Kompleks Fonksiyonlar Teorisi II Dersi. Ernurbahoşefe Ailesi; 16 videos; 2, views; Last updated on Aug 15, Play all. Share. Loading Save. Get this from a library! Kompleks fonksiyonlar teorisi. [Turgut Başkan]. Buy Kompleks Fonksiyonlar Teorisi by Turgut Başkan (ISBN: ) from Amazon’s Book Store. Everyday low prices and free delivery on eligible.

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Uses effective trorisi methods and appropriate technologies to solve problems. Complex numbers, complex plane topology, complex sequences andseries, complex functions, limits, continuity and derivatives, Cauchy-Riemannequations, Analytic, complex exponential, logarithmic, trigonometric, andhyperbolic functions, integration in the complex plane, Cauchy’s theorem,Complex power series, Taylor and Laurent series expansions, Singularclassification of points and the Residue Theorem, some real integralscomplex calculation methods, the argument of principle.

Classrooms of Arts and Sciences Faculty.

### ninova – ITU e-Learning Center

Determines whether complex functions are analytic. Basic properties of comlex numbers, Polar forms, powers, roots, domains. Assessment Methods and Assessment Criteria. Utilize technology as an effective tool in investigating, understanding, and applying mathematics. Mapping by elementary functions. Week addition and multiplication, algebraic properties, vectors and modules, complex congugate 2.

Cauchy-Riemann equations and analyticity 5.

Express koompleks of effective thinking involving analytical, critical and postulational thinking as well as reasoning by analogy and the development of intellectual thinking.

Complex numbers and their properties, the complexplane topology, complex number sequences 2. Week polar representation, exponential forms, products and powers in exponential form,arguments of products and quotients 3.

Knows programming techniques and is able to write a computer program. Identify, define and model mathematics, computation and computer science problems; select fonmsiyonlar apply appropriate analysis and modeling methods for this purpose.

Week stereografic mapping, regions in the complex plane 5. Associate’s Degree Short Cycle. Exponential, logarithmic, trigonometric, hyperbolic, inverse trigonometric functions.

Review of the topics discussed in the lecture notes and sources. Expresses clearly the relationship between objects while constructing a model. Be aware of the effects of information applications on individual, institutional, social and universal dimensions and have etorisi awareness about entrepreneurship, innovation.

Use the time effectively in the process of getting the conclusion with analytical thinking ability. Describe advanced research methods in the field of Mathematics-Computer Science.

MT Course Type: Week hyperbolic function, inverse trigonometric and hyperbolic functions Week Final Exam 2nd. Follow current developments about the awareness of the necessity of continuous professional development and information and communication technologies. None Recommended Optional Programme Components: Curves classifies the complex planeintegral accounts. Recognizes the relationship between different areas of Mathematics and ties between Mathematics and other disciplines.

Draws mathematical models such as formulas, graphs and tables and explains them.

None Aim s of Course: Evaluates contour integrals in complex planes. Evaluates complex integrals using the residue theorem.

## kompleks fonksiyonlar teorisi

Evaluates some real integrals using complex integration technique. Complex exponential ,complex power ,complex logarithmic and complex trigonometric functions. Theory of Complex Functions Course Code: To be integral in the complex plane, complex power series,Taylor and Laurent series expansions of functions, Singular pointsclassification and the Residue Theorem, some real integrals of complexcalculation methods, the argument of principle.

Display the development of a realization of how mathematics is related to physical and social sciences and how it is significant in these areas. Information on the Institution.

## Description of Individual Course Units

Demonstrate in-depth knowledge of mathematics, its scope, application, history, problems, methods, and usefulness to mankind both as a science and as an intellectual discipline. Communicate, mathematical ideas both verbally and in written, making use of numerical, fonksiyonlqr, and symbolic viewpoints.

Face-to-Face Prerequisites and Co-Prerequisites: Week limits, theorems on limits, limits involving infinity, continuity 7. Work effectively as an individual and as a team member to solve problems in the areas of mathematics and computer science.