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U6-1 UNIT 6 Risk and Return and Stock Valuation Risk return tradeoff Diversifiable risk vs. market risk Risk and return: CAPM/SML Stock valuation: constant,

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Presentation on theme: "U6-1 UNIT 6 Risk and Return and Stock Valuation Risk return tradeoff Diversifiable risk vs. market risk Risk and return: CAPM/SML Stock valuation: constant,"— Presentation transcript:

1 U6-1 UNIT 6 Risk and Return and Stock Valuation Risk return tradeoff Diversifiable risk vs. market risk Risk and return: CAPM/SML Stock valuation: constant, nonconstant, and zero growth

2 U6-2 Investment alternatives EconomyProb.T-BillHTCollUSRMP Recession 0.15.5%-27.0%27.0% 6.0%-17.0% Below avg 0.25.5%-7.0%13.0%-14.0%-3.0% Average 0.45.5%15.0%0.0%3.0%10.0% Above avg 0.25.5%30.0%-11.0%41.0%25.0% Boom 0.15.5%45.0%-21.0%26.0%38.0%

3 U6-3 Calculating the expected return

4 U6-4 Summary of expected returns Expected return HT 12.4% Market 10.5% USR 9.8% T-bill 5.5% Coll. 1.0% HT has the highest expected return, and appears to be the best investment alternative, but is it really? Have we failed to account for risk?

5 U6-5 Calculating standard deviation

6 U6-6 Standard deviation for each investment

7 U6-7 Comparing standard deviations USR Prob. T - bill HT 0 5.5 9.8 12.4 Rate of Return (%)

8 U6-8 Comments on standard deviation as a measure of risk Standard deviation (σ i ) measures total, or stand-alone, risk. The larger σ i is, the lower the probability that actual returns will be closer to expected returns. Larger σ i is associated with a wider probability distribution of returns.

9 U6-9 Comparing risk and return SecurityExpected return, r Risk, σ T-bills5.5%0.0% HT12.4%20.0% Coll*1.0%13.2% USR* 9.8%18.8% Market10.5%15.2% * Seem out of place. ^

10 U6-10 Coefficient of Variation (CV) A standardized measure of dispersion about the expected value, that shows the risk per unit of return.

11 U6-11 Risk rankings, by coefficient of variation CV T-bill 0.0 HT 1.6 Coll. 13.2 USR 1.9 Market 1.4 Collections has the highest degree of risk per unit of return. HT, despite having the highest standard deviation of returns, has a relatively average CV.

12 U6-12 Illustrating the CV as a measure of relative risk σ A = σ B, but A is riskier because of a larger probability of losses. In other words, the same amount of risk (as measured by σ) for smaller returns. 0 AB Rate of Return (%) Prob.

13 U6-13 Investor attitude towards risk Risk aversion – assumes investors dislike risk and require higher rates of return to encourage them to hold riskier securities. Risk premium – the difference between the return on a risky asset and a riskless asset, which serves as compensation for investors to hold riskier securities.

14 U6-14 Portfolio construction: Risk and return Assume a two-stock portfolio is created with $50,000 invested in both HT and Collections. A portfolio’s expected return is a weighted average of the returns of the portfolio’s component assets. Standard deviation is a little more tricky and requires that a new probability distribution for the portfolio returns be devised.

15 U6-15 Calculating portfolio expected return

16 U6-16 Calculating portfolio standard deviation and CV

17 U6-17 Comments on portfolio risk measures σ p = 3.4% is much lower than the σ i of either stock (σ HT = 20.0%; σ Coll. = 13.2%). σ p = 3.4% is lower than the weighted average of HT and Coll.’s σ (16.6%). Therefore, the portfolio provides the average return of component stocks, but lower than the average risk. Why? Negative correlation between stocks.

18 U6-18 General comments about risk σ  35% for an average stock. Most stocks are positively (though not perfectly) correlated with the market (i.e., ρ between 0 and 1). Combining stocks in a portfolio generally lowers risk.

19 U6-19 Creating a portfolio: Beginning with one stock and adding randomly selected stocks to portfolio σ p decreases as stocks added, because they would not be perfectly correlated with the existing portfolio. Expected return of the portfolio would remain relatively constant. Eventually the diversification benefits of adding more stocks dissipates (after about 10 stocks), and for large stock portfolios, σ p tends to converge to  20%.

20 U6-20 Breaking down sources of risk Stand-alone risk = Market risk + Diversifiable risk Market risk – portion of a security’s stand-alone risk that cannot be eliminated through diversification. Measured by beta. Diversifiable risk – portion of a security’s stand-alone risk that can be eliminated through proper diversification.

21 U6-21 Capital Asset Pricing Model (CAPM) Model linking risk and required returns. CAPM suggests that there is a Security Market Line (SML) that states that a stock’s required return equals the risk-free return plus a risk premium that reflects the stock’s risk after diversification. r i = r RF + (r M – r RF ) b i Primary conclusion: The relevant riskiness of a stock is its contribution to the riskiness of a well- diversified portfolio.

22 U6-22 Beta Measures a stock’s market risk, and shows a stock’s volatility relative to the market. Indicates how risky a stock is if the stock is held in a well-diversified portfolio.

23 U6-23 Comments on beta If beta = 1.0, the security is just as risky as the average stock. If beta > 1.0, the security is riskier than average. If beta < 1.0, the security is less risky than average. Most stocks have betas in the range of 0.5 to 1.5.

24 U6-24 Can the beta of a security be negative? Yes, if the correlation between Stock i and the market is negative (i.e., ρ i,m < 0). If the correlation is negative, the regression line would slope downward, and the beta would be negative. However, a negative beta is highly unlikely.

