Expected results from this subject |
Training and Learning Results |
To describe in an unified way the electromagnetic field by means of Maxwell's laws. Apply the basic boundary conditions in the vacuum or in materials. |
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C3
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D1 D12 D14
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To derive the equation of propagation of an electromagnetic wave, and describe its main characteristics. Relate this concept with the electromagnetic spectrum. |
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C3
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D12 D14
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To explain the empirical phenomena related with the interaction of radiation with
matter which cannot be explained by the Classical Theory, and the solutions proposed (wave-corpuscle duality, quantization of the radiation). |
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C3
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D12 D14 D15
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To know the postulates of Quantum Mechanics and their consequences in the reformulation of the microscopic theory of the Classical Physics. |
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C3
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D1 D12 D14 D15
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To explain the essentials of the theory of mathematical operators, including the concepts of eigenfunction and eigenvalue, spectrum, linearity and hermiticity, complete sets of eigenfunctions, etc. |
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C3
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D1 D9 D12 D14
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To write the fundamental operators of Quantum Mechanics (position, linear and angular moment, Hamiltonian of simple systems). |
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C3 C19
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D1 D9 D12 D14
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To apply the previous concepts to the quantum- mechanical study of simple systems, like a particle in a square well potential, or to a harmonic oscilator potential, by resolving the time-independent Schrödinger equation. |
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C3 C19
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D1 D3 D6 D8 D12 D13 D14
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To calculate the eigenfunctions and eigenvalues of the angular momentum operator. |
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C3 C19
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D6 D12 D14
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To resolve the wave equation of the hydrogen atom, and calculate its eigenfunctions (orbitals). |
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C3 C19
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D6 D8 D12 D14
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To resolve the Schrödinger equation for many-electron atoms by means of approximate methods. |
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C3 C19 C20
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D1 D5 D6 D9 D12 D13 D14
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To explain in a simple way the transitions between states and the absorption and emission spectra. |
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C3 C19 C20 C22 C23
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D1 D6 D8 D9 D12 D14 D15
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To know the laws of Statistical Mechanics, which govern the behaviour of many-particle systems, in particular the Maxwell-Boltzmann statistics. Derive the partition function of a system and know in detail its physical meaning. |
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C14 C20 C22 C23
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D1 D4 D5 D6 D7 D8 D12 D13
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To apply the Maxwell-Boltzmann statistics to the case of the ideal gases of atoms and polyatomic particles to estimate thermodynamic properties, using microscopic properties like the mass, the molecular geometry and the vibrational frequencies. |
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C14 C19
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D1 D4 D5 D6 D7 D8 D12 D13
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