Essentials of Financial Management 3rd Edition by Eugene F. Brigham - Test Bank Instant Download - Complete Test Bank With Answers Sample Questions Are Posted Below CHAPTER 5 TIME VALUE OF MONEY (Difficulty Levels: Easy, Easy/Medium, Medium, Medium/Hard, and Hard) Note that there is some overlap between the T/F …
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Essentials of Financial Management 3rd Edition by Eugene F. Brigham – Test Bank
Instant Download – Complete Test Bank With Answers
Sample Questions Are Posted Below
CHAPTER 5TIME VALUE OF MONEY |
(Difficulty Levels: Easy, Easy/Medium, Medium, Medium/Hard, and Hard)
Note that there is some overlap between the T/F and the multiple choice questions, as some T/F statements are used in the MC questions. See the preface for information on the AACSB letter indicators (F, M, etc.) on the subject lines.
(5-2) Compounding F J Answer: a EASY
[1]. Starting to invest early for retirement increases the benefits of compound interest.
(5-2) Compounding F J Answer: b EASY
[2]. Starting to invest early for retirement reduces the benefits of compound interest.
(5-2) Compounding F J Answer: a EASY
[3]. A time line is meaningful even if all cash flows do not occur annually.
(5-2) Compounding F J Answer: b EASY
[4]. A time line is not meaningful unless all cash flows occur annually.
(5-2) Compounding F J Answer: a EASY
[5]. Time lines can be constructed in situations where some of the cash flows occur annually but others occur quarterly.
(5-2) Compounding F J Answer: b EASY
[6]. Time lines cannot be constructed in situations where some of the cash flows occur annually but others occur quarterly.
(5-2) Compounding F J Answer: a EASY
[7]. Time lines can be constructed for annuities where the payments occur at either the beginning or the end of the periods.
(5-2) Compounding F J Answer: b EASY
[8]. Time lines cannot be constructed for annuities unless all the payments occur at the end of the periods.
(5-2) Compounding F J Answer: a EASY
[9]. Some of the cash flows shown on a time line can be in the form of annuity payments while others can be uneven amounts.
(5-2) Compounding F J Answer: b EASY
[10]. Some of the cash flows shown on a time line can be in the form of annuity payments but none can be uneven amounts.
(5-3) PV versus FV C J Answer: b EASY
[11]. If the discount (or interest) rate is positive, the present value of an expected series of payments will always exceed the future value of the same series.
(5-3) PV versus FV C J Answer: a EASY
[12]. If the discount (or interest) rate is positive, the future value of an expected series of payments will always exceed the present value of the same series.
(5-3) PV versus FV C J Answer: a EASY
[13]. Disregarding risk, if money has time value, it is impossible for the present value of a given sum to exceed its future value.
(5-3) PV versus FV C J Answer: b EASY
[14]. Disregarding risk, if money has time value, it is impossible for the future value of a given sum to exceed its present value.
(5-16) Effective annual rate C J Answer: b EASY
[15]. If a bank compounds savings accounts quarterly, the nominal rate will exceed the effective annual rate.
(5-16) Effective annual rate C J Answer: a EASY
[16]. If a bank compounds savings accounts quarterly, the effective annual rate will exceed the nominal rate.
(5-2) Compounding C J Answer: b MEDIUM
[17]. The greater the number of compounding periods within a year, then (1) the greater the future value of a lump sum investment at Time 0 and (2) the greater the present value of a given lump sum to be received at some future date.
(5-2) Compounding C J Answer: a MEDIUM
[18]. The greater the number of compounding periods within a year, then (1) the greater the future value of a lump sum investment at Time 0 and (2) the smaller the present value of a given lump sum to be received at some future date.
(5-2) Comparative compounding C J Answer: a MEDIUM
[19]. Suppose Sally Smith plans to invest $1,000. She can earn an effective annual rate of 5% on Security A, while Security B has an effective annual rate of 12%. After 11 years, the compounded value of Security B should be more than twice the compounded value of Security A. (Ignore risk, and assume that compounding occurs annually.)
