# Derivatives and Risk Management

Course ID
MDF 606
Level
Program
BMS
Semester
Sixth
Credits
6.0
Paper Type
DSE – Finance
Method
Lecture & Tutorial

## Unique Paper Code: Update Awaited

To equip students with principles and techniques of Derivatives and its Greeks, and Risk Management through stock market.

## Learning Outcomes:

At the end of the course, students should be able to:

• Understand derivative in detail such as forward, futures, options, Greeks, swaps etc.
• Understand of option pricing models
• Understand the concept of hedging, speculation and arbitrage.

## Course Contents

Unit I
Unit II
Unit III
Unit IV

Unit I (3 weeks)

Introduction: History of derivatives and origin of derivatives in India. Concepts of Early delivery, extension & cancellation of forward contracts, Why hedge, Basis risk and its effect on hedgers (Through numerical). Forwards and Futures, Interest rate futures and currency futures, and their hedging strategies, Determination of forward and futures prices

References:

Chapter 1 (Section 1.6)– [S.L Gupta]

Chapter 5 (Section 5.1-5.4)– [S.L Gupta]

https://www.fedai.org.in/; and P.G. Apte

Chapter 3 (Section 3.1-3.3) – [J.C Hull]

Chapter 5 (Section 5.1-5.13) – [J.C Hull]

Chapter 6 (Section 6.1-6.3) – [J.C Hull]

Unit II (3 weeks)

Options and its type, Factors affecting option Prices. Put & call parity theorem. Trading strategies involving options: payoffs call & Put (both buyer and seller), Spreads (Bull, Bear, Box, Butterfly and Calendar Spread), combinations (Straddle, Strangle, Strip, Straps), Options on Stock Indices and currency.

References:

Chapter 9 (Section 9.1) – [J.C Hull]

Chapter 10 (Section 10.1, 10.4) – [J.C Hull]

Chapter 11 (Section 11.1-11.5) – [J.C Hull]

Chapter 15, Chapter 15.-15.6) – [J.C Hull]

Unit III (3weeks)

Binomial model: One Period, Two Period and multiple Period. Black-Scholes option model (for stock and currency both). Concept and calculation of delta, gamma, rho, theta and Vega options.

References:

Chapter 12 (Section 12.1, 12.3-12.7) – [J.C Hull]

Chapter 17 (Section 17.1-17.9) – [J.C Hull]

Unit IV (3 weeks)

Delta Hedging, Gamma Hedging. Making a portfolio Delta Neutral, Gamma Neutral, Delta positive Gamma Neutral and Delta positive Gamma Neutral, Introduction to Swaps, Interest rate swaps, currency swaps, cross-currency swaps

References:

Chapter 12 (Section 12.1, 12.3-12.7) – [J.C Hull]

Chapter 17 (Section 17.1-17.9) – [J.C Hull]

Chapter 7 (Section 7.1-7.4, 7.10-7.13) – [J.C Hull]

#### Text Books

John C. Hull. Options, Futures and Other Derivatives (Eighth ed.). Pearson Education.

JurgenFranke, Wolfgang Hardle and Christian Hafner. Introduction to Statistics of Financial Markets.
R. Madhumathi, M. Ranganatham. Derivatives and risk management (1st ed.) Redhead, K. Financial Derivatives- An introduction to futures, forwards, options, swaps. Prentice Hall of India
McDonald, Derivatives Markets, (latest ed.), Pearson.
Robert Reitano, 2010, Introduction to Quantitative Finance, MIT Press.
Chance, 2003, Analysis of Derivatives for the CFA Program.
Gupta, S.L, Financial Derivatives: Theory, Concepts and Problems (latest ed.), PHI Learning Publications.

#### Teaching Learning Process

Class room lecture, Case study discussion, Numerical Problem solving, Class presentation on the assigned topic by students individually or in group, Workshop, Tutorials, Role play

#### Assessment Methods

1. Internal evaluation of 25% marks
a. Attendance 5% marks
b. Two internal evaluations by the teacher with 10% marks each out of which one must be a class test and other may be another test or home assignment or presentation. Faculty may take more than two assignments and (or) tests but total will be only 20% marks.
2. End term University Exam of 75% marks

#### Keywords

Forward Contracts, Financial Futures, Options, Delta Hedging, Binomial model, Financial Swaps

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