ࡱ> '` TrbjbjLULU :.?.?+j(qqq8qrL}js v(www. $hO">?x>>"ww+7>ww>jws `GqΌ28M0}NRѴѴdѴ>C,o$""<d}>>>>jqq Chapters 10&11 - Debt Securities Bond characteristics Interest rate risk Bond rating Bond pricing Term structure theories Bond price behavior to interest rate changes Duration and immunization Bond investment strategies Bond characteristics Bond: long-term debt security that the issuer makes specified payments of interest (coupon payments) over a specific time period and repays a fixed amount of principal (par or face value) at maturity Face value or par value: usually $1,000 Coupon rate and interest payment Zero-coupon bond: coupon rate is zero, no coupon payment, sells at a discount. For example: a 10 year zero-coupon bond sells at $550 and yields 6.16% per year Maturity date Call provision: the issuer can repurchase bonds during the call period Call premium and call price Convertible bonds: can be converted into common stocks Puttable bonds: bondholders can sell bonds back to the issuer before maturity Floating-rate bonds: coupon rates vary with some market rates Indexed bonds: payments are tied to a general price index Junk bonds: high yields with high default risk Government bonds, corporate bonds, international bonds Preferred stocks: hybrid security, often considered as an equity but usually included in fixed-income securities Interest rate risk Interest rate price risk vs. interest rate reinvestment risk (reinvestment risk) Interest rate price risk: risk that a bond value (price) falls when market interest rates rise Reinvestment risk: risk that the interests received from a bond will be reinvested at a lower rate if market interest rates fall Bond rating Letter grades that designate quality (safety) of bonds (Figure 10.8 - Digital Image)  AAA AA Investment grade bonds with low default risk A BBB  BB B Speculative grade (junk) bonds with high default risk . Why bond rating? Firm's credit; Borrowing capacity Determinants: Coverage ratios - ratios of earnings to fixed costs Leverage ratio - debt to equity ratio Liquidity ratios - current ratio and quick ratio Profitability ratios - ROA and ROE Cash-flow-to debt ratio - ratio of total cash to outstanding debt Bond pricing Accrued interest and quoted price Invoice price = quoted (flat) price + accrued interest 0 182 days  40 days 142 days remaining until next coupon Suppose annual coupon is $80 and the quoted price is $990, Invoice price = 990 + (40/182)*40 = $998.79 Bond price = present value of coupons + present value of par value The required rate of return serves as the discount rate Premium bonds vs. discount bonds A premium bond sells for more than its face value ($1,000) A discount bond sells for less than its face value ($1,000) Annual interest payment valuation model P = present value of coupons + present value of par value = C (PVIFAr,n) + PV (PVIFr,n), P: intrinsic value of the bond C: annual coupon payment r: the required rate of return, the market interest rate for the bond n: the number of years until the bond matures PV: par value (face value, $1,000 usually) Semiannual interest payment valuation model: adjust the annual coupon to semiannual (C to C/2), the annual required rate of return to semiannual (r to r/2), and the number of years to maturity to semiannual periods (n to 2n) Overpriced securities vs. underpriced securities If the intrinsic value > the market price, the bond in the market is underpriced If the intrinsic value < the market price, the bond in the market is overpriced If the intrinsic value = the market price, the bond in the market is fairly priced Example: A 30-year 8% coupon bond pays semiannual coupon payments. The market interest rate (required rate of return) on the bond is 10%. What should be the bond price (fair value)? If the market price of the bond is $850.00, should you buy the bond? Answer: n = 60, i/y = 5%, FV = 1,000, PMT = 40, solve for PV = -810.71 No, you should not buy the bond since the intrinsic value ($810.71) < the market price ($850.00) If the market interest rate for the bond is 8%, what should be the bond price? Answer: PV = -1,000 If the market interest rate for the bond is 7%, what should be the bond