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| Course Description |
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| Course Name |
: |
Linear Algebra - II |
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| Course Code |
: |
MAT112 |
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| Course Type |
: |
Compulsory |
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| Level of Course |
: |
First Cycle |
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| Year of Study |
: |
1 |
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| Course Semester |
: |
Spring (16 Weeks) |
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| ECTS |
: |
4 |
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| Name of Lecturer(s) |
: |
Asst.Prof.Dr. ELA AYDIN
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| Learning Outcomes of the Course |
: |
Can find a base and dimension of vector space
Understands linear transformation and their properties
Can write a matrix form for a linear transformation
Can alculate the length and angle using inner product and find the orthogonal complement of a space
Can determine eigenvalue and related eigenvector
Can write similar matrices and diagonal matrices
Can do different applications of determinants
Calculate the rank of a matrix
Can calculate with complex numbers in linear algebra and solve the systems
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| Mode of Delivery |
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Face-to-Face |
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| Prerequisites and Co-Prerequisites |
: |
None |
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| Recommended Optional Programme Components |
: |
None |
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| Aim(s) of Course |
: |
To find a base of vector space and determine its dimension,To calculate the length of vectors in inner products spaces and the angles between them,To understand the relation between matrices and linear transformation,To determine eigenvalue and eigenvector and find similar matrices
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| Course Contents |
: |
Linear dependence and independence applications, Dimension of vector spaces, iner product spaces, orthogonal and orthonormal vectors, Gramm-Schmidt orthogonalization process, linear transformations of vector spaces, representation of linear transformations by matrices, permutations, determinant function and applications, eigenvalues and eigenvectors, diagonalization and triangularization of matrices, complex numbers and solving systems of complex equations. |
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| Language of Instruction |
: |
Turkish |
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| Work Place |
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Department classrooms |
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Course Outline /Schedule (Weekly) Planned Learning Activities |
| Week | Subject | Student's Preliminary Work | Learning Activities and Teaching Methods |
|
1 |
Linear functions, one to one and onto functions |
Reading the relevants sections in the textbook and solve problems |
Lecture and discussion |
|
2 |
Kernel and images of linear functions |
Reading the relevants sections in the textbook and solve problems |
Lecture and discussion |
|
3 |
Matrices of linear transformations |
Reading the relevants sections in the textbook and solve problems |
Lecture and discussion |
|
4 |
equvalences of matrices |
Reading the relevants sections in the textbook and solve problems |
Lecture and discussion |
|
5 |
Sthandard inner product in space and plane |
Reading the relevants sections in the textbook and solve problems |
Lecture and discussion |
|
6 |
Inner products and orthogonality |
Reading the relevants sections in the textbook and solve problems |
Lecture and discussion |
|
7 |
Gramm-Schmidt orthogonalization |
Reading the relevants sections in the textbook and solve problems |
Lecture and discussion |
|
8 |
Mid-term exam |
Review and problem solving |
Written exam |
|
9 |
Eigenvalues and eigenvectors |
Reading the relevants sections in the textbook and solve problems |
Lecture and discussion |
|
10 |
Diagonalization and triangularization of matrices |
Reading the relevants sections in the textbook and solve problems |
Lecture and discussion |
|
11 |
Diagonalization of symetric matrices |
Reading the relevants sections in the textbook and solve problems |
Lecture and discussion |
|
12 |
Determinant function applications |
Reading the relevants sections in the textbook and solve problems |
Lecture and discussion |
|
13 |
Rank of matrices |
Reading the relevants sections in the textbook and solve problems |
Lecture and discussion |
|
14 |
Complex numbers in Linear algebra |
Reading the relevants sections in the textbook and solve problems |
Lecture and discussion |
|
15 |
Solving problems |
Solving problems |
Lecture and discussion |
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16/17 |
Final exam |
Review and problem solving |
Written exam |
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Required Course Resources |
| Resource Type | Resource Name |
| Recommended Course Material(s) |
 Bernard Kolman, David R. Hill, " Lineer Cebir" (Çeviri ) Palme Yayıncılık Press,2000
Veli Şahmurov, Gökhan Uzgören, " Lineer Cebir Uygulamaları" Papatya Yayıncılık Press,1999.
Arif Sabuncuoğlu, "Lineer Cebir", Nobel yayın dağıtım,2000.
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| |
| Required Course Material(s) | |
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Assessment Methods and Assessment Criteria |
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Semester/Year Assessments |
Number |
Contribution Percentage |
|
Mid-term Exams (Written, Oral, etc.) |
1 |
100 |
|
Homeworks/Projects/Others |
0 |
0 |
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Total |
100 |
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Rate of Semester/Year Assessments to Success |
40 |
| |
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Final Assessments
|
100 |
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Rate of Final Assessments to Success
|
60 |
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Total |
100 |
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| Contribution of the Course to Key Learning Outcomes |
| # | Key Learning Outcome | Contribution* |
|
1 |
Utilize computer systems and softwares |
4 |
|
2 |
Apply the statistical analyze methods |
5 |
|
3 |
Make statistical inference(estimation, hypothesis tests etc.) |
5 |
|
4 |
Generate solutions for the problems in other disciplines by using statistical techniques |
0 |
|
5 |
Discover the visual, database and web programming techniques and posses the ability of writing programme |
3 |
|
6 |
Construct a model and analyze it by using statistical packages |
0 |
|
7 |
Distinguish the difference between the statistical methods |
0 |
|
8 |
Be aware of the interaction between the disciplines related to statistics |
1 |
|
9 |
Make oral and visual presentation for the results of statistical methods |
0 |
|
10 |
Have capability on effective and productive work in a group and individually |
0 |
|
11 |
Develop scientific and ethical values in the fields of statistics-and scientific data collection |
0 |
|
12 |
Explain the essence fundamentals and concepts in the field of Probability, Statistics and Mathematics |
3 |
|
13 |
Emphasize the importance of Statistics in life |
0 |
|
14 |
Define basic principles and concepts in the field of Law and Economics |
2 |
|
15 |
Produce numeric and statistical solutions in order to overcome the problems |
5 |
|
16 |
Construct the model, solve and interpret the results by using mathematical and statistical tehniques for the problems that include random events |
5 |
|
17 |
Use proper methods and techniques to gather and/or to arrange the data |
3 |
|
18 |
Professional development in accordance with their interests and abilities, as well as the scientific, cultural, artistic and social fields, constantly improve themselves by identifying training needs |
0 |
| * Contribution levels are between 0 (not) and 5 (maximum). |
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| Student Workload - ECTS |
| Works | Number | Time (Hour) | Total Workload (Hour) |
| Course Related Works |
|
Class Time (Exam weeks are excluded) |
14 |
3 |
42 |
|
Out of Class Study (Preliminary Work, Practice) |
14 |
3 |
42 |
| Assesment Related Works |
|
Homeworks, Projects, Others |
0 |
0 |
0 |
|
Mid-term Exams (Written, Oral, etc.) |
1 |
10 |
10 |
|
Final Exam |
1 |
15 |
15 |
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Total Workload: | 109 |
| Total Workload / 25 (h): | 4.36 |
| ECTS Credit: | 4 |
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