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Risk and Rates of Return
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Defining and Measuring Risk
What is risk in the financial world What are some examples of risky investments? What security is usually considered to be a risk free investment?
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Probability Distributions
Definition: A probability distribution is a listing of all possible outcomes with a probability assigned to each. The probabilities must sum to 1.00 (i.e., 100%).
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Probability Distributions - cont
Which do you think is more risky? Why?
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Expected Rate of Return
The following all mean the same thing The rate of return expected to be realized from an investment. The mean value of the probability distribution of possible returns. The weighted average of the outcomes, where the weights are the probabilities.
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Expected Rate of Return - cont
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Continuous vs Discrete Probability Distributions
The number of outcomes is limited (ie finite)
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Continuous vs Discrete Probability Distributions - cont
Continuous Probability Distribution: The number of outcomes is unlimited (ie infinite)
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Measuring Stand Alone Risk: The Standard Deviation
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Measuring Stand Alone Risk: The Standard Deviation
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Measuring Stand Alone Risk: The Standard Deviation
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Measuring Risk - Coefficient of Variation
Standardized measure of risk per unit of return Calculated as the standard deviation divided by the expected return Useful where investments differ in risk and expected returns
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Measuring Risk - Coefficient of Variation (cont)
Implications:
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Risk Aversion and Required Returns
Most investors don’t like risk. In, other words, they’re averse to it. Risk-averse investors require higher expected rates of return for higher-risk securities. Exceptions:
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Risk Aversion and Required Returns
Risk Premium: The portion of the expected return on an investment that can be attributed to its additional risk The difference between the expected return of a given risky asset and that of a less risky asset (e.g., a risk-free asset such as a T-bill): Example: You can invest $1 million in a one-year T-bill at 5% or in Biobotics stock. What’s the risk premium on Biobotics?
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Portfolio Risk – Holding Combinations of Assets
Portfolio - a collection of investment securities Portfolio Returns -The expected return on a portfolio ( k^ p ) is the weighted average return of the stocks held in the portfolio. (Note: The sum of the wi’s has to add up to 1.00, or 100%.)
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Portfolio Returns Example: What is the expected return of a portfolio made up of: 25% Martin Products, 45% U.S. Electric, and 30% Biobotics?
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Portfolio Returns - Cont
How is an expected portfolio return different from a realized portfolio return? The realized rate of return is the return that is actually earned! The realized return is usually different from the expected return!
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Return Distribution for two perfectly negatively correlated stocks
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Return Distribution for two perfectly positively correlated stocks
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Portfolio Risk Correlation Coefficient ( r ):
A measure of the degree of relationship between 2 variables, such as the expected return of company A and the expected return of company B. Positively correlated stocks’ rates of return tend to move in the same direction. Negatively correlated stocks’ rates of return tend to move in opposite directions. Perfectly correlated stocks’ rates of return move exactly together or exactly opposite.
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Portfolio Risk - cont Risk Reduction:
Combining stocks that are NOT perfectly correlated will reduce portfolio risk. We call this diversification. The risk of a portfolio is reduced as the number of stocks in the portfolio increases. The lower the positive correlation of each stock we add to the portfolio, the lower the risk.
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Effects of Portfolio Size on Portfolio Risk for Average Stocks
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Firm Specific vs Market Risk
Firm-Specific Risk: - That part of a security’s risk associated with factors generated by events, or behaviors, specific to the firm. Examples of such firm-specific factors: It can be eliminated by proper diversification. What do we mean by “proper”?
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Firm Specific vs Market Risk (cont)
Market Risk: - That part of a security’s risk that cannot be eliminated by diversification because it is associated with economic or market factors that systematically affect most firms. Examples of such factors:
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Firm Specific vs Market Risk (cont)
Investors who hold a company’s stock as part of a diversified portfolio will be willing to pay more for that stock than someone how holds only that one stock. Why? Therefore, we say a stock’s relevant risk is that part of the stock’s risk that cannot be diversified away… i.e., its market risk. This risk reflects the stock’s contribution to a diversified portfolio. How can we measure this relevant risk?
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The Concept of Beta Beta Coefficient ( ):
A measure of the extent to which the returns on a given stock move with the stock market. Beta is just the coefficient of regression for a simple linear regression of a stock’s return with the return for the stock market as a whole.
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The Concept of Beta Examples:
If stock’s = 0.5, then the stock is half as risky as the average stock. If stock’s = 1.0, then the stock is of average stock market risk. If stock’s = 2.0, then the stock is twice as risky as the average stock.
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The Concept of Beta (cont)
The Capital Asset Pricing Model (“CAPM”): A model based on the proposition that any stock’s required rate of return is equal to the risk-free rate of return plus a risk premium, where risk reflects diversification
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Portfolio Beta Coefficients
The beta of any set of securities is the weighted average of the individual securities’ betas.
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Portfolio Beta Coefficients
Example: What is the beta of a portfolio made up of: 25% of Stock H, 45% of Stock A, and 30% of Stock L?
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The Relationship between Risk and Rates of Return
The Security Market Line (SML): - The line that shows the relationship between risk as measured by beta and the required rate of return for individual securities: Where k j required rate of return for stock j kRF risk-free rate of return k M required rate of return for stock market (or “average stock”) j beta for stock j
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The Relationship between Risk and Rates of Return
Example: Using the SML, what is the required return for a stock that has a beta of 1.5 if T-bills yield 6% and the stock market required return is 14%?
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The Relationship between Risk and Rates of Return
The Security Market Line (cont) We also sometimes refer to the risk premium of the market ( RPM ), which is the additional return over the risk-free rate needed to compensate investors for assuming an average amount of risk,
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The Relationship between Risk and Rates of Return
The Security Market Line (cont) And to the risk premium of a stock j ( RP j ), which is the additional return over the risk-free rate needed to compensate investors for assuming stock j’s risk.
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The Relationship between Risk and Rates of Return
The Security Market Line (cont) Example: Calculate the risk premium for the market and for a stock that has a beta of 1.5 if T-bills yield 6% and the stock market required return is 14%? RP M = RP j =
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The Relationship between Risk and Rates of Return
The Impact of Inflation k j is the price of money to a riskless borrower. The nominal rate consists of: a real (inflation-free) rate of return, and an inflation premium ( IP ). An increase in expected inflation would increase the risk-free rate.
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The Relationship between Risk and Rates of Return
Changes in Risk Aversion The slope of the SML reflects the extent to which investors are averse to risk. An increase in risk aversion increases the risk premium and increases the slope.
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The Relationship between Risk and Rates of Return
Changes in a Stock’s Beta Coefficient The beta risk of a company’s stock is affected by: the composition of the company’s assets, its use of debt, any increased or decreased competition, expiration of patents, other…
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Some Limitations of the Beta Approach
Beta and the Capital Asset Pricing Model (CAPM): The CAPM is based on expected conditions, but we only have historical data to use to estimate beta. Timeframe we select for the regression of the historical data impacts our estimate of beta. As conditions change, future volatility may differ from past volatility. Where does our forecast of the risk-free rate ( R RF ) and the required rate of return for the market ( R m ) come from?
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