical Association of America, 2007. p. 100.

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Life Vincenzo Riccati was born in 1707 in Castelfranco Veneto, a small town about 30 km north of Padua. He was the brother of Giordano Riccati, and the second son of Jacopo Riccati. Vincenzo Riccati, University of St Andrews, Scotland. He began his studies at the College of St. Francis Xavier in Bologna, under the guidance of Luigi Marchenti, a pupil of the French mathematician Pierre Varignon. He entered the Society of Jesus on December 20, 1726. He taught Belles-lettres in the colleges of the Order in Piacenza (1728), Padua (1729), and Parma (1734). He then went to Rome to study theology. In 1739 he was assigned to the College of St. Francis Xavier of Bologna, where he taught mathematics for thirty years, succeeding his former teacher Luigi Marchenti. He was among the first members of the Italian National Academy of Sciences. In 1760 he was elected Honorary Fellow of the Russian Academy of Sciences.

Riccati's main research continued the work of his father in mathematical analysis, especially in the fields of the differential equations and physics. In 1746 and 1749 Riccati published two works, in which he discussed the question of the parallelogram of forces in the context of the vis viva controversy. In 1752, he published the short treatise De usu motus tractorii in constructione aequationum differentialium, in which he proved that all first-order (ordinary) differential equations conceivable at the time could be constructed using tractional motion.

Riccati's main contributions to mathematics and physics were published in two volumes, Opusculorum ad res physicas mathematicas pertinentium (Bologna, 1757-1762), where he introduced the use of hyperbolic functions. Vincenzo edited, in collaboration with his brother Giordano, the Works of his father and published, in collaboration with his friend and student Girolamo Saladini, the three-volume treatise Institutiones analyticae, an important textbook on calculus printed in Bologna in 1765-67. Ten years later Saladini produced an Italian translation of the work under the title Instituzioni Analitiche. Riccati's Institutiones analyticae is the fullest 18th-century Italian treatise on analytic methods in mathematics.

After the suppression of the Society of Jesus, Riccati retired to his family home in Treviso, where he died on January 17, 1775. Riccati was a friend and correspondent of Maria Gaetana Agnesi and Ramiro Rampinelli.

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Contributions His contributions were in hyperbolic functions for solutions of cubics, their derivatives and exponential fiunctions. Lambert is sometimes incorrectly credited as the first to introduce the hyperbolic functions, however, he did this subsequent to Riccati's contributions in 1770. Riccati not only introduced these new functions but also derived the integral formulas connected with them. He then went on to derive the integral formulas for the trigonometric functions. Riccati with Saladini also worked on the , which was first postulated by Grandi. Like his father, Vincenzo Riccati was skilled in hydraulic engineering. His efforts and implementations of flood control projects saved the regions around Venice and Bologna.

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Riccati's hyperbolic addition laws Vincenzo Riccati (1757) introduced hyperbolic functions cosh and sinh, which he denoted as Ch. and Sh. related by $Ch.^\{2\}-Sh.^\{2\}=r^2$ with r being set to unity in modern publications, and formulated the addition laws of hyperbolic sine and cosine:

$\backslash begin\{matrix\}CA=r,\backslash \; CB=Ch.\backslash varphi,\backslash \; BE=Sh.\backslash varphi,\backslash \; CD=Ch.\backslash pi,\backslash \; DF=Sh.\backslash pi\backslash \backslash$

CM=Ch.\overline{\varphi+\pi},\ MN=Sh.\overline{\varphi+\pi}\\ CK=\frac{r}{\sqrt{2}},\ CG=\frac{Ch.\varphi+Sh.\varphi}{\sqrt{2}},\ CH=\frac{Ch.\pi+Sh.\pi}{\sqrt{2}},\ CP=\frac{Ch.\overline{\varphi+\pi}+Sh.\overline{\varphi+\pi}}{\sqrt{2}}\\ CK:CG::CH:CP\\ \leftCh.^{2}-Sh.^{2}=rr\right\\ \hline Ch.\overline{\varphi+\pi}=\frac{Ch.\varphi\,Ch.\pi+Sh.\varphi\,Sh.\pi}{r}\\ Sh.\overline{\varphi+\pi}=\frac{Ch.\varphi\,Sh.\pi+Ch.\pi\,Sh.\varphi}{r} \end{matrix}

He furthermore showed that $Ch.\backslash overline\{\backslash varphi-\backslash pi\}$ and $Sh.\backslash overline\{\backslash varphi-\backslash pi\}$ follow by setting $Ch.\backslash pi\backslash Rightarrow\; Ch.-\backslash pi$ and $Sh.\backslash pi\backslash Rightarrow\; Sh.-\backslash pi$ in the above formulas.

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Works

• Lettera di Vicenzio Riccati della Compagnia di Gesù alla Signora D. Gaetana Maria Agnesi intorno alla costruzione di alcune formule senza la separazione delle indeterminate. In: Gori, Antonio Francesco (ed.), Symbolae litterariae opuscula varia, vol. 10, Florence, 1753, pp. 62–72.
• Dialogo, dove ne' congressi di più giornate delle forze vive e dell'azioni delle forze morte si tien discorso, Bologna, 1749

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See also

• Johann Heinrich Lambert
• Girolamo Saladini
• List of Roman Catholic scientist-clerics

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Bibliography

• Danilo Capecchi (2025). 9788847020566, Springer. ISBN 9788847020566

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External links

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