price? Answer: PV = -1,124.72 Bond price and market interest rates have an inverse relationship: keeping other things constant, the higher the market interest rate, the lower the bond price (Figure 10.3 - Digital Image) Yield to maturity (YTM): rate of return from a bond if it is held to maturity Example (continued): what is YTM of the bond? Answer: PV = -850, FV = 1,000, PMT = 40, n = 60, solve for i/y = 4.76%, YTM = 4.76*2 = 9.52% Yield to call (YTC): rate of return from a bond until it is called Example (continued): suppose the bond can be called after 5 years at a call price of $1,050, what is YTC? Answer: PV = -850, FV = 1,050, PMT = 40, n = 10, solve for i/y = 6.45%, YTC = 6.45*2 = 12.91% Current yield (CY): annual coupon payment divided by the current bond price Example (continued): what is the current yield of the bond? CY = 80/850 = 9.41% If market interest rates rise what would happen to the current yield of a bond? Answer: the current yield would increase since the bond price would decrease Realized compound return: compound rate of return on a bond with all coupons reinvested until maturity Example: 10.5 (Figure 10.5 - Digital Image) Consider a two-year bond selling at par and paying 10% coupon once a year. The YTM is 10%. If the coupon payment is reinvested at an interest rate of 8% per year, the realized compound return will be less than 10% (actually it will be 9.91%) Term structure theories Term structure of interest rates: relationship between time to maturity and yields for a particular fixed-income security Yield curve: a graphical presentation of the term structure Expectation theory: the yield curve is determined solely by expectations of future short-term interest rates Forward rates: implied short-term interest rates in the future Example: suppose that two-year maturity bonds offer yields to maturity of 6% and three-year bonds have yields of 7%. What is the forward rate for the third year? Using the formula:  EMBED Equation.3  and solving for fn = 9.02% Approximation: fn = 7%*3 2*6% = 9.00% Liquidity preference theory: investors demand a risk premium on long-term bonds Liquidity premium: the extra expected return to compensate for higher risk of holding longer term bonds Market segmentation theory: investors have their preferences to specific maturity sectors and unwilling to shift from one sector to another Bond price behavior to interest rate changes The value of a bond is inversely related to its yield.: As yields increase, bond prices fall; as yields fall, bond prices rise. An increase in a bonds yield to maturity results in a smaller price change than a decrease in yield of equal magnitude. (3) As the maturity date approaches, the value of a bond approaches to its par value. Prices of long-term bonds tend to be more sensitive to interest rate changes than prices of short-term bonds. The sensitivity of bond prices to changes in yields increases at a deceasing rate as maturity increases. (6) Interest rate risk is inversely related to the bonds coupon rate. Prices of low-coupon bonds are more sensitive to changes in interest rates than prices of high-coupon bonds. (7) The sensitivity of a bonds price to a change in its yield is inversely related to the yield to maturity at which the bond is currently selling. (Figure 11.1 - Digital Image) Duration and immunization Duration: a measure of the effective maturity of a bond, defined as the weighted average of the times until each payment is made, with weights proportional to the present value of the payment. Measuring duration: Macaulay duration = D =  EMBED Equation.3 , where  EMBED Equation.3  Note: T is the number of years until the bond matures, y is the yield to maturity, and P0 is the market price of the bond Example: A 3-year bond with coupon rate of 8%, payable annually, sells for $950.25 (face value is $1,000). What is yield to maturity? What is D? Answer: y = 10%, D = 2.78 years (Spreadsheet 11.1 - Digital Image) Relationship between duration and bond price volatility  EMBED Equation.3  = - D  EMBED Equation.3  = - D*  EMBED Equation.2 y where D* =  EMBED Equation.3 , is the modified duration Example (continued): What is D*? Answer: D* = D/(1+y) = 2.53 years If the yield drops by 1%, what will happen to the bond price? Answer: the price will increase by 2.53% If the yield rises by 1%, what will happen to the bond price? Answer: the price will decrease by 2.53% Rules for duration (1) for a zero-coupon bond, the duration is equal to the time to maturity (2) the lower the coupon rate, the higher the D (3) the longer the time to maturity, the higher the D (4) the lower the yield, the higher the D (5) for a perpetuity, the D = (1+y)/y Bond immunization: a strategy to shield net worth from interest rate movements; to get interest rate price risk and interest rate reinvestment risk to cancel each other over a certain time period to meet a given promised stream of cash outflows See the example (Table 11.4 - digital Image) Note: immunization works only for small changes in interest rates Cash flow matching: matching cash flows from a fixed-income portfolio with those of an obligation Dedication strategy: refers to multi-period cash flow matching Application of bond immunization: banking management, pension fund management Bond investment strategies Passive strategy: lock in specified rates given the risk, or buy and hold Active management strategy: more aggressive and risky; try to timing the market Bond swaps: an investment strategy where an investor liquidates one bond holding and simultaneously buys a different issue (more in FIN 436) Interest rate swaps: a contract between two parties to exchange a series of cash flows based on fixed-income securities (more in FIN 436) Tax swaps: replace a bond that has a capital loss for a similar security in order to offset a gain in another part of an investment portfolio ASSIGNMENTS Chapter 10 Concept Checks Key Terms Intermediate: 10-15, CFA 1 and 5 Chapter 11 1. Concept Checks 2. Key Terms 3. Intermediate: 10-11, CFA 1-2, and 10 Chapter 12 - Macroeconomic and Industry Analysis Global economy Domestic macro economy Industry analysis Company analysis Global Economy Top-down analysis starts with the global economy: overview of the economic conditions around the world Exchange rate and exchange rate risk Political risk (country risk) Domestic macro economy To develop an economic outlook for domestic economy Gross domestic product (GDP): total value of goods and services produced High grow rate of GDP indicates rapid expansion check for inflation Negative grow rate of GDP indicates contraction check for recession Demand and/or supply shocks Unemployment rate Inflation: general level of prices for goods and services Interest rates Nominal interest rates vs. real interest rates (Figure 12.3 - Digital Image) Determinants of interest rates Supply side: from savers, mainly households Demand side: from borrowers, mainly business Government side: borrower or saver, through Fed The expected inflation rate Budget deficit: spending exceeds revenue Sentiment: optimism or pessimism of the economy Federal government policy: fiscal and monetary policies Fiscal polity - the government uses spending and taxing to stabilize the economy Monetary policy the Fed uses money supply and interest rate to stabilize the economy (price level) Consumer spending Exchange rates Business cycle: repetitive cycles of recession and recovery (Figure 12.4 - Digital Image) Peak vs. trough Cyclical industries: with above average sensitivity to the state of the economy Defensive industries: with below average sensitivity of the state of the economy Economic indicators (Table 12.2 - Digital Image) Leading indicators: rise or fall in advance of the rest of the economy Coincident indicators: rise or fall with the economy Lagging indicators: rise or fall following the economy Industrial analysis To develop an industrial outlook NAICS code to classify industries (Table 12.3 - Digital Image) Sensitivity to the business cycle Sector rotation Industry life cycle Industry structure and performance Threat of entry; Competitors; Substitutes; Bargaining power Technology development Future demand Labor problem Regulations Company analysis Fundamental analysis: intrinsic value, financial statements, ratio analysis, earnings and growth forecast, P/E ratio, and required rate