Timeline of calculus and mathematical analysis
A timeline of calculus and mathematical analysis .
500BC to 1600
5th century BC - The Zeno's paradoxes ,
5th century BC - Antiphon attempts to square the circle ,
5th century BC - Democritus finds the volume of cone is 1/3 of volume of cylinder ,
4th century BC - Eudoxus of Cnidus develops the method of exhaustion ,
3rd century BC - Archimedes displays geometric series in The Quadrature of the Parabola . Archimedes also discovers a method which is similar to differential calculus.[ 1]
3rd century BC - Archimedes develops a concept of the indivisibles—a precursor to infinitesimals —allowing him to solve several problems using methods now termed as integral calculus . Archimedes also derives several formulae for determining the area and volume of various solids including sphere , cone , paraboloid and hyperboloid .[ 2]
Before 50 BC - Babylonian cuneiform tablets show use of the Trapezoid rule to calculate of the position of Jupiter.[ 3]
3rd century - Liu Hui rediscovers the method of exhaustion in order to find the area of a circle .
4th century - The Pappus's centroid theorem ,
5th century - Zu Chongzhi established a method that would later be called Cavalieri's principle to find the volume of a sphere .
600 - Liu Zhuo is the first person to use second-order interpolation for computing the positions of the sun and the moon.[ 4]
665 - Brahmagupta discovers a second order Newton-Stirling interpolation for
sin
-->
(
x
+
ϵ ϵ -->
)
{\displaystyle \sin(x+\epsilon )}
,
862 - The Banu Musa brothers write the "Book on the Measurement of Plane and Spherical Figures" ,
9th century - Thābit ibn Qurra discusses the quadrature of the parabola and the volume of different types of conic sections .[ 5]
12th century - Bhāskara II discovers a rule equivalent to Rolle's theorem for
sin
-->
x
{\displaystyle \sin x}
,
14th century - Nicole Oresme proves of the divergence of the harmonic series ,
14th century - Madhava discovers the power series expansion for
sin
-->
x
{\displaystyle \sin x}
,
cos
-->
x
{\displaystyle \cos x}
,
arctan
-->
x
{\displaystyle \arctan x}
and
π π -->
/
4
{\displaystyle \pi /4}
[ 6] [ 7] This theory is now well known in the Western world as the Taylor series or infinite series.[ 8]
14th century - Parameshvara discovers a third order Taylor interpolation for
sin
-->
(
x
+
ϵ ϵ -->
)
{\displaystyle \sin(x+\epsilon )}
,
1445 - Nicholas of Cusa attempts to square the circle,
1501 - Nilakantha Somayaji writes the Tantrasamgraha , which contains the Madhava's discoveries,
1548 - Francesco Maurolico attempted to calculate the barycenter of various bodies (pyramid, paraboloid, etc.),
1550 - Jyeshtadeva writes the Yuktibhāṣā , a commentary to Nilakantha's Tantrasamgraha ,
1560 - Sankara Variar writes the Kriyakramakari ,
1565 - Federico Commandino publishes De centro Gravitati ,
1588 - Commandino 's translation of Pappus ' Collectio gets published,
1593 - François Viète discovers the first infinite product in the history of mathematics,
17th century
1606 - Luca Valerio applies methods of Archimedes to find volumes and centres of gravity of solid bodies,
1609 - Johannes Kepler computes the integral
∫ ∫ -->
0
θ θ -->
sin
-->
x
d
x
=
1
− − -->
cos
-->
θ θ -->
{\displaystyle \int _{0}^{\theta }\sin x\ dx=1-\cos \theta }
,
1611 - Thomas Harriot discovers an interpolation formula similar to Newton's interpolation formula ,
1615 - Johannes Kepler publishes Nova stereometria doliorum ,
1620 - Grégoire de Saint-Vincent discovers that the area under a hyperbola represented a logarithm ,
1624 - Henry Briggs publishes Arithmetica Logarithmica ,
1629 - Pierre de Fermat discovers his method of maxima and minima, precursor of the derivative concept,
1634 - Gilles de Roberval shows that the area under a cycloid is three times the area of its generating circle,
1635 - Bonaventura Cavalieri publishes Geometria Indivisibilibus ,
1637 - René Descartes publishes La Géométrie ,
1638 - Galileo Galilei publishes Two New Sciences ,
1644 - Evangelista Torricelli publishes Opera geometrica ,
1644 - Fermat's methods of maxima and minima published by Pierre Hérigone ,
1647 - Cavalieri computes the integral
∫ ∫ -->
0
a
x
n
d
x
=
1
n
+
1
a
n
+
1
{\displaystyle \int _{0}^{a}x^{n}\ dx={\frac {1}{n+1}}a^{n+1}}
,
1647 - Grégoire de Saint-Vincent publishes Opus Geometricum ,
1650 - Pietro Mengoli proves of the divergence of the harmonic series,
1654 - Johannes Hudde discovers the power series expansion for
ln
-->
(
1
+
x
)
{\displaystyle \ln(1+x)}
,
1656 - John Wallis publishes Arithmetica Infinitorum ,
1658 - Christopher Wren shows that the length of a cycloid is four times the diameter of its generating circle,
1659 - Second edition of Van Schooten 's Latin translation of Descartes' Geometry with appendices by Hudde and Heuraet ,
1665 - Isaac Newton discovers the generalized binomial theorem and develops his version of infinitesimal calculus ,
1667 - James Gregory publishes Vera circuli et hyperbolae quadratura ,
1668 - Nicholas Mercator publishes Logarithmotechnia ,
1668 - James Gregory computes the integral of the secant function ,
1670 - Isaac Newton rediscovers the power series expansion for
sin
-->
x
{\displaystyle \sin x}
and
cos
-->
x
{\displaystyle \cos x}
(originally discovered by Madhava ),
1670 - Isaac Barrow publishes Lectiones Geometricae ,
1671 - James Gregory rediscovers the power series expansion for
arctan
-->
x
{\displaystyle \arctan x}
and
π π -->
/
4
{\displaystyle \pi /4}
(originally discovered by Madhava ),
1672 - René-François de Sluse publishes A Method of Drawing Tangents to All Geometrical Curves ,
1673 - Gottfried Leibniz also develops his version of infinitesimal calculus ,
1675 - Isaac Newton invents a Newton's method for the computation of roots of a function,
1675 - Leibniz uses the modern notation for an integral for the first time,
1677 - Leibniz discovers the rules for differentiating products , quotients , and the function of a function .
