Chapter 11 Return and Risk: The Capital Asset Pricing Model McGraw-Hill/Irwin Copyright © 2010 by the McGraw-Hill Companies, Inc. All rights reserved. Key Concepts and Skills Know how to calculate expected returns Know how to calculate covariances, correlations, and betas Understand the impact of diversification Understand the systematic risk principle Understand the security market line Understand the risk-return tradeoff Be able to use the Capital Asset Pricing Model 11-1 Chapter Outline 11.1 Individual Securities 11.2 Expected Return, Variance, and Covariance 11.3 The Return and Risk for Portfolios 11.4 The Efficient Set for Two Assets 11.5 The Efficient Set for Many Assets 11.6 Diversification 11.7 Riskless Borrowing and Lending 11.8 Market Equilibrium 11.9 Relationship between Risk and Expected Return (CAPM) 11-2 11.1 Individual Securities The characteristics of individual securities that are of interest are the: Expected Return Variance and Standard Deviation Covariance and Correlation (to another security or index) 11-3 11.2 Expected Return, Variance, and Covariance Consider the following two risky asset world. There is a 1/3 chance of each state of the economy, and the only assets are a stock fund and a bond fund. Scenario Recession Normal Boom Rate of Return Probability Stock Fund Bond Fund 33.3% -7% 17% 33.3% 12% 7% 33.3% 28% -3% 11-4 Expected Return Scenario Recession Normal Boom Expected return Variance Standard Deviation Stock Fund Rate of Squared Return Deviation -7% 0.0324 12% 0.0001 28% 0.0289 11.00% 0.0205 14.3% Bond Rate of Return 17% 7% -3% 7.00% 0.0067 8.2% Fund Squared Deviation 0.0100 0.0000 0.0100 11-5 Expected Return Scenario Recession Normal Boom Expected return Variance Standard Deviation Stock Fund Rate of Squared Return Deviation -7% 0.0324 12% 0.0001 28% 0.0289 11.00% 0.0205 14.3% Bond Fund Rate of Squared Return Deviation 17% 0.0100 7% 0.0000 -3% 0.0100 7.00% 0.0067 8.2% E (rS ) 1 (7%) 1 (12%) 1 (28%) 3 3 3 E (rS ) 11% 11-6 Variance Scenario Recession Normal Boom Expected return Variance Standard Deviation Stock Fund Rate of Squared Return Deviation -7% 0.0324 12% 0.0001 28% 0.0289 11.00% 0.0205 14.3% Bond Fund Rate of Squared Return Deviation 17% 0.0100 7% 0.0000 -3% 0.0100 7.00% 0.0067 8.2% (7% 11%) .0324 2 11-7 Variance Scenario Recession Normal Boom Expected return Variance Standard Deviation Stock Fund Rate of Squared Return Deviation -7% 0.0324 12% 0.0001 28% 0.0289 11.00% 0.0205 14.3% Bond Fund Rate of Squared Return Deviation 17% 0.0100 7% 0.0000 -3% 0.0100 7.00% 0.0067 8.2% 1 .0205 (.0324 .0001 .0289) 3 11-8 Standard Deviation Scenario Recession Normal Boom Expected return Variance Standard Deviation Stock Fund Rate of Squared Return Deviation -7% 0.0324 12% 0.0001 28% 0.0289 11.00% 0.0205 14.3% Bond Fund Rate of Squared Return Deviation 17% 0.0100 7% 0.0000 -3% 0.0100 7.00% 0.0067 8.2% 14.3% 0.0205 11-9 Covariance Scenario Recession Normal Boom Sum Covariance Stock Bond Deviation Deviation -18% 10% 1% 0% 17% -10% Product -0.0180 0.0000 -0.0170 Weighted -0.0060 0.0000 -0.0057 -0.0117 -0.0117 “Deviation” compares return in each state to the expected return. “Weighted” takes the product of the deviations multiplied by the probability of that state. 11-10 Correlation Cov(a, b) a b .0117 0.998 (.143)(.082) 11-11 11.3 The Return and Risk for Portfolios Scenario Recession Normal Boom Expected return Variance Standard Deviation Stock Fund Rate of Squared Return Deviation -7% 0.0324 12% 0.0001 28% 0.0289 11.00% 0.0205 14.3% Bond Fund Rate of Squared Return Deviation 17% 0.0100 7% 0.0000 -3% 0.0100 7.00% 0.0067 8.2% Note that stocks have a higher expected return than bonds and higher risk. Let us turn now to the risk-return tradeoff of a portfolio that is 50% invested in bonds and 50% invested in stocks. 