A History of MechanicsRoutledge & Paul, 1957 - 671 стор. |
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Результати 1-3 із 79
Сторінка 485
... space . Undoubtedly this was because the reduced trans- formation in which the plane ( x ' , t ' ) covers the plane ( x , t ) can be inter- preted by keeping the same direction in space for the axis of x . To meddle with the concept of ...
... space . Undoubtedly this was because the reduced trans- formation in which the plane ( x ' , t ' ) covers the plane ( x , t ) can be inter- preted by keeping the same direction in space for the axis of x . To meddle with the concept of ...
Сторінка 533
... space of n dimensions in an euclidean space of dimensions . 2 However , as this theorem is only concerned with a local realisation , it is preferable to consider a Riemann space as given in itself . 99 The notion of tangent euclidean space ...
... space of n dimensions in an euclidean space of dimensions . 2 However , as this theorem is only concerned with a local realisation , it is preferable to consider a Riemann space as given in itself . 99 The notion of tangent euclidean space ...
Сторінка 612
... space variables . The determination of eigen- values is set in the domain of space ; the mean values A themselves are obtained by an integration in space . Clearly such definitions are not relativistic . It would be necessary to make use of ...
... space variables . The determination of eigen- values is set in the domain of space ; the mean values A themselves are obtained by an integration in space . Clearly such definitions are not relativistic . It would be necessary to make use of ...
Зміст
Nicholas Copernicus 14721543 His system of the world | 5 |
The priority of Herman and Euler in the matter of dAlemberts | 6 |
Transformation of Maxwells equations including convection | 11 |
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Загальні терміни та фрази
acceleration Albert of Saxony Archimedes Aristotle assumed axis Bernoulli Blasius of Parma Carnot centre of gravity classical mechanics concept conservation considered coordinates d'Alembert Daniel Bernoulli deduced Descartes differential direction displacement distance Duhem dynamics Earth Einstein elastic electron energy equal equations equilibrium Euler experiment fall Fermat fluid function Galileo generalised given heavy body Huyghens hypothesis impact impetus inclined plane inertia instant Jean Bernoulli Kepler Lagrange least action Leibniz length Leonardo lever living forces Louis de Broglie mass Maupertuis means moving body natural necessary Newton observation obtained Oresme oscillation particle pendulum physical problem projectile proportional Proposition quantity of motion quantum mechanics ratio relation relative resistance rest Roberval rotation solution space sphere statics supposed surface theory trajectory travelled treatise uniformly variables velocity vertical wave weight XIIIth Century ди ду дх