![]() ![]() Bohr noticed that this classical result yields the correct quantum-theoretical result for the light frequency in a transition from one energy level to another, provided the derivative is replaced by the difference in the energies. The frequency of the classical motion for any particular degree of freedom is given by the partial derivative of the energy function with respect to the corresponding action. Each degree of freedom accumulates its own classical action-integral. The classical motions in simple dynamical systems can be understood as composed of independent partial motions, each with its own degree of freedom. Bohr in the early 1920s as a set of rules for understanding the spectra of simple atoms and molecules. Correspondence principleĪ fundamental hypothesis according to which classical mechanics can be understood as a limiting case of quantum mechanics or conversely, many characteristic features in quantum mechanics can be approximated on the basis of classical mechanics, provided classical mechanics is properly reinterpreted. The Columbia Electronic Encyclopedia™ Copyright © 2022, Columbia University Press. The correspondence principle provided an important theoretical basis for the development of a detailed correlation between the newer quantum theory and the classical physics that preceded it. Ordinarily the quantum theory is used to describe the behavior of bodies that are so small that they cannot be seen under an optical microscope, while the theories of classical physics are used to analyze the behavior of large-scale bodies. Such correspondence is known as the classical limit of the quantum theory. ![]() Technically this principle means that the results of a quantum theory analysis of a problem that involves the use of very large quantum numbers must agree with the results of a classical physics analysis. Thus Bohr's correspondence principle is established.Correspondence principle, physical principle, enunciated by Niels Bohr in 1923, according to which the predictions of the quantum theory must correspond to the predictions of the classical theories of physics when the quantum theory is used to describe the behavior of systems that can be successfully described by classical theories. Calculations show that for quantum number number n as large as 10000, the difference in v and f is less than 0.015%. Lim i t n → ∞=(Clasical Physics)įor example, quantum condition for emission of radiation is h v = E i − E fĪnd Maxwell's classical theory says that an electron revolving with orbital frequency f must radiate light waves of frequency f. We may thereofore rewrite Bohr's correspondence principle as: However, the probability of finding the electron is high near the Bohr orbit radius, and at the same time, the probability of finding the electron between these orbits is not zero.Īccording to Bohr's correspondence principle, the predictions of quantum theory must corresponds to the predictions of classical theory in the regions of sizes where classical theory must corresponds to the predictions of classical theory in the regions of sizes where classical theory holds.įor large size wherein classical theory holds good, quantum number n becomes large. According to this model, electrons in an atom do not move around the nucleus in definite orbits. ![]() ![]() As is know, Bohr's atom model has been replaced by quantum machanical model. ![]()
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