(公司理财)公司理财中文版第九版第三章答案

CHAPTER 8INTEREST RATES AND BOND VALUATION1.The price of a pure discount (zero coupon) bond is the present value of the par. Remember, even though there are no coupon payments, the periods are semiannual to stay consistent with coupon bond payments. So, the price of the bond for each YTM is:a. P = $1,000/(1 + .05/2)20 = $610.27b. P = $1,000/(1 + .10/2)20 = $376.89c. P = $1,000/(1 + .15/2)20 = $235.412.The price of any bond is the PV of the interest payment, plus the PV of the par value. Notice this problem assumes a semiannual coupon. The price of the bond at each YTM will be:a.P = $35({1 – [1/(1 + .035)]50 } / .035) + $1,000[1 / (1 + .035)50]P = $1,000.00When the YTM and the coupon rate are equal, the bond will sell at par.b.P = $35({1 – [1/(1 + .045)]50 } / .045) + $1,000[1 / (1 + .045)50]P = $802.38When the YTM is greater than the coupon rate, the bond will sell at a discount.c.P = $35({1 – [1/(1 + .025)]50 } / .025) + $1,000[1 / (1 + .025)50]P = $1,283.62When the YTM is less than the coupon rate, the bond will sell at a premium.We would like to introduce shorthand notation here. Rather than write (or type, as the case may be) the entire equation for the PV of a lump sum, or the PVA equation, it is common to abbreviate the equations as:PVIF R,t = 1 / (1 + r)twhich stands for Present Value Interest FactorPVIFA R,t= ({1 – [1/(1 + r)]t } / r )which stands for Present Value Interest Factor of an AnnuityThese abbreviations are short hand notation for the equations in which the interest rate and the number of periods are substituted into the equation and solved. We will use this shorthand notation in the remainder of the solutions key.3.Here we are finding the YTM of a semiannual coupon bond. The bond price equation is:P = $1,050 = $39(PVIFA R%,20) + $1,000(PVIF R%,20)Since we cannot solve the equation directly for R, using a spreadsheet, a financialcalculator, or trial and error, we find:R = 3.547%Since the coupon payments are semiannual, this is the semiannual interest rate. TheYTM is the APR of the bond, so:YTM = 2 3.547% = 7.09%4.Here we need to find the coupon rate of the bond. All we need to do is to set up the bondpricing equation and solve for the coupon payment as follows:P = $1,175 = C(PVIFA3.8%,27) + $1,000(PVIF3.8%,27)Solving for the coupon payment, we get:C = $48.48Since this is the semiannual payment, the annual coupon payment is:2 × $48.48 = $96.96And the coupon rate is the annual coupon payment divided by par value, so:Coupon rate = $96.96 / $1,000 = .09696 or 9.70%5.The price of any bond is the PV of the interest payment, plus the PV of the par value.The fact that the bond is denominated in euros is irrelevant. Notice this problem assumes an annual coupon. The price of the bond will be:P = €84({1 – [1/(1 + .076)]15 } / .076) + €1,000[1 / (1 + .076)15]P = €1,070.186.Here we are finding the YTM of an annual coupon bond. The fact that the bond is denominated in yen is irrelevant. The bond price equation is:P = ¥87,000 = ¥5,400(PVIFA R%,21) + ¥100,000(PVIF R%,21)Since we cannot solve the equation directly for R, using a spreadsheet, a financial calculator, or trial and error, we find:R = 6.56%Since the coupon payments are annual, this is the yield to maturity.7.The approximate relationship between nominal interest rates (R), real interest rates (r),and inflation (h) is:R = r + hApproximate r = .05 –.039 =.011 or 1.10%The Fisher equation, which shows the exact relationship between nominal interest rates, real interest rates, and inflation is:(1 + R) = (1 + r)(1 + h)(1 + .05) = (1 + r)(1 + .039)Exact r = [(1 + .05) / (1 + .039)] – 1 = .0106 or 1.06%8.The Fisher equation, which shows the exact relationship between nominal interest rates,real interest rates, and inflation, is:(1 + R) = (1 + r)(1 + h)R = (1 + .025)(1 + .047) – 1 = .0732 or 7.32%9. The Fisher equation, which shows the exact relationship between nominal interest rates,real interest rates, and inflation, is:(1 + R) = (1 + r)(1 + h)h = [(1 + .17) / (1 + .11)] – 1 = .0541 or 5.41%10.The Fisher equation, which shows the exact relationship between nominal interest rates,real interest rates, and inflation, is:(1 + R) = (1 + r)(1 + h)r = [(1 + .141) / (1.068)] – 1 = .0684 or 6.84%11.The coupon rate, located in the first column of the quote is 6.125%. The bid price is:Bid price = 119:19 = 119 19/32 = 119.59375% $1,000 = $1,195.9375The previous day’s ask price is found by:Previous day’s asked