Course Code                               : 0502307

 Course Name                              : Mathematic for Engineers 1

 Instructor                                    :Lec. Abdullah Bakır

 Theoretical/ Practical/Credit       :  4 / 0/ 4

 

Learning Activity

Estimated Time(Hour)

Evaluation

Theoretical Course (14 Week)

3 x 14 = 42

Participation to class

Guided Problem Solving

2 x 14 = 28

Active Participation

Individual Study

3 x 14 = 42

 

Weekly homework problems be solved

1 x 14 = 14

Individual or teamwork and report preparation for homework’s.

Term project

None

 

Midterm Exams

4 x 2 = 8

Closed Book

Final Exam

For Exam            : 2

Individual Study: 8

Closed Book

Quiz (4 Piece)

Individual Study: 8

Closed Book

Research (internet / library)

 

 

Other (documentary / movie watching)

 

 

Other (conference, panel, etc.. Attend meetings)

 

 

Total Course Load (Hours)

152

 

 

 

Code of course & Name

 

0502307 Mathematic for Engineers 1

Type of Course

 

Compulsory

Prerequisite/Recommended 

 

None

Year/Semester

 

2st Year / Fall Semester

Credit

 

4

coordinate of course

 

Lec  Abdullah Bakır

Division/Department/Program

 

Mechanical Engineering /Licence

Instructor

 

Lec.  Abdullah Bakır

 

Room/Number classroom

 

 

Time of course

 

 

 Meeting time

 

 

Groups

 

 

Objective of the Course

 

 

This course is to teach basic mathematical techniques (related to functions of a single variable) and to  Show the application of these techniques to various engineering problems

Course Contents

 

 

Fourier series and applications. Complex numbers. Basic algebraic rules for complex numbers.  DeMoivere's Law and applications. Vector analysis. Curves and surfaces. Line integrals, calculation of work by line integrals. Gradient of scalar fields. Divergence and curl of vector fields.

Textbook/Recommended

Reading

 

 

1.        Hilmi HACISALİHOĞLU, “Temel ve Genel Matematik”, 1990.

2.        Boyce W.E, and DiPrima R.C., “Elementary Differantial Equations” 7th edition, John Wiley and Sons, New-York, 2001. R.C.

3.        Thomas G.B., Finey R.L., “Calculus and Analytic Geometry”,  Part 2, 8th edition, Addison-Wesley, New-York, 1992.

4.        Hughers H., Gleason M., at al. “ Single and Multivariable Calculus” John Wiley, 3rd edition, New-York, 2002.

5.        Johnston E.H. and Mathews J.C..“Calculus”, Addison Wesley,  New-York, 2002.

6.        Prof. Dr. Gabil ALİYEV, 1995, “Kısmi Türevli Diferansiyel Denklemler”, Milli Eğitim Basımevi

 

Semester Teaching Plan

1.     Fourier series

2.    Complex functions

3.   Basic algebraic rules for complex numbers

4.    Limit and continuity

5.     Partial derivatives, DeMoivere's Law and applications

6.    General again

7.    Midterm exam

8.    determinants and systems of linear equations

9.     Line integrals, calculation of work by line integrals.

10.  Vector analysis

11. Gradient of scalar fields

12.  Gradient of scalar fields

13.   Divergence and curl of vector fields.

14.   General again

 

Form of Assessment

Midterm exam (40%); final exam (60%)