VSFS:B_FIM Financial and Investment Math - Course Information
B_FIM Financial and Investment Mathematics
University of Finance and AdministrationWinter 2012
- Extent and Intensity
- 2/1. 5 credit(s). Type of Completion: zk (examination).
- Teacher(s)
- doc. RNDr. Petr Budinský, CSc. (seminar tutor)
RNDr. Ivan Havlíček, CSc. (seminar tutor)
RNDr. Hana Hladíková, Ph.D. (seminar tutor)
Mgr. Miroslav Kučera (seminar tutor) - Guaranteed by
- doc. RNDr. Petr Budinský, CSc.
Department of Computer Science and Mathematics – Departments – University of Finance and Administration
Contact Person: Dagmar Medová, DiS. - Timetable of Seminar Groups
- B_FIM/cBPH: each even Thursday 12:15–12:59 E129, each even Thursday 13:00–13:45 E129, I. Havlíček
B_FIM/cRMO: each even Tuesday 12:15–12:59 M27, each even Tuesday 13:00–13:45 M27, I. Havlíček
B_FIM/cR1PH: each even Thursday 8:45–9:29 E129, each even Thursday 9:30–10:15 E129, H. Hladíková
B_FIM/cR2PH: each odd Thursday 14:00–14:44 E129, each odd Thursday 14:45–15:30 E129, H. Hladíková
B_FIM/cR3PH: each odd Thursday 15:45–16:29 E129, each odd Thursday 16:30–17:15 E129, H. Hladíková
B_FIM/cR4PH: each even Thursday 10:30–11:14 E129, each even Thursday 11:15–12:00 E129, H. Hladíková
B_FIM/pBPH: Wed 12:15–12:59 E128, Wed 13:00–13:45 E128, P. Budinský
B_FIM/pRMO: Tue 10:30–11:14 M27, Tue 11:15–12:00 M27, I. Havlíček
B_FIM/pRPH: Wed 10:30–11:14 E007KC, Wed 11:15–12:00 E007KC, P. Budinský
B_FIM/uRKL: Tue 2. 10. 17:30–19:00 K206, Tue 9. 10. 15:45–17:15 K206, 17:30–19:00 K206, Tue 20. 11. 17:30–19:00 K206, Tue 27. 11. 17:30–19:00 K206, M. Kučera
B_FIM/uRPH: Tue 9. 10. 19:15–20:45 E122, Tue 16. 10. 19:15–20:45 E122, Tue 6. 11. 14:00–15:30 E122, 15:45–17:15 E122, Tue 20. 11. 17:30–19:00 E122, I. Havlíček
B_FIM/vBPH: Fri 12. 10. 17:15–18:45 E128, Sat 27. 10. 9:45–11:15 E128, 11:30–13:00 E128, Fri 9. 11. 15:30–17:00 E128, Fri 14. 12. 13:45–15:15 E128, I. Havlíček
B_FIM/vRMO: Fri 23. 11. 12:00–13:30 M17, 13:45–15:15 M17, Fri 7. 12. 12:00–13:30 M17, 13:45–15:15 M17, 15:30–17:00 M17, I. Havlíček
B_FIM/vRPH: Sat 6. 10. 9:45–11:15 E126, 11:30–13:00 E126, Sat 20. 10. 9:45–11:15 E126, 11:30–13:00 E126, Fri 2. 11. 12:00–13:30 E126, I. Havlíček - Prerequisites
- There are no prerequisites for this course
- Course Enrolment Limitations
- The course is offered to students of any study field.
- Course objectives
- At the end of this course the student will be able to understand and explain
simple and compound interest. They will also acquire knowledge on the calculation of the basic characteristics of bonds (yield, price, duration, convexity), learn to build the portfolio of equities and derivatives . At the end of this course the student will be able to:
- Explain the concepts of interest, annual interest rate
- Describe different types and kinds of interest
- Calculate the future and present value of the investment and its return
- Explain the concept of bond, including the rules for counting and valuation
- Explain and calculate the duration
- Explain the principles of neutralization bond portfolio
- Establish a portfolio composed of two bonds
- Explain the principles of the derivatives and their use
- Describe the basic strategy of investing in portfolios - Syllabus
- 1. Interest and annual interest rate. Simple and compound interest, frequency of compounding. Continuous compounding.
- 2. Interest rate and yield, present and future value, principle of discounting. Calculation of present value of an investment.
- 3. Yield calculation for given present and future value, recalculation of yields for different frequencies of compounding.
- 4. Classification of bonds. The nominal value of the bond, coupon rate, bond yield to maturity. Calculation of bond price for zero-coupon-bond, annuity and perpetuity.
- 5. Rules for bonds calculations. Relationship between bond price and yield. Relationship between coupon rate and bond yield.
- 6. Accrued interest, gross and clean price of the bond. Calculation of clean price of the bond.
- 7. Sensitivity of bond prices to changes in yields. Modified and Macaulay duration, convexity.
- 8. Bond duration and convexity properties. Calculation of bond duration and convexity.
- 9. Investing in the bonds. Reinvestment and capital risk. Duration and investment horizon.
- 10. Bond portfolio, its duration and convexity. Construction of bond portfoliofor given duration equal to the investment horizon.
- 11. Derivatives Portfolio I - forward contracts and options, basic graphs of profits depending on the price of the underlying asset.
- 12. Derivatives Portfolio II - strategies as spread, combination and hedging.
- Literature
- required literature
- Budinský, P. - Záškodný, P. Finanční a investiční matematika. Praha : VŠFS, 2004.
- Teaching methods
- - lectures and seminars in full-time study, - tutorials in part-time study, Minimal required participation is 75% on seminars in full-time study and 50% on tutorials in part-time study. Students with lower than required participation have to fulfill additional study duties.
- Assessment methods
- Method write endings class exam and 75% participation in exercises, to try to be successful (50% correct answers) write exam exam, and do an oral exam.
- Language of instruction
- Czech
- Further comments (probably available only in Czech)
- The course can also be completed outside the examination period.
General note: Bb1.
Information on the extent and intensity of the course: 10 hodin KS/semestr.
- Enrolment Statistics (Winter 2012, recent)
- Permalink: https://is.vsfs.cz/course/vsfs/winter2012/B_FIM