price = Today’s asked price – Change = 119 21/32 – (–17/32) = 120 6/32The previous day’s price in dollars was:Previous day’s dollar price = 120.1875% $1,000 = $1,201.87512.This is a premium bond because it sells for more than 100% of face value. The current yield is:Current yield = Annual coupon payment / Asked price = $75/$1,347.1875 = .0557 or 5.57%The YTM is located under the “Asked yield” column, so the YTM is 4.4817%.The bid-ask spread is the difference between the bid price and the ask price, so:Bid-Ask spread = 134:23 – 134:22 = 1/32Intermediate13. Here we are finding the YTM of semiannual coupon bonds for various maturity lengths.The bond price equation is:P = C(PVIFA R%,t) + $1,000(PVIF R%,t)Miller Corporation bond:P0 = $45(PVIFA3.5%,26) + $1,000(PVIF3.5%,26) = $1,168.90P1 = $45(PVIFA3.5%,24) + $1,000(PVIF3.5%,24) = $1,160.58P3 = $45(PVIFA3.5%,20) + $1,000(PVIF3.5%,20) = $1,142.12P8 = $45(PVIFA3.5%,10) + $1,000(PVIF3.5%,10) = $1,083.17P12= $45(PVIFA3.5%,2) +$1,000(PVIF3.5%,2) = $1,019.00P13= $1,000Modigliani Company bond:P0 = $35(PVIFA4.5%,26) + $1,000(PVIF4.5%,26) = $848.53P1 = $35(PVIFA4.5%,24) + $1,000(PVIF4.5%,24) = $855.05P3 = $35(PVIFA4.5%,20) + $1,000(PVIF4.5%,20) = $869.92P8 = $35(PVIFA4.5%,10) + $1,000(PVIF4.5%,10) = $920.87P12= $35(PVIFA4.5%,2) +$1,000(PVIF4.5%,2) = $981.27P13= $1,000All else held equal, the premium over par value for a premium bond declines as maturity approaches, and the discount from par value for a discount bond declines as maturity approaches. This is called “pull to par.” In both cases, the largest percentage price changes occur at the shortest maturity lengths.Also, notice that the price of each bond when no time is left to maturity is the par value, even though the purchaser would receive the par value plus the coupon payment immediately. This is because we calculate the clean price of the bond.14.Any bond that sells at par has a YTM equal to the coupon rate. Both bonds sell at par, sothe initial YTM on both bonds is the coupon rate, 8 percent. If the YTM suddenly rises to 10 percent:P Laurel= $40(PVIFA5%,4) + $1,000(PVIF5%,4) = $964.54P Hardy= $40(PVIFA5%,30) + $1,000(PVIF5%,30) = $846.28The percentage change in price is calculated as:Percentage change in price = (New price – Original price) / Original price∆P Laurel% = ($964.54 – 1,000) / $1,000 = –0.0355 or –3.55%∆P Hardy% = ($846.28 – 1,000) / $1,000 = –0.1537 or –15.37%If the YTM suddenly falls to 6 percent:P Laurel= $40(PVIFA3%,4) + $1,000(PVIF3%,4) = $1,037.17P Hardy= $40(PVIFA3%,30) + $1,000(PVIF3%,30) = $1,196.00∆P Laurel% = ($1,037.17 – 1,000) / $1,000 = +0.0372 or 3.72%∆P Hardy% = ($1,196.002 – 1,000) / $1,000 = +0.1960 or 19.60%All else the same, the longer the maturity of a bond, the greater is its price sensitivity to changes in interest rates. Notice also that for the same interest rate change, the gain froma decline in interest rates is larger than the loss from the same magnitude change. For aplain vanilla bond, this is always true.15.Initially, at a YTM of 10 percent, the prices of the two bonds are:P Faulk= $30(PVIFA5%,16) + $1,000(PVIF5%,16) = $783.24P Gonas= $70(PVIFA5%,16) + $1,000(PVIF5%,16) = $1,216.76If the YTM rises from 10 percent to 12 percent:P Faulk= $30(PVIFA6%,16) + $1,000(PVIF6%,16) = $696.82P Gonas= $70(PVIFA6%,16) + $1,000(PVIF6%,16) = $1,101.06The percentage change in price is calculated as:Percentage change in price = (New price – Original price) / Original price∆P Faulk% = ($696.82 – 783.24) / $783.24 = –0.1103 or –11.03%∆P Gonas% = ($1,101.06 – 1,216.76) / $1,216.76 = –0.0951 or –9.51% If the YTM declines from 10 percent to 8 percent:P Faulk= $30(PVIFA4%,16) + $1,000(PVIF4%,16) = $883.48P Gonas= $70(PVIFA4%,16) + $1,000(PVIF4%,16) = $1,349.57∆P Faulk% = ($883.48 – 783.24) / $783.24 = +0.1280 or 12.80%∆P Gonas% = ($1,349.57 – 1,216.76) / $1,216.76 = +0.1092 or 10.92% All else the same, the lower the coupon rate on a bond, the greater is its price sensitivity to changes in interest rates.16.The bond price equation for this bond is:P0 = $960 = $37(PVIFA R%,18) + $1,000(PVIF R%,18)Using a spreadsheet, financial calculator, or trial and error we find:R = 4.016%This is the semiannual interest rate, so the YTM is:YTM = 2 ⨯ 4.016% = 8.03%The current yield is:Current yield = Annual coupon payment / Price = $74 / $960 = .0771 or 7.71%The effective annual yield is the same as the EAR, so using the EAR equation from the previous chapter:Effective annual