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Information
| Unit | FACULTY OF SCIENCE AND LETTERS |
| MATHEMATICS PR. | |
| Code | MT467 |
| Name | Operational Mathematics |
| Term | 2017-2018 Academic Year |
| Semester | 7. Semester |
| Duration (T+A) | 3-0 (T-A) (17 Week) |
| ECTS | 5 ECTS |
| National Credit | 3 National Credit |
| Teaching Language | Türkçe |
| Level | Lisans Dersi |
| Type | Normal |
| Label | E Elective |
| Mode of study | Belirsiz |
| Catalog Information Coordinator | Prof. Dr. ŞEHMUS FINDIK |
| Course Instructor |
Prof. Dr. ŞEHMUS FINDIK
(Güz)
(A Group)
(Ins. in Charge)
|
Course Goal / Objective
To teach the students the concepts Laplace Transform, Transform of derivative and Fourier series with examples.
Course Content
The Laplace Transformation. Transforms of derivatives. The Gamma function. The inverse transformation. The other properties of transformation. Fourier series. Bessel´s inequality and Parseval´s equality. The derivative and integral of Fourier series. Solutions of the partial differential equation using Fourier transformations.
Course Precondition
Resources
Operational Mathematics, Yazar: R.V. Churchill Lipschutz, Differential Geometry (Schaum´s outline series)
Notes
Course Learning Outcomes
| Order | Course Learning Outcomes |
|---|---|
| LO01 | Students who successfully complete this course, Know the definition of Laplace transform. |
| LO02 | Calculate the Laplace transform of some functions. |
| LO03 | Know the definition of Fourier Series. |
| LO04 | Calculate the Fourier Series of odd functions. |
| LO05 | Are able to define the Laplace transform of a function. |
| LO06 | Calculate the Fourier Series of even functions. |
| LO07 | Calculate the Fourier Series of odd functions on any given interval. |
| LO08 | Calculate the Fourier Series of even functions on any given interval. |
Relation with Program Learning Outcome
| Order | Type | Program Learning Outcomes | Level |
|---|---|---|---|
| PLO01 | Bilgi - Kuramsal, Olgusal | Comprehend the ability to prove the mathematical knowledge gained in secondary education on the basis of theoretical basis. | 4 |
| PLO02 | Bilgi - Kuramsal, Olgusal | Understands importance of basic consepts of Algebra, Analaysis and Topology. | 4 |
| PLO03 | Yetkinlikler - Öğrenme Yetkinliği | Mathematical reasoning demonstrates the ability to develop and write mathematical proofs by gaining maturity. | 2 |
| PLO04 | Bilgi - Kuramsal, Olgusal | Demonstrates the ability to express the basic theories of mathematics accurately both in writing and orally. | |
| PLO05 | Bilgi - Kuramsal, Olgusal | Understands the relationship between the different fields of mathematics and its relation to other disciplines. | 3 |
| PLO06 | Bilgi - Kuramsal, Olgusal | Comprehends the ability to understand the relationships between the objects in the most understandable way while creating a model for any problem. | |
| PLO07 | Bilgi - Kuramsal, Olgusal | Comprehend and explain mathematical models such as formulas, graphs, tables and schema. | 4 |
| PLO08 | Bilgi - Kuramsal, Olgusal | Demonstrate the ability to mathematically rearrange, analyze, and model the problems they encounter. | 3 |
| PLO09 | Bilgi - Kuramsal, Olgusal | Comprehends at least one of the computer programming languages. | |
| PLO10 | Bilgi - Kuramsal, Olgusal | Demonstrate the ability to use scientific methods and appropriate technologies effectively in problem solving. | 4 |
| PLO11 | Yetkinlikler - Bağımsız Çalışabilme ve Sorumluluk Alabilme Yetkinliği | Understands sufficient knowledge of foreign language to be able to understand Mathematical concepts and communicate with other mathematicians | |
| PLO12 | Yetkinlikler - Bağımsız Çalışabilme ve Sorumluluk Alabilme Yetkinliği | In addition to their professional development, they demonstrate their ability to continuously improve themselves by identifying their educational needs in scientific, cultural, artistic and social areas in line with their interests and abilities. | 3 |
| PLO13 | Yetkinlikler - Öğrenme Yetkinliği | Understands the programming techniques and shows the ability to do programming. | |
| PLO14 | Yetkinlikler - Öğrenme Yetkinliği | Demonstrates the ability to study mathematics both independently and as a group. | 4 |
| PLO15 | Bilgi - Kuramsal, Olgusal | Demonstrate an awareness of the universal and social impacts and legal consequences of mathematical applications in the field of study. | 3 |
| PLO16 | Bilgi - Kuramsal, Olgusal | Demonstrate the ability to select, use and develop effectively for contemporary mathematical applications. | 3 |
| PLO17 | Bilgi - Kuramsal, Olgusal | It has ability of lifelong learning awareness, access to information, monitoring developments in science and technology and self-renewal ability. | |
| PLO18 | Bilgi - Kuramsal, Olgusal | Gains the ability to use information technologies effectively for contemporary mathematical applications. | 4 |
| PLO19 | Bilgi - Kuramsal, Olgusal | Gains the ability to design, conduct experiments, field work, data collection, analysis, archiving, text solving and / or interpretation according to mathematics fields. | |
| PLO20 | Bilgi - Kuramsal, Olgusal | Gains the consciousness of prefesional ethics and responsibility. | 3 |
Week Plan
| Week | Topic | Preparation | Methods |
|---|---|---|---|
| 1 | Laplace transform | Review of the relevant pages from sources | |
| 2 | Piecewise continuous functions and exponential order | Review of the relevant pages from sources | |
| 3 | Transforms of derivatives, the Gamma function | Review of the relevant pages from sources | |
| 4 | Inverse transforms and their properties | Review of the relevant pages from sources | |
| 5 | Piecewise continuous functions, regular point of discontinuity, even and odd functions | Review of the relevant pages from sources | |
| 6 | Fourier Series and Dirichlet conditions | Review of the relevant pages from sources | |
| 7 | Fourier series of odd and even functions | Review of the relevant pages from sources | |
| 8 | Mid-term exam | Review of the topics discussed in the lecture notes and sources | |
| 9 | Complex Fourier series, Fourier series on the interval [a,b] | Review of the relevant pages from sources | |
| 10 | Fourier series of the functions defined on half intervals | Review of the relevant pages from sources | |
| 11 | The Problem of Convergence of Fourier Series, (C,1) summability. | Review of the relevant pages from sources | |
| 12 | L² theory for Fourier Series, Bessel´s Inequality | Review of the relevant pages from sources | |
| 13 | Convolution and Parseval´s Theorem | Review of the relevant pages from sources | |
| 14 | General Review | Review of the relevant pages from sources | |
| 15 | Solving problems | Review of the relevant pages from sources | |
| 16 | Final exam | Review of the topics discussed in the lecture notes and sources | |
| 17 | Final exam | Review of the topics discussed in the lecture notes and sources |
Assessment (Exam) Methods and Criteria
| Assessment Type | Midterm / Year Impact | End of Term / End of Year Impact |
|---|---|---|
| 1. Midterm Exam | 100 | 40 |
| General Assessment | ||
| Midterm / Year Total | 100 | 40 |
| 1. Final Exam | - | 60 |
| Grand Total | - | 100 |
Student Workload - ECTS
| Works | Number | Time (Hour) | 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 | 12 | 12 |
| Final Exam | 1 | 18 | 18 |
| Total Workload (Hour) | 114 | ||
| Total Workload / 25 (h) | 4,56 | ||
| ECTS | 5 ECTS | ||