Chapter 28

Chapter 28 Quantum Theory April 8th, 2013

Quantum Theory Two things are really different at the atomic and sub-atomic scale: • Wave-particle duality • Particles are waves, waves are particles • Energies are not continuous but discrete. They vary by discrete increments called quanta • e. g. electron binding energies

demos • Young’s double-slit experiment demonstrates the wave-nature of light • Wave-particle duality: electron are waves, they diffract like x-ray photons (1956 electron diffraction instrument)

Quantum Regime • Macroscopic-world explanations fail at the atomic-scale • Newtonian mechanics • Maxwell’s equations describing electromagnetism • The atomic-scale world is referred to as the quantum regime • Quantum refers to a very small increment, or parcel, or packet of energy • The discovery and development of quantum theory began in the late 1800s and continued during the early 1900s

Waves vs. Particles • In the world of Newton and Maxwell, energy can be carried by particles and waves • Waves produce an interference pattern when passed through a double slit • Classical particles (bullets) will pass through one of the slits and no interference pattern will be formed

Particles and Waves, Classical • Waves exhibit interference; particles do not • Particles often deliver their energy in discrete amounts • The energy carried or delivered by a wave is not discrete • The energy carried by a wave is described by its intensity • The amount of energy absorbed depends on the intensity and the absorption time

Interference with Electrons • The separation between waves and particles is not found in the quantum regime • Electrons are used in a double slit experiment • The blue lines show the probability of the electrons striking particular locations

Interference with Electrons, cont. • The probability curve of the electrons has the same form as the variation of light intensity in the double-slit interference experiment • The experiment shows that electrons undergo constructive interference at certain locations on the screen • At other locations, the electrons undergo destructive interference • The probability for an electron to reach those location is very small or zero • The experiment also shows aspects of particle-like behavior since the electrons arrive one at a time at the screen

Particles, Waves, Quanta • All objects, including light and electrons, can exhibit interference • All objects, including light and electrons, carry energy in discrete amounts • These discrete parcels of energy are called quanta

Work function • In the 1880s, Hertz discovered the work function and the photoelectric effect • If V is the electric potential at which electrons begin to jump across the vacuum gap, the work function is Wc = eV • The work function, Wc is the minimum energy required to remove a single electron from a piece of metal • This energy can be delivered either as electric potential or by shining light on the metal Wc = eV

Work Function, cont. • A metal contains electrons that are free to move around within the metal • The electrons are still bound to the metal and need energy to be removed from the metal • This energy is the work function • The value of the work function is different for different metals

Work Functions Wc of several metals

Photoelectric Effect • Another way to extract electrons from a metal is by shining light onto it • Light striking a metal is absorbed by the electrons • If an electron absorbs an amount of light energy greater than Wc, it is ejected off the metal • This is called the photoelectric effect

Photoelectric Effect, cont. • No electrons are emitted unless the light’s frequency is greater than a critical value ƒc, the intensity of light does not matter • When the frequency is above ƒc, the kinetic energy of the emitted electrons varies linearly with the frequency, not the intensity of light • These results could not be explained with the classical wave theory of light

Photoelectric Effect, Problems • Trying to explain the photoelectric effect with the classical wave theory of light presented two difficulties: • Experiments showed that the critical frequency is independent of the intensity of the light • Classically, the energy is proportional to the intensity • It should always be possible to eject electrons by increasing the intensity to a sufficiently high value • Yet it is observable that below the critical frequency, there are no ejected electrons no matter how great the light intensity • The kinetic energy of an ejected electron is independent of the light intensity • Classical theory predicts that increasing the intensity will cause the ejected electrons to have a greater kinetic energy • Yet experiments show that the electron kinetic energy depends on the frequency of light, not at all on its intensity

Photoelectric Effect, solution: Photons • Einstein proposed that light carries energy in discrete quanta, now called photons • Each photon carries a quantum of energy Ephoton = hƒ • h is a constant of nature called Planck’s constant • h = 6.626 x 10-34 J ∙ s • A beam of light should be thought of as a collection of photons • Each photon has an energy dependent on its frequency • If the intensity of monochromatic light is increased, the number of photons increases, but the energycarried by each photon does not change • Vending machine analogy

