Chapter 6

Chapter 6 The Returns and Risks from Investing

Learning Objectives • Define “return” and state its two components. • Explain the relationship between return and risk. • Identify the sources of risk. • Describe the different methods of measuring returns. • Describe the different methods of measuring risk. • Discuss the returns and risks from investing in major financial assets in the past.

Asset Valuation • Asset valuation is a function of both return and risk • At the centre of security analysis • Return is the reward for undertaking the investment • The realized risk-return tradeoff is based on the past • The expected future risk-return tradeoff is uncertain and may not occur

Return Components • Returns consist of two elements: • Yield: Periodic cash flows such as interest or dividends (income component of the security’s return) • “Yield” measures relate income return to a price for the security • Issuer makes the payments in cash to the security holder • Capital Gain (Loss): Price appreciation or depreciation • The change in price of the security over some period of time • Total Return = Yield + Capital Gain (Loss)

Example: Calculating yields and price changes • Assume that an investor buys 100 shares of a stock for $40, holds it for one year and then sells it at $50. During that year the investors receives a dividends of $0.01 per share every 4 months. • Calculate the yield and the capital gain (loss) for the investor.

Risk • Risk is the chance that the realized (actual) return for an investment will be different from the expected return • Investors are concerned that the realized return will be less than the expected return • The greater the variability between the expected and realized return, the greater the risk • Although, investors may receive on average their expected returns on risky assets in the long-run, they fail to do so in the short-run

Interest Rate Risk Affects market value and resale price Market Risk Overall market effects Inflation Risk Purchasing power variability Business Risk Financial Risk Tied to debt financing Liquidity Risk Time and price concession required to sell security Exchange Rate Risk Country Risk Potential change in degree of political stability Risk Sources

Risk Sources • Interest Rate Risk • Is the variability in a security’s return resulting from changes in the level of interest rates • Affects bonds more directly than common stocks and is a major risk faced by bondholders • Market Risk • Is the variability in returns resulting from fluctuations in the overall market • All securities (especially common stocks) are exposed to market risk

Risk Sources • Inflation Risk • Also known as purchasing power risk • Is related to interest rate risk since interest rates generally rise as inflation increases (inflation premiums) • Business Risk • The risk of doing business in a particular industry or environment • For example, Shell Canada faces unique problems as a result of developments in the global oil situation

Risk Sources • Financial Risk • Is associated with the use of debt financing by companies (financial leverage) • The larger the proportion of assets financed by debt (as opposed to equity), the larger the variability in returns, the larger the risk • Liquidity Risk • Is the risk associated with the particular secondary market in which the security trades • A T-bill has little or no liquidity risk, whereas a small OTC stock may have a large liquidity risk

Risk Sources • Exchange Rate Risk • Is the variability in returns on securities caused by currency fluctuations • Also called currency risk • Country Risk • Also called political risk • With more investors investing internationally, the political, and therefore economic, stability and viability of a country’s economy need to be considered

Risk Types • Two general types: • Systematic (market) risk • Pervasive, affecting all securities, cannot be avoided • Interest rate or market risk or inflation risk • Non-systematic (non-market) risk • Unique characteristics specific to a security • Total Risk = General Risk + Specific Risk =Market Risk + Issuer Risk = Systematic Risk + Non-Systematic Risk

Measuring Returns • Total Return (TR) compares performance over time or across different securities • Total Return is a percentage relating all cash flows received during a given time period, denoted CFt +(PE - PB), to the start of period price, PB

Measuring Returns • CF_t = cash flows during measurement period t (Cash flows for a bond comes from interest payments received, and for a stock it comes from dividends received) • P_E = ending or sale price • P_B = beginning or purchase price

Measuring Returns • The total return concept is valuable as a measure of return because: 1- It is all-inclusive, measuring the total return per dollar of the original investment 2- It facilitates the comparison of assets returns over a specified period, whether the comparison is of different assets (stocks vs. bonds) or different securities within the same asset (several common stocks)

Measuring Returns • Total Return can be either positive or negative • When calculating a cumulative wealth index or a geometric mean (cumulating or compounding), negative returns are a problem • A Return Relative solves the problem because it is always positive

Example: Total return and return relative • Problem 4 pg 181 • Calculate the TR and return relative for: • A preferred stock bought for $70 per share, held one year during which $5 per share dividend are collected, and sold for $63 • A bond with a 12% coupon rate bought for $870, held for two years during which interest is collected, and sold for $930

Measuring Returns • To measure the level of wealth created by an investment rather than the change in wealth, returns need to be cumulated over time • Cumulative Wealth Index, CWIn, over n periods, =

Measuring Returns • CWI_n = the cumulative wealth index as of the end of period n • WI_0 = the beginning index value, typically $1 (The cumulative effect of returns over time are measured given some stated beginning amount, such as $1) • TR_1…n = the periodic TRs in decimal form

Example: Cumulative wealth index YearTR% 1999 31.42598 2000 7.52756 2001 -12.60567 2002 -12.32439 2003 26.32534 Calculate the cumulative wealth index for the S&P/TSX Index total returns shown above (assume that the beginning index value is equal to $1) Example in book pg 163

Measuring Returns • The values for the cumulative wealth index can be used to calculate the rate of return for a given period • TR_n = (CWI_n / CWI_n-1) – 1 • Example Use the CWI in years 2002 and 2003 to calculate TR for year 2003. (pg 164)

