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Transcript
PHY 102: Waves & Quanta Topic 15 Introduction to Quantum Theory II John Cockburn (j.cockburn@... Room E15) The Uncertainty Principle •One of the fundamental consequences of quantum mechanics is that it is IMPOSSIBLE to SIMULTANEOUSLY determine the POSITION and MOMENTUM of a particle with COMPLETE PRECISION •Can be illustrated by a “thought experiment” known as Heisenberg’s Microscope, using radiation of wavelength λ to “look at” the particle……. Heisenberg Microscope Suppose we have a particle, whose momentum is, initially, precisely known. For convenience assume initial p = 0. “microscope” From wave optics (Rayleigh Criterion, Lecture 8) sin D D From our diagram: y 2 x x sin y 2 2y 2 y x D Δx Heisenberg Microscope 2 y x D Since this is a “thought experiment” we are free from any practical constraints, and we can locate the particle as precisely as we like by using radiation of shorter and shorter wavelengths. “microscope” D y 2 But what are the consequences of this? Δx Heisenberg Microscope In order to see the particle, a photon must scatter off it and enter the microscope. Thus process MUST involve some transfer of momentum to the particle……. “microscope” BUT there is an intrinsic uncertainty in the Xcomponent of the momentum of the scattered photon, since we only know that the photon enters the microscope somewhere within a cone of half angle : Δp =2psin p p By conservation of momentum, there must be the same uncertainty in the momentum of the observed particle…………… Heisenberg Microscope: Summary Uncertainty in position of particle: 2 y x D Can reduce as much as we like by making λ small…… Uncertainty in momentum of particle: 2h D p 2 p photon sin 2y So, if we attempt to reduce uncertainty in position by decreasing λ, we INCREASE the uncertainty in the momentum of the particle!!!!!! Product of the uncertainties in position and momentum given by: 2 y Dh xp 2h D y The Uncertainty Principle Our microscope thought experiment gives us a rough estimate for the uncertainties in position and momentum: xp ~ h “Formal” statement of the Heisenberg uncertainty principle: x p 2 Circular apertures and resolving powers Diffraction effects can, of course be observed with any shape of aperture (see 2nd year optics course). Take circular aperture, for example: Angular radius of bright central spot (Airy disc): sin 1.22 1 D