11-12 Portfolios Rate of Return Stock fund Bond fund Portfolio -7% 17% 5.0% 12% 7% 9.5% 28% -3% 12.5% Scenario Recession Normal Boom Expected return Variance Standard Deviation 11.00% 0.0205 14.31% 7.00% 0.0067 8.16% squared deviation 0.0016 0.0000 0.0012 9.0% 0.0010 3.08% The rate of return on the portfolio is a weighted average of the returns on the stocks and bonds in the portfolio: rP wB rB wS rS 5% 50% (7%) 50% (17%) 11-13 Portfolios Rate of Return Stock fund Bond fund Portfolio -7% 17% 5.0% 12% 7% 9.5% 28% -3% 12.5% Scenario Recession Normal Boom Expected return Variance Standard Deviation 11.00% 0.0205 14.31% 7.00% 0.0067 8.16% squared deviation 0.0016 0.0000 0.0012 9.0% 0.0010 3.08% The expected rate of return on the portfolio is a weighted average of the expected returns on the securities in the portfolio. E (rP ) wB E (rB ) wS E (rS ) 9% 50% (11%) 50% (7%) 11-14 Portfolios Scenario Recession Normal Boom Expected return Variance Standard Deviation Rate of Return Stock fund Bond fund Portfolio -7% 17% 5.0% 12% 7% 9.5% 28% -3% 12.5% 11.00% 0.0205 14.31% 7.00% 0.0067 8.16% squared deviation 0.0016 0.0000 0.0012 9.0% 0.0010 3.08% The variance of the rate of return on the two risky assets portfolio is σ P2 (wB σ B )2 (wS σ S )2 2(wB σ B )(wS σ S )ρ BS where BS is the correlation coefficient between the returns on the stock and bond funds. 11-15 Portfolios Scenario Recession Normal Boom Expected return Variance Standard Deviation Rate of Return Stock fund Bond fund Portfolio -7% 17% 5.0% 12% 7% 9.5% 28% -3% 12.5% 11.00% 0.0205 14.31% 7.00% 0.0067 8.16% squared deviation 0.0016 0.0000 0.0012 9.0% 0.0010 3.08% Observe the decrease in risk that diversification offers. An equally weighted portfolio (50% in stocks and 50% in bonds) has less risk than either stocks or bonds held in isolation. 11-16 11.4 The Efficient Set for Two Assets Risk Return 0% 5% 10% 15% 20% 25% 30% 35% 40% 45% 50.00% 55% 60% 65% 70% 75% 80% 85% 90% 95% 100% 8.2% 7.0% 5.9% 4.8% 3.7% 2.6% 1.4% 0.4% 0.9% 2.0% 3.08% 4.2% 5.3% 6.4% 7.6% 8.7% 9.8% 10.9% 12.1% 13.2% 14.3% 7.0% 7.2% 7.4% 7.6% 7.8% 8.0% 8.2% 8.4% 8.6% 8.8% 9.00% 9.2% 9.4% 9.6% 9.8% 10.0% 10.2% 10.4% 10.6% 10.8% 11.0% Portfolo Risk and Return Combinations Portfolio Return % in stocks 12.0% 11.0% 10.0% 9.0% 8.0% 7.0% 6.0% 5.0% 0.0% 100% stocks 100% bonds 5.0% 10.0% 15.0% 20.0% Portfolio Risk (standard deviation) We can consider other portfolio weights besides 50% in stocks and 50% in bonds. 11-17 % in stocks Risk Return 0% 5% 10% 15% 20% 25% 30% 35% 40% 45% 50% 55% 60% 65% 70% 75% 80% 85% 90% 95% 100% 8.2% 7.0% 5.9% 4.8% 3.7% 2.6% 1.4% 0.4% 0.9% 2.0% 3.1% 4.2% 5.3% 6.4% 7.6% 8.7% 9.8% 10.9% 12.1% 13.2% 14.3% 7.0% 7.2% 7.4% 7.6% 7.8% 8.0% 8.2% 8.4% 8.6% 8.8% 9.0% 9.2% 9.4% 9.6% 9.8% 10.0% 10.2% 10.4% 10.6% 10.8% 11.0% Portfolio Return The Efficient Set for Two Assets Portfolo Risk and Return Combinations 12.0% 11.0% 100% stocks 10.0% 9.0% 8.0% 7.0% 100% bonds 6.0% 5.0% 0.0% 2.0% 4.0% 6.0% 8.0% 10.0% 12.0% 14.0% 16.0% Portfolio Risk (standard deviation) Note that some portfolios are “better” than others. They have higher returns for the same level of risk or less. 11-18 retur n Portfolios with Various Correlations 100% stocks = -1.0 100% bonds = 1.0 = 0.2 Relationship depends on correlation coefficient -1.0 < < +1.0 If = +1.0, no risk reduction is possible If = –1.0, complete risk reduction is possible 11-19 return 11.5 The Efficient Set for Many Securities Individual Assets P Consider a world with many risky assets; we can still identify the opportunity set of riskreturn combinations of various portfolios. 11-20 return The Efficient Set for Many Securities minimum variance portfolio Individual Assets P The section of the opportunity set above the minimum variance portfolio is the efficient frontier. 11-21 Announcements, Surprises, and Expected Returns The return on any security consists of two parts. First, the expected returns Second, the unexpected or risky returns A way to write the return on a stock in the coming month is: R R U where R is the expected part of the return U is the unexpected part of the return 11-22 Announcements, Surprises, and Expected Returns Any announcement can be broken down into two parts, the anticipated (or expected) part and the surprise (or innovation): Announcement = Expected part + Surprise. The expected part of any announcement is the part of the information the market uses to form the expectation, R, of the return on the stock. The surprise is the news that influences the unanticipated return on the stock, U. 11-23 Diversification and Portfolio Risk Diversification can substantially reduce the variability of returns without an equivalent reduction in expected returns. This reduction in risk arises because worse than expected returns from one asset are offset by better than expected returns from another. However, there is a minimum level of risk that cannot be diversified away, and that is the systematic portion. 