LOGISTIC MANAGEMENT
Bachelor	TR-NQF-HE: Level 6	QF-EHEA: First Cycle	EQF-LLL: Level 6

Course Introduction and Application Information

Course Code	Course Name	Semester	Theoretical	Practical	Credit	ECTS
ECO1161	Mathematics for Social Sciences I	Fall	3	0	3	8

The course opens with the approval of the Department at the beginning of each semester

Basic information

Language of instruction:	En
Type of course:	Must Course
Course Level:	Bachelor
Mode of Delivery:	Hybrid
Course Coordinator :	Dr. Öğr. Üyesi DİLA ASFUROĞLU
Course Objectives:	The goal of this course is to provide the basic Mathematical tools and foundations for undergraduate students of Political Science, Business Administration, Economics and Finance at an introductory level and to prepare them for more advanced studies.

Learning Outputs

The students who have succeeded in this course;
1. Acquire basic knowledge in fundamental mathematical techniques and understand how mathematics is used in social sciences. 2. Repeat the concept and properties of real numbers, remembers simple algebraic issues such as factorization, systems of linear equations and linear inequalities, classify numbers and make calculations with exponents and radicals.
3. Define quadratic equations, inequalities and their graphs, develop and model situations described by linear or quadratic equations and solve them.
4. Understand linear, hyperbolic, exponential and logarithmic functions and find composite and inverse functions; sketch the graphs of specific functions and find symmetry, reflection and rotations in Cartesian coordinates.
5. Solve systems by describing equilibrium and break-even points; define economic relationships as single variable functions, like demand, supply, price, revenue, cost and profit.
6. Compute simple interest using the simple interest formula, compound and continuous compound interest; and the future value of an annuity; develop a strategy for solving finance problems using mathematics.
7. Calculate matrix operations, find inverse of a matrix and solve systems of linear equations using matrix equations.

Course Content

Course content mainly includes topics from high school algebra; such as exponentials, radicals, equations, inequalities, functions, logarithms and etc. The basic philosophy of the course is first to introduce the topics and then practice on them. The course is designed such that students taking this course will have the necessary mathematical equipment and use quantitative research methods.

Weekly Detailed Course Contents

	Week	Subject	Related Preparation
1)
2)	Applications and More Algebra
3)	Applications and More Algebra
4)	Functions and Graphs
5)	Functions and Graphs
6)	Lines, Parabolas, and Systems
7)	Lines, Parabolas, and Systems
8)	Exponential and Logarithmic Functions
9)	Exponential and Logarithmic Functions
10)	Mathematics of Finance
11)	Mathematics of Finance
12)	Matrix Algebra
13)	Matrix Algebra
14)	Matrix Algebra

Sources

Course Notes:	Introductory Mathematical Analysis, by Ernest F. Haeussler, Richard S. Paul, Richard J. Wood 13th ed. (or 14th ed.) (IMA).
References:	https://www.statlearning.com

Evaluation System

Semester Requirements	Number of Activities	Level of Contribution
Attendance		% 0
Laboratory		% 0
Application		% 0
Field Work		% 0
Special Course Internship (Work Placement)		% 0
Quizzes		% 0
Homework Assignments		% 0
Presentation		% 0
Project		% 0
Seminar		% 0
Midterms	1	% 40
Preliminary Jury		% 0
Final	1	% 60
Paper Submission		% 0
Jury		% 0
Bütünleme		% 0
Total		% 100
PERCENTAGE OF SEMESTER WORK		% 40
PERCENTAGE OF FINAL WORK		% 60
Total		% 100

ECTS / Workload Table

Activities	Number of Activities	Duration (Hours)	Workload
Course Hours	14	3	42
Laboratory	0	0	0
Application	0	0	0
Special Course Internship (Work Placement)	0	0	0
Field Work	0	0	0
Study Hours Out of Class	14	3	42
Presentations / Seminar	0	0	0
Project	0	0	0
Homework Assignments	0	0	0
Quizzes	2	40	80
Preliminary Jury	0	0	0
Midterms	0	0	0
Paper Submission	0	0	0
Jury	0	0	0
Final	1	26	26
Total Workload			190

Contribution of Learning Outcomes to Programme Outcomes

No Effect	1 Lowest	2 Low	3 Average	4 High	5 Highest

	Program Outcomes	Level of Contribution
1)	To correctly identify the problems and to be able to ask the correct questions	2
2)	To have the ability for problem solving and to utilize analytical approach in dealing with the problems	3
3)	To be able to identify business processes and use them to increase the productivity in logistics system.
4)	To be fully prepared for a graduate study	5
5)	Awareness of the new advancements in Information and Communications Technologies (ICT) and to be able to use them in logistics management effectively. internet and the electronic world
6)	To understand the components of logistics as well as the importance of the coordination among these components.
7)	To know the necessary ingredients for improving the productivity in business life	2
8)	To think innovatively and creatively in complex situations
9)	To act and think both regionally and internationally
10)	To understand the demands and particular questions of globalization
11)	Aware of the two way interaction between globalization and logistics; as well as to use this interaction for increasing the productivity.
12)	To be able to use at least one foreign language both for communication and academic purposes
13)	To acquire leadership qualities but also to know how to be a team member
14)	To understand the importance of business ethics and to apply business ethics as a principal guide in both business and academic environment