Undergraduate Program Course List

Compulsory Departmental Courses

Elective Courses

Service Courses Given to Other Departments

Service Courses Taken From Other Departments



Compulsory Departmental Courses

MATH111 - Basic Logic and Algebra
Logic, Sets, Induction, Relations, Functions, Elementary Number Theory, Elementary Examples of Groups, Rings and Fields, The Real Numbers

MATH112 - Discrete Mathematics and Combinatorics
Numbers and Counting. Countable and Uncountable Sets. Continuum. The Pigeonhole Principle and its Applications. Permutations and Combinations. Combinatorial Formulas. Recurrence Relations. Principle Of Inclusion and Exclusion. Binary Relations. Elementary Graph Theory.

MATH121 - Analytic Geometry I
Fundamental Principles of Analytic Geometry, Cartesian Coordinates, Lines in Plane, Trigonometry, Polar Coordinates, Rotation and Translation in Plane, Conics.

MATH122 - Analytic Geometry II
Cartesian Coordinates in 3-Space, Vectors, Lines and Planes in 3-Space, Basic Surfaces in 3-Space; Cylinders, Surface of Revolutions

MATH135 - Mathematical Analysis I
Preliminaries, Functions and Graphs, Limits and Continuity, Derivatives, Mean Value Theorem, Applications of Derivatives: Monotonicity, Local and Absolute Extrema, Concavity, L’Hospital’s Rule, Graphs of Functions.

MATH136 - Mathematical Analysis II
Riemann Integral, The Fundamental Theorem of Calculus, Integration Techniques, Applications of Integrals: Area, Volume, Arc Length, Improper Integrals, Sequences, Infinite Series, Tests For Convergence, Functional Sequences and Series, Interval of Convergence, Power Series, Taylor Series and Its Applications.

MATH231 - Linear Algebra I
Matrices and Linear Equations, Determinants, Vector Spaces, Linear Transformations.

MATH232 - Linear Algebra II
Eigenvalues and Eigenvectors, Elementary Canonical Forms, The Rational and Jordan Forms, Inner Product Spaces, Operators on Inner Product Spaces, Bilinear Forms. ● Prerequisite: Math 231

MATH247 - Introduction To Object-Oriented Programming
Object-Oriented Thinking, Review of Programming Paradigms, Abstract Data Type, Scope Rules and Access Controls, Classes, Constructors and Destructors, Operator Overloading, Introduction to Object Oriented Concepts: Inheritance, Polymorphism. Templates.

MATH251 - Advanced Calculus I
Vector and Matrix Algebra. Functions of Several Variables. Limit. Continuity. Partial Derivatives. Chain Rule. Implicit Functions. Inverse Functions. Directional Derivatives. Maxima and minima of functions of several variables. Extrema for functions with side conditions.

MATH252 - Advanced Calculus II
Vector and Scalar Fields. Double Integrals. Triple Integrals. Integral of Vector Functions. Improper Integrals. Line Integrals. Green’s Theorem. Surface Integrals. The Divergence Theorem. Stoke’s Theorem

MATH262 - Ordinary Differential Equations
First Order, Higher Order Linear Ordinary Differential Equations, Applications of First Order Differential Equations, Series Solutions of Differential Equations, Laplace Transforms, Linear Systems of Ordinary Differential Equations.

MATH331 - Abstract Algebra
Groups: Subgroups, Cyclic Groups, Permutation groups, Lagrange Theorem, Normal subgroups and Factor Groups, Homomorphisms, Isomorphism Theorems, Rings and Fields: Subrings, Integral Domains, Ideals and Factor Rings, Maximal and Prime Ideals, Homomorphisms of Rings, Field of Quotients, Polynomial Rings, Principal Ideal Domain (PID), Irreducibility of Polynomials (Eisenstein Irr. Criterion), Unique Factorization, Euclidean Domains

MATH346 - Complex Analysis
Complex Numbers and Elementary Functions, Analytic Functions and Integration, Sequences, Series and Singularities of Complex Functions, Residue Calculus and Applications of Contour Integration, Conformal Mappings and Applications.

