Applied Finance Lectures 1. What is finance? 2. The diffusion of the discounted cash flow method 3. Markowitz and the birth of modern portfolio theory.

Slides:

Advertisements

Similar presentations

Chapter 15 – Arbitrage and Option Pricing Theory u Arbitrage pricing theory is an alternate to CAPM u Option pricing theory applies to pricing of contingent.

Advertisements

Option Valuation The Black-Scholes-Merton Option Pricing Model

Valuation of Financial Options Ahmad Alanani Canadian Undergraduate Mathematics Conference 2005.

Financial Analysis, Planning and Forecasting Theory and Application By Alice C. Lee San Francisco State University John C. Lee J.P. Morgan Chase Cheng.

Copyright © 2003 South-Western/Thomson Learning All rights reserved. Chapter 6 Investment Companies.

Options, Futures, and Other Derivatives, 6 th Edition, Copyright © John C. Hull The Black-Scholes- Merton Model Chapter 13.

Spreads  A spread is a combination of a put and a call with different exercise prices.  Suppose that an investor buys simultaneously a 3-month put option.

CAPM and the capital budgeting

Derivatives Inside Black Scholes

1 16-Option Valuation. 2 Pricing Options Simple example of no arbitrage pricing: Stock with known price: S 0 =$3 Consider a derivative contract on S:

Corporate Financial Policy Introduction

Financial options1 From financial options to real options 2. Financial options Prof. André Farber Solvay Business School ESCP March 10,2000.

FINANCE 8. Capital Markets and The Pricing of Risk Professor André Farber Solvay Business School Université Libre de Bruxelles Fall 2007.

50 years of Finance André Farber Université Libre de Bruxelles Inaugurale rede, Francqui Leerstoel VUB 2 December 2004.

Options and Speculative Markets Introduction to option pricing André Farber Solvay Business School University of Brussels.

CAPM and the capital budgeting

FIN 819 Market Efficiency and Capital Structure Some classic arguments.

Corporate Finance Lecture 6.

Financial Markets Prof. André Farber SOLVAY BUSINESS SCHOOL UNIVERSITÉ LIBRE DE BRUXELLES Saigon, April 2004.

Options and Speculative Markets Inside Black Scholes Professor André Farber Solvay Business School Université Libre de Bruxelles.

VALUING STOCK OPTIONS HAKAN BASTURK Capital Markets Board of Turkey April 22, 2003.

Derivatives Options on Bonds and Interest Rates Professor André Farber Solvay Business School Université Libre de Bruxelles.

How Much Does It Cost to Raise Capital? Or How Much Return Do Security-Holders Require a Company to Offer to Buy Its Securities? Lecture: 5 - Capital Cost.

Lecture 2: Option Theory. How To Price Options u The critical factor when trading in options, is determining a fair price for the option.

5.1 Option pricing: pre-analytics Lecture Notation c : European call option price p :European put option price S 0 :Stock price today X :Strike.

Binnenlandse Francqui Leerstoel VUB Black Scholes and beyond André Farber Solvay Business School University of Brussels.

Théorie Financière Financial Options Professeur André Farber.

Corporate Finance Options Prof. André Farber SOLVAY BUSINESS SCHOOL UNIVERSITÉ LIBRE DE BRUXELLES.

Introduction to Risk and Return

Derivatives Introduction to option pricing André Farber Solvay Business School University of Brussels.

CHAPTER 9 The Cost of Capital

FIN351: lecture 6 The cost of capital The application of the portfolio theory and CAPM.

FIN 819 The Capital Structure Some classic arguments.

5- 1 Outline 5: Stock & Bond Valuation  Bond Characteristics  Bond Prices and Yields  Stocks and the Stock Market  Book Values, Liquidation Values.

1 The Black-Scholes-Merton Model MGT 821/ECON 873 The Black-Scholes-Merton Model.

McGraw-Hill/Irwin Fundamentals of Investment Management Hirt Block 1 1 Portfolio Management and Capital Market Theory- Learning Objectives 1. Understand.

Properties of Stock Options

Chapter 15 – Arbitrage and Option Pricing Theory u Arbitrage pricing theory is an alternate to CAPM u Option pricing theory applies to pricing of contingent.

Derivatives. Basic Derivatives Forwards Futures Options Swaps Underlying Assets Interest rate based Equity based Foreign exchange Commodities A derivative.

Investment Models Securities and Investments. Why Use Investment Models? All investors expect to earn money on their investments. All investors wish they.

Management Compensation Completing Lecture 20 Student Presentations Capital Investment Process Need for Good Information Incentives Stock Options Measuring.