(5-2) Comparative compounding C J Answer: b MEDIUM
[20]. Suppose Randy Jones plans to invest $1,000. He can earn an effective annual rate of 5% on Security A, while Security B has an effective annual rate of 12%. After 11 years, the compounded value of Security B should be somewhat less than twice the compounded value of Security A. (Ignore risk, and assume that compounding occurs annually.)
(5-3) PV of a sum C J Answer: a MEDIUM
[21]. The present value of a future sum decreases as either the discount rate or the number of periods per year increases, other things held constant.
(5-3) PV of a sum C J Answer: b MEDIUM
[22]. The present value of a future sum increases as either the discount rate or the number of periods per year increases, other things held constant.
(5-9) PV of an annuity C J Answer: a MEDIUM
[23]. All other things held constant, the present value of a given annual annuity decreases as the number of periods per year increases.
(5-9) PV of an annuity C J Answer: b MEDIUM
[24]. All other things held constant, the present value of a given annual annuity increases as the number of periods per year increases.
(5-15) Periodic and nominal rates C J Answer: a MEDIUM
[25]. If we are given a periodic interest rate, say a monthly rate, we can find the nominal annual rate by multiplying the periodic rate by the number of periods per year.
(5-15) Periodic and nominal rates C J Answer: b MEDIUM
[26]. If we are given a periodic interest rate, say a monthly rate, we can find the nominal annual rate by dividing the periodic rate by the number of periods per year.
(5-16) Effective and nominal rates C J Answer: a MEDIUM
[27]. As a result of compounding, the effective annual rate on a bank deposit (or a loan) is always equal to or greater than the nominal rate on the deposit (or loan).
(5-16) Effective and nominal rates C J Answer: b MEDIUM
[28]. As a result of compounding, the effective annual rate on a bank deposit (or a loan) is always equal to or less than the nominal rate on the deposit (or loan).
(5-18) Amortization C J Answer: b MEDIUM
[29]. When a loan is amortized, a relatively high percentage of the payment goes to reduce the outstanding principal in the early years, and the principal repayment’s percentage declines in the loan’s later years.
(5-18) Amortization C J Answer: a MEDIUM
[30]. When a loan is amortized, a relatively low percentage of the payment goes to reduce the outstanding principal in the early years, and the principal repayment’s percentage increases in the loan’s later years.
(5-18) Amortization C J Answer: a MEDIUM
[31]. The payment made each period on an amortized loan is constant, and it consists of some interest and some principal. The closer we are to the end of the loan’s life, the greater the percentage of the payment that will be a repayment of principal.
(5-18) Amortization C J Answer: b MEDIUM
[32]. The payment made each period on an amortized loan is constant, and it consists of some interest and some principal. The closer we are to the end of the loan’s life, the smaller the percentage of the payment that will be a repayment of principal.
(5-18) Amortization C J Answer: b HARD
[33]. Midway through the life of an amortized loan, the percentage of the payment that represents interest must be equal to the percentage that represents repayment of principal. This is true regardless of the original life of the loan or the interest rate on the loan.
(5-18) Amortization C J Answer: a HARD
[34]. Midway through the life of an amortized loan, the percentage of the payment that represents interest could be equal to, less than, or greater than to the percentage that represents repayment of principal. The proportions depend on the original life of the loan and the interest rate.
The correct answers to most of these questions can be determined without doing any calculations, but calculations are required for a few of them, and calculations are useful to confirm the answers to others. You can see from the answer where calculations are required. Those questions generally take students longer to answer.
(5-1) Time lines F J Answer: b MEDIUM
[35]. Which of the following statements is CORRECT?
(5-1) Time lines F J Answer: d MEDIUM
[36]. Which of the following statements is CORRECT?