MATH351 - Introduction to Real Analysis
A review of Sets and Functions, The Real numbers (or system), Countable and uncountable Sets, Sequences of Real Numbers ( Cauchy Sequences), Uniform Convergence of Sequences of functions, Metric Spaces, Compactness and Connectedness, Contraction Mapping Theorem, Arzela-Ascoli Theorem, Extension Theorem fo Tietze, Baire’s Theorem. ●Prerequisite: MATH 136

MATH374 - Differential Geometry
Curves in the Plane and Space, Curvature and Torsion, Global Properties of Plane Curves, Surfaces in Space, The First Fundamental Form, Curvatures of Surfaces, Gaussian Curvature and the Gauss Map, Geodesics, Minimal Surfaces, Gauss's Theorema Egregium, The Gauss-Bonnet Theorem. ●Prerequisite: MATH 251

MATH392 - Probability Theory and Statistics
Probability Spaces, Conditional Probability and Independence, Random Variables and Probability Distributions, Numerical Characteristics of Random Variables, Classical Probability Distributions, Random Vectors, Descriptive Statistics, Sampling, Point Estimation, Interval Estimation, Testing Hypotheses.

MATH411 - Seminar Studies
The course is designed for senior Mathematics students. The purpose of the course is to introduce students to the activities of reading and doing research on advanced Mathematics topics and presenting them in class. Each student is required to work individually on a topic assigned by his/her supervisor and to make atleast one presentation to the class and the faculty.

Elective Courses

- Area Elective

MATH313 - Introduction to Mathematical Finance
Introduction to theory of interest: Simple and compound interest, time value of money, rate of interest, rate of discount, Nominal rates, effective rates, compound interest functions, Generalized cash flow modelling, Loans, Present value analysis, accumulated profit, and internal rate of return for investment projects, annuities, perpetuities, Measurement of investment performance, bonds, probability, geometric Brownian motion, term structure of interest rates, stochastic interest rate models

MATH316 - Mathematics of Financial Derivatives
Introduction to options and markets, European Call and Put Options, Arbitrage, Put call parity, Asset price random walks, Brownian Motion, Ito’s Lemma, Derivation of Black-Scholes formula for European options, Greeks, Options for dividend paying assets, Multi-step binomial models, American call and put options, Early exercise on calls and puts on a non-dividend-paying stocks, American option pricing as the free boundary value problems, Exotic options, Forwards and Futures, Interest rate models.

MATH325 - Elementary Number Theory
Divisibility, Congruences , Euler, Chinese Remainder and Wilson’s Theorems, Arithmetical Functions, Primitive Roots, Quadratic Residues and Quadratic Reciprocity, Diophantine Equations.

MATH326 - Coding Theory
Error Detection, Correction and Decoding, Finite Fields, Linear Codes, Bounds In Coding Theory, Construction of Linear Codes, Cyclic Codes.

MATH332 - Finite Fields
Characterization of Finite Fields, Roots of Irreducible Polynomials, Trace, Norm, Roots of Unity and Cyclotomic Polynomials, Order of Polynomials and Primitive Polynomials, Irreducible Polynomials, Construction of Irreducible Polynomials, Factorization of Polynomials

MATH333 - Matrix Analysis
Preliminaries, Eigenvalues, Eigenvectors, and Similarity, Unitary Equivalence and Normal Matrices, Canonical Forms, Hermitian and Symmetric Matrices, Norms for Vectors and Matrices, Location and Perturbation of Eigenvalues, Positive Definite Matrices, Nonnegative Matrices. ●Prerequisite: MATH 231

MATH337 - Bernstein Polynamials
Weierstrass Approximation Theorem, Definition of Bernstein Polynomials, Derivatives of Bernstein Polynomials, Approximation of the Derivatives, The Degree of Approximation by Bernstein Polynomials, Theorems of Popoviciu and Voronovskaya, Shape-Preserving Properties of Bernstein Polynomials, Generalizations of Bernstein Polynomials, Kantorovich, Durrmeyer and Chlodowskii Polynomials, Bernstein Polynomials in Complex Domain. ●Prerequisite: MATH 136

MATH347 - Data Structures
Static and Dynamic Memory Allocation, Recursion, Algorithms, Stacks, Queues, Linked Lists, Circular Linked Lists, Trees, Binary Trees, Hash Tables, Searching and Sorting Algorithms.

MATH357 - Functional Analysis
Vector Spaces, Hamel Basis, Linear Operators, Equations in Operators, Ordered Vector Spaces, Extension of Positive Linear Functionals, Convex Functions, Hahn-Banach Theorem, The Minkowski Functional, Seperation Theorem, Metric Spaces, Continuity and Uniform Continuity, Completeness, Baire Theorem, Normed Spaces, Banach Spaces, The Algebra of Bounded Linear Operators on Banach Spaces, Hilbert Spaces and basic concepts.●Prerequisite: Math 235

MATH360 - Introduction to Theory of Ordinary Differential Equations
First Order Ordinary Differential Equations, The Existence and Uniqueness Theorem, Systems and Higher Order Ordinary Differential Equations, Linear Differential Equations, Boundary Value Problems and Eigenvalue Problems, Oscillation and Comparison Theorems.

