1. PHY 102: Lecture 13 13.1 Wave-Particle Duality 13.2 Blackbody Radiation Planck’s Constant 13.3 Photons and Photoelectric Effect 13.4 Photon Momentum Compton Effect 13.5 de Broglie Wavelength Wave Nature of Matter 13.6 Heisenberg Uncertainty Principle

2. PHY 102: Lecture 12 Particles and Waves 12.1 Wave-Particle Duality

3. Wave Interference Ability to exhibit interference effects is an essential characteristic of waves An example is Young’s experiment Light passes through two closely spaced slits and produces a pattern of bright and dark fringes on a screen The fringe pattern is a direct indication that interference is occurring between light waves coming from each slit

4. Particle Interference - 1 20 th century discovery Particles behave like waves and exhibit interference Diagram shows a version of Young’s experiment Beam of electrons are directed onto a double slit Screen glows when an electron strikes it

5. Particle Interference - 2 (a) The pattern that would be seen on the screen if each electron behaved like a particle Each electron were to pass through one slit or the other and strike screen Pattern would consist of an image of each slit

6. Particle Interference - 3 (b) Shows the pattern actually observed Consists of bright and dark fringes Fringe pattern indicates that the electrons are exhibiting interference effects associated with waves

7. Wave-Particle Duality The concept of an electron as a tiny discrete particle of matter does not account for the fact that the electron can behave as a wave in some circumstances The electron exhibits a dual nature, with both particle-like characteristics and wave- like characteristics Waves can exhibit particle-like characteristics, and particles can exhibit wave-like characteristics

8. PHY 102: Lecture 12 Particles and Waves 12.2 Blackbody Radiation; Planck’s Constant

9. Thermal Radiation - 1 All bodies continuously radiate electromagnetic waves (blackbody radiation) We see the glow of very hot objects because they emit electromagnetic waves in the visible region of the spectrum At low temperatures objects emit visible light waves only weakly and do not appear to be glowing

10. Thermal Radiation - 2 At a given temperature, the intensities of the electromagnetic waves emitted by an object vary by wavelength The two curves show that at a higher temperature the maximum emitted intensity per unit wavelength increases Also shifts to shorter wavelengths

11. Max Planck (1858 – 1947) 1900 German Explained the thermal radiation curves Took first step toward understanding of the wave-particle duality

12. Planck’s Explanation Use a model Blackbody is a large number of atomic oscillators Each emits and absorbs electromagnetic waves Assumed that the energy E of an atomic oscillator could have only discrete values E = 0, hf, 2hf, 3hf,… E = nhf n = 0, 1, 2, 3, … f is the frequency of vibration

13. Planck’s Constant h is Planck’s constant h = 6.62606876 x 10 -34 Js

14. Quantized Energy Radical feature of Planck’s assumption Energy of an atomic oscillator could have only discrete values hf, 2hf, 3hf, … Energies in between these values are forbidden Whenever the energy of a system can have only certain definite values and nothing in between the energy is quantized

15. Quantized Electromagnetic Energy Conservation of energy requires that the energy carried off by the radiated electromagnetic waves must equal the energy lost by the atomic oscillators For example, an oscillator with an energy of 3hf emits an electromagnetic wave Next smallest allowed value for the energy of the oscillator is 2hf Energy carried off by the electromagnetic wave would have the value of hf

16. PHY 102: Lecture 12 Particles and Waves 12.3 Photons and Photoelectric Effect

17. Photons Electromagnetic waves are composed of particle-like entities called photons Energy = E = hf Momentum = p = h/

18. Photoelectric Effect - 1 Experimental evidence that light consists of photons comes from the photoelectric effect Electrons are emitted from a metal surface when light shines on it Electrons are emitted if the light has a sufficiently high frequency

19. Photoelectric Effect - 2 Ejected electrons move toward a positive electrode called the collector This causes a current to register on the ammeter The electrons are ejected with the aid of light They are called photoelectrons

20. Photoelectric Effect - 3 In 1905 Einstein presented an explanation of the photoelectric Einstein proposed that light of frequency f could be regarded as a collection of discrete packets of energy (photons) Each packet containing an amount of energy given by E = hf h is Planck’s constant

21. Photoelectric Effect - 4 Einstein explained that when light shines on a metal, a photon can give up its energy to an electron in the metal If the photon has enough energy to do the work of removing the electron from the metal, the electron can be ejected Work required depends on how strongly the electron is held For least strongly held electrons, the work has a minimum value W 0, called work function

22. Photoelectric Effect - 5 If a photon has energy in excess of the work needed to remove an electron, the excess appears as kinetic energy of the ejected electron