Photoelectric Effect, solution: Photons • The introduction of photons accounts for all the problems with the classical explanation • The absorption of light by an electron is just like a collision between two particles, a photon and an electron • The photon carries an energy that is absorbed by the electron • If this energy is less than the work function, the electron is not able to escape from the metal • The energy of a single photon depends on frequency but not on the light intensity

Photoelectric Effect, solution: Photons • The kinetic energy of the ejected electrons depends on light frequency but not intensity • The critical frequency corresponds to photons whose energy is equal to the work function h ƒc = Wc • This electron is ejected with 0 kinetic energy • If the photon has a higher frequency, the difference goes into kinetic energy of the ejected electron KEelectron = h ƒ - h ƒc = h ƒ - Wc • This linear relationship is what was observed experimentally

Photoelectric EffectNobel prizeAlbert Einstein 1921 (his discovery was in 1905) KEelectron = h ƒ - h ƒc = h ƒ– Wc With his explanation of the photoelectric effect, Einstein introduced the idea that light is made of particles, now called photons,and that their energies are quantized. We now say that: a photon is a quantum of light

Momentum of a Photon • A light wave with energy E also carries a certain momentum • Particles of light called photonscarry a discrete amount of both energy and momentum • Photons have two properties that are different from classical particles • Photons do not have any mass • Photons exhibit interference effects

Blackbody Radiation • Blackbody radiation is emitted over a range of wavelengths • To the eye, the color of the cavity is determined by the wavelength at which the radiation intensity is largest

Blackbody Radiation, Classical • The blackbody intensity curve has the same shape for a wide variety of objects • Electromagnetic waves form standing waves as they reflect back and forth inside the oven’s cavity • The frequencies of the standing waves follow the pattern ƒn = n ƒ where n = 1, 2, 3, … • There is no limit to the value of n, so the frequency can be infinitely large • But as the frequency increases, so does the energy • Classical theory predicts that the blackbody intensity should become infinite as the frequency approaches infinity. This is nonsense!

Blackbody Radiation and Quanta • The disagreement between the classical predictions and experimental observations was called the “ultraviolet catastrophe” • Planck proposed solving the problem by assuming the energy in a blackbody cavity must come in discrete quanta • Each parcel would have energy E = h ƒn • His theory fit the experimental results, but gave no reason why it worked • Planck’s work is generally considered to be the beginning of quantum theory

Particle-Wave Nature of Light • Some phenomena can only be understood in terms of the particle nature of light • Photoelectric effect • Blackbody radiation • Light also has wave properties at the same time • Interference • Light has both wave-like and particle-like properties

Wave-like Duality • The notion that the properties of both classical waves and classical particles are present at the same time is also called wave-particle duality and it is essential for understanding the micro-scale world • All particles at all scales are capable of wave-like properties, as first proposed by Louis de Broglie • De Broglie suggested that if a particle has a momentum p, its wavelength is • Even baseballs, although those would have a wavelength, albeit a very small one (e.g. 10-34m)!

Electrons are waves! • To test de Broglie’s hypothesis, an experiment was designed by Davisson-Germer to observe interference of electrons • The experiment showed conclusively that electrons have wavelike properties: the diffraction pattern they form is identical to that obtained by x-ray photons. • The calculated wavelength was in good agreement with de Broglie’s theory

Wavelengths of Macroscopic Particles • From de Broglie’s equation and using the classical expression for kinetic energy • As the mass of the particle (object) increases, its wavelength decreases • In principle, you could observe interference with baseballs • Has not yet been observed

Problem 28.36 An electron and a neutron have the same wavelength. What is the ration of (a) their kinetic energies and (b) their momenta? Assume the speeds are low enough that you can ignore relativity.

Chapter 28

Chapter 28

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Chapter 28

Chapter 28

Chapter 28

Chapter 28

Chapter 28

Chapter 28

CHAPTER 28

Chapter 28

Chapter 28

Chapter 28

Chapter 28

Chapter 28

Chapter 28

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Chapter 28