MATH363 - Calculus on Time Scales
The h-derivative and The q-derivative, The concept of a time scale, Differentiation on Time Scales, Integration on Time Scales, Taylor’s Formula on Time Scales. ●Prerequisite: MATH 136

MATH365 - Approximation Theory
Preliminaries, Convexity, Chebychev Solution of Inconsistent Linear Systems, Interpolation, Approximation of Functions by Polynomials, Least-Squares Approximation.

MATH372 - Topology
Fundamental Concepts, Functions, Relations, Sets and Axiom of Choice, Well-ordered Sets, Topological Spaces, Basis, The Order Topology, The Subspace Topology, Closed Sets and Limit Points, Continuous Functions, The Product Topology, Metric Topology, The Quotient Topology, Connectedness and Compactness, Countability and Separation Axioms, The Fundamental Group, Classification of Surfaces.

MATH378 - Partial Differential Equations
Basic Concepts. First Order Partial Differential Equations. Types and Normal Forms of Second Order Linear Partial Equations. Separation of Variables. Fourier Series. Hyperbolic, Parabolic, and Elliptic Equations. Solution of the Wave Equation.

MATH381 - Numerical Analysis
Computational and Mathematical Preliminaries, Numerical Solution of Nonlinear Equations and Systems of Nonlinear Equations, Numerical Solution of Systems of Linear Equations, Direct and Iterative Methods, The Algebraic Eigenvalue Problem, Interpolation and Approximation, Numerical Differentiation and Integration, Numerical solution of ODEs

MATH417 - Computational Methods of Mathematical Finance
Introduction to MATLAB, Finite difference formulae, The explicit and implicit finite difference methods, The Crank-Nicolson method, European option pricing by the heat equation, pricıng by the Black-Scholes equation, Pricing by an explicit, an implicit and Crank-Nicolson method, Pricing American options, Projected SOR and tree methods, Pseudo-Random numbers, Inverse transform, Acceptance-Rejection and Box-Muller methods, The polar method of Marsaglia, Monte Carlo integration, Option pricing by Monte Carlo simulation.

MATH419 - History of Mathematics II
Early Middle Ages European mathematics (c. 500–1100) Mathematics of the Renaissance: Rebirth of mathematics in Europe (1100–1400) Early modern European mathematics (c. 1400–1600): Solution of the cubic equation and consequences. Invention of logarithms. Time of Fermat and Descartes. Development of the limit concept. Newton and Leibniz. The age of Euler. Contributions of Gauss and Cauchy. Non-Euclidean geometries. The arithmetization of analysis. The rise of abstract algebra. Aspects of the twentieth century.

MATH427 - Introduction to Crytopgraphy
Basics of Cryptography, Classical Cryptosystems, Substitution, Review of Number Theory and Algebra, Public-key and Private-key Cryptosystems, RSA Cryptosystem, Diffie-Hellman Key Exchange, El-Gamal Cryptosystem, Digital Signatures, Basic Cryptographic Protocols.

MATH437 - Statistical Methods and Financial Applications
Central Tendency/Dispersion Measures, Moments, Maximum Likelihood Estimation, Correlation and Simple Linear Regression, Multi Regression Model, Autocorrelation and Multi Collinearity on Regression Models, Portfolio Theory, CAPM and ARMA Approaches

MATH441 - Group Theory
Review of Elementary Group Theory, Group Actions on Sets, Finite p-groups and Sylow's Theorem, Groups of Small Orders, Compositions Series and Jordan-Hölder's Theorem, Soluble groups and Nilpotent groups, The Frattini Subgroups and Burnside's Basis Theorem, Direct Products, Direct Sums and the Structure of Finitely Generated Abelian Groups, Free Groups and Presentations.

MATH443 - Algebraic Number Theory
Integers, Norm, Trace, Discriminant, Algebraic Integers, Quadratic Integers, Dedekind Domains, Valuations, Ramification in an Extension of Dedekind Domains, Different, Ramification in Galois Extensions, Ramification and Arithmetic in Quadratic Fields, The Quadratic Reciprocity Law, Ramification and Integers in Cyclotomic Fields, The Kronecker-Weber Theorem on Abelian Extensions, The Dirichlet's Theorem on the Finiteness of the Class Group, The Dirichlet's Theorem on Units, The Hermite-Minkowski Theorem, The Fermat's Last Theorem.