Black Scholes Option Pricing Model Finance (Derivative Securities) 312 Tuesday, 10 October 2006 Readings: Chapter 12.

Computational Finance 1/34 Panos Parpas Asset Pricing Models 381 Computational Finance Imperial College London.

Intermediate Investments F3031 Option Pricing There are two primary methods we will examine to determine how options are priced –Binomial Option Pricing.

Valuing Stock Options: The Black- Scholes Model Chapter 11.

Fundamentals of Futures and Options Markets, 7th Ed, Ch 13, Copyright © John C. Hull 2010 Valuing Stock Options: The Black-Scholes-Merton Model Chapter.

Properties of Stock Option Prices Chapter 9. Notation c : European call option price p :European put option price S 0 :Stock price today K :Strike price.

Copyright © 2003 South-Western/Thomson Learning All rights reserved. Chapter 8 Investment Companies.

13.1 Valuing Stock Options : The Black-Scholes-Merton Model Chapter 13.

The Black-Scholes-Merton Model Chapter 13 Options, Futures, and Other Derivatives, 7th International Edition, Copyright © John C. Hull

FIN 614: Financial Management Larry Schrenk, Instructor.

Valuing Stock Options:The Black-Scholes Model

Daucus carrota Professor André Farber Solvay Business School Université Libre de Bruxelles.

3- 1 Outline 3: Risk, Return, and Cost of Capital 3.1 Rates of Return 3.2 Measuring Risk 3.3 Risk & Diversification 3.4 Measuring Market Risk 3.5 Portfolio.

FIN 350: lecture 9 Risk, returns and WACC CAPM and the capital budgeting.

 Hedge Funds. The Name  Act as hedging mechanism  Investing can hedge against something else  Typically do well in bull or bear market.

Chapter 14 The Black-Scholes-Merton Model

Learning Objectives LO 1: Explain the basic characteristics and terminology of options. LO 2: Determine the intrinsic value of options at expiration date.

Capital Structure Theory (1)

Introduction to Binomial Trees

The Black-Scholes-Merton Model

Chapter 15 The Black-Scholes-Merton Model

Valuing Stock Options: The Black-Scholes-Merton Model

Applied Finance Lectures

Daucus carrota Professor André Farber Solvay Business School

LO 5-1 Compute various measures of return on multi-year investments.

Chapter 15 The Black-Scholes-Merton Model

Théorie Financière Financial Options

Microfoundations of Financial Economics

Théorie Financière Financial Options

Presentation transcript:

Applied Finance Lectures 1. What is finance? 2. The diffusion of the discounted cash flow method 3. Markowitz and the birth of modern portfolio theory 4. CAPM: the relationship between expected returns and risk 5. The Efficient Market Hypothesis: do stock prices move randomly? 6. Modigliani-Miller: does financing matter? 7. Black – Merton – Scholes: how to value options 8. Beyond Black-Merton-Scholes: state prices, stochastic discount factors

What is Finance? Equity Debt Investors Dividends Companies Interests Operating cash flow Capital expenditures Portfolio management

Asset pricing models Time Uncertainty Discounted cash flow method Capital Asset Pricing Model Markowitz Sharpe Lintner Option Pricing Models Black Scholes Cox Ross Rubinstein State Prices Arrow-Debreu Stochastic discount factors

Outline 1. What is finance? 2. The diffusion of the discounted cash flow method 3. Markowitz and the birth of modern portfolio theory 4. CAPM: the relationship between expected returns and risk 5. The Efficient Market Hypothesis: do stock prices move randomly? 6. Modigliani-Miller: does financing matter? 7. Black – Merton – Scholes: how to value options 8. Beyond Black-Merton-Scholes: state prices, stochastic discount factors

Discounted cash flow method Cash flows Required rates of return PV = C 1 v 1 + C 2 v 2 + …+C n v n

Penetration rate of discount cash flow Callahan, C. and S. Haka, A Model and Test of Interfirm Innovation Diffusion: the Case of Discounted Cash Flow Techniques, Manuscript January 2002

Outline 1. What is finance? 2. The diffusion of the discounted cash flow method 3. Markowitz and the birth of modern portfolio theory 4. CAPM: the relationship between expected returns and risk 5. The Efficient Market Hypothesis: do stock prices move randomly? 6. Modigliani-Miller: does financing matter? 7. Black – Merton – Scholes: how to value options 8. Beyond Black-Merton-Scholes: state prices, stochastic discount factors