Measuring International Returns • International returns include any realized exchange rate changes • If foreign currency depreciates, returns are lower in domestic currency terms and vice versa • Total Return in domestic currency =

Example: International Returns • (Pg 164 & 165) Consider a Canadian investor who invests in US Steel (which trades on NYSE) at $30 US when the value of the US dollar stated in Canadian dollars is $1.37. One year later, US Steel is at $33 US and the stock paid a dividend of $0.20 US. The US dollar is now at $1.4, which means that the Canadian dollar depreciated against it. • Calculate the TR to the Canadian investor in US dollars • Calculate the TR to the Canadian investor in Canadian dollars after currency adjustment

Measures Describing a Return Series • TR, RR, and CWI are useful for a given, single time period • What about summarizing returns over several time periods (i.e., a series of returns)? • Arithmetic mean and geometric mean • Arithmetic mean, or simply mean, is the sum of each of the values being considered divided by the total number of values

Arithmetic Mean • When should the arithmetic mean be used when talking about stock returns? • Arithmetic mean should be used when describing the average rate of return without considering compounding • It is the best estimate of the rate of return for a single period, such as a year

Geometric Mean • Geometric mean is the compound rate of return over time • When should the geometric mean be used when talking about stock returns? • It is a better measure of the change in wealth over more than a single period • Over multiple periods the geometric mean indicates the compound rate of return or the rate at which the invested dollar grows, taking into account the variability in returns.

Arithmetic Versus Geometric • Arithmetic mean does not measure the compound growth rate over time • Does not capture the realized change in wealth over multiple periods • Does capture typical return in a single period • Geometric mean reflects compound, cumulative returns over more than one period

Geometric Mean • Geometric mean defined as the n-th root of the product of n return relatives minus one, or G =

Example: Arithmetic and Geometric Mean YearTR% 1987 6.23 1988 10.62 1989 21.20 1990 -14.81 • Calculate the arithmetic and geometric mean

Arithmetic and Geometric Mean • The geometric mean will always be less than the arithmetic mean (unless the values are identical) because it reflects the variability of the returns • The spread between the two depends on the dispersion of the distribution • Difference between Geometric mean and Arithmetic mean depends on the variability of returns (standard deviation), s

Inflation-Adjusted (Real) Returns • Returns measures are not adjusted for inflation (since they are nominal returns) • Purchasing power of investment may change over time • Consumer Price Index (CPI) is a possible measure of the rate of inflation (IF)

Example: Inflation-Adjusted Returns • (Pg 169) For the period from April 1, 1995 to March 31, 2004, the total return for small-cap Canadian common stocks for the entire period was 9% and the rate of inflation was 1.9%. • Calculate the real (inflation-adjusted) total return for small-cap common stocks • How much is a basket of consumer goods purchased for $1 in April 1995 worth in March 2004?

Measuring Risk • Risk is the chance that the actual outcome will be different than the expected outcome (i.e., dispersion or variability of returns) • Standard Deviation measures the deviation of returns from the arithmetic mean of the observations

Standard Deviation • s = standard deviation • X = each observation in the sample • ¯X = the mean of the observations • n = the number of returns in the sample

Standard Deviation • Standard deviation is a measure of the total risk of an asset or portfolio • It is considered to be a reliable measure of variability because all the information in a sample is used • It can be combined with the normal distribution to provide useful information about the dispersion or variation in returns.

Standard Deviation

Example: Standard Deviation YearTR% 1999 31.42598 2000 7.52756 2001 -12.60567 2002 -12.32439 2003 26.32534 • Calculate the standard deviation for the years 1999 to 2003. (Problem 16 pg 182)

Risk Premiums • Premium is additional return earned or expected for additional risk • Calculated for any two asset classes • Risk premium is the part of the security’s return above the risk-free rate of return • The risk premiums are measured as the geometric difference between pairs of return series

Risk Premiums • Equity risk premium is the difference between stock returns and risk-free rate of return • Equity Risk Premium, ERP, =

Risk Premiums • Bond horizon premium is the difference between the return on long term government bonds and the risk-free rate as measured by the returns on T-bills • Bond Horizon Premium, BHP, =

Risk Premiums • Bond default premium is the difference between the return on long term corporate bonds and on long-term government bonds • Bond Default Premium, BDP, =

The Risk-Return Record • Since 1938, cumulative wealth indexes show stock returns dominate bond returns • Stock standard deviations also exceed bond standard deviations • Annual geometric mean return for the time period between 1938 and 2003 for Canadian common stocks is 10.32% with standard deviation of 16.36% • The smaller differences between the geometric and arithmetic means for bonds (6.07% & 6.46%), T-bills (5.2% & 5.28%), and inflation (3.97% & 4.05%) reflect the much lower levels of variability in these series

Annual Total Returns for Major Financial Assets (1938-2003)

The Risk-Return Record • G = the geometric mean of a series of asset returns • ¯X = the arithmetic mean of a series of asset returns • s = the standard deviation of the arithmetic series of returns Thus, if we know the arithmetic mean of a series of asset returns and the standard deviation of the series, we can approximate the geometric mean of this series.

Chapter 6

Chapter 6

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Chapter 6

Chapter 6

Chapter 6

Chapter 6

Chapter 6

Chapter 6

Chapter 6

Chapter 6

Chapter 6

Chapter 6

CHAPTER 6

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