Course Name Code Semester T+U Hours Credit ECTS
Mathematics I MAT 111 1 4 + 0 4 6
Precondition Courses
Recommended Optional Courses
Course Language Turkish
Course Level Bachelor's Degree
Course Type Compulsory
Course Coordinator Doç.Dr. SELMA ALTUNDAĞ
Course Assistants

Research Assistants in mathematics department

Course Category Available Basic Education in the Field
Course Objective

To give fundamental conceptions of mathematical analysis and limit,continuity, derivative and applications of derivative in single-valued functions

Course Content

Foreknowledge, functions, Limit and continuity, Derivate, Application of derivative 

# Course Learning Outcomes Teaching Methods Assessment Methods
1 He/she defines sets and number set concepts. Explains equality, inequality and equation concepts. Lecture, Question-Answer, Discussion, Drilland Practice, Problem Solving, Testing, Oral Exam, Homework,
2 He/she recognizes functions and its properties. Lecture, Drilland Practice, Problem Solving, Testing, Homework,
3 He/she expresses trigonometric, reverse trigonometric and hyperbolic functions, partial function and special functions ( Absolute value, exact value and sign functions) Lecture, Drilland Practice, Problem Solving, Testing, Homework,
4 He/she expresses concept of limit and calculates. Can prove the rules which are used for limit. Lecture, Drilland Practice, Problem Solving, Testing, Homework,
5 He/she defines right and left approached limit. Knows the undetermined conditions. Lecture, Drilland Practice, Problem Solving, Testing, Homework,
6 He/she defines the concept of continuity and discontinuity. Lecture, Drilland Practice, Problem Solving, Testing, Oral Exam, Homework,
7 He/she can explain concept of derivative and calculates derivatives with this definition. Proves the derivative rules with the definition of derivative. Lecture, Drilland Practice, Problem Solving, Testing, Homework,
8 Can define the derivative of trigonometric, reverse trigonometric functions, Exponential and logarithmic function, hyperbolic and revere hyperbolic functions. Lecture, Drilland Practice, Problem Solving, Testing, Homework,
9 He/she calculates high order derivatives. Can define the derivatives of given functions and parametric equations. Express the derivative of implicit functions. Lecture, Drilland Practice, Problem Solving, Testing, Oral Exam, Homework,
10 Defines the increasing and decreasing functions with the help of tangent and normal equations. Lecture, Question-Answer, Drilland Practice, Demonstration, Motivations to Show, Testing, Oral Exam,
11 Can calculate the limit of undetermined conditions with the help of derivatives. Lecture, Question-Answer, Problem Solving, Testing, Oral Exam,
12 Can define the maximum, minimum and asymptote of functions. Lecture, Question-Answer, Drilland Practice, Problem Solving, Testing, Oral Exam, Homework,
13 Expresses the curve plot. Lecture, Question-Answer, Problem Solving, Testing, Oral Exam,
14 Solves the engineering problems with the help of derivative and approximates with differential approach. Lecture, Question-Answer, Problem Solving, Testing, Oral Exam, Homework,
Week Course Topics Preliminary Preparation
1 Sets. Number sets. Equations. Equality and inequality.
2 Concept of function. Types of functions (Polynomial sets, rational function, exponential and logarithmic functions and the definition set of these functions)
3 Function types (Trigonometric, reverse trigonometric and hyperbolic functions, Partial functions , special defined functions (Absolute value, exact value, sign functions) .
4 Concept of limit and limit calculation with the definition of limit. Proof of the rules used for limit rule. Sandwich theorem. Limit of trigonometric functions.
5 Right and left limit. Undetermined conditions (0/0,infinity/infinity, 0.infinity, infinity-infinity,1^infinity)
6 Continuity concept in functions. Types of discontinuity and characteristics of continuous functions (Mid value theorem, absolute maximum and minimum, concept of local maximum and minimum.. )
7 Concept of derivative, and calculation with derivative rule. Proof of derivate with derivative rule. Derivative of reverse function.
8 Derivative of trigonometric and reverse trigonometric functions. Derivative of exponential and logarithmic functions. Derivative of hyperbolic and reverse hyperbolic functions
9 High order derivatives. Derivatives of functions with parametric equations. Derivative of implicit functions.
10 Equation of tangent and normal. Increasing and decreasing functions.
11 Undetermined conditions ( Analyses of 8 condition with L’hopital Rule )
12 Maximum, minimum and asymptote of functions.
13 Curve plotting.
14 Engineering problems. Approximation with differential.
Course Notes <p>Lecture Notes</p>
Course Resources

[1] Thomas, G.B., Thomas Calculus, 11.baskı, çeviri:Recep Korkmaz, Beta Basım, 2010.

[2] Kadıoğlu, E., Kamali, M., Genel Matematik, Kültür Eğitim Vakfı, 2009.

[3] Can, M., Yüksek Matematik 1, Literatür, 2009.

[4] Balcı, M., Genel Matematik 1, Sürat Yayınları, 2012.

Order Program Outcomes Level of Contribution
1 2 3 4 5
1 Adequate knowledge in mathematics, science and engineering subjects pertaining to the relevant discipline; ability to use theoretical and applied knowledge in these areas in complex engineering problems. X
2 Ability to identify formulate, and solve complex engineering problems; ability to select and apply proper analysis and modeling methods for this purpose. X
3 Ability to design a complex system, process, device or product under realistic constraints and conditions, in such a way as to meet the desired result; ability to apply modern design methods for this purpose. (Realistic constraints and conditions may include factors such as economic and environmental issues, sustainability, manufacturability, ethics, health, safety issues, and social and political issues, according to the nature of the design.)
4 Ability to devise, select, and use modem techniques and tools needed for analyzing and solving complex problems encountered in engineering practice; ability to employ information technologies effectively.
5 Ability to design and conduct experiments, gather data analyze and interpret results for investigating complex engineering problems or discipline specific research questions.
6 Ability to work efficiently in intra-disciplinary and multi-disciplinary teams; ability to work individually.
7 Ability to communicate effectively in Turkish, both orally and in writing; knowledge of a minimum of one foreign language; ability to write effective reports and comprehend written reports, prepare design and production reports, make effective presentations, and give and receive clear and intelligible instructions.
8 Recognition of the need for lifelong learning; ability to access information, to follow developments in science and technology, and to continue to educate him/herself.
9 Consciousness to behave according to ethical principles and professional and ethical responsibility; knowledge on standards used in engineering practice.
10 Knowledge about business life practices such as project management, risk management, and change management; awareness in entrepreneurship, innovation; knowledge about sustainable development.
11 Knowledge about the global and social effects of engineering practice on health, environment, and safety, and contemporary issues of the century reflected into the field of engineering; awareness of the legal consequences of engineering solutions.
Evaluation System
Semester Studies Contribution Rate
1. Ara Sınav 70
1. Kısa Sınav 10
2. Kısa Sınav 10
3. Kısa Sınav 10
Total 100
1. Yıl İçinin Başarıya 50
1. Final 50
Total 100
ECTS - Workload Activity Quantity Time (Hours) Total Workload (Hours)
Course Duration (Including the exam week: 16x Total course hours) 16 4 64
Hours for off-the-classroom study (Pre-study, practice) 16 3 48
Mid-terms 1 10 10
Assignment 1 15 15
Quiz 2 12 24
Total Workload 161
Total Workload / 25 (Hours) 6.44
dersAKTSKredisi 6