Education Information System

Course Information

MAT221 - Lineer Cebir I

Rapor Tarihi: 13.04.2026 03:08

Course Information

Course Title	Code	Language	Type	Semester	L+U Hour	Credits	ECTS
Linear Algebra I	MAT221	Turkish	Compulsory	3. Semester	2 + 2	3.0	5.0

Prerequisite Courses
Course Level	Undergraduate
Mode of delivery	Lecturing
Course Coordinator	Doç. Dr. ZAKİR DENİZ
Instructor(s)	Doç. Dr. ZAKİR DENİZ (Güz)
Goals	To understand the basic concepts of vector space and matrices and solutions of linear equations
Course Content	Linear equations systems;The solving linear equations by the rule of Gauss; Matrices and elementary row operations; The solving of a linear equations system by the elemantary row operations, inverse of a matrix; Vector space and supspace; Base and dimension; Direct sum of supspace; Rank of a matrix; Coordinates and mapping matrix in the between of bases; Linear mappings ; Value space and kernel ; The matrix represantation of linear mapping

Learning Outcomes

#	Öğrenme Kazanımı
1	Student’s ability of commenting and thinking truely will improve and the students will gain basic information associated with mathematic

Lesson Plan (Weekly Topics)

Week	Topics/Applications	Method
1. Week	Introduction(Group, ring. field)
2. Week	Operations and vectors in Rn and Cn
3. Week	ttt
4. Week	Findings of solutions of linear equation systems by Gauss method
5. Week	Matrices and operations on matrices
6. Week	Finding the inverse of solution matrices of equation systems with elementary operations
7. Week	Vector spaces and subspaces
8. Week	Linear independence	Preparation, After Class Study, Research
9. Week	Base and dimension
10. Week	Direct sum of supspace
11. Week	Rank of a matrix
12. Week	Coordinates and mapping matrix in the between of bases
13. Week	Linear mappings
14. Week	The presence of the value space and the kernel

*Midterm and final exam dates are not specified in the 14-week course operation plan. Midterm and final exam dates are held on the dates specified in the academic calendar with the decision of the University Senate.

The Matrix for Course & Program Learning Outcomes

No	Program Requirements	Level of Contribution
No	Program Requirements	1	2	3	4	5
1	Possesses theoretical and applied knowledge of the fundamental areas of mathematics (Analysis and Function Theory, Algebra and Number Theory, Geometry, Applied Mathematics, Topology and Foundations of Mathematics, and Mathematical Logic).					✔
2	Explains the historical development of mathematical concepts, their relationship with other branches of science, and their application areas.			✔
3	Defines mathematical problems, selects appropriate methods, and solves them using analytical/numerical techniques.	✔
4	Constructs mathematical expressions with logical integrity and reaches conclusions using proof methods.	✔
5	Formulates and interprets real-life problems by performing mathematical modeling.	✔
6	Effectively uses information technologies and mathematical software in data analysis and computation processes.		✔
7	Takes responsibility in individual or team work; plans and executes projects.		✔
8	Follows current developments in their field; improves themselves with a lifelong learning awareness.		✔
9	Expresses mathematical ideas verbally and in writing clearly and in accordance with academic rules.	✔
10	Acts in accordance with professional and academic ethical values; acts with a sense of social responsibility.					✔

Relations with Education Attainment Program Course Competencies

Program Requirements	DK1
PY1	5
PY2	3
PY3	1
PY4	1
PY5	1
PY6	2
PY7	2
PY8	2
PY9	1
PY10	5
PY11	1
PY12	5
PY13	2
PY14	2
PY15	1

Recommended Sources

Ders Kitabı veya Notu	Ders Kitabı veya Ders Notu bulunmamaktadır.
Diğer Kaynaklar	2.Linear Algebra .Hofman KUNZE 3. Linear Algebra with application,Bernard Kolman,DavidR.Hill 1.Schaum’s outlıne series Theory and problems LINEAR ALGEBRA

Evaluation Method

Responsible Personnel	Grup	Evaluation Method	Percentage
Güz Dönemi
Doç. Dr. ZAKİR DENİZ		Vize	40.00
Doç. Dr. ZAKİR DENİZ		Final	60.00
Toplam			100.00

ECTS credits and course workload

ECTS credits and course workload		Quantity	Duration (Hour)	Total Workload (Hour)
Ders İçi	Class Hours	14	4	56
Sınavlar	Midterm	1	2	2
	Final	1	2	2
	Practice	15	1	15
	Practice End-Of-Term	15	2	30
	Classroom Activities	15	1	15
Total Workload				120
*AKTS = (Total Workload) / 25,5		ECTS Credit of the Course		25.5 5.0