yield = (1 + 0.04016)2– 1 = .0819 or 8.19%17.The company should set the coupon rate on its new bonds equal to the required return.The required return can be observed in the market by finding the YTM on outstanding bonds of the company. So, the YTM on the bonds currently sold in the market is:P = $1,063 = $50(PVIFA R%,40) + $1,000(PVIF R%,40)Using a spreadsheet, financial calculator, or trial and error we find:R = 4.650%This is the semiannual interest rate, so the YTM is:YTM = 2 ⨯ 4.650% = 9.30%18. Accrued interest is the coupon payment for the period times the fraction of the periodthat has passed since the last coupon payment. Since we have a semiannual coupon bond, the coupon payment per six months is one-half of the annual coupon payment. There are two months until the next coupon payment, so four months have passed since the last coupon payment. The accrued interest for the bond is:Accrued interest = $84/2 × 4/6 = $28And we calculate the clean price as:Clean price = Dirty price – Accrued interest = $1,090 – 28 = $1,06219. Accrued interest is the coupon payment for the period times the fraction of the periodthat has passed since the last coupon payment. Since we have a semiannual coupon bond, the coupon payment per six months is one-half of the annual coupon payment. There are four months until the next coupon payment, so two months have passed since the last coupon payment. The accrued interest for the bond is:Accrued interest = $72/2 × 2/6 = $12.00And we calculate the dirty price as:Dirty price = Clean price + Accrued interest = $904 + 12 = $916.0020.To find the number of years to maturity for the bond, we need to find the price of thebond. Since we already have the coupon rate, we can use the bond price equation, and solve for the number of years to maturity. We are given the current yield of the bond, so we can calculate the price as:Current yield = .0842 = $90/P0P0 = $90/.0842 = $1,068.88Now that we have the price of the bond, the bond price equation is:P = $1,068.88 = $90{[(1 – (1/1.0781)t ] / .0781} + $1,000/1.0781tWe can solve this equation for t as follows:$1,068.88 (1.0781)t = $1,152.37 (1.0781)t– 1,152.37 + 1,000152.37 = 83.49(1.0781)t1.8251 = 1.0781tt = log 1.8251 / log 1.0781 = 8.0004 ≈ 8 yearsThe bond has 8 years to maturity.21.The bond has 10 years to maturity, so the bond price equation is:P = $871.55 = $41.25(PVIFA R%,20) + $1,000(PVIF R%,20)Using a spreadsheet, financial calculator, or trial and error we find:R = 5.171%This is the semiannual interest rate, so the YTM is:YTM = 2 5.171% = 10.34%The current yield is the annual coupon payment divided by the bond price, so:Current yield = $82.50 / $871.55 = .0947 or 9.47%22.We found the maturity of a bond in Problem 20. However, in this case, the maturity isindeterminate. A bond selling at par can have any length of maturity. In other words, when we solve the bond pricing equation as we did in Problem 20, the number of periods can be any positive number.Challenge23.To find the capital gains yield and the current yield, we need to find the price of the bond.The current price of Bond P and the price of Bond P in one year is:P: P0 = $90(PVIFA7%,5) + $1,000(PVIF7%,5) = $1,082.00P1 = $90(PVIFA7%,4) + $1,000(PVIF7%,4) = $1,067.74Current yield = $90 / $1,082.00 = .0832 or 8.32%The capital gains yield is:Capital gains yield = (New price – Original price) / Original priceCapital gains yield = ($1,067.74 – 1,082.00) / $1,082.00 = –0.0132 or –1.32% The current price of Bond D and the price of Bond D in one year is:D: P0 = $50(PVIFA7%,5) + $1,000(PVIF7%,5) = $918.00P1 = $50(PVIFA7%,4) + $1,000(PVIF7%,4) = $932.26Current yield = $50 / $918.00 = 0.0545 or 5.45%Capital gains yield = ($932.26 – 918.00) / $918.00 = 0.0155 or 1.55% All else held constant, premium bonds pay a high current income while having price depreciation as maturity nears; discount bonds pay a lower current income but have price appreciation as maturity nears. For either bond, the total return is still 7%, but this return is distributed differently between current income and capital gains.24.a. The rate of return you expect to earn if you purchase a bond and hold it until maturity is the YTM. The bond price equation for this bond is:P0 = $1,140 = $90(PVIFA R%,10) + $1,000(PVIF R%,10)Using a spreadsheet, financial calculator, or trial and error we find:R = YTM = 7.01%b. To find our HPY, we need to find the price of the bond in two years. The price ofthe