ࡱ> IKHT[ 5bjbj P~ΐΐd-6A* * mm4MMMhLM4.:P P P ------- 02l-!. "P !!-mm-&&&!^m^-&!-&&V+No,`u Md!&, -.04.,T3#,3o,3o,TP d &r ~ P P P --%P P P 4.!!!!3P P P P P P P P P * 3: Chapter 7 Bonds and Their Valuation SOLUTIONS TO END-OF-CHAPTER PROBLEMS 7-1 With your financial calculator, enter the following: N = 10; I = YTM = 9%; PMT = 0.08 ( 1,000 = 80; FV = 1000; PV = VB = ? PV = $935.82. 7-2 With your financial calculator, enter the following to find YTM: N = 10 ( 2 = 20; PV = -1100; PMT = 0.08/2 ( 1,000 = 40; FV = 1000; I = YTM = ? YTM = 3.31% ( 2 = 6.62%. With your financial calculator, enter the following to find YTC: N = 5 ( 2 = 10; PV = -1100; PMT = 0.08/2 ( 1,000 = 40; FV = 1050; I = YTC = ? YTC = 3.24% ( 2 = 6.49%. 7-3 The problem asks you to find the price of a bond, given the following facts: N = 16; I = 8.5/2 = 4.25; PMT = 45; FV = 1000. With a financial calculator, solve for PV = $1,028.60. 7-4 VB = $985; M = $1,000; Int = 0.07 ( $1,000 = $70. a. Current yield = Annual interest/Current price of bond = $70/$985.00 = 7.11%. b. N = 10; PV = -985; PMT = 70; FV = 1000; YTM = ? Solve for I = YTM = 7.2157% ( 7.22%. c. N = 7; I = 7.2157; PMT = 70; FV = 1000; PV = ? Solve for VB = PV = $988.46. 7-5 a. 1. 5%: Bond L: Input N = 15, I = 5, PMT = 100, FV = 1000, PV = ?, PV = $1,518.98. Bond S: Change N = 1, PV = ? PV = $1,047.62. 2. 8%: Bond L: From Bond S inputs, change N = 15 and I = 8, PV = ?, PV = $1,171.19. Bond S: Change N = 1, PV = ? PV = $1,018.52. 3. 12%: Bond L: From Bond S inputs, change N = 15 and I = 12, PV = ?, PV = $863.78. Bond S: Change N = 1, PV = ? PV = $982.14. b. Think about a bond that matures in one month. Its present value is influenced primarily by the maturity value, which will be received in only one month. Even if interest rates double, the price of the bond will still be close to $1,000. A 1-year bonds value would fluctuate more than the one-month bonds value because of the difference in the timing of receipts. However, its value would still be fairly close to $1,000 even if interest rates doubled. A long-term bond paying semiannual coupons, on the other hand, will be dominated by distant receipts, receipts that are multiplied by 1/(1 + kd/2)t, and if kd increases, these multipliers will decrease significantly. Another way to view this problem is from an opportunity point of view. A 1-month bond can be reinvested at the new rate very quickly, and hence the opportunity to invest at this new rate is not lost; however, the long-term bond locks in subnormal returns for a long period of time. 7-6 a. VB =  EMBED Equation.3  M = $1,000. I = 0.09($1,000) = $90. 1. VB = $829: Input N = 4, PV = -829, PMT = 90, FV = 1000, I = ? I = 14.99%. 2. VB = $1,104: Change PV = -1104, I = ? I = 6.00%. b. Yes. At a price of $829, the yield to maturity, 15 percent, is greater than your required rate of return of 12 percent. If your required rate of return were 12 percent, you should be willing to buy the bond at any price below $908.88. 7-7 The rate of return is approximately 15.03 percent, found with a calculator using the following inputs: N = 6; PV = -1000; PMT = 140; FV = 1090; I = ? Solve for I = 15.03%. 7-8 a. Using a financial calculator, input the following: N = 20, PV = -1100, PMT = 60, FV = 1000, and solve for I = 5.1849%. However, this is a periodic rate. The nominal annual rate = 5.1849%(2) = 10.3699% ( 10.37%. b. The current yield = $120/$1,100 = 10.91%. c. YTM = Current Yield + Capital Gains (Loss) Yield 10.37% = 10.91% + Capital Loss Yield -0.54% = Capital Loss Yield. d. Using a financial calculator, input the following: N = 8, PV = -1100, PMT = 60, FV = 1060, and solve for I = 5.0748%. However, this is a periodic rate. The nominal annual rate = 5.0748%(2) = 10.1495% ( 10.15%. 