23. Photoelectric Effect Equation Photon energy = Max. KE of ejected electron + Min. work to eject electron hf = KE max + W 0 KE max = hf – W 0 If KE max = 0 then hf 0 = W 0 W 0 is the work function

24. Problem 1 - 1 In converting electrical energy into light energy, a sixty-watt incandescent light bulb operates at about 2.1% efficiency Assuming that all the light is green (vacuum wavelength = 5.55 x 10 -7 m) Determine the number of photons per second given off by the bulb

25. Problem 1 - 2 At an efficiency of 2.1% the light energy emitted per second by a sixty-watt bulb is (0.021)(60.0 J/s) = 1.3 J/s The energy of a single photon is E = hf = hc/ E = (6.63 x 10 -34 )(3.00 x 10 8 )/5.55 x 10 -7 E = 3.58 x 10 -19 J Photons / sec = 1.3/3.58 x 10 -19 =3.6 x 10 18

26. Problem 2 - 1 Work function for silver surface is W 0 = 4.73 eV Find the minimum frequency that light must have to eject electrons from this surface W 0 = (4.73 eV)(1.60 x 10 -19 J/1ev) W 0 = 3.58 x 10 -19 J hf 0 = KE max +W 0 = 0 + W 0 f 0 = W 0 /h = 7.57 x 10 -19 J/6.63 x 10 -34 Js f 0 = 1.14 x 10 15 Hz 0 = 263 nm ultraviolet

27. Classical vs Modern Physics - 1 Classical Physics Kinetic energy of electron independent of frequency Modern Physics Only light with a frequency above a minimum value will eject electrons Regardless of brightness of light

28. Classical vs Modern Physics - 2 Classical Physics Maximum kinetic energy of electron increases as brightness of light increases Modern Physics Maximum kinetic energy remains the same as the brightness increases As brightness increases, the number of electrons ejected increases

29. Classical vs Modern Physics - 3 Classical Physics For a dim beam of light, there should be a long delay before electrons are emitted Modern Physics Electrons are emitted immediately

30. PHY 102: Lecture 12 Particles and Waves 12.4 Photon Momentum / Compton Effect

31. Arthur H. Compton (1892 – 1962) 1923 American Physicist Used photon model to explain scattering of X-rays by the electrons in graphite X-rays are high-frequency electromagnetic waves and are composed of photons

32. Compton Effect - 1 X-ray photon strikes an electron in graphite The X-ray photon scatters in one direction after the collision Electron recoils in another direction

33. Compton Effect - 2 Scattered photon has frequency f’ Smaller than the frequency f of incident photon Photon loses energy during collision Difference between two frequencies depends on angle  at which the scattered photon leaves the collision

34. Compton Effect Conservation of Energy / Momentum Energy of incident photon = Energy of scattered photon + Kinetic energy of recoil electron hf = hf’ + KE hf’ = hf – KE Energy and frequency of scattered photon is less than energy and frequency of incident photon Momentum of incident photon = Momentum of scattered photon + Momentum of recoil electron

35. Compton Effect Equation  ’ – =(h/mc)(1 – cos  ) m is mass of electron h/mc is the Compton wavelength of electron h/mc = 2.43 x 10 -12 m

36. PHY 102: Lecture 12 Particles and Waves 12.5 de Broglie Wavelength / Wave Nature of Light

37. Louis de Broglie (1892 – 1987) 1923 French Suggested that since light waves could exhibit particle-like behavior, particles of matter should exhibit wave-like behavior de Broglie wavelength  = h/p –h is Planck’s constant –p is magnitude of relativistic momentum of the particle

38. Clinton J. Davisson (1881 – 1958) Lester H. Germer (1896 - 1971 1927 American Directed a beam of electrons on a crystal of nickel Observed that the electrons exhibited a diffraction behavior

39. Neutron Diffraction Pattern

40. Problem 3 - 1 Determine the de Broglie wavelength for (a) an electron (mass = 9.1 x 10 -31 kg) moving at a speed of 6.0 x 10 6 m/s (b) a baseball (mass = 0.15 kg) moving at a speed of 13 m/s

41. Problem 3 - 2 Determine the de Broglie wavelength for (a) an electron (mass = 9.1 x 10 -31 kg) moving at a speed of 6.0 x 10 6 m/s momentum = p p=mv = 9.1 x 10 -31 x 6 x 10 6 = 5.46 x 10 -24  = h/p = 6.63 x 10 -34 / 5.46 x 10 -24  = 1.21 x 10 -10 m

42. Problem 3 - 3 Determine the de Broglie wavelength for (b) a baseball (mass = 0.15 kg) moving at a speed of 13 m/s momentum = p p = mv = 0.15 x 13 = 1.95  = h/p = 6.63 x 10 -34 / 1.95  = 3.4 x 10 -34 m