11-24 Portfolio Risk and Number of Stocks In a large portfolio the variance terms are effectively diversified away, but the covariance terms are not. Diversifiable Risk; Nonsystematic Risk; Firm Specific Risk; Unique Risk Portfolio risk Nondiversifiable risk; Systematic Risk; Market Risk n 11-25 Risk: Systematic and Unsystematic A systematic risk is any risk that affects a large number of assets, each to a greater or lesser degree. An unsystematic risk is a risk that specifically affects a single asset or small group of assets. Unsystematic risk can be diversified away. Examples of systematic risk include uncertainty about general economic conditions, such as GNP, interest rates or inflation. On the other hand, announcements specific to a single company are examples of unsystematic risk. 11-26 Total Risk Total risk = systematic risk + unsystematic risk The standard deviation of returns is a measure of total risk. For well-diversified portfolios, unsystematic risk is very small. Consequently, the total risk for a diversified portfolio is essentially equivalent to the systematic risk. 11-27 return Optimal Portfolio with a Risk-Free Asset 100% stocks rf 100% bonds In addition to stocks and bonds, consider a world that also has risk-free securities like T-bills. 11-28 return 11.7 Riskless Borrowing and Lending 100% stocks Balanced fund rf 100% bonds Now investors can allocate their money across the T-bills and a balanced mutual fund. 11-29 return Riskless Borrowing and Lending rf P With a risk-free asset available and the efficient frontier identified, we choose the capital allocation line with the steepest slope. 11-30 return 11.8 Market Equilibrium M rf P With the capital allocation line identified, all investors choose a point along the line—some combination of the risk-free asset and the market portfolio M. In a world with homogeneous expectations, M is the same for all investors. 11-31 return Market Equilibrium 100% stocks Balanced fund rf 100% bonds Where the investor chooses along the Capital Market Line depends on her risk tolerance. The big point is that all investors have the same CML. 11-32 Risk When Holding the Market Portfolio Researchers have shown that the best measure of the risk of a security in a large portfolio is the beta (b)of the security. Beta measures the responsiveness of a security to movements in the market portfolio (i.e., systematic risk). bi Cov( Ri , RM ) ( RM ) 2 11-33 Security Returns Estimating b with Regression Slope = bi Return on market % Ri = a i + biRm + ei 11-34 The Formula for Beta ( Ri ) bi 2 ( RM ) ( RM ) Cov( Ri , RM ) Clearly, your estimate of beta will depend upon your choice of a proxy for the market portfolio. 11-35 11.9 Relationship between Risk and Expected Return (CAPM) Expected Return on the Market: R M RF Market Risk Premium • Expected return on an individual security: Ri RF βi ( R M RF ) Market Risk Premium This applies to individual securities held within welldiversified portfolios. 11-36 Expected Return on a Security This formula is called the Capital Asset Pricing Model (CAPM): Ri RF βi ( R M RF ) Expected return on a security RiskBeta of the = + × free rate security Market risk premium • Assume bi = 0, then the expected return is RF. • Assume bi = 1, then Ri R M 11-37 Expected return Relationship Between Risk & Return Ri RF βi ( R M RF ) RM RF 1.0 b 11-38 Expected return Relationship Between Risk & Return 13.5% 3% 1.5 β i 1.5 RF 3% b R M 10% R i 3% 1.5 (10% 3%) 13.5% 11-39 Quick Quiz How do you compute the expected return and standard deviation for an individual asset? For a portfolio? What is the difference between systematic and unsystematic risk? What type of risk is relevant for determining the expected return? Consider an asset with a beta of 1.2, a risk-free rate of 5%, and a market return of 13%. What is the expected return on the asset? 11-40