bond in two years, at the new interest rate, will be:P2 = $90(PVIFA6.01%,8) + $1,000(PVIF6.01%,8) = $1,185.87To calculate the HPY, we need to find the interest rate that equates the price wepaid for the bond with the cash flows we received. The cash flows we receivedwere $90 each year for two years, and the price of the bond when we sold it. Theequation to find our HPY is:P0 = $1,140 = $90(PVIFA R%,2) + $1,185.87(PVIF R%,2)Solving for R, we get:R = HPY = 9.81%The realized HPY is greater than the expected YTM when the bond was boughtbecause interest rates dropped by 1 percent; bond prices rise when yields fall.25.The price of any bond (or financial instrument) is the PV of the future cash flows. Eventhough Bond M makes different coupons payments, to find the price of the bond, we just find the PV of the cash flows. The PV of the cash flows for Bond M is:P M = $800(PVIFA4%,16)(PVIF4%,12) + $1,000(PVIFA4%,12)(PVIF4%,28) +$20,000(PVIF4%,40)P M = $13,117.88Notice that for the coupon payments of $800, we found the PVA for the coupon payments, and then discounted the lump sum back to today.Bond N is a zero coupon bond with a $20,000 par value; therefore, the price of the bond is the PV of the par, or:P N = $20,000(PVIF4%,40) = $4,165.7826.To find the present value, we need to find the real weekly interest rate. To find the realreturn, we need to use the effective annual rates in the Fisher equation. So, we find the real EAR is:(1 + R) = (1 + r)(1 + h)1 + .107 = (1 + r)(1 + .035)r = .0696 or 6.96%Now, to find the weekly interest rate, we need to find the APR. Using the equation for discrete compounding:EAR = [1 + (APR / m)]m– 1We can solve for the APR. Doing so, we get:APR = m[(1 + EAR)1/m– 1]APR = 52[(1 + .0696)1/52– 1]APR = .0673 or 6.73%So, the weekly interest rate is:Weekly rate = APR / 52Weekly rate = .0673 / 52Weekly rate = .0013 or 0.13%Now we can find the present value of the cost of the roses. The real cash flows are an ordinary annuity, discounted at the real interest rate. So, the present value of the cost of the roses is:PVA = C({1 – [1/(1 + r)]t } / r)PVA = $8({1 – [1/(1 + .0013)]30(52)} / .0013)PVA = $5,359.6427.To answer this question, we need to find the monthly interest rate, which is the APRdivided by 12. We also must be careful to use the real interest rate. The Fisher equation uses the effective annual rate, so, the real effective annual interest rates, and the monthly interest rates for each account are:Stock account:(1 + R) = (1 + r)(1 + h)1 + .12 = (1 + r)(1 + .04)r = .0769 or 7.69%APR = m[(1 + EAR)1/m– 1]APR = 12[(1 + .0769)1/12– 1]APR = .0743 or 7.43%Monthly rate = APR / 12Monthly rate = .0743 / 12Monthly rate = .0062 or 0.62%Bond account:(1 + R) = (1 + r)(1 + h)1 + .07 = (1 + r)(1 + .04)r = .0288 or 2.88%APR = m[(1 + EAR)1/m– 1]APR = 12[(1 + .0288)1/12– 1]APR = .0285 or 2.85%Monthly rate = APR / 12Monthly rate = .0285 / 12Monthly rate = .0024 or 0.24%Now we can find the future value of the retirement account in real terms. The future value of each account will be:Stock account:FVA = C {(1 + r )t– 1] / r}FVA = $800{[(1 + .0062)360 – 1] / .0062]}FVA = $1,063,761.75Bond account:FVA = C {(1 + r )t– 1] / r}FVA = $400{[(1 + .0024)360 – 1] / .0024]}FVA = $227,089.04The total future value of the retirement account will be the sum of the two accounts, or: Account value = $1,063,761.75 + 227,089.04Account value = $1,290,850.79Now we need to find the monthly interest rate in retirement. We can use the same procedure that we used to find the monthly interest rates for the stock and bond accounts, so:(1 + R) = (1 + r)(1 + h)1 + .08 = (1 + r)(1 + .04)r = .0385 or 3.85%APR = m[(1 + EAR)1/m– 1]APR = 12[(1 + .0385)1/12– 1]APR = .0378 or 3.78%Monthly rate = APR / 12Monthly rate = .0378 / 12Monthly rate = .0031 or 0.31%Now we can find the real monthly withdrawal in retirement. Using the present value of an annuity equation and solving for the payment, we find:PVA = C({1 – [1/(1 + r)]t } / r )$1,290,850.79 = C({1 – [1/(1 + .0031)]300 } / .0031)C = $6,657.74This is the real dollar amount of the monthly withdrawals. The nominal monthly withdrawals will increase by the inflation rate each month. To find the nominal dollar amount of the last withdrawal, we can increase the real dollar withdrawal by the inflation rate. We can increase the real withdrawal by the effective annual inflation rate since we are only interested in the nominal amount of the last withdrawal. So, the last