43. What Kind of Wave is de Broglie Wave?-1 (a) Shows the fringe pattern on the screen when electrons are used in a version of Young’s double-slit experiment Bright fringes occur in places where particle waves coming from each slit interfere constructively Dark fringes occur in places where the waves interfere destructively

44. What Kind of Wave is de Broglie Wave?-2 When an electron passes through the double-slit arrangement and strikes a spot on the screen glows at that spot (b), (c), (d) Illustrate how the spots accumulate in times As more and more electrons strike the screen, the spots eventually form the fringe pattern

45. What Kind of Wave is de Broglie Wave?-3 Bright fringes occur where there is a big probability of electrons striking the screen Dark fringes occur where there is a low probability Particle waves are waves of probability Magnitude at a point in space gives an indication of the probability that the particle will be found at that point

46. What Kind of Wave is de Broglie Wave?-4 At the place where the screen is located, the pattern of probabilities conveyed by the particle waves causes the fringe pattern to emerge The pattern of probabilities that leads to the fringes is analogous to the pattern of light intensities that is responsible for the fringes in Young’s experiment with light waves

47. Wavefunction In the case of particle waves, the probability is proportional to the square of the magnitude   is the wave function of the particle In 1925, Erwin Schrodinger and Werner Heisenberg developed theoretical frameworks for determining the wave function Established a new branch of physics called quantum mechanics

48. PHY 102: Lecture 12 Particles and Waves 12.6 Heisenberg Uncertainty Principle

49. Uncertainty - 1 Bright fringes indicate the places where there is a high probability of an electron striking the screen There are a number of bright fringes There is more than one place where each electron has some probability of hitting It is not possible to specify in advance exactly where on screen an individual electron will hit All we can do is speak of probability that electron may end up in a number of different places

50. Uncertainty - 2 No longer is it possible to say, as Newton’s laws would suggest, that a single electron, fired through the double slit, will travel directly forward in a straight line and strike the screen This simple model does not apply when a particle as small as an electron passes through a pair of closely spaced narrow slits Wave nature of particles is important in such circumstances, we lose the ability to predict with 100% certainty the path that a single particle will follow

51. Uncertainty - 3 Consider electrons passing through a single slit After a sufficient number of electrons strike the screen, a diffraction pattern emerged Electron diffraction pattern consists of alternating bright and dark fringes Analogous to light wave diffraction pattern

52. Uncertainty - 3 Figure shows the slit and locates the first dark fringe on either side of the central bright image Central fringe is bright because electrons strike the screen over the entire region between the dark fringes

53. Uncertainty - 4 To reach locations within the central bright fringe, some electrons must have acquired momentum in the y direction Despite the fact that they enter the slit traveling along the x direction and have no momentum in the y direction to start with

54. Uncertainty - 5 y component of momentum may be big as  p y The notation  p y indicates the difference between the maximum value of the y component of the momentum after the electron passes through the slit and its value of zero before the electron passes through the slit

55. Uncertainty - 6  p y represents the uncertainty in the y component of the momentum in that the y component my have any value from zero to  p y

56. Uncertainty - 7 Assume that light diffraction equation also applies to particle whose wavelength is sin  = /W locate first dark fringe If q is small then sin   tan  tan  =  p y /p x

57. Uncertainty - 8  p y / p x =  p y / (h/ ) = /W  p y / p x = h / W Heisenberg suggested that the uncertainty  p y is related to the uncertainty in the y position of the electron as the electron passes through the slit

58. Uncertainty - 9 Electron can pass through anywhere within the width W  y = W This leads to (  p y )(  y) = h

59. Heisenberg Uncertainty Principle Momentum and position (  p y )(  y) >= h/4   y = uncertainty in a particle’s position along the x direction  p y = uncertainty in the y component of the linear momentum of the particle Energy and Time (  E)(  t) >= h/4   E = uncertainty in the energy of a particle when the particle is in a certain state  t = time interval during which the particle is in the state

60. Problem 4 - 1 Assume that the position of an object is known so precisely that the uncertainty in the position is only  y = 1.5 x 10 -11 m (a) Determine the minimum uncertainty in the momentum of the object (b) Find the corresponding minimum uncertainty in the speed of the object in the case when the object is an electron (mass = 9.1 x 10 -31 kg)

61. Problem 4 - 2 Assume that the position of an object is known so precisely that the uncertainty in the position is only  y = 1.5 x 10 -11 m (a) Determine the minimum uncertainty in the momentum of the object  p y >= h/4  y = (6.63x10 -34 )/4  (1.5 x 10 -11 )  p y >= 3.5 x 10 -24 (b)  p y >= 3.5 x 10 -24 = m  v  v >= 3.5 x 10 -24 / 9.1 x 10 -31 = 3.8 x 10 6 m/s