ECTS Course Catalogue
Course details
Course code:
IGS10800o17Semester:
2017/2018 winterName:
Math Analysis IMajor:
Geodesy and CartographyStudy Type:
first cycleCourse type:
compulsoryStudy Semester:
1ECTS points:
7Hours (Lectures / Tutorials / Other):
30 / 30 / 0Lecturer:
dr hab. Ryszard DeszczLanguage of instruction:
Polish / EnglishThe course taught in English if the group has ≥6 students. The course taught in Polish with a possibility of support in English if the group has <6 studentsLearning outcomes:
Understands the civilization’s significance of Mathematics and its applications, knows basic theorems from selected sections of Mathematics, knows elements of differential and integral calculus of functions of one variable.
Skills
Use differential calculus of a function of one variable to the investigation of a function of one variable, use integral calculus of a function of one variable to compute of given geometrical quantities, solve differentials equations of some types.
Competences:
Knows limitations of his/her own knowledge and understands the need for further education, understands and appreciates the importance of intellectual honesty in his/her own activities and those of other people; behaves ethicallyPrerequisites:
Mathematics on the secondary school level (comprehensive secondary school of a general profile)Course content:
In the course Mathematical Analysis I there are contained elements of differential and integral calculus of functions of one variable and ordinary differential equations.
Limit of a sequence, limits of functions, continuity and derivatives of a function of one variable, Lagrange theorem, de L’Hospital’s rule, Taylor formula, Maclaurin formula, investigation of the shape of a function of one variable, number series, tests for convergence of series, power series, indefinite integrals, definite integrals, Leibniz-Newton formula, improper integrals, first-order ordinary differential equations, second-order ordinary differential equations, Cauchy problem, applications of ordinary differential equations.
Recommended literature:
1. Heinbockel J.H., Introduction to Calculus, Vol. I, Vol. II, 2012. (Paper or electronic copies for noncommercial use may be made freely without explicit permission of the author. All other rights are reserved); 2. Trench W.F., Introduction to real analysis, Free Edition 1.06, January 2011. (this book was published previously by Pearson Education); 3. Polyanin A.D., Valentin F.Z., Handbook of exact solutions for ordinary differential equations, 2nd ed., 2003 by Chapman & Hall/CRC, a CRC Press Company Boca Raton, London, New York, Washington, D.C.; - complementary/optional 4. Gradshteyn I.S., Ryzhik I.M., Table of Integrals, Series, and Products, seventh ed., 2007, Jeffrey A., Editor University of Newcastle upon Tyne, England, Zwillinger D., Editor Rensselaer Polytechnic Institute, USA, Translated from Russian by Scripta Technica, Inc. Amsterdam, Boston, Heidelberg, London, New York, Oxford, Paris, San Diego, San Francisco, Singapore, Sydney, Tokyo, Academic Press, Elsevier Inc. Assessment methods:
Obligatory completion of tutorials, a written exam. Minimum required for passing: 50%.Comment: