Inhalt

[ 290MAFSMA1U26 ] UE (*)Exercises for Mathematics in Chemistry I

Versionsauswahl
(*) Leider ist diese Information in Deutsch nicht verfügbar.
Workload Ausbildungslevel Studienfachbereich VerantwortlicheR Semesterstunden Anbietende Uni
3 ECTS B1 - Bachelor 1. Jahr Mathematik Markus Passenbrunner 2 SSt Johannes Kepler Universität Linz
Detailinformationen
Quellcurriculum Bachelorstudium Chemistry and Chemical Technology 2026W
Lernergebnisse
Kompetenzen
(*)Students can independently formulate mathematical arguments, identify logical fallacies, and choose appropriate proof techniques to solve rigorous algebraic and analytical problems. They analyze the structural and behavioral properties of real-valued functions and sequences, enabling them to evaluate mathematical models and compute numerical approximations systematically.
Fertigkeiten Kenntnisse
(*)
  • Analyze the validity of compound propositions and quantified predicates using truth tables and formal rules of logical reasoning. (k1, k2)
  • Determine upper and lower bounds, suprema, infima, and precise limits for real-valued sets and numerical sequences. (k1, k2, k3)
  • Explain structural function properties such as injectivity, surjectivity, bijectivity, invertibility, and continuity on specific domains. (k1, k2, k3)
  • Calculate permutations, variations, and combinations for distinguishable and indistinguishable objects in combinatorial problems. (k1, k2, k3)
  • Optimize functions depending on one parameter using Differential calculus. (k2, k4, k5)
  • Determine areas of geometric objects by means of integration and the Fundamental theorem of calculus. (k2, k4, k5)
  • Apply numerical approximation methods, specifically the bisection method, to locate zeros of continuous real functions within defined error bounds. (k2, k3, k4)
(*)
  • Definitions of foundational algebraic structures, including set operations, mappings, open/closed intervals, Cauchy sequences, and accumulation points.
  • Axioms governing the real numbers, specifically field axioms, linear order axioms, and the completeness axiom.
  • Theorems such as the Bolzano-Weierstraß theorem, the Intermediate Value theorem, and the Fundamental theorem of calculus.
  • Formulas for binomial coefficients, trigonometric addition, hyperbolic functions, and combinatorial counting methods.
  • Various elementary analytical techniques including the concepts of differentiation and integration.
Beurteilungskriterien (*)The criteria for successful completion of the tutorial course involve

  1. regular attendance
  2. active participation (at least two in-class presentations during the semester)
  3. correct weekly homework assignments.
Abhaltungssprache Englisch
Lehrinhalte wechselnd? Nein
Sonstige Informationen (*)
  • The Chemistry Maths Book, Erich Steiner, Oxford University Press, 1996, ISBN 0-19-855913-5
  • Mathematics for Physical Chemistry, Robert G. Mortimer, Elsevier, 2005, ISBN 0-12-508347-5
  • Maths for Chemistry: A chemist’s toolkit of calculations, Paul Monk and Lindsey J. Munro, Oxford University Press, 2010, ISBN 0-19-954129-9
  • Mathematics for Chemists, G. Francis, Springer, 1984, ISBN 978-94-010-8950-0

Until termin 2026S known as: 663MAPHMA1U18 Applications of Mathematics for Biological Chemistry 1

Äquivalenzen (*)290MAFSMA1U26: UE Exercises for Mathematics in Chemistry I (3 ECTS)
in combination with
290MAFSTMAK26: KV Tutorium Mathematics for Chemistry (1,5 ECTS)
is equivalent to
290MAFSMC1K19: KV Applications of Mathematics in Chemistry with Exercises I (4,5 ECTS)
Gilt als absolviert, wenn (*)663MAPHMA1U18: UE Applications of Mathematics for Biological Chemistry 1 (3 ECTS)
or
290MAFSMC1K19: UE Applications of Mathematics in Chemistry with Exercises I (3 ECTS)
Präsenzlehrveranstaltung
Teilungsziffer 35
Zuteilungsverfahren Direktzuteilung