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The Heisenberg Uncertainty Principle. Inderjit Singh. Heisenberg realized that. In the world of very small particles, one cannot measure any property of a particle without interacting with it in some way This introduces an unavoidable uncertainty into the result
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The Heisenberg Uncertainty Principle Inderjit Singh
Heisenberg realized that ... • In the world of very small particles, one cannot measure any property of a particle without interacting with it in some way • This introduces an unavoidable uncertainty into the result • One can never measure all the properties exactly
Measuring Position and Momentum of an Electron • Shine light on electron and detectreflected light using a microscope • Minimum uncertainty in position is given by the wavelength of the light • So to determine the Position accurately, it is necessary to use light with a short wavelength BEFORE ELECTRON-PHOTON COLLISION incidentphoton electron
Measuring Position and Momentum of an Electron • By Planck’s law E = hc/λ, a photon with a short wavelength has a large energy • Thus, it would impart a large ‘kick’ to the electron • But to determine its momentum accurately, electron must only be given a small kick • This means using light of long wavelength ! AFTER ELECTRON-PHOTON COLLISION scatteredphoton recoiling electron
Implications • It is impossible to know both the position and momentum exactly, i.e., Δx=0 and Δp=0 • These uncertainties are inherent in the physical world and have nothing to do with the skill of the observer • Because h is so small, these uncertainties are not observable in normal everyday situations
Example of Baseball • A pitcher throws a 0.1-kg baseball at 40 m/s • So momentum is 0.1 x 40 = 4 kg m/s • Suppose the momentum is measured to an accuracy of 1 percent , i.e., Δp = 0.01p = 4 x 10-2 kg m/s
Example of Baseball (cont’d) • The uncertainty in position is then • No wonder one does not observe the effects of the uncertainty principle in everyday life!
Example of Electron • Same situation, but baseball replaced by an electron which has mass 9.11 x 10-31 kg traveling at 40 m/s • So momentum = 3.6 x 10-29 kg m/s and its uncertainty = 3.6 x 10-31 kg m/s • The uncertainty in position is then
Classical World • The observer is objective and passive • Physical events happen independently of whether there is an observer or not • This is known as objective reality
Role of an Observer in Quantum Mechanics • The observer is not objective and passive • The act of observation changes the physical system irrevocably • This is known as subjective reality
The Heisenberg Uncertainty Principle • Whenever a measurement is made there is always some uncertainty • Quantum mechanics limits the accuracy of certain measurements because of wave –particle duality and the resulting interaction between the target and the detecting instrument
4. The Heisenberg’s uncertainty principle • In the example of a free particle, we see that if its momentum is completely specified, then its position is completely unspecified • When the momentum p is completely specified we write: (because: and when the position x is completely unspecified we write: • In general, we always have: This constant is known as: (called h-bar) h is the Planck’s constant
So we can write: That is the Heisenberg’s uncertainty principle “ it is impossible to know simultaneously and with exactness both the position and the momentum of the fundamental particles” N.B.: •We also have for the particle moving in three dimensions • With the definition of the constant
Energy Uncertainty The energy uncertainty of a Gaussian wave packet is combined with the angular frequency relation • Energy-Time Uncertainty Principle: .
Derivation - Continued The condition for the formation of the node is that amplitude should be zero or
Derivation - Continued If x1 and x2 be the position of two consecutive nodes, then So that and
Derivation - Continued So uncertainity in measurement of position of the particle (x1-x2)
Physical Origin of the Uncertainty PrincipleHeisenberg (Bohr) Microscope • The measurement itself introduces the uncertainty • When we “look” at an object we see it via the photons that are detected by the microscope • These are the photons that are scattered within an angle 2θ and collected by a lens of diameter D • Momentum of electron is changed • Consider single photon, this will introduce the minimum uncertainty
(a)Limitation in determing the position of electron =half angle subtended by the objective at the object i.e. electron
(b)Limitation in determining the momentum of the electron If photon is scattered along OQ,Then
Applications of Heisenberg uncertainty Principle-Non existence of electron in the nucleus Size of Nucleus =10-14 m If electron is present in the nucleus uncertainty in the position of electron is =10-14 m
The minimum momentum of the electron must be at least equal to uncertainty in momentum
Zero point Energy or minimum energy of a particle in the box The minimum energy of a system at 0K is called zero point energy. Let a particle of mass m0 is moving in a one dimensional box of length L So uncertainty of the position of the particle in the box Δx=L Uncertainty in the momentum Δp h/Δx = h/L
Minimum energy of a particle in the box Minimum momentum of the particle is at least equal to uncertainty in momentum p=Δp=ℏ/L K.E. of the particle is =p2 /2m0 =(Δp)2 /2m0 K.E.=ℏ/ 2m0 L2 This is the energy of the particle. Because the energy of the system is minimum at 0K .
Minimum energy of a particle in the box Since the Δp 0 at 0K, So the particle will have some energy even at 0K. This minimum energy is called end point energy. So a particle confined to a region of space cannot have zero energy.
Binding energy of an electron Electron-revolving around the nucleous in an orbit of radius r So uncrtainity in the position of the electron is equal to the radius of the atom Δx=r Uncertainty in the momentum Δp h/Δx = h/r
Binding energy of an electron Minimum momentum of the particle is at least equal to uncertainty in momentum p=Δp=ℏ/r K.E. of the particle is =p2 /2m0 =(Δp)2 /2m0 K.E.=ℏ/ 2m0 r2
Binding energy of an electron The potetial energy of the electron in the field of the nucleus of atomic no Z is
Minimum Energy of the Hermonic Oscillator Consider a mechanical oscillator –spring attached at one end and mass attached at the other end. Classical mechanics-when at rest-energy of the oscillator is zero Quantum mechanics—Energy of the oscillator can never be zero. Let Δx is the displacement of the mass. Uncertainity in position= Δx
Harmonic Oscillator-Continued Uncertainty in the momentum Δp h/Δx Minimum momentum of the particle is at least equal to uncertainty in momentum p=Δp=ℏ/ Δx Energy of the Hermonic oscillator= PE+KE
Heisenberg (Bohr) Microscope As a consequence of momentum conservation Trying to locate electron we introduce the uncertainty of the momentum
Heisenberg (Bohr) Microscope • θ~(D/2)/L, L ~ D/2 θ is distance to lens • Uncertainty in electron position for small θ is • To reduce uncertainty in the momentum, we can either increase the wavelength or reduce the angle • But this leads to increased uncertainty in the position, since
PROBLEM 3 An electron is moving along x axis with the speed of 2×106 m/s (known with a precision of 0.50%). What is the minimum uncertainty with which we can simultaneously measure the position of the electron along the x axis? Given the mass of an electron 9.1×10-31 kg SOLUTION From the uncertainty principle: if we want to have the minimum uncertainty: We evaluate the momentum: The uncertainty of the momentum is: