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Introduction to Quantum Mechanics 1


Introduction to Quantum Mechanics 1

Thermal Radiation and Experimental Facts Regarding the Quantization of Matter
1. Aufl.

von: Ibrahima Sakho

139,99 €

Verlag: Wiley
Format: PDF
Veröffentl.: 23.12.2019
ISBN/EAN: 9781119671411
Sprache: englisch
Anzahl Seiten: 352

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Beschreibungen

The conception of lasers and optoelectronic devices such as solar cells have been made possible, thanks to the modern day mastery of processes that harness the interaction of electromagnetic radiation with matter. This first volume is dedicated to thermal radiation and experimental facts that reveal the quantification of matter. The study of black body radiation allows the introduction of fundamental precepts such as Planck�s law and the energy-related qualities that characterize radiation. The properties of light and wave–particle duality are also examined, based on the interpretation of light interferences, the photoelectric effect and the Compton effect. This book goes on to investigate the hydrogen atomic emission spectrum and how it dovetails into our understanding of quantum numbers to describe the energy, angular momentum, magnetic moment and spin of an electron. A look at the spectroscopic notation of the states explains the different wavelengths measured from the splitting of spectral lines. Finally, this first volume is completed by the study of de Broglie�s wave theory and Heisenberg�s uncertainty principle, which facilitated the advancement of quantum mechanics.
<p>Foreword xi<br /> <i>Louis MARCHILDON</i></p> <p>Preface xiii</p> <p><b>Chapter 1. Thermal Radiation </b><b>1</b></p> <p>1.1. Radiation 2</p> <p>1.1.1. Definition 2</p> <p>1.1.2. Origin of radiation 2</p> <p>1.1.3. Classification of objects 4</p> <p>1.2. Radiant flux 4</p> <p>1.2.1. Definition of radiant flux, coefficient of absorption 4</p> <p>1.2.2. Black body and gray body 5</p> <p>1.3. Black body emission spectrum 6</p> <p>1.3.1. Isotherms of a black body: experimental facts 6</p> <p>1.3.2. Solid angle 7</p> <p>1.3.3. Lambert’s law, radiance 9</p> <p>1.3.4. Kirchhoff’s laws 10</p> <p>1.3.5. Stefan–Boltzmann law, total energy exitance 11</p> <p>1.3.6. Wien’s laws, useful spectrum 12</p> <p>1.3.7. The Rayleigh–Jeans law, “ultraviolet catastrophe” 15</p> <p>1.3.8. Planck’s law, monochromatic radiant exitance 16</p> <p>1.4. Exercises 18</p> <p>1.4.1. Exercise 1 – Calculation of the Stefan–Boltzmann constant 18</p> <p>1.4.2. Exercise 2 – Calculation of the Sun’s surface temperature 18</p> <p>1.4.3. Exercise 3 – Average energy of a quantum oscillator, Planck’s formula 19</p> <p>1.4.4. Exercise 4 – Deduction of Wien’s first law from Planck’s formula 20</p> <p>1.4.5. Exercise 5 – Total electromagnetic energy radiated by the black body 20</p> <p>1.5. Solutions 21</p> <p>1.5.1. Solution 1 – Calculation of the Stefan–Boltzmann constant 21</p> <p>1.5.2. Solution 2 – Calculation of the Sun’s surface temperature 23</p> <p>1.5.3. Solution 3 – Average energy of a quantum oscillator, Planck’s formula 24</p> <p>1.5.4. Solution 4 – Deduction of Wien’s law from Planck’s law 27</p> <p>1.5.5. Solution 5 – Total electromagnetic energy radiated by the black body 29</p> <p><b>Chapter 