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CZECH TECHNICAL UNIVERSITY IN PRAGUE
STUDY PLANS
2011/2012

Mathematics for Bc students

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Code Completion Credits Range Language
17BPMB Z,ZK 4 2+2 Czech
Lecturer:
Eva Feuerstein (gar.)
Tutor:
Eva Feuerstein (gar.), Petr Písařík, Milan Tatíček, Šárka Vondrová
Supervisor:
Department of Natural Sciences
Synopsis:

The subject is an introduction to differential calculus, linear algebra, and integral calculus.

Differential calculus comprises of intro to sets of numbers (natural, rational, irrational), sequences of real numbers (bounded, unbounded, monotonous, convergent), real-valued functions of one independent real variable (injective, monotonous, continuous, differentiable), inverse functions, differential of a function, Taylor polynomials.

Linear algebra deals with intro to solving linear algebraic systems of equations (LAES), Gaussian elimination algorithm for solving LAES, intro to vector spaces (linear combination of vectors, linear dependence/independence of a set of vectors, basis and dimension of a vector space), intro to matrix algebra (matrix operations, rank of a matrix, determinant and methods of calculation, matrix inverse, eigenvalues and eigenvectors of a matrix).

Integral calculus intro consists of definition of an indefinite integral, properties and methods of integration (integration by substitution, integration by parts, partial fractions), definite integral, properties, Newton-Leibnitz fundamental theorem, simple applications of definite integral.

Requirements:

Assessment:

Maximum 3 absences during the semester for serious reasons like sickness, injury etc. (medical certificate required).

Minimum 50% (i.e. 10 pts) evaluation at each of the 2 tests, each test consisting of 4 tasks, a task evaluated max. 5 pts each (the tests are taken in 6th and 13th week of the semester).

Exam:

1. Assessment recorded in „KOS? and signed by respective teacher in student?s “Index?,

2. Minimum 50% evaluation at the exam test. Exam test comprises of 10 tasks, a single task evaluated max 10% each.

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

Syllabus of lectures:

1. Sets of numbers, sequences of real numbers, limit of a sequence, properties of sequences (monotonous, bounded, convergent or divergent sequence), real-valued functions of one independent real variable, function properties (injective, bounded, unbounded, even, odd, periodic functions), operations with functions, compound functions, inverse function.

2. Review of elementary functions (polynomials, trigonometric functions, inverse trigonometric functions, exponential function, logarithmic function), limit of a function definition, techniques and rules for finding limits of a function, improper limits, limits in infinity, continuous functions, properties of continuous functions in a closed interval.

3. Asymptotes of a function -horizontal, vertical, oblique. Derivative of a function, rules and techniques for computing derivatives, derivative of a compound function, derivative of an inverse function, differential of a function and its application.

4. Tangent lines of a functions, L' Hospital rule, rules and techniques for computing higher order derivatives of a function, Taylor polynomial, Taylor's theorem in one real variable.

5. Local and global extremes of a function, monotonicity and the sign of the first derivative of a function, first and second derivatives use to find the graph of a given function.

6. Real number series, convergence criteria, sum of a series. (Test No. 1)

7. Systems of linear algebraic equations, Gaussian elimination algorithm for solving LAES,

8. Vector space - definition, examples, linear combination of vectors, linear dependence and independence of a family of vectors, linear span of a set of vectors, linear space and examples, basis and dimension of a linear space (or a subspace), dot product of two vectors.

9. Matrices, various types of matrices, rank of a matrix, operations with matrices, identity matrix, transpose of a matrix, matrix inverse, regular matrices, singular matrices.

10. Determinant of a square matrix, Sarrus? rule for calculating a determinant of a 3 by 3 matrix, Laplace rule, techniques for finding the inverse of a regular matrix.

11. Solvability of a system of linear algebraic equations, Frobenius theorem, structure of solution of a system of linear algebraic equations, methods for solving systems of linear equations, solving a system of linear algebraic equations with regular matrix - Cramer?s rule.

12. Indefinite integral definition, properties, indefinite integrals of some functions (the functions that are derivatives of elementary functions). Techniques of integration: integration by parts, integration by substitution, simple applications.

13. Rational functions integration, partial fraction technique. (Test No. 2)

14. Definite integral, methods of integration, basic properties, methods of integration for definite integral, Newton-Leibnitz fundamental theorem, simple applications of definite integral.

Syllabus of tutorials:

Problems to be solved:

1. Properties of given sequences, limits of various sequences, convergence or divergence of a sequence, elementary functions and their properties (injective, non-injective, even, odd, periodical), domain, range and graph of some elementary function.

2. Operations with functions, limit of a given function, techniques and rules for finding limits of a function, improper limits, limits in infinity, continuity of a given function, continuous functions in a closed interval.

3. Asymptotes of a given function -horizontal, vertical, oblique. Practice techniques of differentiation of given functions derivative of a function, rules and techniques for computing derivatives, derivative of a compound function, derivative of an inverse function, differential of a function and its application.

4. Tangential lines for a given function, L' Hospital rule for finding limit of a function.

5. Local and global extremes of a function, monotonicity and the sign of the first derivative of a function, first and second derivatives use to find the graph of a given function. Taylor polynomial.

6. Analysis of properties of a given function, graph of the function.

7. Examples of series, geometrical series, convergence criteria, sum of a series.

8. Systems of linear algebraic equations, practice Gaussian elimination algorithm for solving LAES.

9. Vector space properties, linear dependence or independence of a family of vectors, linear space and examples, basis and dimension of a linear space (or a subspace) examples.

10. Dot product, operations with matrices, rank of a matrix, transpose of a matrix, matrix inverse, regular matrices, singular matrices. Gauss-Jordan elimination method for calculating inverse of a given matrix.

11. Sarrus rule for calculating a determinant of a 3 by 3 matrix, Laplace rule, techniques for finding the inverse of a regular matrix, solving matrix equations.

12. Application of Frobenius theorem, finding all solutions of a system of linear algebraic equations, Gausssian elimination method for solving systems of linear equations, solving a system of linear algebraic equations with regular matrix - Cramer?s rule.

13. Computing indefinite integrals of some elementary functions and their linear combinations, practicing techniques of integration: integration by parts, integration by substitution.

14. Definite integral, methods of integration, applications of definite integral, various examples of exam tests solving.

Study Objective:

To gain necessary theoretical background of respected introductory fields of mathematics. By the end of the course students will be able to apply the knowledge in solving various practical examples and problems in the field of fundamental differential and integral calculus, and linear algebra.

Study materials:

[1] L. Gillman, R.H. McDowell: Calculus, Norton, New York, 1973

Note:
Time-table for winter semester 2011/2012:
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
Mon
Tue
roomKL:GDM3
Feuerstein E.
14:00–15:50
(lecture parallel1
parallel nr.103)

Kladno FBMI
Učebna GDM3_303
Fri
roomKL:B-616
Písařík P.
08:00–09:50
(lecture parallel1
parallel nr.104)

Kladno FBMI
Učebna
roomKL:C-4
Feuerstein E.
10:00–11:50
(lecture parallel1)
Kladno FBMI
Malý sál
Thu
Fri
Time-table for summer semester 2011/2012:
Time-table is not available yet
The course is a part of the following study plans:
Generated on 2012-7-9
For updated information see http://bilakniha.cvut.cz/en/predmet1550606.html