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Chapter McGraw-Hill/Irwin Copyright © 2008 by The McGraw-Hill Companies, Inc. All rights reserved. 11 Diversification and Risky Asset Allocation.

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Presentation on theme: "Chapter McGraw-Hill/Irwin Copyright © 2008 by The McGraw-Hill Companies, Inc. All rights reserved. 11 Diversification and Risky Asset Allocation."— Presentation transcript:

1 Chapter McGraw-Hill/Irwin Copyright © 2008 by The McGraw-Hill Companies, Inc. All rights reserved. 11 Diversification and Risky Asset Allocation

2 11-2 Diversification Intuitively, we all know that if you hold many investments Through time, some will increase in value Through time, some will decrease in value It is unlikely that their values will all change in the same way Diversification has a profound effect on portfolio return and portfolio risk. But, exactly how does diversification work?

3 11-3 Diversification and Asset Allocation Our goal in this chapter is to examine the role of diversification and asset allocation in investing. In the early 1950s, professor Harry Markowitz was the first to examine the role and impact of diversification. Based on his work, we will see how diversification works, and we can be sure that we have “efficiently diversified portfolios.” –An efficiently diversified portfolio is one that has the highest expected return, given its risk. –You must be aware that diversification concerns expected returns.

4 11-4 Expected Returns, I. Expected return is the “weighted average” return on a risky asset, from today to some future date. The formula is: To calculate an expected return, you must first: –Decide on the number of possible economic scenarios that might occur. –Estimate how well the security will perform in each scenario, and –Assign a probability to each scenario –(BTW, finance professors call these economic scenarios, “states.”) The next slide shows how the expected return formula is used when there are two states. –Note that the “states” are equally likely to occur in this example. –BUT! They do not have to be equally likely--they can have different probabilities of occurring.

5 11-5 Expected Return, II. Suppose: –There are two stocks: Starcents Jpod –We are looking at a period of one year. Investors agree that the expected return: –for Starcents is 25 percent –for Jpod is 20 percent Why would anyone want to hold Jpod shares when Starcents is expected to have a higher return?

6 11-6 Expected Return, III. The answer depends on risk Starcents is expected to return 25 percent But the realized return on Starcents could be significantly higher or lower than 25 percent Similarly, the realized return on Jpod could be significantly higher or lower than 20 percent.

7 11-7 Calculating Expected Returns

8 11-8 Expected Risk Premium Recall: Suppose riskfree investments have an 8% return. If so, –the expected risk premium on Jpod is 12% –The expected risk premium on Starcents is 17% This expected risk premium is simply the difference between –the expected return on the risky asset in question and –the certain return on a risk-free investment

9 11-9 Calculating the Variance of Expected Returns The variance of expected returns is calculated using this formula: This formula is not as difficult as it appears. This formula says is to add up the squared deviations of each return from its expected return after it has been multiplied by the probability of observing a particular economic state (denoted by “s”). The standard deviation is simply the square root of the variance.

10 11-10 Example: Calculating Expected Returns and Variances: Equal State Probabilities Note that the second spreadsheet is only for Starcents. What would you get for Jpod?

11 11-11 Expected Returns and Variances, Starcents and Jpod

12 11-12 Portfolios Portfolios are groups of assets, such as stocks and bonds, that are held by an investor. One convenient way to describe a portfolio is by listing the proportion of the total value of the portfolio that is invested into each asset. These proportions are called portfolio weights. –Portfolio weights are sometimes expressed in percentages. –However, in calculations, make sure you use proportions (i.e., decimals).

13 11-13 Portfolios: Expected Returns The expected return on a portfolio is a linear combination, or weighted average, of the expected returns on the assets in that portfolio. The formula, for “n” assets, is: In the formula: E(R P ) = expected portfolio return w i = portfolio weight in portfolio asset i E(R i ) = expected return for portfolio asset i

14 11-14 Example: Calculating Portfolio Expected Returns Note that the portfolio weight in Jpod = 1 – portfolio weight in Starcents.

15 11-15 Variance of Portfolio Expected Returns Note: Unlike returns, portfolio variance is generally not a simple weighted average of the variances of the assets in the portfolio. If there are “n” states, the formula is: In the formula, VAR(R P ) = variance of portfolio expected return p s = probability of state of economy, s E(R p,s ) = expected portfolio return in state s E(R p ) = portfolio expected return Note that the formula is like the formula for the variance of the expected return of a single asset.

16 11-16 Example: Calculating Variance of Portfolio Expected Returns It is possible to construct a portfolio of risky assets with zero portfolio variance! What? How? (Open this spreadsheet, scroll up, and set the weight in Starcents to 2/11ths.) What happens when you use.40 as the weight in Starcents?

17 11-17 Diversification and Risk, I.

18 11-18 Diversification and Risk, II.

19 11-19 Why Diversification Works, I. Correlation: The tendency of the returns on two assets to move together. Imperfect correlation is the key reason why diversification reduces portfolio risk as measured by the portfolio standard deviation. Positively correlated assets tend to move up and down together. Negatively correlated assets tend to move in opposite directions. Imperfect correlation, positive or negative, is why diversification reduces portfolio risk.

20 11-20 Why Diversification Works, II. The correlation coefficient is denoted by Corr(R A, R B ) or simply,  A,B. The correlation coefficient measures correlation and ranges from: From:(perfect negative correlation) Through:0(uncorrelated) To:+1(perfect positive correlation)

21 11-21 Why Diversification Works, III.

22 11-22 Why Diversification Works, IV.

23 11-23 Why Diversification Works, V.

24 11-24 Calculating Portfolio Risk For a portfolio of two assets, A and B, the variance of the return on the portfolio is: Where: x A = portfolio weight of asset A x B = portfolio weight of asset B such that x A + x B = 1. (Important: Recall Correlation Definition!)

25 11-25 The Importance of Asset Allocation, Part 1. Suppose that as a very conservative, risk-averse investor, you decide to invest all of your money in a bond mutual fund. Very conservative, indeed? Uh, is this decision a wise one?

26 11-26 Correlation and Diversification, I.

27 11-27 Correlation and Diversification, II.

28 11-28 Correlation and Diversification, III. The various combinations of risk and return available all fall on a smooth curve. This curve is called an investment opportunity set,because it shows the possible combinations of risk and return available from portfolios of these two assets. A portfolio that offers the highest return for its level of risk is said to be an efficient portfolio. The undesirable portfolios are said to be dominated or inefficient.

29 11-29 More on Correlation & the Risk-Return Trade-Off (The Next Slide is an Excel Example)

30 11-30 Example: Correlation and the Risk-Return Trade-Off, Two Risky Assets

31 11-31 The Importance of Asset Allocation, Part 2. We can illustrate the importance of asset allocation with 3 assets. How? Suppose we invest in three mutual funds: One that contains Foreign Stocks, F One that contains U.S. Stocks, S One that contains U.S. Bonds, B Figure 11.6 shows the results of calculating various expected returns and portfolio standard deviations with these three assets. Expected ReturnStandard Deviation Foreign Stocks, F 18% 35% U.S. Stocks, S1222 U.S. Bonds, B 814

32 11-32 Risk and Return with Multiple Assets, I.

33 11-33 Risk and Return with Multiple Assets, II. Figure 11.6 used these formulas for portfolio return and variance: But, we made a simplifying assumption. We assumed that the assets are all uncorrelated. If so, the portfolio variance becomes:

34 11-34 The Markowitz Efficient Frontier The Markowitz Efficient frontier is the set of portfolios with the maximum return for a given risk AND the minimum risk given a return. For the plot, the upper left-hand boundary is the Markowitz efficient frontier. All the other possible combinations are inefficient. That is, investors would not hold these portfolios because they could get either –more return for a given level of risk, or –less risk for a given level of return.

35 11-35 Example: Web-Based Markowitz Frontiers www.finportfolio.com

36 11-36 Useful Internet Sites www.411stocks.com (to find expected returns)www.411stocks.com www.investopedia.com (for more on risk measures)www.investopedia.com www.teachmefinance.com (also contains more on risk measure)www.teachmefinance.com www.morningstar.com (measure diversification using “instant x-ray”)www.morningstar.com www.moneychimp.com (review modern portfolio theory)www.moneychimp.com www.efficentfrontier.com (check out the online journal)www.efficentfrontier.com

37 11-37 Chapter Review, I. Expected Returns and Variances –Expected returns –Calculating the variance Portfolios –Portfolio weights –Portfolio expected returns –Portfolio variance

38 11-38 Chapter Review, II. Diversification and Portfolio Risk –The Effect of diversification: Another lesson from market history –The principle of diversification Correlation and Diversification –Why diversification works –Calculating portfolio risk –More on correlation and the risk-return trade-off The Markowitz Efficient Frontier –Risk and return with multiple assets


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