(5-1) Time lines F J Answer: c MEDIUM
[37]. Which of the following statements is CORRECT?
(5-1) Time lines F J Answer: e MEDIUM
[38]. Which of the following statements is CORRECT?
(5-3) Effects of factors on PVs C J Answer: b MEDIUM
[39]. You plan to analyze the value of a potential investment by calculating the sum of the present values of its expected cash flows. Which of the following would lower the calculated value of the investment?
(5-3) Effects of factors on PVs C J Answer: b MEDIUM
[40]. You plan to analyze the value of a potential investment by calculating the sum of the present values of its expected cash flows. Which of the following would increase the calculated value of the investment?
(5-6) Annuities F J Answer: d MEDIUM
[41]. Which of the following statements is CORRECT?
(5-6) Annuities F J Answer: c MEDIUM
[42]. Which of the following statements is CORRECT?
(5-16) Quarterly compounding C J Answer: c MEDIUM
[43]. Your bank account pays a 6% nominal rate of interest. The interest is compounded quarterly. Which of the following statements is CORRECT?
(5-16) Quarterly compounding C J Answer: d MEDIUM
[44]. Your bank account pays an 8% nominal rate of interest. The interest is compounded quarterly. Which of the following statements is CORRECT?
(5-18) Amortization C J Answer: c MEDIUM
[45]. A $50,000 loan is to be amortized over 7 years, with annual end-of-year payments. Which of these statements is CORRECT?
(5-18) Amortization C J Answer: d MEDIUM
[46]. A $150,000 loan is to be amortized over 7 years, with annual end-of-year payments. Which of these statements is CORRECT?
(5-18) Amortization C J Answer: b MEDIUM
[47]. Which of the following statements regarding a 15-year (180-month) $125,000, fixed-rate mortgage is CORRECT? (Ignore taxes and transactions costs.)
(5-18) Amortization C J Answer: e MEDIUM
[48]. Which of the following statements regarding a 15-year (180-month) $125,000, fixed-rate mortgage is CORRECT? (Ignore taxes and transactions costs.)
(5-18) Amortization C J Answer: b MEDIUM
[49]. Which of the following statements regarding a 30-year monthly payment amortized mortgage with a nominal interest rate of 10% is CORRECT?
(5-18) Amortization C J Answer: b MEDIUM
[50]. Which of the following statements regarding a 30-year monthly payment amortized mortgage with a nominal interest rate of 10% is CORRECT?
(Comp.) Time value concepts C J Answer: a MEDIUM
[51]. Which of the following investments would have the highest future value at the end of 10 years? Assume that the effective annual rate for all investments is the same and is greater than zero.
(Comp.) Time value concepts C J Answer: d MEDIUM
[52]. Which of the following investments would have the lowest present value? Assume that the effective annual rate for all investments is the same and is greater than zero.
(Comp.) Time value concepts C J Answer: d MEDIUM
[53]. A U.S. Treasury bond will pay a lump sum of $1,000 exactly 3 years from today. The nominal interest rate is 6%, semiannual compounding. Which of the following statements is CORRECT?
(Comp.) Time value concepts C J Answer: e MEDIUM
[54]. A U.S. Treasury bond will pay a lump sum of $1,000 exactly 3 years from today. The nominal interest rate is 6%, semiannual compounding. Which of the following statements is CORRECT?
(Comp.) Time value concepts C J Answer: c MEDIUM
[55]. Which of the following statements is CORRECT, assuming positive interest rates and holding other things constant?
(Comp.) Time value concepts C J Answer: d MEDIUM
[56]. Which of the following statements is CORRECT, assuming positive interest rates and holding other things constant?
(Comp.) Time value concepts C J Answer: a MEDIUM
[57]. Which of the following statements is CORRECT?
(Comp.) Time value concepts C J Answer: b MEDIUM
[58]. Which of the following statements is CORRECT?
