GAZI UNIVERSITY INFORMATION PACKAGE - 2019 ACADEMIC YEAR

COURSE DESCRIPTION
MATHEMATICS I/MAT-101
Course Title: MATHEMATICS I
Credits 4 ECTS 8
Semester 1 Compulsory/Elective Compulsory
COURSE INFO
 -- LANGUAGE OF INSTRUCTION
  TURKISH
 -- NAME OF LECTURER(S)
   Assoc.Prof. Çetin VURAL; Assoc.Prof. Ercan ALTINIŞIK
 -- WEB SITE(S) OF LECTURER(S)
  http://websitem.gazi.edu.tr/site/cvural ; http://websitem.gazi.edu.tr/site/ealtinisik
 -- EMAIL(S) OF LECTURER(S)
  cvural@gazi.edu.tr ; ealtinisik@gazi.edu.tr
 -- LEARNING OUTCOMES OF THE COURSE UNIT
Be able to understand definition of functionthe fundamental function.
Ability of combinig functions to make new functions.
Ability to comment on continuitylimit of functions at given points.
The concept of derivative
Be able to use some applications of derivatives
Learning to Higher-Order Derivatives, implicit differentiationderivative of the parametric functions.
Convex functions, curve sketching, approximate calculations with a finite sum,a total of sigma notation and finite limits
Definite integral, fundamental theorem of integral
indefinite intergral and substitution method
the region between the curves of the area section (slitting) method, and rotation about an axis of the cylindrical shells and the volume calculation.
 -- MODE OF DELIVERY
  The mode of delivery of this course is Face to face
 -- PREREQUISITES AND CO-REQUISITES
  There is no prerequisiteco-requisite for this course
 -- RECOMMENDED OPTIONAL PROGRAMME COMPONENTS
  There is no recommended optional programme component for this course.
 --COURSE CONTENT
1. Week  Functions and their graphs.
2. Week  Combining functions to make new functions.
3. Week  Trigonometric functions.
4. Week  Limits of functions
5. Week  Rules for Calculating limits.
6. Week  One-sided limits and the formal definition of limit
7. Week  Contiunity.
8. Week  Limits at infinity and infinite limits.
9. Week  Midterm exam.
10. Week  Definition of derivative and Differentiation rules.
11. Week  Higher-Order Derivatives, implicit differentiationderivative of the parametric functions.
12. Week  The geometrical meaning further applications of derivative, Rolle's Theorem, Mean Value Theorem, etc.
13. Week  Convex functions, curve sketching, approximate calculations with a finite sum, a total of sigma notation and finite limits
14. Week  Definite integral, fundamental theorem of integral indefinite intergral and substitution method, the region between the curves of the area
15. Week  section (slitting) method, and rotation about an axis of the cylindrical shells and the volume calculation
16. Week  Final exam
 -- RECOMMENDED OR REQUIRED READING
  1-) George B. Thomas, "Thomas Kalkülüs", çev.Edt. Mustafa Bayram, Pearson yayınevi. 2-) Prof. Dr. İbrahim Ethem Anar, "Genel Matematik-I" , Gazi Yayınevi
 -- PLANNED LEARNING ACTIVITIES AND TEACHING METHODS
  Lecture, Practise
 -- WORK PLACEMENT(S)
  
 -- ASSESSMENT METHODS AND CRITERIA
 
Quantity
Percentage
 Mid-terms
1
40
 Assignment
0
0
 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
4
56
 Practising Hours of Course Per Week
14
2
28
 Reading
0
 Searching in Internet and Library
4
5
20
 Designing and Applying Materials
2
5
10
 Preparing Reports
1
10
10
 Preparing Presentation
1
10
10
 Presentation
2
6
12
 Mid-Term and Studying for Mid-Term
1
18
18
 Final and Studying for Final
1
25
25
 Other
0
 TOTAL WORKLOAD: 
189
 TOTAL WORKLOAD / 25: 
7.56
 ECTS: 
8
 -- COURSE'S CONTRIBUTION TO PROGRAM
NO
 PROGRAM LEARNING OUTCOMES
1
2
3
4
5
11. The statistical textbooks which include latest information about statistics, equipment and other resources supported by scientific approach on undergraduate level have theoretical and practical knowledge.X
22. Statisticians by using knowledge and skills acquired at bachelor degree level model, analyze, and interpret datasets.X
33. Statisticians identify and analyze the problems with current developments in statistic and also develop solutions based upon researches and proofs.X
44. Statisticians apply theoretical and practical knowledge acquired in Statistics at bachelor degree level to the current problems.X
55. Statisticians have the ability to use computer software and computing technology at the certain level required by statistics field.X
66. Statisticians take responsibility at disciplinary and interdisciplinary studies as an individual or a team member.X
77. Statisticians must have knowledge and ability to follow development in the field of Statistics, and must develop life long-learning attitudes.
88. By using a foreign language, statistician can keep track of every statistical information, and communicate with colleagues.
99. Applying the statistical knowledge in the professional sense, statistician has social, scientific, and ethical values.X
1010. A statistician must have the ability to social sensitivity and socialization.X
1111. During the process of inference, a statistician uses time efficiently with the analytical thinking ability.X