2. Wave and Particle Aspects of Light </b><b>33</b></p> <p>2.1. Light interferences 34</p> <p>2.1.1. Elongation of a light wave 34</p> <p>2.1.2. Total elongation of synchronous light sources 35</p> <p>2.1.3. Young’s experimental setup 36</p> <p>2.1.4. Interference field, fringes of interference 37</p> <p>2.1.5. Interpretation, interference as concept 37</p> <p>2.1.6. Path difference 39</p> <p>2.1.7. Fringe spacing, order of interference 41</p> <p>2.2. Photoelectric effect 44</p> <p>2.2.1. Experimental setup, definition 44</p> <p>2.2.2. Interpretation, photon energy 44</p> <p>2.2.3. Einstein relation, energy function 45</p> <p>2.2.4. Photoelectric threshold 46</p> <p>2.2.5. Stopping potential, saturation current 48</p> <p>2.2.6. Quantum efficiency of a photoelectric cell 51</p> <p>2.2.7. Sensitivity of a photoelectric cell 51</p> <p>2.3. Compton effect 53</p> <p>2.3.1. Experimental setup, definition 53</p> <p>2.3.2. Energy and linear momentum of a relativistic particle 55</p> <p>2.3.3. Interpretation, photon linear momentum, and Compton shift 56</p> <p>2.4. Combining the particle- and wave-like aspects of light 59</p> <p>2.4.1. Particle- and wave-like properties of the photon 59</p> <p>2.4.2. Planck–Einstein relation 60</p> <p>2.5. Exercises 61</p> <p>2.5.1. Exercise 1 – Single-slit diffraction, interferences 61</p> <p>2.5.2. Exercise 2 – Order of interference fringes 62</p> <p>2.5.3. Exercise 3 – Experimental measurement of Planck constant and of the work function of an emissive photocathode 63</p> <p>2.5.4. Exercise 4 – Experimental study of the behavior of a photoelectric cell, quantum efficiency and sensitivity 64</p> <p>2.5.5. Exercise 5 – Compton backscattering 65</p> <p>2.5.6. Exercise 6 – Energy and linear momentum of scattered photons and of the electron ejected by Compton effect 65</p> <p>2.5.7. Exercise 7 – Inverse Compton effect 66</p> <p>2.6. Solutions 66</p> <p>2.6.1. Solution 1 – Single-slit diffraction, interferences 66</p> <p>2.6.2. Solution 2 – Order of interference fringes 68</p> <p>2.6.3. Solution 3 – Experimental measurement of Planck constant and of the work function of an emissive photocathode 70</p> <p>2.6.4. Solution 4 – Experimental study of the behaviour of a photoelectric cell, quantum efficiency and sensitivity 74</p> <p>2.6.5. Solution 5 – Compton backscattering 76</p> <p>2.6.6. Solution 6 – Energy and linear momentum of the scattered photons and of the electron ejected by Compton effect 78</p> <p>2.6.7. Solution 7 – Inverse Compton effect 79</p> <p><b>Chapter 3. Quantum Numbers of the Electron </b><b>83</b></p> <p>3.1. Experimental facts 85</p> <p>3.1.1. Spectrometer 85</p> <p>3.1.2. First lines of the hydrogen atom identified by Ångström 88</p> <p>3.1.3. Balmer’s formula 89</p> <p>3.1.4. Rydberg constant for hydrogen 90</p> <p>3.1.5. Ritz combination principle 92</p> <p>3.2. Rutherford’s planetary model of the atom 92</p> <p>3.2.1. Rutherford’s scattering, atomic nucleus 92</p> <p>3.2.2. Limitations of the planetary model 94</p> <p>3.3. Bohr’s quantized model of the atom 95</p> <p>3.3.1. Shell model of electron configurations 95</p> <p>3.3.2. Bohr’s postulates, principal quantum number 95</p> <p>3.3.3. Absorption spectrum, emission spectrum 98</p> <p>3.3.4. Principle of angular momentum quantization 99</p> <p>3.3.5. Quantized expression