Markowitz (1952) Portfolio selection Return of portfolio: normal distribution Characteristics of a portfolio: 1.Expected return 2.Risk: Variance/Standard deviation

Calculation of optimal portfolio

Markowitz: the birth of modern portfolio theory

Outline 1. What is finance? 2. The diffusion of the discounted cash flow method 3. Markowitz and the birth of modern portfolio theory 4. CAPM: the relationship between expected returns and risk 5. The Efficient Market Hypothesis: do stock prices move randomly? 6. Modigliani-Miller: does financing matter? 7. Black – Merton – Scholes: how to value options

Capital Asset Pricing Model

Expected return Beta Risk free interest rate r rMrM 1 β

Net Present Value Calculation with CAPM

Outline 1. What is finance? 2. The diffusion of the discounted cash flow method 3. Markowitz and the birth of modern portfolio theory 4. CAPM: the relationship between expected returns and risk 5. The Efficient Market Hypothesis: do stock prices move randomly? 6. Modigliani-Miller: does financing matter? 7. Black – Merton – Scholes: how to value options 8. Beyond Black-Merton-Scholes: state prices, stochastic discount factors

Jensen Distribution of “t” values for excess return 115 mutual funds Not significantly different from 0

US Equity Mutual Funds (Malkiel, Journal of Finance June 1995) Average Annual Return Capital appreciation funds 16.32% Growth funds15.81% Small company growth funds13.46% Growth and income funds15.97% Equity income funds15.66% S&P 500 Index17.52% Average deviation from benchmark -3.20% (risk adjusted)

The Efficient Market Hypothesis S&P

The Efficient Market Hypothesis S&P

The Random Walk Model

Outline 1. What is finance? 2. The diffusion of the discounted cash flow method 3. Markowitz and the birth of modern portfolio theory 4. CAPM: the relationship between expected returns and risk 5. The Efficient Market Hypothesis: do stock prices move randomly? 6. Modigliani-Miller: does financing matter? 7. Black – Merton – Scholes: how to value options 8. Beyond Black-Merton-Scholes: state prices, stochastic discount factors

Does the capital structure matters? Modigliani Miller 1958 : NO, under some conditions Debt Equity

Trade-off theory Market value Debt ratio Value of all-equity firm PV(Tax Shield) PV(Costs of financial distress)

Outline 1. What is finance? 2. The diffusion of the discounted cash flow method 3. Markowitz and the birth of modern portfolio theory 4. CAPM: the relationship between expected returns and risk 5. The Efficient Market Hypothesis: do stock prices move randomly? 6. Modigliani-Miller: does financing matter? 7. Black – Merton – Scholes: how to value options 8. Beyond Black-Merton-Scholes: state prices, stochastic discount factors

Options Right to: Buy (CALL) Sell (PUT) an asset at a fixed price (EXERCICE PRICE / STRIKING PRICE) up to or at a future date (MATURITY) at a future date (EUROPEAN OPTION) up to a future date (AMERICAN OPTION)

Buy 1 Fortis share

Buying a put Put Stock Stock + Put

Buying a call Call Bond Bond + Call

How to value an option Standard present value calculation fails Value of option = f(Stock price, Time) Required rate of return = f(Stock price, Time) Black Merton Scholes Combine stock and option to create a riskless position Law of one price (no arbitrage) f=(#shares)(Stockprice)+Bond

The fundamental partial differential equation Assume we are in a risk neutral world Expected change of the value of derivative security Change of the value with respect to time Change of the value with respect to the price of the underlying asset Change of the value with respect to volatility

And now, the Black Scholes formulas Closed form solutions for European options on non dividend paying stocks assuming: Constant volatility Constant risk-free interest rate Call option: Put option: N(x) = cumulative probability distribution function for a standardized normal variable

Binomial option pricing model Stock price S Stock price S u Option f u Stock price S d Option f d Time interval Δt Risk neutral probability Risk free interest rate

Outline 1. What is finance? 2. The diffusion of the discounted cash flow method 3. Markowitz and the birth of modern portfolio theory 4. CAPM: the relationship between expected returns and risk 5. The Efficient Market Hypothesis: do stock prices move randomly? 6. Modigliani-Miller: does financing matter? 7. Black – Merton – Scholes: how to value options 8. Beyond Black-Merton-Scholes: state prices, stochastic discount factors

State prices Current price State UpDown StockSSuSu SdSd Risk free bond11+rΔt Law of one price (no free lunches) Price of a digital option

Stochastic discount factors Valuing a derivative: Expectation operator Stochastic discount factor Random payoff of derivative

Growth of derivative industry

Explosion of the market for options