Infinitesimal Calculus II (MAY211): Διαφορά μεταξύ των αναθεωρήσεων
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[[Undergraduate Courses Outlines]] - [https://math.uoi.gr Department of Mathematics] | |||
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Αναθεώρηση της 18:48, 1 Ιουλίου 2022
Undergraduate Courses Outlines - Department of Mathematics
General
School | School of Science |
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Academic Unit | Department of Mathematics |
Level of Studies | Undergraduate |
Course Code | MAY211 |
Semester | 2 |
Course Title | Infinitesimal Calculus II |
Independent Teaching Activities | Lectures, laboratory exercises (Weekly Teaching Hours: 5, Credits: 7.5) |
Course Type | General Background |
Prerequisite Courses | None (from the typical point of view). Without the knowledge earned from the course “Infinitesimal Calculus I” will be nearly impossible to follow this course. |
Language of Instruction and Examinations | Greek |
Is the Course Offered to Erasmus Students | Yes (exams in English are provided for foreign students) |
Course Website (URL) | http://www.math.uoi.gr/GR/studies/undergraduate/courses/may211.htm |
Learning Outcomes
Learning outcomes |
This course is the sequel of the course “Infinitesimal Calculus I”. The student will get in contact with more notions and techniques in the branch of Analysis. In this course the students:
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General Competences |
The course provides inductive and analytical thinking, the students evolve their computational skills and they get knowledge necessary for other courses during their undergraduate studies. |
Syllabus
Series, convergence of series and criteria for convergence of series. Dirichlet’s criterion, D’ Alembert’s criterion, Cauchy’s criterion, integral criterion. Series with alternating signs and Leibnitz’s theorem. Absolute convergence and reordering of series, Power series, radius of convergence of power series.
Uniform continuity, definition and properties. Characterization of uniform continuity via sequences. Uniform continuity of continuous functions defined on closed intervals.
Riemann integral, definition for bounded functions defined on closed intervals. Riemann’s criterion, integrability of continuous functions. Indefinite integral and the Fundamental theorem of Calculus. Mean Value theorem of integral calculus, integration by parts, integration by substitution. Integrals of basic functions, integrations of rational functions. Applications of integrals, generalized integrals, relation between generalized integrals and series.
Taylor polynomials, Taylor’s Theorem, forms of the Taylor remainder. Taylor series and expansions of some basic functions as Taylor series.
Teaching and Learning Methods - Evaluation
Delivery |
Due to the theoretical nature of this course the teaching is exclusively given in the blackboard by the teacher. | ||||||||||
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Use of Information and Communications Technology |
The students may contact their teachers by electronic means, i.e. by e-mail. | ||||||||||
Teaching Methods |
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Student Performance Evaluation |
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Attached Bibliography
- Γενικά Μαθηματικά - Απειροστικος Λογισμός τόμος Ι, Χ. Αθανασιάδης, Ε. Γιαννακούλιας, Σ. Γιωτόπουλος, Εκδόσεις Συμμετρία.
- Απειροστικός Λογισμός Τόμος ΙΙα, Σ. Νεγρεπόντης, Σ. Γιωτόπουλος, Ε. Γιαννακούλιας, Εκδόσεις Ζήτη.
- Απειροστικός Λογισμός τομος Β, Σ. Ντούγιας, Leader Books.
- Thomas, Απειροστικός Λογισμός, R.L. Finney, M.D. Weir, F.R.Giordano, Πανεπιστημιακές Εκδόσεις Κρήτης, (Απόδοση στα ελληνικά: Μ. Αντωνογιαννάκης).
- Διαφορικός και Ολοκληρωρικός Λογισμός: Μια εισαγωγή στην Ανάλυση, Michael Spivak, Πανεπιστημιακές Εκδόσεις Κρήτης (Μετάφραση στα ελληνικά: Α. Γιαννόπουλος).