(1) GENERAL INFORMATION
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FACULTY |
APPLIED TECHNOLOGIES |
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DEPARTMENT |
AIRCRAFT TECHNOLOGY ENGINEERING |
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LEVEL OF STUDIES |
UNDERGRADUATE |
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MODULE CODE |
AE1210T |
SEMESTER OF STUDIES |
2ND |
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MODULE TITLE |
ΜΑTHEMATICS II |
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INDEPENDENT TEACHING ACTIVITIES |
TEACHING HOURS PER WEEK |
CREDIT UNITS |
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Lectures |
3 |
3 |
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Practice |
1 |
2 |
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COURSE TYPE
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General Background |
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PRE-REQUIRED COURSES |
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TEACHING AND EXAMINATION LANGUAGE |
GREEK |
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THE COURSE IS OFFERED TO ERASMUS STUDENTS |
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COURSE WEBPAGE (URL) |
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(2) LEARNING OBJECTIVES
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Learning Objectives |
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After successfully completing the course, students should be able to analyze the basic concepts of differential equations and differential and integral calculus of multivariable functions. They should also be able to apply the principles for the solution of differential equations and infinitensimal calculus of multivariable functions for the soulution of practical problems that arise during the repair and maintenance procedures of aircraft parts. |
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General Skills |
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Search, analysis and combination of data and information, with the use of the necessary technologies. |
(3) COURSE CONTENT
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Unit 1: Introduction to differential equations Generation of differential equation. Solution of differentia equation. Separation variable differential equations. Homogeneus first order differential equation Unti 2: First order differential equations Linear first order differential equations. Bernoulli and Ricatti's differential equations. Exact first order differential equation. First order differential equation reducible to exact. Clairaut and Lagrange's differential equations Unit 3: Higher order differential equations Linear second order differential equations with random continuous function coefficient. Linear second order differential equations with constant coefficients. Applications of second order differential equations. Higher order differential equations. Linear differential systems. Unit 4: Laplace Transformation Definition of Laplace transformation, Fundamental properties, Inverse Laplace transformation, Application of Laplace transformation for the solution of differential equations and differential systems. Unit 5: Introduction to infinitesimal calculus of multivariable functions Continuity, derivative and real function differential of multivariable functions. Partial derivatives and their geometric interpretation Unit 6: Derivatives of multivariable functions Total differential. Partial derivatives and complex function differential, Complecated functions and Jacobians, Derivative and direction Unit 7: Double integral: Double integral, examples and applications of double integrals in aircraft technology Unit 8: Multiple integrals Triple and multiple integrals and applications in aircraft technology
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(4) TEACHING AND LEARNING OBJECTIVES – EVALUATION
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TEACHING METHOD |
Face to face |
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USE OF INFRORMATION AND COMMUNICATION TECHNOLOGIES |
• Use of Internet • Learning procedure through e-class support
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TEACHING ORGANIZATION
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STUDENT EVALUATION
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· Written examination in the scheduled examination periods including theory questions, comprehension questions, multiple choice and problem solving. |
(5) SUGGESTED BIBLIOGRAPHY
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-Suggested Bibliography : · Αναστασάτος, Κικίλιας κλπ, Διαφορικές εξισώσεις, Εκδόσεις Δηρός, 2002. · Κικίλιας, Κουρής κλπ, Συντηρήσεις πολλών μεταβλητών, Εκδόσεις Δηρός, 2002. · Δημητρακούδης, Κωστάκης κ.λπ., Μαθηματικά ΙΙ, Εκδόσεις Δίφρος, 1999. · Κωστάκης, Κικίλιας, Συναρτήσεις πολλών μεταβλητών, Εκδόσεις Μακεδονικές, 1994. · Tom Apostol, Διαφορικός και Ολοκληρωτικός Λογισμός (CALCULUS), Τόμος ΙΙ, Εκδόσεις Ατλαντίς, 1962. · Α. Παπαϊωάννου, Διαφορικές Εξισώσεις, τεύχος Α, Μακεδονικές Εκδόσεις, 1992. · Paul Davis, Differential Equations, Modeling with Matlab Prentice Hall, 1999 · Kent R. Nagle, et al Fundamentals of Differential Equations, 1999 · R. Bronson, Modern Introductory Differential Equations, Schaum's Outline Series · R. C. McLann, Introduction to Ordinary Differential Equations, Harcourt Brace Jovanovich Inc. · Erwin Kreyszig , Advanced Engineering Mathematics, John Wiley & Sons, 8th Edition, October 1998. · Stroud, Engineering Mathematics, The MacMillan Press, 1999.
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