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
MAT 4069	ADVANCED MATHEMATICAL PROBLEM SOLVING TECHNIQUES FOR OLYMPIADS	ELECTIVE	4	0	0	7

Offered By

Mathematics

Level of Course Unit

First Cycle Programmes (Bachelor's Degree)

Course Coordinator

ASSISTANT PROFESSOR CELAL CEM SARIOĞLU

Offered to

Mathematics

Course Objective

This course aims to introduce students to advanced problem techniques for the problems in mathematical olympiads.

Learning Outcomes of the Course Unit

1	will be able to use important identities and inequalities to solve olympiad problems
2	will be able to use calculus and analysis techniques to solve olympiad problems
3	will be able to use geometric and trigonometric tools to solve olympiad problems
4	will be able to use linear algebra tools to solve olympiad problems
5	will be able to use number theoretic methods to solve olympiad problems
6	will be able to use combinatorial techniques to solve olympiad problems

Mode of Delivery

Face -to- Face

Prerequisites and Co-requisites

None

Recomended Optional Programme Components

None

Course Contents

Week	Subject	Description
1	Methods of Proof
2	Identities and Inequalities
3	Polynomials and olympiad problems
4	Linear algebra for olympiad problems
5	Abstract algebra for olympiad problems
6	Sequences and Series
7	Calculus techniques for olympiad problems
8	Equations with functions as unknowns + Midterm Exam
9	Geometry in olympiad problems
10	Trigonomety in olympiad problems
11	Integer Valued Sequences and Functions, Arithmetic
12	Arithmetic, Diophantine Equations
13	Combinatorial and Probability techniques for olympiad problems
14	Graph theory for olympiad problems

Recomended or Required Reading

Textbooks:
1. Gelca, R. and Andreescu, T., Putnam and Beyond, Springer, 2007
2. Andreescu, T. and Enescu, B., Mathematical Olympiad Treasures, Birkhauser, 2011
Supplementary Books:
3. Andreescu, T. and Gelca, R., Mathematical Olympiad Challenges, 2nd edition, Birkhauser, 2008
4. Andreescu, T., Mortici, C. and Tetiva, M., Mathematical Bridges, Birkhauser, 2017
5. Djukic, D., Jankovic, V., Matic, I. and Petrovic, N., The IMO Compendium: A Collection of Problems Suggested for The International Mathematical Olympiads: 1959-2009, 2nd Edition, Springer, 2011
6. Shklarsky, D. O., Chentzov, N. N. and Yaglom, I.M., The USSR Olympiad Problem Book: Selected Problems and Theorems of Elementary Mathematics, 3rd edition, Dover, 2013
7. Cvetkovski, Z., Inequalities: Theorems, Techniques and Selected Problems, Springer, 2012
8. Small, C. G., Functional Equations and How to Solve Them, Springer, 2007
9. Grigorieva, E., Methods of Solving Sequence and Series Problems, Birkhauser, 2016
10. Grigorieva, E., Methods of Solving Number Theory Problems, Birkhauser, 2018
11. Grigorieva, E., Methods of Solving Nonstandart Problems, Birkhauser, 2015
12. Grigorieva, E., Methods of Solving Complex Geometry Problems, Birkhauser, 2015
13. Posamentier, A. S. and Salkind, C. T., Challenging Problems in Geometry, Dover, 2012
14. Posamentier, A. S. and Salkind, C. T., Challenging Problems in Algebra, Dover, 2012
15. Prilepko, A.I., Problem Book in High-School Mathematics, Mir, 1985

Planned Learning Activities and Teaching Methods

Assessment Methods

SORTING NUMBER	SHORT CODE	LONG CODE	FORMULA
1	MTE	MIDTERM EXAM
2	QUZ	QUIZ
3	ASG	ASSIGNMENT
4	FIN	FINAL EXAM
5	FCGR	FINAL COURSE GRADE (RESIT)	MTE * 0.30 + QUZ * 0.10 + ASG * 0.10 + FIN * 0.50
6	RST	RESIT
7	FCGR	FINAL COURSE GRADE (RESIT)	MTE * 0.30 + QUZ * 0.10 + ASG * 0.10 + RST * 0.50

*** Resit Exam is Not Administered in Institutions Where Resit is not Applicable.

Further Notes About Assessment Methods

None

Assessment Criteria

Midterm, Quiz, Homework Assignments, Final

Language of Instruction

English

Course Policies and Rules

Attandence in the rate 70% is compulsory

Contact Details for the Lecturer(s)

Asst.Prof.Dr. Celal Cem Sarıoğlu
E-mail: celalcem.sarioglu@deu.edu.tr
Office : +90 232 3018607

Office Hours

TBA

Work Placement(s)

None

Workload Calculation

Activities	Number	Time (hours)	Total Work Load (hours)
Lectures	14	4	56
Preparations before/after weekly lectures	13	2	26
Preparation for midterm exam	1	20	20
Preparation for final exam	1	26	26
Preparation for quiz etc.	2	5	10
Preparing assignments	5	6	30
Final	1	2	2
Midterm	1	2	2
Quiz etc.	2	1	2
TOTAL WORKLOAD (hours)			174

Contribution of Learning Outcomes to Programme Outcomes

PO/LO	PO.1	PO.2	PO.3	PO.4	PO.5	PO.6	PO.7	PO.8	PO.9	PO.11	PO.12	PO.13
LO.1	5	5	5	4	3	5	4	5	3	3	4	4
LO.2	5	5	5	4	3	5	4	5	3	3	4	4
LO.3	5	5	5	4	3	5	4	5	3	3	4	4
LO.4	5	5	5	4	3	5	4	5	3	3	4	4
LO.5	5	5	5	4	3	5	4	5	3	3	4	4
LO.6	5	5	5	4	3	5	4	5	3	3	4	4

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