7-9 The problem asks you to solve for the YTM, given the following facts: N = 5, PMT = 80, and FV = 1000. In order to solve for I we need PV. However, you are also given that the current yield is equal to 8.21%. Given this information, we can find PV. Current yield = Annual interest/Current price 0.0821 = $80/PV PV = $80/0.0821 = $974.42. Now, solve for the YTM with a financial calculator: N = 5, PV = -974.42, PMT = 80, and FV = 1000. Solve for I = YTM = 8.65%. 7-10 The problem asks you to solve for the current yield, given the following facts: N = 14, I = 10.5883/2 = 5.29415, PV = -1020, and FV = 1000. In order to solve for the current yield we need to find PMT. With a financial calculator, we find PMT = $55.00. However, because the bond is a semiannual coupon bond this amount needs to be multiplied by 2 to obtain the annual interest payment: $55.00(2) = $110.00. Finally, find the current yield as follows: Current yield = Annual interest/Current price = $110/$1,020 = 10.78%. 7-11 The bond is selling at a large premium, which means that its coupon rate is much higher than the going rate of interest. Therefore, the bond is likely to be called--it is more likely to be called than to remain outstanding until it matures. Thus, it will probably provide a return equal to the YTC rather than the YTM. So, there is no point in calculating the YTM--just calculate the YTC. Enter these values: N = 10, PV = -1353.54, PMT = 70, FV = 1050, and then solve for I. The periodic rate is 3.2366 percent, so the nominal YTC is 2 ( 3.2366% = 6.4733% ( 6.47%. This would be close to the going rate, and it is about what the firm would have to pay on new bonds. 7-12 a. To find the YTM: N = 10, PV = -1175, PMT = 110, FV = 1000 I = YTM = 8.35%. b. To find the YTC, if called in Year 5: N = 5, PV = -1175, PMT = 110, FV = 1090 I = YTC = 8.13%. c. The bonds are selling at a premium which indicates that interest rates have fallen since the bonds were originally issued. Assuming that interest rates do not change from the present level, investors would expect to earn the yield to call. (Note that the YTC is less than the YTM.) d. Similarly from above, YTC can be found, if called in each subsequent year. If called in Year 6: N = 6, PV = -1175, PMT = 110, FV = 1080 I = YTM = 8.27%. If called in Year 7: N = 7, PV = -1175, PMT = 110, FV = 1070 I = YTM = 8.37%. If called in Year 8: N = 8, PV = -1175, PMT = 110, FV = 1060 I = YTM = 8.46%. If called in Year 9: N = 9, PV = -1175, PMT = 110, FV = 1050 I = YTM = 8.53%. According to these calculations, the latest investors might expect a call of the bonds is in Year 6. This is the last year that the expected YTC will be less than the expected YTM. At this time, the firm still finds an advantage to calling the bonds, rather than seeing them to maturity. 7-13 First, we must find the amount of money we can expect to sell this bond for in 5 years. This is found using the fact that in five years, there will be 15 years remaining until the bond matures and that the expected YTM for this bond at that time will be 8.5%. N = 15, I = 8.5, PMT = 90, FV = 1000 PV = -$1,041.52. VB = $1,041.52. This is the value of the bond in 5 years. Therefore, we can solve for the maximum price we would be willing to pay for this bond today, subject to our required rate of return of 10%. N = 5, I = 10, PMT = 90, FV = 1041.52 PV = -$987.87. VB = $987.87. We are willing to pay up to $987.87 for this bond today. 7-14 Before you can solve for the price, we must find the appropriate semiannual rate at which to evaluate this bond. EAR = (1 + NOM/2)2 - 1 0.0816 = (1 + NOM/2)2 - 1 NOM = 0.08. Semiannual interest rate = 0.08/2 = 0.04 = 4%. Solving for price: N = 20, I = 4, PMT = 45, FV = 1000 PV = -$1,067.95. VB = $1,067.95. 7-15 a. The current yield is defined as the annual coupon payment divided by the current price. CY = $80/$901.40 = 8.875%. b. Solving for YTM: N = 9, PV = -901.40, PMT = 80, FV = 1000 I = YTM = 9.6911%. c. Expected capital gains yield can be found as the difference between YTM and the current yield. CGY = YTM - CY = 9.691% - 8.875% = 0.816%. Alternatively, you can solve for the capital gains yield by first finding the expected price next year. N = 8, I = 9.6911, PMT = 80, FV = 1000 PV = -$908.76. VB = $908.76. Hence, the capital gains yield is the percent price appreciation over the next year. CGY = (P1 - P0)/P0 = ($908.76 - $901.40)/$901.40 = 0.816%. 