of return (risk) Valuation models (covered in Chapter 13) ASSIGNMENT Concept Checks Key Terms Intermediate: 12, 14, and CFA 6 Chapter 13 - Equity Valuations Characteristics of common stock Valuation by comparables Dividend discount model (DDM) Alternative models Free cash flow valuation approach Characteristics of common stocks Ownership with residual claims Advantages and disadvantages of common stock ownership Higher returns Easy to buy and sell (liquidity) Higher risk Less current income Cash dividend, stock dividend, and stock split Treasury stocks - repurchased stocks held by a firm Capital gains yield and dividend yield Valuation by comparables Stocks with similar characteristics should sell for similar prices Book value: the net worth of common equity according to a firms balance sheet Liquidation value: net amount that can be realized by selling the assets of a firm and paying off the debt Replacement cost: cost to replace a firms assets Tobins q: the ratio of market value of the firm to replacement cost P/E ratio approach Price-to-sales ratio approach Market-to-book value approach Price-to-cash flow approach Example (Table 13.1 - Digital Image) Dividend discount model (DDM) Market price vs. intrinsic value Market price: the actual price that is determined by the demand and supply in the market Intrinsic value: the present value of a firms expected future net cash flows discounted by the required rate of return In market equilibrium, the required rate of return is the market capitalization rate Net income, retained earnings, and cash dividends General formula:  EMBED Equation.3  Forecasting sales and growth rate: g = ROE * b (b is the retention ratio) Estimating EPS and DPS (1) Zero growth DDM (g = 0), which means that dividend is a constant (D)  EMBED Equation.3  or  EMBED Equation.3  where k is the required rate of return and E(r) is the expected rate of return Example: if D = $2.00 (constant) and k = 10%, then V0 = $20.00 Preferred stocks can be treated as common stocks with zero growth (g = 0) (2) Constant growth DDM (g = a constant) D1 = D0*(1+g) D2 = D1*(1+g) = D0*(1+g)2, and in general, Dt = Dt-1*(1+g) = D0*(1+g)t  EMBED Equation.3  or  EMBED Equation.3  Example: assume D0 = 3.81, g = 5%, k = 12%, then V0 = 57.15 Stock price and PVGO (present value of growth opportunity) Dividend payout ratio (1-b) vs. plowback ratio (b, earnings retention ratio) Price = no-growth value per share + PVGO  EMBED Equation.3 , where  EMBED Equation.3  is the no-growth value per share Example: assume E1 = $5.00, k = 12.5%, ROE = 15% If D1 = $5.00, then g = 0% (g = ROE * b, b = 0) P0 = 5/0.125 = $40.00 If b = 60%, then g = 15%*0.6 = 9%, D1 = 5*(1-0.6) = $2.00 P0 = $57.14 (from constant DDM) PVGO = 57.14 40.00 = $17.14 (3) Life cycle and multistage growth models: the growth rates are different at different stages, but eventually it will be a constant Two-stage growth DDM Example: Honda Motor Co. Expected dividend in next four years: $0.90 in 2009 $0.98 in 2010 $1.06 in 2011 $1.15 in 2012 Dividend growth rate will be steady beyond 2012 Assume ROE = 11%, b = 70%, then long-term growth rate g = 7.7% Hondas beta is 1.05, if the risk-free rate is 3.5% and the market premium is 8%, then k = 11.9% (from CAPM) Using constant DDM, P2012 = 1.15*(1 + 0.077) / (0.119 - 0.077) = $29.49 $29.49 $0.90 $0.98 $1.06 $1.15 2008 2009 2010 2011 2012 Discount all the cash flows to the present at 11.9%, V2008 = $21.88 Multistage growth DDM: extension of two stage DDM Alternative models P/E ratio approach If g = ROE*b, the constant growth DDM is  EMBED Equation.3 , with k>ROE*b. Since P/E ratio indicates firms growth opportunity, P/E over g (call PEG ratio) should be close to 1. If PEG ratio is less than 1, it is a good bargain. For the S&P index over the past 20 years, the PEG ratio is between 1 and 1.5. Price-to-book ratio approach Price-to-cash flow ratio approach Price-to-sales ratio approach Free cash flow valuation approach Free cash flow: cash flow available to the firm or to the shareholders net of capital expenditures Free cash flow to the firm (FCFF) FCFF = EBIT*(1-tc) + depreciation capital expenditures increase in NWC Use FCFF to estimate