# Search result: Catalogue data in Spring Semester 2022

Physics Bachelor | ||||||

Additional Courses, Seminars and Colloquia no course offering in this semester | ||||||

Additional Courses | ||||||

Number | Title | Type | ECTS | Hours | Lecturers | |
---|---|---|---|---|---|---|

529-4000-00L | Chemistry | Z | 4 credits | 3G | E. C. Meister | |

Abstract | Introduction to chemistry with aspects of inorganic, organic and physical chemistry. | |||||

Learning objective | - Understanding of simple models of chemical bonding and the three-dimensional molecular structure - Quantitative description of selected chemical systems by means of reaction equations and equilibria - Understanding of fundamental concepts of chemical kinetics (e.g. reaction order, rate law, rate constant) | |||||

Content | Periodic system of the elements, chemical bonding (LCAO-MO), molecular structure (VSEPR), reactions, equilibria, chemical kinetics. | |||||

Lecture notes | Handouts of lecture presentations and additional supporting information will be offered. | |||||

Literature | C.E. Housecroft, E.C. Constable, Chemistry. An Introduction to Organic, Inorganic and Physical Chemistry, 4th ed., Pearson: Harlow 2010. C.E. Mortimer, U. Müller, Chemie, 11. Auflage, Thieme: Stuttgart 2014. | |||||

151-0102-00L | Fluid Dynamics I | Z | 6 credits | 4V + 2U | T. Rösgen | |

Abstract | An introduction to the physical and mathematical foundations of fluid dynamics is given. Topics include dimensional analysis, integral and differential conservation laws, inviscid and viscous flows, Navier-Stokes equations, boundary layers, turbulent pipe flow. Elementary solutions and examples are presented. | |||||

Learning objective | An introduction to the physical and mathematical principles of fluid dynamics. Fundamental terminology/principles and their application to simple problems. | |||||

Content | Phenomena, applications, foundations dimensional analysis and similitude; kinematic description; conservation laws (mass, momentum, energy), integral and differential formulation; inviscid flows: Euler equations, stream filament theory, Bernoulli equation; viscous flows: Navier-Stokes equations; boundary layers; turbulence | |||||

Lecture notes | Lecture notes (extended formulary) for the course are made available electronically. | |||||

Literature | Recommended book: Fluid Mechanics, Kundu & Cohen & Dowling, 6th ed., Academic Press / Elsevier (2015). | |||||

Prerequisites / Notice | Voraussetzungen: Physik, Analysis |

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