withdrawal in nominal terms will be: FV = PV(1 + r)tFV = $6,657.74(1 + .04)(30 + 25)FV = $57,565.3028.In this problem, we need to calculate the future value of the annual savings after the fiveyears of operations. The savings are the revenues minus the costs, or:Savings = Revenue – CostsSince the annual fee and the number of members are increasing, we need to calculate the effective growth rate for revenues, which is:Effective growth rate = (1 + .06)(1 + .03) – 1Effective growth rate = .0918 or 9.18%The revenue for the current year is the number of members times the annual fee, or:Current revenue = 500($500)Current revenue = $250,000The revenue will grow at 9.18 percent, and the costs will grow at 2 percent, so the savings each year for the next five years will be:Year Revenue Costs Savings1 $ 272,950.00 $ 76,500.00 $ 196,450.002 298,006.81 78,030.00 219,976.813 325,363.84 79,590.60 245,773.244 355,232.24 81,182.41 274,049.825 387,842.55 82,806.06 305,036.49Now we can find the value of each year’s savi ngs using the future value of a lump sum equation, so:FV = PV(1 + r)tYear Future Value1 $196,450.00(1 + .09)4 = $277,305.212 $219,976.81(1 + .09)3 = 284,876.353 $245,773.24(1 + .09)2 = 292,003.184 $274,049.82(1 + .09)1 = 298,714.315 305,036.49Total future value of savings = $1,457,935.54He will spend $500,000 on a luxury boat, so the value of his account will be:Value of account = $1,457,935.54 – 500,000Value of account = $957,935.54Now we can use the present value of an annuity equation to find the payment. Doing so, we find:PVA = C({1 – [1/(1 + r)]t } / r )$957,935.54 = C({1 – [1/(1 + .09)]25 } / .09)C = $97,523.83CHAPTER 91.We need to find the required return of the stock. Using the constant growth model, wecan solve the equation for R. Doing so, we find:R = (D1 / P0) + g = ($2.85 / $58) + .06 = .1091 or 10.91%2.The dividend yield is the dividend next year divided by the current price, so the dividendyield is:Dividend yield = D1 / P0 = $2.85 / $58 = .0491 or 4.91%The capital gains yield, or percentage increase in the stock price, is the same as the dividend growth rate, so:Capital gains yield = 6%3.We know the stock has a required return of 13 percent, and the dividend and capitalgains yield are equal, so:Dividend yield = 1/2(.13) = .065 = Capital gains yieldNow we know both the dividend yield and capital gains yield. The dividend is simply the stock price times the dividend yield, so:D1 = .065($64) = $4.16This is the dividend next year. The question asks for the dividend this year. Using the relationship between the dividend this year and the dividend next year:D1 = D0(1 + g)We can solve for the dividend that was just paid:$4.16 = D0 (1 + .065)D0 = $4.16 / 1.065 = $3.914.The price of a share of preferred stock is the dividend divided by the required return.This is the same equation as the constant growth model, with a dividend growth rate of zero percent. Remember that most preferred stock pays a fixed dividend, so the growth rate is zero. Using this equation, we find the price per share of the preferred stock is:R = D/P0 = $6.40/$103 = .0621 or 6.21%5.This stock has a constant growth rate of dividends, but the required return changes twice.To find the value of the stock today, we will begin by finding the price of the stock at Year 6, when both the dividend growth rate and the required return are stable forever.The price of the stock in Year 6 will be the dividend in Year 7, divided by the required return minus the growth rate in dividends. So:P6 = D6(1 + g) / (R–g) = D0(1 + g)7/ (R–g) = $2.75(1.06)7/ (.11 – .06) = $82.70Now we can find the price of the stock in Year 3. We need to find the price here since the required return changes at that time. The price of the stock in Year 3 is the PV of the dividends in Years 4, 5, and 6, plus the PV of the stock price in Year 6. The price of the stock in Year 3 is:P3= $2.75(1.06)4/ 1.14 + $2.75(1.06)5/ 1.142 + $2.75(1.06)6/ 1.143 + $82.70 / 1.143 P3= $64.33Finally, we can find the price of the stock today. The price today will be the PV of the dividends in Years 1, 2, and 3, plus the PV of the stock in Year 3. The price of the stock today is:P0= $2.75(1.06) / 1.16 + $2.75(1.06)2/ (1.16)2+ $2.75(1.06)3/ (1.16)3+ $64.33 /(1.16)3P0= $48.126.The price of a stock is the PV of the future dividends. This stock is paying five dividends,so the price of the stock is the PV of these dividends using the required return. The price of the stock is:P0 = $13 / 1.11 + $16 / 1.112 + $19 / 1.113 + $22 / 1.114 + $25 / 1.115 = $67.927.Here we need to find the dividend next year for a stock experiencing differential growth.We know the stock price, the dividend growth rates, and the required return, but not the dividend. First, we need to realize that the dividend in Year 3 is the current dividend times the FVIF. The dividend in Year 3 will be:D3 = D0(1.30)3And the dividend in Year 4 will be the dividend in Year 3 times one plus the growth rate, or:D4 = D0(1.30)3(1.18)The stock begins constant growth after the 4th dividend is paid, so we can find the price of the stock in Year 4 as the dividend in Year 5, divided by the required return minus the growth rate. The equation for the price of the stock in Year 4 is:P4= D4(1 + g) / (R– g)Now we can substitute the previous dividend in Year 4 into this equation as follows:P4 = D0(1 + g1)3(1 + g2) (1 + g3) / (R–g3)P4= D0(1.30)3(1.18) (1.08) / (.13 – .08) = 56.00D0When we solve this equation, we find that the stock price in Year 4 is 56.00 times as large as the dividend today. Now we need to find the equation for the stock price today.The stock price today is the PV of the dividends in Years 1, 2, 3, and 4, plus the PV of the Year 4 price. So:P0= D0(1.30)/1.13 + D0(1.30)2/1.132+ D0(1.30)3/1.133+ D0(1.30)3(1.18)/1.134+56.00D0/1.134We can factor out D0 in the equation, and combine the last two terms. Doing so, we get: P0 = $65.00 = D0{1.30/1.13 + 1.302/1.132 + 1.303/1.133 + [(1.30)3(1.18) + 56.00] / 1.134} Reducing the equation even further by solving all of the terms in the braces, we get:$65 = $39.86D0D0 = $65.00 / $39.86 = $1.63This is the dividend today, so the projected dividend for the next year will be:D1 = $1.63(1.30) = $2.128.The price of a share of preferred stock is the dividend payment divided by the requiredreturn. We know the dividend payment in Year 5, so we can find the price of the stock in Year 4, one year before the first dividend payment. Doing so, we get:P4 = $7.00 / .06 = $116.67The price of the stock today is the PV of the stock price in the future, so the price today will be:P0 = $116.67 / (1.06)4 = $92.419.To find the number of shares owned, we can divide the amount invested by the stockprice. The share price of any financial asset is the present value of the cash flows, so, tofind the price of the stock we need to find the cash flows. The cash flows are the two dividend payments plus the sale price. We also need to find the aftertax dividends since the assumption is all dividends are taxed at the same rate for all investors. The aftertax dividends are the dividends times one minus the tax rate, so:Year 1 aftertax dividend = $1.50(1 – .28)Year 1 aftertax dividend = $1.08Year 2 aftertax dividend = $2.25(1 – .28)Year 2 aftertax dividend = $1.62We can now discount all cash flows from the stock at the required return. Doing so, we find the price of the stock is:P = $1.08/1.15 + $1.62/(1.15)2 + $60/(1+.15)3P = $41.62The number of shares owned is the total investment divided by the stock price, which is: Shares owned = $100,000 / $41.62Shares owned = 2,402.9810.The required return of a stock consists of two components, the capital gains yield and thedividend yield. In the constant dividend growth model (growing perpetuity equation), the capital gains yield is the same as the dividend growth rate, or algebraically:R = D1/P0 + gWe can find the dividend growth rate by the growth rate equation, or:g = ROE ×bg = .16 × .80g = .1280 or 12.80%This is also the growth rate in dividends. To find the current dividend, we can use the information provided about the net income, shares outstanding, and payout ratio. The total dividends paid is the net income times the payout ratio. To find the dividend per share, we can divide the total dividends paid by the number of shares outstanding. So: Dividend per share = (Net income × Payout ratio) / Shares outstandingDividend per share = ($10,000,000 × .20) / 2,000,000Dividend per share = $1.00Now we can use the initial equation for the required return. We must remember that the equation uses the dividend in one year, so:R = D1/P0 + gR = $1(1 + .1280)/$85 + .1280R = .1413 or 14.13%11. a.If the company does not make any new investments, the stock price will be thepresent value of the constant perpetual dividends. In this case, all earnings are paiddividends, so, applying the perpetuity equation, we get:P = Dividend / RP = $8.25 / .12P = $68.75。