(Comp.) Annuities C J Answer: d MEDIUM
[59]. You are considering two equally risky annuities, each of which pays $5,000 per year for 10 years. Investment ORD is an ordinary (or deferred) annuity, while Investment DUE is an annuity due. Which of the following statements is CORRECT?
(Comp.) Annuities C J Answer: a MEDIUM
[60]. You are considering two equally risky annuities, each of which pays $5,000 per year for 10 years. Investment ORD is an ordinary (or deferred) annuity, while Investment DUE is an annuity due. Which of the following statements is CORRECT?
(5-14) Solving for I: uneven CFs C J Answer: c HARD
[61]. Which of the following statements is CORRECT?
(5-14) Solving for I: uneven CFs C J Answer: e HARD
[62]. Which of the following statements is CORRECT?
(5-16) Effective annual rate C J Answer: e HARD
[63]. Which of the following bank accounts has the highest effective annual return?
(5-16) Effective annual rate C J Answer: d HARD
[64]. Which of the following bank accounts has the lowest effective annual return?
(5-16) Effective annual rate C J Answer: e HARD
[65]. You plan to invest some money in a bank account. Which of the following banks provides you with the highest effective rate of interest?
(5-2) FV of a lump sum C J Answer: d EASY
[66]. Sue now has $125. How much would she have after 8 years if she leaves it invested at 8.5% with annual compounding?
(5-2) FV of a lump sum C J Answer: d EASY
[67]. Jose now has $500. How much would he have after 6 years if he leaves it invested at 5.5% with annual compounding?
(5-2) FV of a lump sum C J Answer: a EASY
[68]. Suppose you have $1,500 and plan to purchase a 5-year certificate of deposit (CD) that pays 3.5% interest, compounded annually. How much will you have when the CD matures?
(5-2) FV of a lump sum C J Answer: a EASY
[69]. Suppose you have $2,000 and plan to purchase a 10-year certificate of deposit (CD) that pays 6.5% interest, compounded annually. How much will you have when the CD matures?
(5-2) FV of a lump sum C J Answer: c EASY
[70]. Last year Rocco Corporation’s sales were $225 million. If sales grow at 6% per year, how large (in millions) will they be 5 years later?
(5-2) FV of a lump sum C J Answer: c EASY
[71]. Last year Dania Corporation’s sales were $525 million. If sales grow at 7.5% per year, how large (in millions) will they be 8 years later?
(5-2) FV of a lump sum C J Answer: b EASY
[72]. How much would $1, growing at 3.5% per year, be worth after 75 years?
(5-2) FV of a lump sum C J Answer: b EASY
[73]. How much would $100, growing at 5% per year, be worth after 75 years?
(5-2) FV of a lump sum C J Answer: b EASY
[74]. You deposit $1,000 today in a savings account that pays 3.5% interest, compounded annually. How much will your account be worth at the end of 25 years?
(5-2) FV of a lump sum C J Answer: b EASY
[75]. You deposit $500 today in a savings account that pays 3.5% interest, compounded annually. How much will your account be worth at the end of 25 years?
(5-3) PV of a lump sum C J Answer: a EASY
[76]. Suppose a State of New York bond will pay $1,000 ten years from now. If the going interest rate on these 10-year bonds is 5.5%, how much is the bond worth today?
(5-3) PV of a lump sum C J Answer: a EASY
[77]. Suppose a State of California bond will pay $1,000 eight years from now. If the going interest rate on these 8-year bonds is 5.5%, how much is the bond worth today?
(5-3) PV of a lump sum C J Answer: e EASY
[78]. How much would $20,000 due in 50 years be worth today if the discount rate were 7.5%?
(5-3) PV of a lump sum C J Answer: e EASY
[79]. How much would $5,000 due in 25 years be worth today if the discount rate were 5.5%?
(5-3) PV of a lump sum C J Answer: b EASY
[80]. Suppose a U.S. treasury bond will pay $2,500 five years from now. If the going interest rate on 5-year treasury bonds is 4.25%, how much is the bond worth today?