7-16 Using the TIE ratio, we can solve for the firm's current operating income. TIE = EBIT/Int Exp 3.2 = EBIT/$10,500,000 EBIT = $33,600,000. Using the same methodology, you can solve for the maximum interest expense the firm can bear without violating its covenant. 2.5 = $33,600,000/Int Exp Max Int Exp = $13,440,000. Therefore, the firm can raise debt to the point that its interest expense increases by $2.94 million ($13.44 ( $10.50). The firm can raise $25 million at 8%, which would increase the cost of debt by $25 ( 0.08 = $2 million. Additional debt will be issued at 10%, and the amount of debt to be raised can be found, since we know that only an additional $0.94 million in interest expense can be incurred. Additional Int Exp = Additional Debt ( Cost of debt $0.94 million = Additional Debt ( 0.10 Additional Debt = $9.40 million. Hence, the firm may raise up to $34.4 million in additional debt without violating its bond covenants. 7-17 First, we must find the price Baili paid for this bond. N = 10, I = 9.79, PMT = 110, FV = 1000 PV = -$1,075.02. VB = $1,075.02. Then to find the one-period return, we must find the sum of the change in price and the coupon received divided by the starting price. One-period return =  EMBED Equation.3  One-period return = ($1,060.49 - $1,075.02 + $110)/$1,075.02 One-period return = 8.88%. 7-18 The answer depends on when one works the problem. We used The Wall Street Journal, February 3, 2003: a. AT&Ts 8.625%, 2031 bonds had an 8.6 percent current yield. The bonds sold at a premium, 100.75% of par, so the coupon interest rate would have to be set lower than 8.625% for the bonds to sell at par. If we assume the bonds arent callable, we can do a rough calculation of their YTM. Using a financial calculator, we input the following values: N = 29 ( 2 = 58, PV = 1.0075 ( -1,000 = -1007.50, PMT = EMBED Equation.3 ( 1,000 = 86.25/2 = 43.125, FV = 1000, and then solve for YTM = kd = 4.2773% ( 2 = 8.5546%. Thus, AT&T would have to set a rate of 8.55 percent on new long-term bonds. b. The return on AT&Ts bonds is the current yield of 8.6 percent, less a small capital loss in 2031. The total return is about 8.55 percent. 7-19 a. Yield to maturity (YTM): With a financial calculator, input N = 28, PV = -1165.75, PMT = 95, FV = 1000, I = ? I = kd = YTM = 8.00%. Yield to call (YTC): With a calculator, input N = 3, PV = -1165.75, PMT = 95, FV = 1090, I = ? I = kd = YTC = 6.11%. Knowledgeable investors would expect the return to be closer to 6.1 percent than to 8 percent. If interest rates remain substantially lower than 9.5 percent, the company can be expected to call the issue at the call date and to refund it with an issue having a coupon rate lower than 9.5 percent. c. If the bond had sold at a discount, this would imply that current interest rates are above the coupon rate. Therefore, the company would not call the bonds, so the YTM would be more relevant than the YTC. 7-20 Percentage Price at 8% Price at 7% change 10-year, 10% annual coupon $1,134.20 $1,210.71 6.75% 10-year zero 463.19 508.35 9.75 5-year zero 680.58 712.99 4.76 30-year zero 99.38 131.37 32.19 $100 perpetuity 1,250.00 1,428.57 14.29 7-21 a. t Price of Bond C Price of Bond Z 0 $1,012.79 $ 693.04 1 1,010.02 759.57  2 1,006.98 832.49 3 1,003.65 912.41 4 1,000.00 1,000.00 b.     Answers and Solutions: 7 - PAGE 5  EMBED PowerPoint.Slide.8  $HI ' ( J K o { |  % &     %&㚐h@hK4CJaJjhK4EHU+jn; hK4OJQJUVhmHnHujhK4U hK4H*hLS/ jhK4 jhK4@ hK4@ hK4H* jhK4hK4h01h01CJh01hK45CJ$OJQJ4 $IJ~m d081$` d081$^ d081$ `081$dx$&@#$./gd01@$ `08d$&@#$$d%d&d'd./NOPQa$  o  2 3 4 % &   d081$` d081$^ d081$ d0801$^`0& ` q } ~ , - .   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