Isaac Newton and Natural PhilosophyIsaac Newton is one of the greatest scientists in history, yet the spectrum of his interests was much broader than that of most contemporary scientists. In fact, Newton would have defined himself not as a scientist, but as a natural philosopher. He was deeply involved in alchemical, religious, and biblical studies, and in the later part of his life he played a prominent role in British politics, economics, and the promotion of scientific research. Newton’s pivotal work Philosophiæ Naturalis Principia Mathematica, which sets out his laws of universal gravitation and motion, is regarded as one of the most important works in the history of science. Niccolò Guicciardini’s enlightening biography offers an accessible introduction both to Newton’s celebrated research in mathematics, optics, mechanics, and astronomy and to how Newton viewed these scientific fields in relation to his quest for the deepest secrets of the universe, matter theory and religion. Guicciardini sets Newton the natural philosopher in the troubled context of the religious and political debates ongoing during Newton’s life, a life spanning the English Civil Wars, the Restoration, the Glorious Revolution, and the Hanoverian succession. Incorporating the latest Newtonian scholarship, this fast-paced biography broadens our perception of both this iconic figure and the great scientific revolution of the early modern period. |
From inside the book
Results 1-5 of 31
Page 13
... problem. The spine of the Bible can be seen on the far left, representing the reconciliation between science and faith. Louis-Gabriel Blanchet, The Fathers François Jacquier and Thomas Le Seur Working in Their Room at Trinità dei Monti ...
... problem. The spine of the Bible can be seen on the far left, representing the reconciliation between science and faith. Louis-Gabriel Blanchet, The Fathers François Jacquier and Thomas Le Seur Working in Their Room at Trinità dei Monti ...
Page 44
... problems of geometry'. In the Géométrie Descartes had explained how 'equations' could be used in the process of geometrical problem solving. Indeed, problems in geometry, since Euclid's times, had been solved by means of geometrical ...
... problems of geometry'. In the Géométrie Descartes had explained how 'equations' could be used in the process of geometrical problem solving. Indeed, problems in geometry, since Euclid's times, had been solved by means of geometrical ...
Page 45
... problems by algebraic means, mathematicians such as Viète, Fermat and Descartes had to overcome conceptual obstacles ... problems. There were, however, lacunae and unresolved problems in the Géométrie. Most disappointingly, Descartes had ...
... problems by algebraic means, mathematicians such as Viète, Fermat and Descartes had to overcome conceptual obstacles ... problems. There were, however, lacunae and unresolved problems in the Géométrie. Most disappointingly, Descartes had ...
Page 46
... problem on motion). Mechanical curves also occurred as solutions of problems concerning the area of curvilinear surfaces. Most notably, it was known that the area bounded by a hyperbola is expressed by the logarithmic curve. The ...
... problem on motion). Mechanical curves also occurred as solutions of problems concerning the area of curvilinear surfaces. Most notably, it was known that the area bounded by a hyperbola is expressed by the logarithmic curve. The ...
Page 47
... problem solving was confined to the use of finite magnitudes (such as finite segments) expressed by 'finite' equations (that is, equations with a finite number of terms). Wallis, instead, had conceived finite curvilinear surfaces as ...
... problem solving was confined to the use of finite magnitudes (such as finite segments) expressed by 'finite' equations (that is, equations with a finite number of terms). Wallis, instead, had conceived finite curvilinear surfaces as ...
Contents
7 | |
22 | |
42 | |
3 A Young Professor and His Audience 16691674 | 76 |
4 A Maturing Scholar 16751683 | 102 |
5 Natural Philosopher 16841695 | 143 |
6 The Last Years 16961727 | 180 |
Chronology | 233 |
References | 237 |
Bibliography | 253 |
Acknowledgements | 257 |
Photo Acknowledgements | 259 |
Index | 261 |
Other editions - View all
Common terms and phrases
absolute space according to Newton alchemical alchemist algebra ancient anti-Trinitarian astronomical Barrow Bentley biblical bodies Boyle calculus Cambridge Cartesian Catholic causes century chronology Church colours comets Commercium conception contemporaries corpuscles corpuscular correspondence cosmology curves defended Descartes distance divine Earth edition Edmond Halley ematical England ether experimental experiments experimentum crucis fact Fatio geometry Glorious Revolution God’s Halley Hooke Hooke’s Huygens Hypothesis idea illus infinite number Isaac Barrow Isaac Newton Johann Bernoulli John Kepler King’s laws of motion Leibniz London Lucasian Lectures magnetic manuscripts mathematicians matter mechanical philosophy metals metaphysical method method of fluxions Micrographia natural philosophy Newton’s early Newton’s mathematical Newtonian observed Opticks optics orbit particles phenomena planetary motion planets political Principia principles prism problems published Queries refraction religion religious Robert Boyle Royal Society Scholium soul stars Stephen Snobelen surface telescope texts theological theory of colours tion trajectories University white light