(5-3) PV of a lump sum C J Answer: b EASY
[81]. Suppose an Exxon Corporation bond will pay $4,500 ten years from now. If the going interest rate on safe 10-year bonds is 4.25%, how much is the bond worth today?
(5-4) Finding I C J Answer: d EASY
[82]. Suppose the U.S. Treasury offers to sell you a bond for $747.25. No payments will be made until the bond matures 5 years from now, at which time it will be redeemed for $1,000. What interest rate would you earn if you bought this bond at the offer price?
(5-4) Finding I C J Answer: d EASY
[83]. Suppose the U.S. Treasury offers to sell you a bond for $3,000. No payments will be made until the bond matures 10 years from now, at which time it will be redeemed for $5,000. What interest rate would you earn if you bought this bond at the offer price?
(5-4) Growth rate C J Answer: b EASY
[84]. Ten years ago, Lucas Inc. earned $0.50 per share. Its earnings this year were $2.20. What was the growth rate in earnings per share (EPS) over the 10-year period?
(5-4) Growth rate C J Answer: b EASY
[85]. Five years ago, Weed Go Inc. earned $1.50 per share. Its earnings this year were $3.20. What was the growth rate in earnings per share (EPS) over the 5-year period?
(5-5) Finding N C J Answer: e EASY
[86]. Janice has $5,000 invested in a bank that pays 3.8% annually. How long will it take for her funds to triple?
(5-5) Finding N C J Answer: e EASY
[87]. Bob has $2,500 invested in a bank that pays 4% annually. How long will it take for his funds to double?
(5-5) Finding N C J Answer: d EASY
[88]. Last year Thomson Inc’s earnings per share were $3.50, and its growth rate during the prior 5 years was 9.0% per year. If that growth rate were maintained, how many years would it take for Thomson’s EPS to triple?
(5-5) Finding N C J Answer: e EASY
[89]. You plan to invest in securities that pay 8.0%, compounded annually. If you invest $5,000 today, how many years will it take for your investment to grow to $9,140.20?
(5-5) Finding N C J Answer: e EASY
[90]. You plan to invest in bonds that pay 6.0%, compounded annually. If you invest $10,000 today, how many years will it take for your investment to grow to $30,000?
(5-7) FV of ordinary annuity C J Answer: c EASY
[91]. You want to buy a new sports car 3 years from now, and you plan to save $4,200 per year, beginning one year from today. You will deposit your savings in an account that pays 5.2% interest. How much will you have just after you make the 3rd deposit, 3 years from now?
(5-7) FV of ordinary annuity C J Answer: c EASY
[92]. You want to buy a new ski boat 2 years from now, and you plan to save $8,200 per year, beginning one year from today. You will deposit your savings in an account that pays 6.2% interest. How much will you have just after you make the 2nd deposit, 2 years from now?
(5-7) FV of ordinary annuity C J Answer: a EASY
[93]. You want to go to Europe 5 years from now, and you can save $3,100 per year, beginning one year from today. You plan to deposit the funds in a mutual fund that you think will return 8.5% per year. Under these conditions, how much would you have just after you make the 5th deposit, 5 years from now?
(5-8) FV of annuity due C J Answer: a EASY
[94]. You want to quit your job and go back to school for a law degree 4 years from now, and you plan to save $3,500 per year, beginning immediately. You will make 4 deposits in an account that pays 5.7% interest. Under these assumptions, how much will you have 4 years from today?
(5-8) FV of annuity due C J Answer: c EASY
[95]. You want to quit your job and return to school for an MBA degree 3 years from now, and you plan to save $7,000 per year, beginning immediately. You will make 3 deposits in an account that pays 5.2% interest. Under these assumptions, how much will you have 3 years from today?
