| Language of instruction : English |
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Sequentiality
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No sequentiality
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| Degree programme | | Study hours | Credits | P2 SBU | P2 SP | 2nd Chance Exam1 | Tolerance2 | Final grade3 | |
 | 2rd year Bachelor of Physics option Theoritical Physics and Astronomy | Compulsory | 135 | 5,0 | 135 | 5,0 | Yes | Yes | Numerical |  |
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| | | Learning outcomes |
- EC
| EC 7: A graduate of the Bachelor of Physics programme is able to apply the mathematical methods which are used in physics and possesses good numerical skills, including computational techniques and programming skills. |
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| | EC = learning outcomes DC = partial outcomes BC = evaluation criteria |
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Ordinary differential equations, bifurcations, existence and uniqueness of solutions and consequences of this, systems of ordinary differential equations, types of equilibria, linear systems, matrix exponential, linearisation, conjugacy, stability, phase plane analysis, invariant sets
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Ordinary differential equations, bifurcations, existence and uniqueness of solutions and consequences of this, systems of ordinary differential equations, types of equilibria, linear systems, matrix exponential, linearisation, conjugacy, stability, dynamical systems, phase plane analysis, invariant sets
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Lecture ✔
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Response lecture ✔
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Period 2 Credits 5,00 Second examination period
| Evaluation second examination opportunity different from first examination opprt | |
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| Compulsory textbooks (bookshop) |
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Differential equations, dynamical Systems & an introduction to chaos,Morris W. Hirsch, Stephen Smale, Robert L. Devaney,Elsevier academic press,9780123820105 |
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| Previously purchased compulsory textbooks |
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Differential equations, dynamical Systems & an introduction to chaos, Morris W. Hirsch, Stephen Smale, Robert L. Devaney, Elsevier academic press, 0123497035 |
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| Compulsory course material |
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Study guide (available on Blackboard) |
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| Exchange Programme Physics | Optional | 135 | 5,0 | 135 | 5,0 | Yes | Yes | Numerical | |
| Exchange Programme Mathematics | Optional | 135 | 5,0 | 135 | 5,0 | Yes | Yes | Numerical | |
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Ordinary differential equations, bifurcations, existence and uniqueness of solutions and consequences of this, systems of ordinary differential equations, types of equilibria, linear systems, matrix exponential, linearisation, conjugacy, stability, phase plane analysis, invariant sets
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Ordinary differential equations, bifurcations, existence and uniqueness of solutions and consequences of this, systems of ordinary differential equations, types of equilibria, linear systems, matrix exponential, linearisation, conjugacy, stability, dynamical systems, phase plane analysis, invariant sets
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Lecture ✔
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Response lecture ✔
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| Compulsory textbooks (bookshop) |
| |
Differential equations, dynamical Systems & an introduction to chaos,Morris W. Hirsch, Stephen Smale, Robert L. Devaney,Elsevier academic press,9780123820105 |
|
|
| Previously purchased compulsory textbooks |
| |
Differential equations, dynamical Systems & an introduction to chaos, Morris W. Hirsch, Stephen Smale, Robert L. Devaney, Elsevier academic press, 0123497035 |
|
|
| Compulsory course material |
| |
Study guide (available on Blackboard) |
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| 2nd year Bachelor of Physics option twin | Broadening | 135 | 5,0 | 135 | 5,0 | Yes | Yes | Numerical | |
| 3th year Bachelor of Physics option free choice addition | Broadening | 135 | 5,0 | 135 | 5,0 | Yes | Yes | Numerical | |
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| | | Learning outcomes |
- EC
| EC 7: A graduate of the Bachelor of Physics programme is able to apply the mathematical methods which are used in physics and possesses good numerical skills, including computational techniques and programming skills. |
|
| | EC = learning outcomes DC = partial outcomes BC = evaluation criteria |
|
|
Ordinary differential equations, bifurcations, existence and uniqueness of solutions and consequences of this, systems of ordinary differential equations, types of equilibria, linear systems, matrix exponential, linearisation, conjugacy, stability, phase plane analysis, invariant sets
|
|