罗斯《公司理财》（第9版）课后习题第1章公司理财导论一、概念题1．资本预算（capital budgeting）答：资本预算是指综合反映投资资金来源与运用的预算，是为了获得未来产生现金流量的长期资产而现在投资支出的预算。

资本预算决策也称为长期投资决策，它是公司创造价值的主要方法。

资本预算决策一般指固定资产投资决策，耗资大，周期长，长期影响公司的产销能力和财务状况，决策正确与否影响公司的生存与发展。

完整的资本预算过程包括：寻找增长机会，制定长期投资战略，预测投资项目的现金流，分析评估投资项目，控制投资项目的执行情况。

资本预算可通过不同的资本预算方法来解决，如回收期法、净现值法和内部收益率法等。

2．货币市场（money markets）答：货币市场指期限不超过一年的资金借贷和短期有价证券交易的金融市场，亦称“短期金融市场”或“短期资金市场”，包括同业拆借市场、银行短期存贷市场、票据市场、短期证券市场、大额可转让存单市场、回购协议市场等。

其参加者为各种政府机构、各种银行和非银行金融机构及公司等。

货币市场具有四个基本特征：①融资期限短，一般在一年以内，最短的只有半天，主要用于满足短期资金周转的需要；②流动性强，金融工具可以在市场上随时兑现，交易对象主要是期限短、流动性强、风险小的信用工具，如票据、存单等，这些工具变现能力强，近似于货币，可称为“准货币”，故称货币市场；③安全性高，由于货币市场上的交易大多采用即期交易，即成交后马上结清，通常不存在因成交与结算日之间时间相对过长而引起价格巨大波动的现象，对投资者来说，收益具有较大保障；④政策性明显，货币市场由货币当局直接参加，是中央银行同商业银行及其他金融机构的资金连接的主渠道，是国家利用货币政策工具调节全国金融活动的杠杆支点。

货币市场的交易主体是短期资金的供需者。

需求者是为了获得现实的支付手段，调节资金的流动性并保持必要的支付能力，供应者提供的资金也大多是短期临时闲置性的资金。

第一章公司理财导论1.代理么问题谁拥有公司?描述所有者控制公司管理层的过程。

代理关系在公司的组织形式中存在的主要原因是什?在这种环境下，可能会出现什么样的问题?2.非营利企业的目标假设你是一家非营利企业（或许是非营利医院）的财务经理，你认为什么样的财务管理目标将会是恰当的?3.公司的目标评价下面这句话：管理者不应该只关注现在的股票价值，因为这么做将会导致过分强调短期利润而牺牲长期利润。

4.道德规范和公司目标股票价值最大化的目标可能和其他目标，比如避免不道德或者非法的行为相冲突吗?特别是，你认为顾客和员工的安全、环境和社会的总体利益是否在这个框架之内，或者他们完全被忽略了?考虑一些具体的情形来阐明你的回答。

5.跨国公司目标股票价值最大化的财务管理目标在外国会有不同吗?为什么?6.代理问题假设你拥有一家公司的股票，每股股票现在的价格是25 美元。

另外一家公司刚刚宣布它想要购买这个公司，愿意以每股35 美元的价格收购发行在外的所有股票。

你公司的管理层立即展开对这次恶意收购的斗争。

管理层是为股东的最大利益行事吗?为什么?7.代理问题和公司所有权公司所有权在世界各地都不相同。

历史上，美国个人投资者占了上市公司股份的大多数，但是在德国和日本，银行和其他金融机构拥有上市公司股份的大部分。

你认为代理问题在德国和日本会比在美国更严重吗?8.代理问题和公司所有权近年来，大型金融机构比如共同基金和养老基金已经成为美国股票的主要持有者。

这些机构越来越积极地参与公司事务。

这一趋势对代理问题和公司控制有什么样的启示?9.高管薪酬批评家指责美国公司高级管理人员的薪酬过高，应该削减。

比如在大型公司中，甲骨文的LarryEllison 是美国薪酬最高的首席执行官之一，2004～2008 年收入高达4.29 亿美元，仅2008 年就有1.93 亿美元之多。

这样的金额算多吗?如果承认超级运动员比如老虎·伍兹，演艺界的知名人士比如汤姆·汉克斯和奥普拉·温弗瑞，还有其他在他们各自领域非常出色的人赚的都不比这少或许有助于回答这个问题。

