Introduction to Numerical Analysis (MAY341): Διαφορά μεταξύ των αναθεωρήσεων

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=== Syllabus ===
=== Syllabus ===


Error Analysis. Numerical Solution of Nonlinear Equations: Iterative Methods, Newton’s Method, Secant Method. Numerical Solution of Linear Systems: Direct Methods (Gauss Elimination, LU factorization), Iterative Methods (Jacobi, Gauss-Seidel). Polynomial Interpolation: Lagrange method, Method of divided differences of Newton. Numerical Integration: Simple and Generated Rules of Numerical Integration, Trapezoidal Rule, Simpson’s Rule, Error analysis of Numerical Integration.
* Error Analysis.  
* Numerical solution of nonlinear equations: iterative methods, the fixed-point theorem, Newton’s method, the secant method.  
* Numerical solution of linear systems: Matrix norms and conditioning. Direct Methods (Gauss elimination, LU factorization). Iterative methods, convergence, and examples of iterative methods (Jacobi, Gauss-Seidel).
* Polynomial interpolation: Lagrange and Hermite interpolation. Linear splines. Error analysis of interpolation.  
* Numerical integration: Newton-Cotes quadrature formula (the trapezoidal rule and Simpson’s rule). Error analysis of numerical integration.


=== Teaching and Learning Methods - Evaluation ===
=== Teaching and Learning Methods - Evaluation ===

Αναθεώρηση της 00:16, 29 Σεπτεμβρίου 2022

Undergraduate Courses Outlines - Department of Mathematics

General

School

School of Science

Academic Unit

Department of Mathematics

Level of Studies

Undergraduate

Course Code

ΜΑY341

Semester 3
Course Title

Introduction to Numerical Analysis

Independent Teaching Activities

Lectures (Weekly Teaching Hours: 4, Credits: 7.5)

Course Type

General Background

Prerequisite Courses -
Language of Instruction and Examinations

Greek

Is the Course Offered to Erasmus Students

Yes (in English)

Course Website (URL) See eCourse, the Learning Management System maintained by the University of Ioannina.

Learning Outcomes

Learning outcomes

Upon successful completion of this course, students will be able to:

  1. recognise key numerical methods from a variety of maths problems and apply them for the solution of actual problems.
  2. apply a variety of theoretical techniques for deriving and analyzing the error of numerical approximations.
  3. analyse and evaluate the accuracy of common numerical methods.
  4. evaluate the performance of numerical methods in terms of accuracy, efficacy, and applicability.
General Competences
  • Search for, analysis and synthesis of data and information, with the use of the necessary technology.
  • Adapting to new situations.
  • Working independently.
  • Production of free, creative, and inductive thinking.
  • Promotion of analytical and synthetic thinking.

Syllabus

  • Error Analysis.
  • Numerical solution of nonlinear equations: iterative methods, the fixed-point theorem, Newton’s method, the secant method.
  • Numerical solution of linear systems: Matrix norms and conditioning. Direct Methods (Gauss elimination, LU factorization). Iterative methods, convergence, and examples of iterative methods (Jacobi, Gauss-Seidel).
  • Polynomial interpolation: Lagrange and Hermite interpolation. Linear splines. Error analysis of interpolation.
  • Numerical integration: Newton-Cotes quadrature formula (the trapezoidal rule and Simpson’s rule). Error analysis of numerical integration.

Teaching and Learning Methods - Evaluation

Delivery

In the class

Use of Information and Communications Technology -
Teaching Methods
Activity Semester Workload
Lectures (13X4) 52
Study and analysis of bibliography 104
Exercises-Homeworks 31.5
Course total 187.5
Student Performance Evaluation

Written examination.

Attached Bibliography

See the official Eudoxus site or the local repository of Eudoxus lists per academic year, which is maintained by the Department of Mathematics. Books and other resources, not provided by Eudoxus:

  • “An Introduction to Numerical Analysis”, E. Süli, and D. Mayers, Cambridge University Press, Cambridge, 2003.