Ordinary differential equations, bifurcations, existence and uniqueness of solutions and consequences of this, systems of ordinary differential equations, types of equilibria, linear systems, matrix exponential, linearisation, conjugacy, stability, dynamical systems, phase plane analysis, invariant sets
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Lecture ✔
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Response lecture ✔
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|
Period 2 Credits 5,00 Second examination period
| Evaluation second examination opportunity different from first examination opprt | |
|
|
|
| Compulsory textbooks (bookshop) |
| |
Differential equations, dynamical Systems & an introduction to chaos,Morris W. Hirsch, Stephen Smale, Robert L. Devaney,Elsevier academic press,9780123820105 |
|
|
| Previously purchased compulsory textbooks |
| |
Differential equations, dynamical Systems & an introduction to chaos, Morris W. Hirsch, Stephen Smale, Robert L. Devaney, Elsevier academic press, 0123497035 |
|
|
| Compulsory course material |
| |
Study guide (available on Blackboard) |
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|
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| 2nd year Bachelor of Mathematics | Transitional curriculum | 135 | 5,0 | 135 | 5,0 | Yes | Yes | Numerical | |
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| | | Learning outcomes |
- EC
| EC 1: A graduate of the Bachelor of Mathematics programme has a thorough basic knowledge and insight in various disciplines of Mathematics including algebra, geometry, analysis, numerical mathematics, probability theory, statistics, aspects of discrete mathematics and logic. | - EC
| EC 2: A graduate of the Bachelor of Mathematics programme has an advanced knowledge and insight into the main branches of Mathematics (pure mathematics, applied mathematics,...). | - EC
| EC 3: A graduate of the Bachelor of Mathematics programme has mastered the formal mathematical language and methodology. He/she is able to work at a sufficiently high level of abstraction. | - EC
| EC 4: A graduate of the Bachelor of Mathematics programme is able to understand a mathematical proof, he/she is able to judge whether an argument is correct and is able to understand which properties are used (in the context of the acquired knowledge). He/she can identify a gap or a redundant step in a proof or a calculation. | - EC
| EC 5: A graduate of the Bachelor of Mathematics programme can apply the theories and methods to relatively simple mathematical problems (theoretical as well as computational). He/she can make and write down a mathematical line of reasoning by him/herself. | - EC
| EC 6: A graduate of the Bachelor of Mathematics programme is able to integrate the acquired knowledge in new mathematical topics. He/she understands the connection between subjects. | - EC
| EC 7: A graduate of the Bachelor of Mathematics programme is able to autonomously comprehend new mathematical basic texts.
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| EC 13: A graduate of the Bachelor of Mathematics programme is familiar with English professional literature.
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| EC 14: A graduate of the Bachelor of Mathematics programme has a critical attitude and a research attitude.
| - EC
| EC 16: A graduate of the Bachelor of Mathematics programme is able to work and plan independently, he/she is able to evaluate him/herself and is able to adjust his or her behaviour accordingly. |
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| | EC = learning outcomes DC = partial outcomes BC = evaluation criteria |
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Ordinary differential equations, bifurcations, existence and uniqueness of solutions and consequences of this, systems of ordinary differential equations, types of equilibria, linear systems, matrix exponential, linearisation, conjugacy, stability, dynamical systems, phase plane analysis, invariant sets
|
|
Ordinary differential equations, bifurcations, existence and uniqueness of solutions and consequences of this, systems of ordinary differential equations, types of equilibria, linear systems, matrix exponential, linearisation, conjugacy, stability, dynamical systems, phase plane analysis, invariant sets
|
|
|
|
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|
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Lecture ✔
|
|
|
|
Response lecture ✔
|
|
|
|
Period 2 Credits 5,00 Second examination period
| Evaluation second examination opportunity different from first examination opprt | |
|
|
|
| Compulsory textbooks (bookshop) |
| |
Differential equations, dynamical Systems & an introduction to chaos,Morris W. Hirsch, Stephen Smale, Robert L. Devaney,Elsevier academic press,9780123820105 |
|
|
| Previously purchased compulsory textbooks |
| |
Differential equations, dynamical Systems & an introduction to chaos, Morris W. Hirsch, Stephen Smale, Robert L. Devaney, Elsevier academic press, 0123497035 |
|
|
| Compulsory course material |
| |
Study guide (available on Blackboard) |
|
|
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1 examination regulations art.1.3, section 4. |
| 2 examination regulations art.4.7, section 2. |
3 examination regulations art.2.2, section 3.
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| Legend |
| SBU : course load | SP : ECTS | N : Dutch | E : English |
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