Search result: Catalogue data in Autumn Semester 2017
Chemical Engineering Bachelor | ||||||
1. Semester | ||||||
Compulsory Subjects First Year Examinations | ||||||
Number | Title | Type | ECTS | Hours | Lecturers | |
---|---|---|---|---|---|---|
529-0011-02L | General Chemistry (Inorganic Chemistry) I | O | 3 credits | 2V + 1U | A. Togni | |
Abstract | Introduction to the chemistry of ionic equilibria: Acids and bases, redox reactions, formation of coordination complexes and precipitation reactions | |||||
Objective | Understanding and describing ionic equilibria from both a qualitative and a quantitative perspective | |||||
Content | Chemical equilibrium and equilibrium constants, mono- and polyprotic acids and bases in aqueous solution, calculation of equilibrium concentrations, acidity functions, Lewis acids, acids in non-aqueous solvents, redox reactions and equilibria, Galvanic cells, electrode potentials, Nernst equation, coordination chemistry, stepwise formation of metal complexes, solubility | |||||
Lecture notes | Copies of the course slides as well as other documents will be provided as pdf files via the moodle platform. | |||||
Literature | C. E. Housecroft & E. C. Constable: Chemistry, An Introduction to Organic, Inorganic and Physical Chemistry, 4th Edition, Prentice Hall / Pearson, 2010, ISBN 978-0-273-71545-0 | |||||
529-0011-03L | General Chemistry (Organic Chemistry) I | O | 3 credits | 2V + 1U | H. Wennemers | |
Abstract | Introduction to Organic Chemistry. Classical structure theory, stereochemistry, chemical bonds and bonding, symmetry, nomenclature, organic thermochemistry, conformational analysis, basics of chemical reactions. | |||||
Objective | Introduction to the structures of organic compounds as well as the structural and energetic basis of organic chemistry. | |||||
Content | Introduction to the history of organic chemistry, introduction to nomenclature, learning of classical structures and stereochemistry: isomerism, Fischer projections, CIP rules, point groups, molecular symmetry and chirality, topicity, chemical bonding: Lewis bonding model and resonance theory in organic chemistry, description of linear and cyclic conjugated molecules, aromaticity, Huckel rules, organic thermochemistry, learning of organic chemistry reactions, intermolecular interactions. | |||||
Lecture notes | Unterlagen werden als PDF über die ILIAS-Plattform zur Verfügung gestellt | |||||
Literature | C. E. Housecroft & E. C. Constable: Chemistry, An Introduction to Organic, Inorganic and Physical Chemistry, 4th Edition, Prentice Hall / Pearson, 2010, ISBN 978-0-273-71545-0 | |||||
529-0011-01L | General Chemistry (Physical Chemistry) I | O | 3 credits | 2V + 1U | H. J. Wörner | |
Abstract | Atomic structure and structure of matter; Atomic orbitals and energy levels; Quantum mechanical atom model; Chemical bonding; Equations of state. | |||||
Objective | Introduction to Physical Chemistry | |||||
Content | Atomic structure and structure of matter: atomic theory, elementary particles, atomic nuclei, radioactivity, nuclear reactions. Atomic orbitals and energy levels: ionisation energies, atomic spectroscopy, term values and symbols. Quantum mechanical atom model: wave-particle duality, the uncertainty principle, Schrödinger's equation, the hydrogen atom, construction of the periodic table of the elements. Chemical bonding: ionic bonding, covalent bonding, molecular orbitals. Equations of state: ideal gases | |||||
Lecture notes | See homepage of the lecture. | |||||
Literature | See homepage of the lecture. | |||||
Prerequisites / Notice | Voraussetzungen: Maturastoff. Insbesondere Integral- und Differentialrechnung. | |||||
551-0015-00L | Biology I | O | 2 credits | 2V | R. Glockshuber, E. Hafen | |
Abstract | The lecture Biology I, together with the lecture Biology II in the following summer semester, is a basic, introductory course into Biology for Students of Materials Sciences and other students with biology as subsidiary subject. | |||||
Objective | The goal of this course is to give the students a basic understanding of the molecules that build a cell and make it function, and the basic principles of metabolism and molecular genetics. | |||||