(5-9) PV of ordinary annuity C J Answer: e EASY
[96]. What is the PV of an ordinary annuity with 10 payments of $2,700 if the appropriate interest rate is 5.5%?
(5-9) PV of ordinary annuity C J Answer: e EASY
[97]. What is the PV of an ordinary annuity with 5 payments of $4,700 if the appropriate interest rate is 4.5%?
(5-9) PV of ordinary annuity C J Answer: e EASY
[98]. You have a chance to buy an annuity that pays $2,500 at the end of each year for 3 years. You could earn 5.5% on your money in other investments with equal risk. What is the most you should pay for the annuity?
(5-9) PV of ordinary annuity C J Answer: e EASY
[99]. You just inherited some money, and a broker offers to sell you an annuity that pays $5,000 at the end of each year for 20 years. You could earn 5% on your money in other investments with equal risk. What is the most you should pay for the annuity?
(5-9) PV of ordinary annuity C J Answer: b EASY
[100]. Your aunt is about to retire, and she wants to sell some of her stock and buy an annuity that will provide her with income of $50,000 per year for 30 years, beginning a year from today. The going rate on such annuities is 7.25%. How much would it cost her to buy such an annuity today?
(5-9) PV of annuity due C J Answer: a EASY
[101]. What is the PV of an annuity due with 5 payments of $2,500 at an interest rate of 5.5%?
(5-11) PV of a perpetuity C J Answer: b EASY
[102]. What’s the present value of a perpetuity that pays $250 per year if the appropriate interest rate is 5%?
(5-11) Return on a perpetuity C J Answer: a EASY
[103]. What’s the rate of return you would earn if you paid $950 for a perpetuity that pays $85 per year?
(5-9) PV of annuity due C J Answer: c MEDIUM
[104]. You have a chance to buy an annuity that pays $550 at the beginning of each year for 3 years. You could earn 5.5% on your money in other investments with equal risk. What is the most you should pay for the annuity?
(5-9) PV of annuity due C J Answer: c MEDIUM
[105]. You have a chance to buy an annuity that pays $5,000 at the beginning of each year for 5 years. You could earn 4.5% on your money in other investments with equal risk. What is the most you should pay for the annuity?
(5-9) PV of annuity due C J Answer: d MEDIUM
[106]. Your uncle is about to retire, and he wants to buy an annuity that will provide him with $75,000 of income a year for 20 years, with the first payment coming immediately. The going rate on such annuities is 5.25%. How much would it cost him to buy the annuity today?
(5-9) PV of annuity due C J Answer: d MEDIUM
[107]. Your father is about to retire, and he wants to buy an annuity that will provide him with $85,000 of income a year for 25 years, with the first payment coming immediately. The going rate on such annuities is 5.15%. How much would it cost him to buy the annuity today?
(5-9) PV of annuity due C J Answer: b MEDIUM
[108]. You inherited an oil well that will pay you $25,000 per year for 25 years, with the first payment being made today. If you think a fair return on the well is 7.5%, how much should you ask for it if you decide to sell it?
(5-9) PV of annuity due C J Answer: b MEDIUM
[109]. Sam was injured in an accident, and the insurance company has offered him the choice of $25,000 per year for 15 years, with the first payment being made today, or a lump sum. If a fair return is 7.5%, how large must the lump sum be to leave him as well off financially as with the annuity?
(5-9) PV of ord. ann. & end. pmt. C J Answer: e MEDIUM
[110]. What’s the present value of a 4-year ordinary annuity of $2,250 per year plus an additional $3,000 at the end of Year 4 if the interest rate is 5%?
(5-10) Ord. annuity payments C J Answer: a MEDIUM
[111]. Suppose you inherited $275,000 and invested it at 8.25% per year. How much could you withdraw at the end of each of the next 20 years?
(5-10) Ord. annuity payments C J Answer: d MEDIUM
[112]. Your uncle has $375,000 and wants to retire. He expects to live for another 25 years and to earn 7.5% on his invested funds. How much could he withdraw at the end of each of the next 25 years and end up with zero in the account?
