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Schrödinger equation |
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Schrödinger equationFundamental equation developed in 1926 by Erwin Schrödinger that established the mathematics of quantum mechanics. The equation determines the behaviour of the wave function that describes the wavelike properties of a subatomic system. It relates kinetic energy and potential energy to the total energy, and it is solved to find the different energy levels of the system. Schrödinger applied the equation to the hydrogen atom and predicted many of its properties with remarkable accuracy. The equation is used extensively in atomic, nuclear, and solid-state physics. See also wave-particle duality. Schrödinger equation [′shrād·iŋ·ər i‚kwā·zhən] (quantum mechanics) A partial differential equation governing the Schrödinger wave function ψ of a system of one or more nonrelativistic particles;h(∂ψ/∂t) =Hψ, whereHis a linear operator, the Hamiltonian, which depends on the dynamics of the system, andhis Planck's constant divided by 2π. How to thank TFD for its existence? Tell a friend about us, add a link to this page, add the site to iGoogle, or visit webmaster's page for free fun content. |
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