of the energy of the hydrogen atom 100</p> <p>3.3.6. Interpretation of spectral series 104</p> <p>3.3.7. Energy diagram of the hydrogen atom, ionization energy 107</p> <p>3.3.8. Advantages and limitations of Bohr’s model 109</p> <p>3.3.9. Reduced Rydberg constant 110</p> <p>3.4. Sommerfeld’s atomic model 111</p> <p>3.4.1. Experimental facts: normal Zeeman effect 111</p> <p>3.4.2. Bohr–Sommerfeld model, angular momentum quantum number 113</p> <p>3.4.3. Atomic orbital, electron configuration 114</p> <p>3.4.4. Interpretation of normal Zeeman effect, angular momentum quantum number 117</p> <p>3.4.5. Advantages and limitations of the Bohr–Sommerfeld model 120</p> <p>3.5. Electron spin 120</p> <p>3.5.1. The Stern–Gerlach experiment 120</p> <p>3.5.2. The Uhlenbeck and Goudsmit hypothesis, electron spin 121</p> <p>3.5.3. Degree of degeneracy of energy levels 124</p> <p>3.5.4. Total quantum number, selection rules 125</p> <p>3.6. Electron magnetic moments 127</p> <p>3.6.1. Orbital and spin magnetic moments 127</p> <p>3.6.2. Magnetic potential energy 130</p> <p>3.6.3. Spin–orbit interaction, spectroscopic notation of states 131</p> <p>3.6.4. Fine structure of the levels of energy of the hydrogen atom 132</p> <p>3.7. Exercises 135</p> <p>3.7.1. Exercise 1 – Spectrum of hydrogen-like ions 136</p> <p>3.7.2. Exercise 2 – Using the energy diagram of the lithium atom 136</p> <p>3.7.3. Exercise 3 – Spectra of the hydrogen atom, application to astrophysics 137</p> <p>3.7.4. Exercise 4 – Atomic resonance 139</p> <p>3.7.5. Exercise 5 – X-ray spectrum 141</p> <p>3.7.6. Exercise 6 – Lifetime of the hydrogen atom according to the planetary model 143</p> <p>3.7.7. Exercise 7 – Correspondence principle, quantization of the angular momentum 144</p> <p>3.7.8. Exercise 8 – Franck–Hertz experiment: experimental confirmation of Bohr’s atomic model 145</p> <p>3.7.9. Exercise 9 – Identification of a hydrogen-like system 148</p> <p>3.7.10. Exercise 10 – Nucleus drag effect: discovery of deuteron 149</p> <p>3.7.11. Exercise 11 – Normal Zeeman effect on the Lyman alpha line of the hydrogen atom 150</p> <p>3.7.12. Exercise 12 – Zeeman–Lorentz triplet, Larmor precession 150</p> <p>3.7.13. Exercise 13 – The Stern–Gerlach experiment, magnetic force 152</p> <p>3.7.14. Exercise 14 – Intensities of the spots in the Stern–Gerlach experiment 153</p> <p>3.7.15. Exercise 15 – Normal Zeeman effect on the 2p level of hydrogen-like systems 155</p> <p>3.7.16. Exercise 16 – Anomalous Zeeman effect on the ground state of hydrogen-like systems 156</p> <p>3.7.17. Exercise 17 – Anomalous Zeeman effect on the 2p level of hydrogen-like systems 156</p> <p>3.7.18. Exercise 18 – Fine structure of the resonance line of the hydrogen atom 157</p> <p>3.7.19. Exercise 19 – Fine structure of n = 2 level of the hydrogen atom 157</p> <p>3.7.20. Exercise 20 – Illustration of complex Zeeman effect on the yellow sodium line, selection rules 159</p> <p>3.7.21. Exercise 21 – Linear oscillator in the phase space, Bohr’s principle for angular momentum quantization 159</p> <p>3.8. Solutions 161</p> <p>3.8.1. Solution 1 – Spectrum of hydrogen-like ions 161</p> <p>3.8.2. Solution 2 – Using the energy diagram of the lithium atom 164</p> <p>3.8.3. Solution 3 – Spectra of the hydrogen atom, application to astrophysics 166</p> <p>3.8.4. Solution 