MATH445 - Noncommutative Rings
Noetherian Rings, The Hilbert's Basis Theorem, Artinian Rings, The Jacobson Radical of a ring, The Hopkins-Levitzki Theorem, Semisimple Rings, The Wedderburn-Artin Theorem, The Goldie's Theorems, Krull Dimension

MATH447 - Galois Theory
Characteristic of a Field, The Frobenius Morphism, Field Extensions, Algebraic Extensions, Algebraically Closed Fields, The Fundamental Theorem of Algebra, The Steinitz's Theorems, The Algebraic Closure of a Field, Normal Extensions, Separable Extensions, Primitive Elements, Galois Extensions, The Fundamental Theorem of the Galois Theory, The Galois Group of a Polynomial, The Galois Criterion for Solvability of Algebraic Equations by Radicals, The Abel-Ruffini Theorem.

MATH463 - Applied Mathematics
Calculus of Variations and Applications, Integral Equations and Applications.

MATH467 - Dynamical Systems and Chaos
One-dimensional dynamic systems. Stability of equilibria. Bifurcation. Linear systems and its stability. two-dimensional dynamic systems. Liapunov’s direct method and method of linearization. 3-dimensional dynamic systems.

MATH471 - Manifold Theory
Tensor Algebra, Differentiable Manifolds, Vectors and Tensor Fields on a Manifold, Exterior Differential Forms, Differentiation on a Manifold, Psuedo-Riemannian and Riemannian Manifolds.

MATH473 - Algebraic Topology
Homotopic Mappings, Homotopy Equivalence Versus Homeomorphism, the Fundamental Group, Covering Spaces, Higher Homotopy Groups, Singular Complexes and Singular Homology, Relationship Between the Fundamental Groupand the First Homology Group, Homotopy Invariance of Homology Groups, Relative Homology, Exacteness, Excision and Mayer-Vietories Sequence, Applications to Spheres, Applications to Euclidean Spaces, Finite Cell Complex, Betti Numbers and Euler Charateristic, Outline of Singular Cohomology, Poincare Duality for Topological Manifolds and Applications of Cohomology Algebras.

MATH481 - Numerical Linear Algebra
Numerical Solution of Systems of Linear Equations, Direct and Iterative Methods, Matrix and Vector Norms, Error Analysis, Convergence and Perturbation Theorems, Computation of Eigenvalues and Eigenvectors, Iterative Methods, Error Analysis

MATH482 - Numerical Methods for Ordinary Differential Equations
Existence, Uniqueness and Stability Theory. IVP: Euler’s Method, Taylor Series Method, Runge-Kutta Methods, Explicit and Implicit methods. Multistep methods based on Integration and Differentiation. Predictor–Corrector methods. Stability, convergence and error estimates of the methods. Boundary Value Problems: Finite Difference Methods, Shooting Methods, Collocation methods.

MATH483 - Special Functions of Applied Mathematics
Gamma and Beta functions. Pochhammer's symbol. Hypergeometric series. Hypergeometric differential equation. Generalized hypergeometric functions. Bessel function; the functional relationships, Bessel's differential equation. Orthogonality of Bessel functions. ● Prerequisite: Math 262 or Math 276 or Consent of the instructor

MATH484 - Classical Orthogonal Polynomials
Generating Functions. Orthogonal Polynomials. Legendre polynomials. Hermite polynomials. Laguerre polynomials. Tchebicheff polynomials. Gegenbauer polynomials. ● Prerequisite: Math 262 or Math 276 or Consent of the instructor

MATH485 - Theory of Difference Equations
The Difference Calculus, Linear Difference Equations, Linear Systems of Difference Equations, Self-adjoint Second Order Linear Equations, The Sturm-Liouville Eigenvalue Problem, Boundary Value Problems for Nonlinear Equations.

MATH486 - Mathematical Modeling
Differetial Equations and Solutions, Models of Vertical Motion, Single-Species Population Models, Multiple-Species Population Models, Mechanical Oscillators, Modeling Electric Circuits, Diffusion Models.

Service Courses Given to Other Departments

MATH101 - Introduction to Calculus
Course Description : Basic algebra, Graphs, Functions and Their Graphs, Equations and Inequalities, Polynomials and Rational Functions, Exponential and Logarithmic Functions, System of Equations, Matrices, Determinants.

