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STUDIJNÍ PLÁNY
2023/2024
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Integrální počet

Přihlášení do KOSu pro zápis předmětu Zobrazit rozvrh
Kód Zakončení Kredity Rozsah Jazyk výuky
F7ABBITP Z,ZK 4 2P+2C anglicky

Podmínkou zápisu na předmět F7ABBITP je, že student úspěšně absolvoval F7ABBLAD nebo získal zápočet a nevyčerpal všechny zkouškové termíny předmětu F7ABBLAD. Předmět F7ABBITP lze klasifikovat až po úspěšné klasifikaci předmětu F7ABBLAD

Úspěšná klasifikace předmětu F7ABBITP je podmínkou pro následnou klasifikaci předmětu F7ABBFVP

Garant předmětu:
Petr Maršálek
Přednášející:
Petr Maršálek
Cvičící:
Petr Maršálek, Tomáš Parkman
Předmět zajišťuje:
katedra přírodovědných oborů
Anotace:

The subject is an introduction to integral calculus and integral transforms.

Integral calculus: anti-derivative, indefinite integral, properties and methods of integration (integration by parts and by substitution, partial fractions), definite integral, properties, Newton-Leibnitz fundamental theorem, simple applications of both indefinite and definite integrals, improper integral, solving differential equations (ODEs) (1st order ODEs with separable variables, linear 1st order homogenous as well as non-homogenous ODEs, 2nd order linear homogenous and non-homogenous ODEs with constant coefficients),intro to multiple integrals, particularly double integral and applications.

Integral transforms: Laplace transform and inverse Laplace transform and their application for solving nth order linear ODEs with constant coefficients.

Z-transform and inverse Z-transform, their application for solving nth order linear difference equations.

Požadavky:

Assessment:

1. Maximum 3 absences during the semester for serious reason.

2. Activities at seminars will be checked by mini-tests (10 minutes,1-2 tasks). There will be 8 mini-tests during the semester, evaluated by 5 points each. Total sum MT ranging from 0 to 40 points.

3. Midterm tests

1st midterm test in the middle of the current semester (see schedule for the current AY)

2nd midterm test in the end of the current semester (see schedule for the current AY)

Midterm test consists of 4 tasks, each task evaluated by 5 points (maximum 20 points at a midterm test). A student must gain from one midterm test at least 10 points, it means that minimum gained from both midterm tests must be at least 20 points. So, VT ranging from 20 to 40 points.

Student's grading from seminars transferred for the exam:

MT:8 + VT:4 - ranging from 5 to 15 points.

Additional term for missing midterm tests (see schedule for the current AY)

Exam:

Assessment registered by respective teacher in KOS together with the poi nts transferred for exam.

Exam is only written, lasts 90 minutes.

It is forbidden to use a calculator, mobile phone, or any other electronic device during the exam.

The exam consists of

1. 7 tasks, evaluated by 10 points each, in total maximum 70 points

2. 5 tests, evaluated by 2 points each, in total maximum 10 points

3. 5 tests, evaluated by 1 point each, in total 5 points

4. Evaluation at seminar - transferred points maximum 15 points

Exam grading

A: 90-100, B: 80-89, C: 70-79, D: 60-69, E: 50-59, F: less than 50

Osnova přednášek:

1. Introduction to indefinite integral, basic properties, elementary functions integration, integration by parts, integration by substitution.

2. Rational functions integration, partial fraction technique.

3. Integration of trigonometric functions, combined techniques of integration.

4. Introduction to definite integral, simple geometrical applications (area, volume of rotational bodies, curve length).

5. Improper integral, introduction to differential equations, general solution.

6. Differential equations, initial value problem for ODEs, 1st order ODE with separable variables, linear 1st order ODEs homogenous and non-homogenous, method of variation of constant, homogenous ODEs (substitution z=y/x).

7. nth order linear ODEs with constant coefficients and their solution.

8. Double integral, introduction and elementary methods of its calculating.

9. Jacobian and substitution in double integral, polar coordinates, geometrical applications of double integral.

10. Laplace transform- definition, properties and examples.

11. Inverse Laplace transform, application of Laplace transform for solving IVP for homogenous and non-homogenous nth order linear ODEs with constant coefficients.

12. Z-transform - definition, properties and examples.

13. Inverse Z-transform, Test No. 2

14. Z-transform for solving linear difference equations.

Osnova cvičení:

1. Elementary functions integration, integration by parts, integration by substitution.

2. Rational functions integration, partial fraction technique.

3. Integration of trigonometric functions, combined techniques of integration.

4. Definite integral, simple geometrical applications (area, volume of rotational bodies, curve length).

5. Improper integral, simple examples of improper integrals due to the function or due to the infinite interval of integration, introduction to differential equations, general solution.

6. 1st order ODE with separable variables examples, linear 1st order ODEs homogenous and non-homogenous, method of variation of constant, examples.

7. Homogenous ODEs (substitution z=y/x), nth order linear ODEs with constant coefficients and their solution.

8. Double integral, introduction and elementary methods of its calculating.

9. Jacobian and substitution in double integral, polar coordinates, geometrical applications of double integral.

10. Laplace transform properties and examples.

11. Inverse Laplace transform and application of Laplace transform for solving IVP for homogenous and non-homogenous nth order linear ODEs with constant coefficients.

12. Z-transform properties and examples.

13. Inverse Z-transform. Simple examples.

14. Z-transform for solving linear difference equations.

Cíle studia:
Studijní materiály:

Study materials

[1] Neustupa J.: Mathematics 1, skriptum ČVUT, 2004

[2] Bubeník F.: Problems to Mathematics for Engineers, skriptum ČVUT, 2007

[3] Stewart, J. : Calculus, Brooks/Cole, 2012

Poznámka:
Rozvrh na zimní semestr 2023/2024:
Rozvrh není připraven
Rozvrh na letní semestr 2023/2024:
06:00–08:0008:00–10:0010:00–12:0012:00–14:0014:00–16:0016:00–18:0018:00–20:0020:00–22:0022:00–24:00
Po
Út
místnost KL:B-307
Maršálek P.
12:00–13:50
(přednášková par. 1)
Kladno FBMI
Učebna
místnost KL:B-307
Maršálek P.
14:00–15:50
(přednášková par. 1
paralelka 1)

Kladno FBMI
Učebna
St
Čt

Předmět je součástí následujících studijních plánů:
Platnost dat k 27. 3. 2024
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