Difference between revisions of "IU:TestPage"
Jump to navigation
Jump to search
R.sirgalina (talk | contribs) Tag: Manual revert |
R.sirgalina (talk | contribs) Tag: Manual revert |
||
| Line 35: | Line 35: | ||
* Fast Fourier Transform |
* Fast Fourier Transform |
||
* To find eigenvalues and eigenvectors for matrix diagonalization and single value decomposition |
* To find eigenvalues and eigenvectors for matrix diagonalization and single value decomposition |
||
| + | === Course evaluation === |
||
| + | {| class="wikitable" |
||
| + | |+ Course grade breakdown |
||
| + | |- |
||
| + | ! Type !! Points |
||
| + | |- |
||
| + | | Labs/seminar classes || 20 |
||
| + | |- |
||
| + | | Interim performance assessment || 30 |
||
| + | |- |
||
| + | | Exams || 50 |
||
| + | |} |
||
| + | |||
| + | === Grades range === |
||
| + | {| class="wikitable" |
||
| + | |+ Course grading range |
||
| + | |- |
||
| + | ! Grade !! Points |
||
| + | |- |
||
| + | | A || [85, 100] |
||
| + | |- |
||
| + | | B || [65, 84] |
||
| + | |- |
||
| + | | C || [50, 64] |
||
| + | |- |
||
| + | | D || [0, 49] |
||
| + | |} |
||
Revision as of 16:19, 6 December 2021
Analytical Geometry \& Linear Algebra -- II
- Course name: Analytical Geometry \& Linear Algebra -- II
- Course number: XYZ
Course Characteristics
Key concepts of the class
- fundamental principles of linear algebra,
- concepts of linear algebra objects and their representation in vector-matrix form
What is the purpose of this course?
Course objectives based on Bloom’s taxonomy
- What should a student remember at the end of the course?
By the end of the course, the students should be able to
- List basic notions of linear algebra
- Understand key principles involved in solution of linear equation systems and the properties of matrices
- Linear regression analysis
- Fast Fourier Transform
- How to find eigenvalues and eigenvectors for matrix diagonalization and single value decomposition
- What should a student be able to understand at the end of the course?
By the end of the course, the students should be able to
- Key principles involved in solution of linear equation systems and the properties of matrices
- Become familiar with the four fundamental subspaces
- Linear regression analysis
- Fast Fourier Transform
- How to find eigenvalues and eigenvectors for matrix diagonalization and single value decomposition
- What should a student be able to apply at the end of the course?
By the end of the course, the students should be able to
- Linear equation system solving by using the vector-matrix approach
- Make linear regression analysis
- Fast Fourier Transform
- To find eigenvalues and eigenvectors for matrix diagonalization and single value decomposition
Course evaluation
| Type | Points |
|---|---|
| Labs/seminar classes | 20 |
| Interim performance assessment | 30 |
| Exams | 50 |
Grades range
| Grade | Points |
|---|---|
| A | [85, 100] |
| B | [65, 84] |
| C | [50, 64] |
| D | [0, 49] |