MATH102 - Calculus for Management and Economics Students
Limits and Continuity, Derivative, Applications of Derivative, Integration, Applications of Integral, Functions of Several Variables, Partial Derivatives, Extrema of Functions of Several Variables. ●Prerequisite:Math101

MATH103 - General Mathematics
Sets, numbers and their properties, identities, equations and inequalities, polinomials, coordinate system in plane, graphs of lines and quadratic equations, functions, trigonometry, polar coordinates, complex numbers, systems of linear equations, matrices and determinants.

MATH104 - Single Variable Calculus
Review of Functions, Trigonometric Functions, Exponential and Logarithmic Functions, Limit and Continuity, Derivative, Applications of the Derivative, Definite and Indefinite Integrals, Techniques of Integration, Areas and Volumes.

MATH105 - Introduction to Calculus
Basic algebra, Graphs, Functions and Their Graphs, Equations and Inequalities, Polynomials and Rational Functions, Exponential and Logarithmic Functions, System of Equations, Matrices, Determinants.

MATH106 - Calculus for Management and Economics Students
Limits and Continuity, Derivative, Applications of Derivative, Integration, Applications of Integral, Functions of Several Variables, Partial Derivatives, Extrema of Functions of Several Variables.

MATH107 - Basic Mathematics I
Sets, numbers, intervals, absolute value, exponential and radicals, equations and inequalities, polynomials, coordinate system in the plane, equations of line and conics in the plane and their graphs, systems of linear equations, matrices and determinants.

MATH108 - Basic Mathematics II
Functions, trigonometric functions, exponential and logarithmic functions, Limits and continuity, Derivative, applications of derivative, Definite and indefinite integrals, integration techniques, Area and volume computation.

MATH110 -
Percentage, profit and loss calculations in terms of cost and selling prices, ratios and proportions, average value, simple and compound interest rates, discount, equivalent bonds, current accounts, investment, revenue, loan amortizations, annuity.

MATH151 - Calculus I
Preliminaries, Limits and Continuity, Differentiation, Applications of Derivatives, L'Hopital’s Rule, Integration, Applications of Integrals, Integrals and Transcendental Functions, Integration Techniques, and Improper Integrals.

MATH152 - Calculus II
Sequences, Infinite Series, Vectors in the Plane and Polar Coordinates, Vectors and Motions in Space, Multivariable Functions and Their Derivatives, Multiple Integrals: Double Integrals, Areas, Double Integrals in Polar Form, Triple Integrals in Rectangular, Cylindrical and Spherical Coordinates.

MATH157 - Extended Calculus I
Preliminaries, Limits and Continuity, Differentiation, Applications of Derivatives, L'Hopital’s Rule, Integration, Applications of Integrals, Integrals and Transcendental Functions, Integration Techniques, and Improper Integrals, Sequences.

MATH158 - Extended Calculus II
Infinite Series, Vectors in the plane and Polar Coordinates. Vectors and Motions in Space, Multivariable Functions and Their Derivatives, Multiple Integrals: Double Integrals, Areas, Double Integrals in Polar Coordinates, Triple Integrals in Rectangular, Cylindrical and Spherical Coordinates, Line Integrals, Independence of path, Green’s Theorem.

MATH191 - Mathematics-1
Sets, numbers, identities, equalities and inequalities, polynomials, coordinate system in plane, functions, trigonometric functions and identities, complex numbers, exponential and logarithm functions

MATH275 - Linear Algebra
Linear Equations and Matrices, Real Vector Spaces, Inner Product Spaces, Linear Transformations and Matrices, Determinants, Eigenvalues and Eigenvectors.

MATH276 - Differential Equations
First Order, Higher Order Linear Ordinary Differential Equations, Series Solutions of Differential Equations, Laplace Transforms, Linear Systems of Ordinary Differential Equations, Fourier Analysis and Partial Differential Equations.

MATH291 - Introduction to Probability and Statistics-I
Basic Definitions, Tables and Graphs, Central Tendency Measures, Central Dispersion Measures, Probability Concept, Conditional Probability, Bayesian Approach, Random Variables, Expected Value, Binomial and Normal Distributions.

MATH292 - Introduction to Probability and Statistics-II
Sampling and Sampling Distributions, Central Limit Theorem, Point Estimation, Confidence Interval, Hypothesis Testing, Regression and Correlation, Variance Analysis

MATH293 - Introduction to Probability and Statistics-I
Basic Definitions, Tables and Graphs, Central Tendency Measures, Central Dispersion Measures, Probability Concept, Conditional Probability, Bayesian Approach, Random Variables, Expected Value, Binomial and Normal Distributions.