申明：转载自第一章1.在所有权形式的公司中,股东是公司的所有者。

股东选举公司的董事会,董事会任命该公司的管理层。

企业的所有权和控制权分离的组织形式是导致的代理关系存在的主要原因。

管理者可能追求自身或别人的利益最大化,而不是股东的利益最大化。

在这种环境下,他们可能因为目标不一致而存在代理问题。

2.非营利公司经常追求社会或政治任务等各种目标。

非营利公司财务管理的目标是获取并有效使用资金以最大限度地实现组织的社会使命。

3.这句话是不正确的。

管理者实施财务管理的目标就是最大化现有股票的每股价值，当前的股票价值反映了短期和长期的风险、时间以及未来现金流量。

4.有两种结论。

一种极端,在市场经济中所有的东西都被定价。

因此所有目标都有一个最优水平，包括避免不道德或非法的行为，股票价值最大化。

另一种极端,我们可以认为这是非经济现象,最好的处理方式是通过政治手段。

一个经典的思考问题给出了这种争论的答案:公司估计提高某种产品安全性的成本是30美元万。

然而,该公司认为提高产品的安全性只会节省20美元万。

请问公司应该怎么做呢”5.财务管理的目标都是相同的,但实现目标的最好方式可能是不同的,因为不同的国家有不同的社会、政治环境和经济制度。

6.管理层的目标是最大化股东现有股票的每股价值。

如果管理层认为能提高公司利润，使股价超过35美元,那么他们应该展开对恶意收购的斗争。

如果管理层认为该投标人或其它未知的投标人将支付超过每股35美元的价格收购公司,那么他们也应该展开斗争。

然而,如果管理层不能增加企业的价值,并且没有其他更高的投标价格,那么管理层不是在为股东的最大化权益行事。

现在的管理层经常在公司面临这些恶意收购的情况时迷失自己的方向。

7.其他国家的代理问题并不严重,主要取决于其他国家的私人投资者占比重较小。

较少的私人投资者能减少不同的企业目标。

高比重的机构所有权导致高学历的股东和管理层讨论决策风险项目。

此外,机构投资者比私人投资者可以根据自己的资源和经验更好地对管理层实施有效的监督机制。

罗斯《公司理财》第9版笔记和课后习题（含考研真题）详解[视频详解]第31章跨国公司财务31.1复习笔记随着经济全球化的发展，跨国公司越来越多。

跨国公司经营必须考虑各种因素，其中包括外币汇率、各国不同的利率、国外经营所用的复杂会计方法、外国税率和外国政府的干涉等等。

公司财务的基本原理仍然适用于跨国公司。

外汇问题是跨国财务中最重要、最复杂的难题。

当跨国公司进行资本预算决策或融资决策时，外汇市场能为其提供信息和机会。

外汇、利率和通货膨胀三者的相互关系构成了汇率基本理论。

即：购买力平价理论、利率平价理论和预期理论。

跨国公司融资决策通常有以下三种基本途径：将本国货币用于国外经营业务、向投资所在国借贷和向第三国借贷。

三种途径各有优缺点。

1．有关专业术语（1）美国存托凭证（ADR）。

美国存托凭证是指在美国发行的一种代表外国股权的证券。

外国公司运用以美元发行的ADR实现外国股票在美国上市交易，来吸引更多的潜在的美国投资者群体。

这些ADR通常由投资银行持有并为其做市，它以两种形式存在：一是在交易所挂牌交易的ADR，称为公司保荐形式；另一种是非保荐形式。

这两种形式的ADR均可由个人投资和买卖。

ADR解决了美国与国外证券交易制度、惯例、语言、外汇管理等不尽相同所造成的交易上的困难，是外国公司在美国市场上筹资的重要金融工具，同时也是美国投资者最广泛接受的外国证券形式。

（2）交叉汇率。

交叉汇率是指两种货币之间（通常都不是美元）通过第三种货币联系起来的汇率。

美元是决定交叉汇率的中介货币。

例如，如果投资者想卖出日元买进瑞士法郎，他可能先卖出日元买入美元，随后又卖出美元买入瑞士法郎。

所以，虽然该交易只涉及日元与瑞士法郎，但是美元汇率起到了基准作用。

（3）欧洲货币单位。

欧洲货币单位是指1979年设计的由10种欧洲货币组成的一揽子货币，它是欧洲货币体系（EMS）的货币单位。

根据章程，EMS成员国每五年或者当出现某种货币权重发生25％或以上的变动时，都要重新估算一次ECU的组成。

罗斯《公司理财》第9版笔记和课后习题（含考研真题）详解[视频详解]第1章公司理财导论[视频讲解]1.1复习笔记公司的首要目标——股东财富最大化决定了公司理财的目标。

公司理财研究的是稀缺资金如何在企业和市场内进行有效配置，它是在股份有限公司已成为现代企业制度最主要组织形式的时代背景下，就公司经营过程中的资金运动进行预测、组织、协调、分析和控制的一种决策与管理活动。

从决策角度来讲，公司理财的决策内容包括投资决策、筹资决策、股利决策和净流动资金决策；从管理角度来讲，公司理财的管理职能主要是指对资金筹集和资金投放的管理。

公司理财的基本内容包括：投资决策（资本预算）、融资决策（资本结构）、短期财务管理（营运资本）。

1．资产负债表资产负债表是总括反映企业某一特定日期财务状况的会计报表，它是根据资产、负债和所有者权益之间的相互关系，按照一定的分类标准和一定的顺序，把企业一定日期的资产、负债和所有者权益各项目予以适当排列，并对日常工作中形成的大量数据进行高度浓缩整理后编制而成的。

资产负债表可以反映资本预算、资本支出、资本结构以及经营中的现金流量管理等方面的内容。

2．资本结构资本结构是指企业各种资本的构成及其比例关系，它有广义和狭义之分。

广义资本结构，亦称财务结构，指企业全部资本的构成，既包括长期资本，也包括短期资本（主要指短期债务资本）。

狭义资本结构，主要指企业长期资本的构成，而不包括短期资本。

通常人们将资本结构表示为债务资本与权益资本的比例关系（D/E）或债务资本在总资本的构成（D/A）。

准确地讲，企业的资本结构应定义为有偿负债与所有者权益的比例。

资本结构是由企业采用各种筹资方式筹集资本形成的。

筹资方式的选择及组合决定着企业资本结构及其变化。

资本结构是企业筹资决策的核心问题。

企业应综合考虑影响资本结构的因素，运用适当方法优化资本结构，从而实现最佳资本结构。

资本结构优化有利于降低资本成本，获取财务杠杆利益。

3．财务经理财务经理是公司管理团队中的重要成员，其主要职责是通过资本预算、融资和资产流动性管理为公司创造价值。