GAZI UNIVERSITY INFORMATION PACKAGE - 2019 ACADEMIC YEAR

COURSE DESCRIPTION
EXPERIMENTAL DESIGN IN MATHEMATICS/MAT- 441
Course Title: EXPERIMENTAL DESIGN IN MATHEMATICS
Credits 3 ECTS 5
Semester 7 Compulsory/Elective Elective
COURSE INFO
 -- LANGUAGE OF INSTRUCTION
  : Turkish
 -- NAME OF LECTURER(S)
   Prof.. Aysel VANLI
 -- WEB SITE(S) OF LECTURER(S)
  www.gazi.edu.tr/~avanli
 -- EMAIL(S) OF LECTURER(S)
  avanli@gazi.edu.tr
 -- LEARNING OUTCOMES OF THE COURSE UNIT
Applies to daily life by learning non-Euclidean geometries.
They have ability to work with an interdisciplinary.
Working to help solve the problem of empirical sciences of geometry, has competence in understanding the impact of global and societal context.
Ability to communicate effectively wins.





 -- MODE OF DELIVERY
  The mode of delivery of this course is Face to face
 -- PREREQUISITES AND CO-REQUISITES
  There is no prerequisite or co-requisite for this course.
 -- RECOMMENDED OPTIONAL PROGRAMME COMPONENTS
  There is no recommended optional programme component for this course.
 --COURSE CONTENT
1. Week  Matrix theory
2. Week  Groubs theory
3. Week  Experimental arrangement, the experimental design models
4. Week  Incomplete random block design, the restriction on the experiment,
5. Week  Latin square
6. Week  Grekolatin square
7. Week  Youden square, t-structures, Euclidean plane
8. Week  Mid-Term Exam
9. Week  Affine planes,the partial plane
10. Week  Configurations, projective planes,
11. Week  Projective geometry
12. Week  Affine plane is completed to projective plane
13. Week  Complete sets of Latin squares and Youden squares are related to projective and other geometries
14. Week  Complete sets of Latin squares and Youden squares are related to projective and other geometries
15. Week  Complete sets of Latin squares and Youden squares are related to projective and other geometries
16. Week  Final Exam
 -- RECOMMENDED OR REQUIRED READING
  The mode of delivery of this course is Face to face
 -- PLANNED LEARNING ACTIVITIES AND TEACHING METHODS
  There is no prerequisite or co-requisite for this course.
 -- WORK PLACEMENT(S)
  None
 -- ASSESSMENT METHODS AND CRITERIA
 
Quantity
Percentage
 Mid-terms
1
30
 Assignment
1
10
 Exercises
0
0
 Projects
0
0
 Practice
0
0
 Quiz
0
0
 Contribution of In-term Studies to Overall Grade  
40
 Contribution of Final Examination to Overall Grade  
60
 -- WORKLOAD
 Efficiency  Total Week Count  Weekly Duration (in hour)  Total Workload in Semester
 Theoretical Study Hours of Course Per Week
14
3
42
 Practising Hours of Course Per Week
0
 Reading
9
3
27
 Searching in Internet and Library
9
3
27
 Designing and Applying Materials
0
 Preparing Reports
0
 Preparing Presentation
0
 Presentation
0
 Mid-Term and Studying for Mid-Term
1
15
15
 Final and Studying for Final
1
19
19
 Other
0
 TOTAL WORKLOAD: 
130
 TOTAL WORKLOAD / 25: 
5.2
 ECTS: 
5
 -- COURSE'S CONTRIBUTION TO PROGRAM
NO
PROGRAM LEARNING OUTCOMES
1
2
3
4
5
1To train individuals who are contemporary, entrepreneur and have unique and aesthetic values, self-confidence and capable of independent decision-making.X
2To give good education in the program fields as algebra, geometry, applied mathematics, topology and analysis in order to be equipped with enough mathematics.X
3To teach mathematical thinking methods in order to improve the ability to express mathematics both orally and in writing.X
4To train individuals who are knowledgeable about the history of mathematics and the production of scientific knowledge and can follow developments in these disciplines.X
5To provide necessary equipments to take positions such areas as banking, finance, econometrics, and actuarial.X
6To acquire ability to solve problems encountered in real life by means of mathematical modeling using mathematical methods.X
7To provide ability to do necessary resource researches in the areas of mathematics and to use accessed information.X
8To give appropriate training in such areas as in computer programming and creating algorithms in order to take parts in developing IT sector.X
9To gain substructure to be able to study at graduate level.X
10To enable the student to gain the ability of relating mathematics with the other sciences.X