firms value by discounting all future FCFF (including a terminal value, PT) to the present Free cash flow to equity holders FCFE = FCFF interest expense*(1-tc) + increases in net debt Use FCFE to estimate equity value by discounting all future FCFE (including a terminal value, PT) to the present Examples ASSIGNMENTS Concept Checks Key Terms Intermediate: 12, 13, 14, and CFA 1-4 Chapter 18 - Portfolio Performance and Evaluation Risk-adjusted returns M2 measure T2 measure Active and passive portfolio management Market timing Risk-adjusted returns Comparison groups: portfolios are classified into similar risk groups Basic performance-evaluation statistics Starting from the single index model  EMBED Equation.3  Where  EMBED Equation.3  is the portfolio Ps excess return over the risk-free rate,  EMBED Equation.3  is the excess return on the market portfolio over the risk-free rate,  EMBED Equation.3  is the portfolio beta (sensitivity),  EMBED Equation.3  is the nonsystematic component, which includes the portfolios alpha  EMBED Equation.3  and the residual term  EMBED Equation.3  (the residual term  EMBED Equation.3  has a mean of zero) The expected return and the standard deviation of the returns on portfolio P  EMBED Equation.3  and  EMBED Equation.3  Estimation procedure (1) Obtain the time series of RPt and RMt (enough observations) (2) Calculate the average of RPt and RMt ( EMBED Equation.3  and  EMBED Equation.3 ) (3) Calculate the standard deviation of returns for P and M ( EMBED Equation.3  and  EMBED Equation.3 ) (4) Run a linear regression to estimate  EMBED Equation.3  (5) Compute portfolio Ps alpha:  EMBED Equation.3  (6) Calculate the standard deviation of the residual:  EMBED Equation.3  Risk-adjusted portfolio performance measurement (Table 18.1 - Digital Image) The Sharpe measure: measures the risk premium of a portfolio per unit of total risk, reward-to-volatility ratio Sharpe measure =  EMBED Equation.3  The Jensen measure (alpha): uses the portfolios beta and CAPM to calculate its excess return, which may be positive, zero, or negative. It is the difference between actual return and required return  EMBED Equation.3  The Treynor measure: measures the risk premium of a portfolio per unit of systematic risk Treynor measure =  EMBED Equation.3  M2 measure M2 measure: is to adjust portfolio P such that its risk (volatility) matches the risk (volatility) of a benchmark index, then calculate the difference in returns between the adjusted portfolio and the market  EMBED Equation.3  Example: Given the flowing information of a portfolio and the market, calculate M2, assuming the risk-free rate is 6%. Portfolio (P) Market (M) Average return 35% 28% Beta 1.2 1.0 Standard deviation 42% 30% S for P = (0.35 - 0.06) / 0.42 = 0.69 S for M = (0.28 - 0.06) / 0.30 = 0.73 M2 = (0.69 - 0.73)*0.30 = -0.0129 = -1.29% (Figure 18.2 - Digital Image) E(r) CML    rP = 35% P M  rM = 28% rP* =26.71% M2 CAL P* rf = 6%   EMBED Equation.3 =30%  EMBED Equation.3 =42% Alternative way: adjust P to P* (to match the risk of the market) Determining the weights to match the risk of the market portfolio 30/42 = 0.7143 in portfolio 1-0.7143 = 0.2857 in risk-free asset Adjusted portfolio risk = 30% Adjusted portfolio return = 0.7143*35% + 0.2857*6% = 26.71% < 28% M2 = 26.7% 28% = -1.29% The portfolio underperforms the market T2 measure T2 measure: is similar to M2 measure but by adjusting the market risk - beta  EMBED Equation.3  Example (continued) Weights: 1/1.2 = 0.8333 in P and 1 0.8333 = 0.1667 in risk-free asset The adjusted portfolio has a beta of 1: 1.2*0.8333 + 0*0.1667 = 1 Adjusted portfolio return = 0.8333*35% + 0.1667*6% = 30.17% > 28% T2 = 30.17% 28% = 2.17% E(r)   P  rP = 35% P*  rP* = 30.17%  rM = 28% T2 SML M rf = 6%   EMBED Equation.3 =1  EMBED Equation.3 =1.2 The portfolio outperforms the market Why M2 and T2 are different? Because P is not fully diversified and the standard deviation is too high Active and passive portfolio management Active: attempt to improve portfolio performance either by identifying mispriced securities or by timing the market; it is an aggressive portfolio management technique Passive: attempt of