Dokuz Eylül University Information Package / Courses Catalog

Description of Individual Course Units

Course Unit Code	Course Unit Title	Type Of Course	D	U	L	ECTS
MIM 1011	MATHEMATICS	COMPULSORY	4	0	0	5

Offered By

Architecture

Level of Course Unit

First Cycle Programmes (Bachelor's Degree)

Course Coordinator

ASISTANT PROFESSOR TANER UÇAR

Offered to

Architecture

Course Objective

The aim of this course is to introduce the definitions, the theorems and the applications on the basic mathematical concepts, limit, continuity, differential and integration. Matrices, determinants, solution of homogenous and non-homogenous systems of linear equations, numerical solutions of non-linear equations

Learning Outcomes of the Course Unit

1	Evaluating limits of functions and examining continuity
2	Finding the derivative of functions and understanding applications of derivatives
3	Learning the integration methods and integral applications
4	Understanding matrix operations and evaluating determinants
5	Solving homogeneous and non-homogeneous systems of linear equations
6	Understanding the numerical solution of non-linear equations

Mode of Delivery

Face -to- Face

Prerequisites and Co-requisites

None

Recomended Optional Programme Components

None

Course Contents

Week	Subject	Description
1	Limits, Right and left limits, Theorems on limits, Limits of trigonometric functions, Indeterminate forms, / type, 0/0 type, 0. type, - type, Continuity, Theorems on continuity, Right and left continuity, Supplementary examples.
2	The derivative, Derivative rules, Differentiation of a function of a function, Higher derivatives, Parametric differentiation, Implicit differentiation, Supplementary examples.
3	Differentiation of inverse functions, Differentiation of trigonometric functions, Differentiation of inverse trigonometric functions, Differentiation of exponential and logarithmic functions, Supplementary examples.
4	Using of derivatives to evaluate limits, L Hospital Rule, 1. , 00, .0 indeterminate forms, Geometric interpretation of differentiation, Tangents and normals, Increasing and decreasing functions, Relative maximum and minimum values of a function, Supplementary examples.
5	Series expansion of functions, Taylor s and Maclaurin s series, Partial derivatives, Partial derivatives of higher orders, Indefinite integrals, Fundamental integration formulas, Integration methods, Integration by substitution (change of variables), Supplementary examples.
6	Trigonometric integrals, Integration by parts, Integration by partial franctions, Supplementary examples.
7	Trigonometric substitutions, Miscellaneous substitutions, Supplementary examples.
8	The definite integral, Properties of definite integral, Geometric interpretation of definite integrals, Areas by integration, Supplementary examples.
9	Matrices, Matrix operations, Power of matrices, Properties of matrix operations, Square matrices, Determinants, Minors and cofactors, Evaluatiing determinants, Rule of Sarrus, Properties and theorems for determinants, Supplementary examples.
10	Midterm
11	Inverse of a square matrix: using the definition, using adjoint matrix, using elementary row operations, using the Cayley-Hamilton theorem, Rank of a matrix, Supplementary examples.
12	Systems of linear equations, Solution of non-homogeneous systems of linear equations using matrices, Gaussian elimination, Inverse matrix method, Supplementary examples.
13	Solution of homogeneous systems of linear equations, Solution of homogeneous systems of linear equations using determinants, Cramer s rule, Numerical solutions of nonlinear equations, Newton-Raphson Method, Geometric interpretation of the Newton-Raphson method, Convergence of the method, Supplementary examples.
14	Secand method, Bisection method, Functional iteration method, Supplementary examples.

Recomended or Required Reading

Tin, A.T., Badem, N., (2011), "Matematik I", Cilt 1-2, Dokuz Eylül University Engineering Faculty Press, IZMIR
Supplementary Book(s):
Aydın, S., (1980), "Analize Giriş", Başarı Yayınları, Ankara.
Speigel, M.R., (1978) "Advanced Calculus", Mc-Graw-Hill Book Company, New York.
Stein, S.K., Barcellos, A., (1996) "Calculus and Analytic Geometry" Cilt 1-2, Mc-Graw-Hill-Literatür, Istanbul.
Ayres, F., (1980) "Matrices", Schaums Outline Series, Mc-Graw-Hill Book Company, New York.
Lipschutz, S., (1974) "Linear Algebra", Schaums Outline Series, Mc-Graw-Hill Book Company, New York.
Çatal, (Alku) S. , (2003) "Sayısal Çözümleme ve Örnekler", Dokuz Eylül Üniversitesi Müh. Fak.Basım Ünitesi, Izmir.
Yardımcı kaynaklar :
Oturanç, G.; Kurnaz, A.; Kiriş, M.E. (2003) "Sayısal Analiz", Dizgi Ofset Yayınları, Konya.
Uzun, I. (2000) "Nümerik Analiz", Beta Yayınları, Istanbul.
Gündoğdu Ö., Kopmaz O., Ceviz M.A., (2004) "Matlab Mühendislik ve Fen Uygulamalarıyla" Nobel Yayın Dağıtım, Istanbul

Materials: Calculator.

Planned Learning Activities and Teaching Methods

Theoretical lectures, supplementary examples, midterm exam and final exam

Assessment Methods

SORTING NUMBER	SHORT CODE	LONG CODE	FORMULA
1	MTE	MIDTERM EXAM
2	FINS	FINAL EXAM
3	FCG	FINAL COURSE GRADE	MTE * 0.50 + FINS * 0.50
4	RST	RESIT
5	FCGR	FINAL COURSE GRADE (RESIT)	MTE * 0.50 + RST * 0.50

Further Notes About Assessment Methods

None

Assessment Criteria

LO1-6: Evaluated by midterm and final exam questions
Midterm exam : %50 (LO1, LO2, LO3)
Final exam : %50(LO1, LO2, LO3, LO4, LO5, LO6)

Language of Instruction

Turkish

Course Policies and Rules

Attendance to the 70% of the lectures is compulsory in order to be accepted to the final exam.

Contact Details for the Lecturer(s)

Assit.Prof.Dr.Taner UÇAR

Office Hours

Any suitable time.

Work Placement(s)

None

Workload Calculation

Activities	Number	Time (hours)	Total Work Load (hours)
Tutorials	0	0	0
Lectures	13	4	52
Preparations before/after weekly lectures	13	2	26
Preparation for final exam	1	25	25
Preparation for midterm exam	1	15	15
Final	1	4	4
Midterm	1	4	4
TOTAL WORKLOAD (hours)			126

Contribution of Learning Outcomes to Programme Outcomes

PO/LO	PO.2	PO.3	PO.5	PO.12
LO.1	5	5	5	5
LO.2	5	5	5	5
LO.3	5	5	5	5
LO.4	5	5	5
LO.5	5	5	5
LO.6	5	5	5

COURSE UNIT TITLE

DEGREE PROGRAMMES

Description of Individual Course Units

Offered By

Level of Course Unit

Course Coordinator

Offered to

Course Objective

Learning Outcomes of the Course Unit

Mode of Delivery

Prerequisites and Co-requisites

Recomended Optional Programme Components

Course Contents

Recomended or Required Reading

Planned Learning Activities and Teaching Methods

Assessment Methods

Further Notes About Assessment Methods

Assessment Criteria

Language of Instruction

Course Policies and Rules

Contact Details for the Lecturer(s)

Office Hours

Work Placement(s)

Workload Calculation

Contribution of Learning Outcomes to Programme Outcomes

CONTACT INFORMATION