4 – Atomic resonance phenomenon 168</p> <p>3.8.5. Solution 5 – X-ray spectrum 170</p> <p>3.8.6. Solution 6 – Lifetime of the hydrogen atom according to the planetary model 172</p> <p>3.8.7. Solution 7 – Correspondence principle, angular momentum quantization principle 175</p> <p>3.8.8. Solution 8 – Experimental confirmation of Bohr’s model: Franck–Hertz experiment 179</p> <p>3.8.9. Solution 9 – Identification of a hydrogen-like system 184</p> <p>3.8.10. Solution 10 – Nucleus drag effect: discovery of the deuton 186</p> <p>3.8.11. Solution 11 – Normal Zeeman effect on the Lyman alpha line of the hydrogen atom 188</p> <p>3.8.12. Solution 12 – Zeeman–Lorentz triplet, Larmor precession 189</p> <p>3.8.13. Solution 13 – Theoretical interpretation of the Stern–Gerlach experiment, magnetic force 195</p> <p>3.8.14. Solution 14 – Intensities of the spots in the Stern–Gerlach experiment 198</p> <p>3.8.15. Solution 15 – Normal Zeeman effect on the 2p level of hydrogen-like systems 202</p> <p>3.8.16. Solution 16 – Anomalous Zeeman effect on the ground level of hydrogen-like systems 204</p> <p>3.8.17. Solution 17 – Anomalous Zeeman effect on the 2p level of hydrogen-like systems 205</p> <p>3.8.18. Solution 18 – Fine structure of the resonance line of the hydrogen atom 206</p> <p>3.8.19. Solution 19 – Fine structure of n = 2 level of the hydrogen atom 209</p> <p>3.8.20. Solution 20 – Illustration of complex Zeeman effect on the yellow line of sodium, selection rules 211</p> <p>3.8.21. Solution 21 – Linear oscillator in the phase space, Bohr’s angular momentum quantization principle 212</p> <p><b>Chapter 4. Matter Waves – Uncertainty Relations </b><b>217</b></p> <p>4.1. De Broglie’s matter waves 218</p> <p>4.1.1. From light wave to matter wave 218</p> <p>4.1.2. De Broglie’s relation 219</p> <p>4.1.3. Law of dispersion of matter waves 221</p> <p>4.1.4. Phase velocity and group velocity 222</p> <p>4.1.5. Bohr’s quantization principle and de Broglie hypothesis 226</p> <p>4.1.6. Experimental confirmation, experiment of Davisson and Germer 228</p> <p>4.2. Heisenberg’s uncertainty relations 236</p> <p>4.2.1. Uncertainty principle 236</p> <p>4.2.2. Probabilistic interpretation of the wave function 237</p> <p>4.2.3. Root mean square deviation 238</p> <p>4.2.4. Spatial uncertainty relations, complementary variables 239</p> <p>4.2.5. Time–energy uncertainty relation, width of lines 241</p> <p>4.2.6. Heisenberg’s microscope 242</p> <p>4.3. Exercises 244</p> <p>4.3.1. Group velocity of de Broglie waves in the relativistic case 244</p> <p>4.3.2. Observing an atom with an electron microscope 245</p> <p>4.4. Solutions 246</p> <p>4.4.1. Group velocity of de Broglie waves in the relativistic case 246</p> <p>4.4.2. Observing an atom with an electron microscope 248</p> <p><b>Appendices 251</b></p> <p>Appendix 1 253</p> <p>Appendix 2 267</p> <p>Appendix 3 275</p> <p>Appendix 4 287</p> <p>Appendix 5 293</p> <p>References 309</p> <p>Index 313</p>
<p><b>Ibrahima Sakho</b> is a Doctor of Physical Science, and works at the science and technology training and research unit at the University of Thiès (Senegal). On-site, he teaches quantum mechanics, atomic and nuclear physics, radiation–matter interaction, and environmental chemistry.</p>

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