Content | Die folgenden Kapitelnummern beziehen sich auf das der Vorlesung zugrundeliegende Lehrbuch "Biology" (Campbell & Rees, 10th edition, 2015) Kapitel 1-4 des Lehrbuchs werden als Grundwissen vorausgesetzt 1. Aufbau der Zelle Kapitel 5: Struktur und Funktion biologischer Makromoleküle Kapitel 6: Eine Tour durch die Zelle Kaptiel 7: Membranstruktur und-funktion Kapitel 8: Einführung in den Stoffwechsel Kapitel 9: Zelluläre Atmung und Speicherung chemischer Energie Kapitel 10: Photosynthese Kapitel 12: Der Zellzyklus Kapitel 17: Vom Gen zum Protein 2. Allgemeine Genetik Kapitel 13: Meiose und Reproduktionszyklen Kapitel 14: Mendel'sche Genetik Kapitel 15: Die chromosomale Basis der Vererbung Kapitel 16: Die molekulare Grundlage der Vererbung Kapitel 18: Genetik von Bakterien und Viren Kapitel 46: Tierische Reproduktion Grundlagen des Stoffwechsels und eines Überblicks über molekulare Genetik | |||||
Lecture notes | Der Vorlesungsstoff ist sehr nahe am Lehrbuch gehalten, Skripte werden ggf. durch die Dozenten zur Verfügung gestellt. | |||||
Literature | Das folgende Lehrbuch ist Grundlage für die Vorlesungen Biologie I und II: „Biology“, Campbell and Rees, 10th Edition, 2015, Pearson/Benjamin Cummings, ISBN 978-3-8632-6725-4 | |||||
Prerequisites / Notice | Zur Vorlesung Biologie I gibt es während der Prüfungssessionen eine einstündige, schriftliche Prüfung. Die Vorlesung Biologie II wird separat geprüft. | |||||
401-0271-00L | Mathematical Foundations I: Analysis A | O | 5 credits | 3V + 2U | L. Kobel-Keller | |
Abstract | Introduction to calculus in one dimension. Building simple models and analysing them mathematically. Functions of one variable: the notion of a function, of the derivative, the idea of a differential equation, complex numbers, Taylor polynomials and Taylor series. The integral of a function of one variable. | |||||
Objective | Introduction to calculus in one dimension. Building simple models and analysing them mathematically. | |||||
Content | Functions of one variable: the notion of a function, of the derivative, the idea of a differential equation, complex numbers, Taylor polynomials and Taylor series. The integral of a function of one variable. | |||||
Literature | G. B. Thomas, M. D. Weir, J. Hass: Analysis 1, Lehr- und Übungsbuch, Pearson-Verlag D. W. Jordan, P. Smith: Mathematische Methoden für die Praxis, Spektrum Akademischer Verlag R. Sperb/M. Akveld: Analysis I (vdf) L. Papula: Mathematik für Ingenieure und Naturwissenschaftler (3 Bände), Vieweg further reading suggestions will be indicated during the lecture | |||||
529-0001-00L | Introduction to Computer Science | O | 4 credits | 2V + 2U | P. H. Hünenberger | |
Abstract | Introduction to UNIX, data representation, introduction to C++ programming, errors, algorithms, computer architecture, sorting and searching, databases, numerical algorithms, types of algorithms, simulation, data communication & networks, chemical structures, operating systems, programming languages, software engineering. | |||||
Objective | Discuss fundamentals of computer architecture, languages, algorithms and programming with an eye to their application in the area of chemistry, biology and material science. | |||||
Content | Minimal introduction to UNIX, Data representation and processing, algorithms and programming in C++, Errors, programming guidelines, efficiency, computer architecture, algorithms for sorting and searching, databases, numerical algorithms, types of algorithms, simulation, data communication & networks, chemical structures, operating systems, programming languages, style, software engineering. | |||||
Lecture notes | Available (in English), distributed at first lecture | |||||
Literature | See: Link | |||||
Prerequisites / Notice | Since the exercises on the computer do convey and test essentially different skills as those being conveyed during the lectures and tested at the written exam, the results of the exercises are taken into account when evaluating the results of the exam. For more information about the lecture: Link |
- Page 1 of 1