1. 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

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

3. 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

4. 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

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

6. 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

7. 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

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

9. Calculation of optimal portfolio

10. Markowitz: the birth of modern portfolio theory

11. 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

12. Capital Asset Pricing Model

13. Expected return Beta Risk free interest rate r rMrM 1 β

14. Net Present Value Calculation with CAPM

15. 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

16. Jensen 1968 - Distribution of “t” values for excess return 115 mutual funds 1955-1964 Not significantly different from 0

17. US Equity Mutual Funds 1982-1991 (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)

18. The Efficient Market Hypothesis S&P 500 2000-2004

19. The Efficient Market Hypothesis S&P 500 2000-2004

20. The Random Walk Model

21. 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

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

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

24. 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

25. 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)

26. Buy 1 Fortis share

27. Buying a put Put Stock Stock + Put

28. Buying a call Call Bond Bond + Call

29. 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

30. 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

31. 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

32. 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

33. 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

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

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

36. Growth of derivative industry

37. Explosion of the market for options