MATH294 - Introduction to Probability and Statistics-II
Sampling and Sampling Distributions, Central Limit Theorem, Point Estimation, Confidence Interval, Hypothesis Testing, Regression and Correlation, Variance Analysis

MATH380 - Numerical Methods for Engineers
Solution of Nonlinear Equations, Solution of Linear Systems, Eigenvalues and Eigenvectors, Interpolation and Polynomial Approximation, Interpolation by Spline Functions, Least Square Approximation, Numerical Differentiation, Numerical Integration.

Service Courses Taken From Other Departments

CMPE101 - Introduction to Computers and Programming
Basics of information systems, computer software, computer hardware: CPU, memory units, and I/O devices, internet and networking, basic programming concepts, hands-on experience of application software and internet through laboratory sessions.

CMPE102 - Computer Programming
Programming concepts: data types, arithmetic expressions, assignment statements; input/output functions; library functions; selection and repetition statements; user-defined functions; arrays and strings.

ENG101 - English for Academic Purposes I
ENG101 consists of academic skills, such as reading comprehension, vocabulary building and critical analysis of texts. In this frame, listening and note-taking, class discussions, presentations, writing, research assignments and use of technology are some of the important activities.

ENG102 - English for Academic Purposes II
ENG102 elaborates on academic skills such as reading comprehension, listening, class discussions about the topic of the unit, vocabulary building and critical analysis of texts. It also includes research assignments and response paper and graph writing. Skills like listening and note-taking, analysis of written products, portfolio keeping and use of technology are elaborated in this course, as well.

ENG201 - English for Academic Purposes III
The course consists of mainly advanced reading and writing skills, applying critical reading skills and strategies, identifying the organization of a reading text, main ideas of the texts, and the author’s main purpose, summarizing a given text, outlining and writing an argumentative essay. Some parts of the input are in flipped learning mode.

ENG202 - English for Academic Purposes IV
This course includes research-based report writing skills. The content includes types of reports and models; the choice of topics, formation of thesis statements, writing paraphrases and summaries, preparation of report outlines, evaluation of print and electronic sources, in-text and end-of-text citation, report presentation in oral and written format. Flipped learning method is utilised to a great extent.

ENG301 - English For Professional Communication I
This course includes job-related communication skills. In this frame, the functions such as, describing relationships at work, discussing performance reviews and giving feedback, discussing plans and arrangements, using social media for professional communication, discussing on recruitment tests and job interviews, presenting a service or product, writing reviews on websites, writing job-related e-mails are dealt with.

ENG302 - English For Professional Communication II
This course includes more detailed job-related communication skills. In this frame, describing and organising meetings, developing communicational styles in various cultural settings, handling mistakes and apologizing, getting familiar with marketing styles and advertising, deciding how to adapt and market a product in different countries, preparing different types of presentation (speech), discussing workplace dilemmas and rules, writing job-related e-mails are dealt with.

HIST111 - Principles of Ataturk and History of Turkish Revolution I
A history of the foundation of the Turkish Republic in the light of Mustafa Kemal Atatürk’s principles and basic terms, concepts and events of modern Turkey history in a period covering 16‐20th centuries in comparison with world and global history in the same period of time.

HIST112 - Principles of Ataturk and History of Turkish Revolution II
A history of the foundation of the Turkish Republic in the light of Mustafa Kemal Atatürk’s principles and basic terms, concepts and events of modern Turkey history in a period covering 16‐20th centuries in comparison with world and global history in the same period of time.

HIST221 - History of Civilization
Culture, civilization, prehistoric and historical periods, social, historical, political structures, law, governments, religious, philosophical, political thoughts, cultural contributions.

PHYS 101 - General Physics I
Measurement; Motion Along a Straight Line; Vectors; Motion in Two and Three Dimensions; Force and Motion I; Force and Motion II; Kinetic Energy and Work; Potential Energy and Conservation of Energy; Center of Mass and Linear Momentum; Rotation; Rolling, Torque, and Angular Momentum; Equilibrium and Elasticity.

PHYS 102 - General Physics II
Electric Charge; Electric Fields; Gauss' Law; Electric Potential; Capacitance; Current and Resistance; Circuits; Magnetic Fields; Magnetic Field due to Currents; Induction and Inductance

TURK 401 -

TURK 402 -