VSFS:BA_MaB_2 Mathematics B 2 - Informace o předmětu
BA_MaB_2 Mathematics B 2
Vysoká škola finanční a správníléto 2013
- Rozsah
- 2/1. 12 hodin KS/semestr. 6 kr. Ukončení: zk.
- Vyučující
- Mgr. Barbora Batíková, Ph.D. (cvičící)
Ing. Miloš Krejčí (pomocník) - Garance
- Mgr. Barbora Batíková, Ph.D.
Katedra informatiky a matematiky (FES, KIM) – Katedry – Vysoká škola finanční a správní
Kontaktní osoba: Dagmar Medová, DiS. - Rozvrh seminárních/paralelních skupin
- BA_MaB_2/cBM1PH: každé sudé úterý 10:30–11:14 E128, každé sudé úterý 11:15–12:00 E128, B. Batíková
BA_MaB_2/cBM2PH: každé liché úterý 10:30–11:14 E128, každé liché úterý 11:15–12:00 E128, B. Batíková
BA_MaB_2/pBMPH: Út 8:45–9:29 E128, Út 9:30–10:15 E128, B. Batíková - Předpoklady
- The course builds on the subject of BA_MaB_1 of winter semester 1st year. Knowledge at the level of this course curriculum is assumed.
- Omezení zápisu do předmětu
- Předmět je otevřen studentům libovolného oboru.
- Cíle předmětu
- Students will learn the notions and procedures used in the investigation of the behaviour of functions (local extremes, convex function and concave function and their geometrical interpretations). Furthermore, they will learn the meanings of the antiderivative, indefinite integral, method of integration by parts, method of integration by substitution, integration of rational functions, and Riemann’s definite integral and its application. Infinite number series, power series and the development of functions into series will also be presented to the students.
- Osnova
- 1. Notions pertinent to functions – monotonicity intervals, local extremes of a function. 2. Notions pertinent to the behaviour of functions – convex and concave functions, inflection points. 3. Procedure of investigating the behaviour of a function. 4. Antiderivative and indefinite integral. 5. Integration of elementary functions. 6. Integration by parts. 7. Integration by the substitution method. 8. Integration of rational functions. 9. Riemann’s definite integral. 10. Infinite definite integral. 11. Number series, their convergence and divergence. 12. Power series, their convergence and divergence.
- Literatura
- povinná literatura
- Neustupa J.: Mathematics I. Vydavatelství ČVUT, Praha 2004, 2. vydání
- Výukové metody
- PS: (full time students) 2 hours per week of lectures and 1 hours per week of seminars (2/1); KS: (part time students) 6 seminars (90 min each). Lectures for present studies will be split into theoretical as well as practical part. Theoretical parts will be always explained on practical examples. Even more interactive form of study is applied in KS (part time study). Students in full time study program should attend 75% of seminars as a minimum. Students in part time study program should attend 50% of seminars as a minimum.
- Metody hodnocení
- The subject is completed by credit test and written examination. The credit test comprises 5 questions. Reaching the result of minimum 6 points out of 10 points is the precondition to gain the credit. Grading will be based on an individual written examination.
- Vyučovací jazyk
- Angličtina
- Další komentáře
- Předmět je dovoleno ukončit i mimo zkouškové období.
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- Statistika zápisu (léto 2013, nejnovější)
- Permalink: https://is.vsfs.cz/predmet/vsfs/leto2013/BA_MaB_2