1683 - Jacob Bernoulli discovers the number e ,
1684 - Leibniz publishes his first paper on calculus,
1686 - The first appearance in print of the
∫ ∫ -->
{\displaystyle \int }
notation for integrals,
1687 - Isaac Newton publishes Philosophiæ Naturalis Principia Mathematica ,
1691 - The first proof of Rolle's theorem is given by Michel Rolle ,
1691 - Leibniz discovers the technique of separation of variables for ordinary differential equations ,
1694 - Johann Bernoulli discovers the L'Hôpital's rule ,
1696 - Guillaume de L'Hôpital publishes Analyse des Infiniment Petits , the first calculus textbook,
1696 - Jakob Bernoulli and Johann Bernoulli solve the brachistochrone problem , the first result in the calculus of variations .
18th century
1711 - Isaac Newton publishes De analysi per aequationes numero terminorum infinitas ,
1712 - Brook Taylor develops Taylor series ,
1722 - Roger Cotes computes the derivative of sine function in his Harmonia Mensurarum ,
1730 - James Stirling publishes The Differential Method ,
1734 - George Berkeley publishes The Analyst ,
1734 - Leonhard Euler introduces the integrating factor technique for solving first-order ordinary differential equations,
1735 - Leonhard Euler solves the Basel problem , relating an infinite series to π,
1736 - Newton's Method of Fluxions posthumously published,
1737 - Thomas Simpson publishes Treatise of Fluxions ,
1739 - Leonhard Euler solves the general homogeneous linear ordinary differential equation with constant coefficients ,
1742 - Modern definion of logarithm by William Gardiner ,
1742 - Colin Maclaurin publishes Treatise on Fluxions ,
1748 - Euler publishes Introductio in analysin infinitorum ,
1748 - Maria Gaetana Agnesi discusses analysis in Instituzioni Analitiche ad Uso della Gioventu Italiana ,
1762 - Joseph Louis Lagrange discovers the divergence theorem ,
1797 - Lagrange publishes Théorie des fonctions analytiques ,
19th century
1807 - Joseph Fourier announces his discoveries about the trigonometric decomposition of functions ,
1811 - Carl Friedrich Gauss discusses the meaning of integrals with complex limits and briefly examines the dependence of such integrals on the chosen path of integration,
1815 - Siméon Denis Poisson carries out integrations along paths in the complex plane,
1817 - Bernard Bolzano presents the intermediate value theorem — a continuous function which is negative at one point and positive at another point must be zero for at least one point in between,
1822 - Augustin-Louis Cauchy presents the Cauchy integral theorem for integration around the boundary of a rectangle in the complex plane ,
1825 - Augustin-Louis Cauchy presents the Cauchy integral theorem for general integration paths—he assumes the function being integrated has a continuous derivative , and he introduces the theory of residues in complex analysis ,
1825 - André-Marie Ampère discovers Stokes' theorem ,
1828 - George Green introduces Green's theorem ,
1831 - Mikhail Vasilievich Ostrogradsky rediscovers and gives the first proof of the divergence theorem earlier described by Lagrange, Gauss and Green,
1841 - Karl Weierstrass discovers but does not publish the Laurent expansion theorem ,
1843 - Pierre-Alphonse Laurent discovers and presents the Laurent expansion theorem,
1850 - Victor Alexandre Puiseux distinguishes between poles and branch points and introduces the concept of essential singular points ,
1850 - George Gabriel Stokes rediscovers and proves Stokes' theorem ,
1861 - Karl Weierstrass starts to use the language of epsilons and deltas,
1873 - Georg Frobenius presents his method for finding series solutions to linear differential equations with regular singular points ,
20th century
See also
References
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