25 U6-25 Comparing expected returns and beta coefficients Security Expected Return Beta HT 12.4% 1.32 Market 10.5 1.00 USR 9.8 0.88 T-Bills 5.5 0.00 Coll. 1.0-0.87 Riskier securities have higher returns, so the rank order is OK.

26 U6-26 The Security Market Line (SML): Calculating required rates of return SML: r i = r RF + (r M – r RF ) b i r i = r RF + (RP M ) b i Assume the yield curve is flat and that r RF = 5.5% and RP M = 5.0%.

27 U6-27 Calculating required rates of return r HT = 5.5% + (5.0%)(1.32) = 5.5% + 6.6%= 12.10% r M = 5.5% + (5.0%)(1.00)= 10.50% r USR = 5.5% + (5.0%)(0.88)= 9.90% r T-bill = 5.5% + (5.0%)(0.00)= 5.50% r Coll = 5.5% + (5.0%)(-0.87)= 1.15%

28 U6-28 Expected vs. Required returns

29 U6-29 Illustrating the Security Market Line.. Coll.. HT T-bills. USR SML r M = 10.5 r RF = 5.5 -1 0 1 2. SML: r i = 5.5% + (5.0%) b i r i (%) Risk, b i

30 U6-30 An example: Equally-weighted two-stock portfolio Create a portfolio with 50% invested in HT and 50% invested in Collections. The beta of a portfolio is the weighted average of each of the stock’s betas. b P = w HT b HT + w Coll b Coll b P = 0.5 (1.32) + 0.5 (-0.87) b P = 0.225

31 U6-31 Calculating portfolio required returns The required return of a portfolio is the weighted average of each of the stock’s required returns. r P = w HT r HT + w Coll r Coll r P = 0.5 (12.10%) + 0.5 (1.15%) r P = 6.63% Or, using the portfolio’s beta, CAPM can be used to solve for expected return. r P = r RF + (RP M ) b P r P = 5.5% + (5.0%) (0.225) r P = 6.63%

32 U6-32 Factors that change the SML What if investors raise inflation expectations by 3%, what would happen to the SML? SML 1 r i (%) SML 2 0 0.5 1.01.5 13.5 10.5 8.5 5.5  I = 3% Risk, b i

33 U6-33 Factors that change the SML What if investors’ risk aversion increased, causing the market risk premium to increase by 3%, what would happen to the SML? SML 1 r i (%) SML 2 0 0.5 1.01.5 13.5 10.5 5.5  RP M = 3% Risk, b i

34 U6-34 Intrinsic Value and Stock Price Outside investors, corporate insiders, and analysts use a variety of approaches to estimate a stock’s intrinsic value (P 0 ). In equilibrium we assume that a stock’s price equals its intrinsic value. Outsiders estimate intrinsic value to help determine which stocks are attractive to buy and/or sell. Stocks with a price below (above) its intrinsic value are undervalued (overvalued).

35 U6-35 Dividend growth model Value of a stock is the present value of the future dividends expected to be generated by the stock.

36 U6-36 Constant growth stock A stock whose dividends are expected to grow forever at a constant rate, g. D 1 = D 0 (1+g) 1 D 2 = D 0 (1+g) 2 D t = D 0 (1+g) t If g is constant, the dividend growth formula converges to:

37 U6-37 Future dividends and their present values $ 0.25 Years (t) 0

38 U6-38 What happens if g > r s ? If g > r s, the constant growth formula leads to a negative stock price, which does not make sense. The constant growth model can only be used if: r s > g g is expected to be constant forever

39 U6-39 If r RF = 7%, r M = 12%, and b = 1.2, what is the required rate of return on the firm’s stock? Use the SML to calculate the required rate of return (r s ): r s = r RF + (r M – r RF )b = 7% + (12% - 7%)1.2 = 13%

40 U6-40 If D 0 = $2 and g is a constant 6%, find the expected dividend stream for the next 3 years, and their PVs. 1.8761 1.7599 D 0 = 2.00 1.6509 r s = 13% g = 6% 01 2.247 2 2.382 3 2.12

41 U6-41 What is the stock’s intrinsic value? Using the constant growth model:

42 U6-42 What is the expected market price of the stock, one year from now? D 1 will have been paid out already. So, P 1 is the present value (as of year 1) of D 2, D 3, D 4, etc. Could also find expected P 1 as:

43 U6-43 What are the expected dividend yield, capital gains yield, and total return during the first year? Dividend yield = D 1 / P 0 = $2.12 / $30.29 = 7.0% Capital gains yield = (P 1 – P 0 ) / P 0 = ($32.10 - $30.29) / $30.29 = 6.0% Total return (r s ) = Dividend Yield + Capital Gains Yield = 7.0% + 6.0% = 13.0%

44 U6-44 What would the expected price today be, if g = 0? The dividend stream would be a perpetuity. 2.00 0123 r s = 13%...

45 U6-45 Supernormal growth: What if g = 30% for 3 years before achieving long-run growth of 6%? Can no longer use just the constant growth model to find stock value. However, the growth does become constant after 3 years.

46 U6-46 Valuing common stock with nonconstant growth r s = 13% g = 30% g = 6%  P  0.06 $66.54 3 4.658 0.13   2.301 2.647 3.045 46.114 54.107 = P 0 ^ 01234 D 0 = 2.00 2.600 3.380 4.394... 4.658

47 U6-47 If the stock was expected to have negative growth (g = -6%), would anyone buy the stock, and what is its value? The firm still has earnings and pays dividends, even though they may be declining, they still have value.

48 U6-48 What is market equilibrium? In equilibrium, stock prices are stable and there is no general tendency for people to buy versus to sell. In equilibrium, two conditions hold: The current market stock price equals its intrinsic value (P 0 = P 0 ). Expected returns must equal required returns. ^


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