holding diversified portfolios; it is a buy and hold strategy Market timing A strategy that moves funds between the risky portfolio and cash, based on forecasts of relative performance (Table 18.7 - Digital Image) When can we time the market? (Figure 18.9 - Digital Image) Can we time the market? Example: Intermediate 6 (Figure - Digital Image) We first distinguish between timing ability and selection ability. The intercept of the scatter diagram is a measure of stock selection ability. If the manager tends to have a positive excess return even when the markets performance is merely neutral (i.e., the market has zero excess return) then we conclude that the manager has, on average, made good stock picks. In other words, stock selection must be the source of the positive excess returns. Timing ability is indicated by the curvature of the plotted line. Lines that become steeper as you move to the right of the graph show good timing ability. The steeper slope shows that the manager maintained higher portfolio sensitivity to market swings (i.e., a higher beta) in periods when the market performed well. This ability to choose more market-sensitive securities in anticipation of market upturns is the essence of good timing. In contrast, a declining slope as you move to the right indicates that the portfolio was more sensitive to the market when the market performed poorly, and less sensitive to the market when the market performed well. This indicates poor timing. We can therefore classify performance ability for the four managers as follows: Selection AbilityTiming AbilityABad GoodB Good GoodC Good BadD Bad Bad ASSIGNMENTS Concept Checks Key Terms Intermediate: 5, 6, and CFA 1-4 Chapter 19 - International Investing Global equity markets Risk factors in international investing International diversification Exchange rate risk and political risk Global equity markets Developed markets vs. emerging markets (Tables 19.1 and 19.2 - Digital Image) Market capitalization and GDP: positive relationship, the slope is 0.66 and R2 is 0.28, suggesting that an increase of 1% in the ratio of market capitalization to GDP is associated with an increase in per capita GDP by 0.66% Home-country bias: investors prefer to invest in home-country stocks Risk factors in international investing Exchange rare risk Direct quote vs. indirect quote Direct quote: $ for one unit of foreign currency, for example, $2 for one pound Indirect quote: foreign currency for $1, for example, 0.5 pound for $1 Interest rate parity:  EMBED Equation.3  Example: 19.1 - 19.3 Given: you have $20,000 to invest, rUk = 10%, E0 = $2 per pound, the exchange rate after one year is E1 = $1.80 per pound, what is your rate of return in $? $20,000 = 10,000 pounds, invested at 10% for one year, to get 11,000 pounds Exchange 11,000 pounds at $1.80 per pound, to get $19800, a loss of $200 So your rate of return for the year in $ is -1% = (19,800 - 20,000) / 20,000 If E1 = $2.00 per pound, what is your return? How about E1 = $2.20 per pound? If F0 = $1.93 (futures rate for one year delivery) per pound, what should be the risk-free rate in the U.S.? Answer: rUS = 6.15%, using the interest rate parity If F0 = $1.90 per pound and rUS = 6.15%, how can you arbitrage? Step 1: borrow 100 pounds at 10% for one year and convert it to $200 and invest it in U.S. at 6.15% for one year (will receive 200*(1 + 0.0615) = $212.3) Step 2: enter a contract (one year delivery) to sell $212.3 at F0 Step 3: in one year, you collect $212.3 and covert it to111.74 pounds Step 4: repay the loan plus interest of 110 pounds and count for risk-free profit of 1.74 pounds Country-specific risk (political risk) International diversification Adding international equities in domestic portfolios can further diversify domestic portfolios risk (Figure 19.10 - Digital Image) Portfolio Risk   With US stocks only US and international stocks   # of stocks in portfolio Adding international stocks expands the opportunity set which enhances portfolio performance (Figure 19.10 - Digital Image) E(rP)   US and international stocks  With US stocks only    EMBED Equation.3  (Way? 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