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| Course Description |
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| Course Name |
: |
Mathematics For Statistics - II |
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| Course Code |
: |
MAT232 |
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| Course Type |
: |
Compulsory |
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| Level of Course |
: |
First Cycle |
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| Year of Study |
: |
2 |
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| Course Semester |
: |
Spring (16 Weeks) |
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| ECTS |
: |
6 |
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| Name of Lecturer(s) |
: |
Assoc.Prof.Dr. AHMET TEMİZYÜREK
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| Learning Outcomes of the Course |
: |
Calculates the center of mass and moment of inertia
Defines the integral over a region
Solves triple integrals using cylindrical and spherical coordinates
Refers to the provided integral as an elliptic integral
Uses the concept of vector at the Integral calculations.
applies the Green´s theorem
Learns the Divergence Theorem
Recognizes the types of differential equations
Determines the type of a given differential equation
solves a given differential equation using the appropriate method
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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 introduce the concepts doble integral, triple integral and line integral and teach the meaning of the differential equatin. To teach the applications of these concepts. |
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| Course Contents |
: |
The center of mass and moments , integrals over a region of space, elliptic integrals, vector integral calculus, line integrals, divergence theorem, Green´s theorem, differential equations, first-order differential equations, homogeneous differential equations, Exact differential equations, linear differential equations, Bernoulli´s differential equation |
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| Language of Instruction |
: |
Turkish |
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| Work Place |
: |
Faculty of Arts and Sciences Annex Classrooms |
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Course Outline /Schedule (Weekly) Planned Learning Activities |
| Week | Subject | Student's Preliminary Work | Learning Activities and Teaching Methods |
|
1 |
Center of mass and moment of inertia |
Review of the relevant pages from sources |
Lecture and solving problem |
|
2 |
Integrals over a region in space |
Review of the relevant pages from sources |
Lecture and solving problem |
|
3 |
Triple integrals in cylindrical and spherical coordinates. |
Review of the relevant pages from sources |
Lecture and solving problem |
|
4 |
Elliptic integrals. |
Review of the relevant pages from sources |
Lecture and solving problem |
|
5 |
Vector integral calculus. |
Review of the relevant pages from sources |
Lecture and solving problem |
|
6 |
Line integral, Green´s theorem in the plane. |
Review of the relevant pages from sources |
Lecture and solving problem |
|
7 |
Divergence Theorem |
Review of the relevant pages from sources |
Lecture and solving problem |
|
8 |
mid-term exam |
Review of the topics discussed in the lecture notes and sources again |
Written exam |
|
9 |
Diferansiyel denklemlerle ilgili temel tanımlar |
Review of the relevant pages from sources |
Lecture and solving problem |
|
10 |
First-order differential equations. |
Review of the relevant pages from sources |
Lecture and solving problem |
|
11 |
Homogeneous differential equations. |
Review of the relevant pages from sources |
Lecture and solving problem |
|
13 |
Linear differential equations |
Review of the relevant pages from sources |
Lecture and solving problem |
|
14 |
Bernoulli, Riccatti, Clairout differential equations |
Review of the relevant pages from sources |
Lecture and solving problem |
|
15 |
High-order linear differential equations |
Review of the relevant pages from sources |
Lecture and solving problem |
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16/17 |
Final exam |
Review of the topics discussed in the lecture notes and sources again |
Written exam |
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Required Course Resources |
| Resource Type | Resource Name |
| Recommended Course Material(s) |
 Theory and Problems of Differential Equations, Ayres F. JR.,Schaum´s Outline series,1972
Öztunç K., Yüksek Matematik ,Cilt 1,2, , irem Publications,1975
F.Akdeniz, Ünlü Y., Dönmez D. Analize Giriş ,Vol. 2,Nobel Bookstore ,2006.
Calculus with Analytic Geometry,Silverman R.A.,Prentice Hall Inc.,London.,1985
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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 |
80 |
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Homeworks/Projects/Others |
5 |
20 |
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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 |
0 |
|
2 |
Apply the statistical analyze methods |
0 |
|
3 |
Make statistical inference(estimation, hypothesis tests etc.) |
2 |
|
4 |
Generate solutions for the problems in other disciplines by using statistical techniques |
3 |
|
5 |
Discover the visual, database and web programming techniques and posses the ability of writing programme |
0 |
|
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 |
5 |
|
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 |
3 |
|
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 |
4 |
|
13 |
Emphasize the importance of Statistics in life |
0 |
|
14 |
Define basic principles and concepts in the field of Law and Economics |
0 |
|
15 |
Produce numeric and statistical solutions in order to overcome the problems |
4 |
|
16 |
Construct the model, solve and interpret the results by using mathematical and statistical tehniques for the problems that include random events |
0 |
|
17 |
Use proper methods and techniques to gather and/or to arrange the data |
2 |
|
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 |
4 |
56 |
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Out of Class Study (Preliminary Work, Practice) |
14 |
3 |
42 |
| Assesment Related Works |
|
Homeworks, Projects, Others |
5 |
2 |
10 |
|
Mid-term Exams (Written, Oral, etc.) |
1 |
20 |
20 |
|
Final Exam |
1 |
20 |
20 |
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Total Workload: | 148 |
| Total Workload / 25 (h): | 5.92 |
| ECTS Credit: | 6 |
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