Studienhandbuch | UE Mathematics 3

Inhalt

[ 281MANAMA3U20 ] UE Mathematics 3

^(*) Unfortunately this information is not available in english.

Workload	Education level	Study areas	Responsible person	Hours per week	Coordinating university
1,5 ECTS	B2 - Bachelor's programme 2. year	Mathematics	Markus Passenbrunner	1 hpw	Johannes Kepler University Linz

Detailed information

Original study plan

Bachelor's programme Mechatronics 2025W

Learning Outcomes

Competences
Students know the types of ordinary and partial differential equations and can apply various solution strategies to them. Furthermore, they understand the significance of ordinary and partial differential equations in natural sciences and are able to apply numerical methods for solving ordinary differential equations.

Skills	Knowledge
Classify ordinary differential equations (ODEs) (k3) Geometric interpretation of solutions of ODEs (k4) Apply criteria for the existence and uniqueness of initial value problems (k3) Apply elementary explicit solution methods to ODEs (k3) Perform error estimates for solutions of ODEs in terms of initial values (k4) Determine fundamental matrices of systems of linear ODEs (k4) Explicitly solve systems of linear ODEs with constant coefficients (k3) Explicitly solve linear ODEs with constant coefficients (k3) Draw phase portraits of autonomous ODEs (k4) Apply the Laplace transformation to solve ODEs (k3) Solve elementary boundary or eigenvalue problems (k3) Analyze the long-term stability of solutions of ODEs (k4) Apply various numerical methods (explicit and implicit single and multistep methods) to approximate solutions of ODEs (k6) Classify partial differential equations (k3) Apply the method of separation of variables to elementary partial differential equations (k3)	Ordinary differential equations systems of differential equations examples from the natural sciences separable differential equations Peano's theorem Picard-Lindelöf theorem successive approximation generalized eigenvectors of matrices phase portraits Laplace transformation eigenvalue problems Lyapunov function explicit and implicit single and multistep methods method of separation of variables for partial differential equations maximum principle for partial differential equations

Criteria for evaluation

exercises and written exam

Methods

students present the exercises, discussion

Language

German

Changing subject?

Further information

none

Corresponding lecture

^(*)MEBPAUEMAT3: UE Mathematik 3 (1,25 ECTS)

On-site course
Maximum number of participants	35
Assignment procedure	Assignment according to sequence