(5-10) Annuity due payments C J Answer: c MEDIUM
[113]. Your uncle has $375,000 and wants to retire. He expects to live for another 25 years, and he also expects to earn 7.5% on his invested funds. How much could he withdraw at the beginning of each of the next 25 years and end up with zero in the account?
(5-10) Annuity due payments C J Answer: c MEDIUM
[114]. Your grandmother just died and left you $100,000 in a trust fund that pays 6.5% interest. You must spend the money on your college education, and you must withdraw the money in 4 equal installments, beginning immediately. How much could you withdraw today and at the beginning of each of the next 3 years and end up with zero in the account?
(5-10) Annuity due payments C J Answer: d MEDIUM
[115]. Suppose you inherited $275,000 and invested it at 8.25% per year. How much could you withdraw at the beginning of each of the next 20 years?
(5-10) Finding annuity periods C J Answer: a MEDIUM
[116]. Your father’s employer was just acquired, and he was given a severance payment of $375,000, which he invested at a 7.5% annual rate. He now plans to retire, and he wants to withdraw $35,000 at the end of each year, starting at the end of this year. How many years will it take to exhaust his funds, i.e., run the account down to zero?
(5-10) Finding annuity periods C J Answer: b MEDIUM
[117]. Your uncle has $300,000 invested at 7.5%, and he now wants to retire. He wants to withdraw $35,000 at the end of each year, starting at the end of this year. He also wants to have $25,000 left to give you when he ceases to withdraw funds from the account. For how many years can he make the $35,000 withdrawals and still have $25,000 left in the end?
(5-10) Finding annuity due periods C J Answer: e MEDIUM
[118]. Your Aunt Ruth has $500,000 invested at 6.5%, and she plans to retire. She wants to withdraw $40,000 at the beginning of each year, starting immediately. How many years will it take to exhaust her funds, i.e., run the account down to zero?
(5-10) Finding annuity due periods C J Answer: c MEDIUM
[119]. Your aunt has $500,000 invested at 5.5%, and she now wants to retire. She wants to withdraw $45,000 at the beginning of each year, beginning immediately. She also wants to have $50,000 left to give you when she ceases to withdraw funds from the account. For how many years can she make the $45,000 withdrawals and still have $50,000 left in the end?
(5-10) Finding I: annuity C J Answer: b MEDIUM
[120]. Suppose you just won the state lottery, and you have a choice between receiving $2,550,000 today or a 20-year annuity of $250,000, with the first payment coming one year from today. What rate of return is built into the annuity? Disregard taxes.
(5-10) Finding I: annuity C J Answer: a MEDIUM
[121]. Your girlfriend just won the Florida lottery. She has the choice of $15,000,000 today or a 20-year annuity of $1,050,000, with the first payment coming one year from today. What rate of return is built into the annuity?
(5-10) Finding I: annuity due C J Answer: e MEDIUM
[122]. Assume that you own an annuity that will pay you $15,000 per year for 12 years, with the first payment being made today. You need money today to start a new business, and your uncle offers to give you $120,000 for the annuity. If you sell it, what rate of return would your uncle earn on his investment?
(5-11) Payments on a perpetuity C J Answer: b MEDIUM
[123]. What annual payment must you receive in order to earn a 6.5% rate of return on a perpetuity that has a cost of $1,250?
(5-12) PV of uneven cash flows C J Answer: e MEDIUM
[124]. What is the present value of the following cash flow stream at a rate of 6.25%?
Years: 0 1 2 3 4
| | | | |
CFs: $0 $75 $225 $0 $300
(5-12) PV of uneven cash flows C J Answer: c MEDIUM
[125]. What is the present value of the following cash flow stream at a rate of 12.0%?
Years: 0 1 2 3 4
| | | | |
CFs: $0 $1,500 $3,000 $4,500 $6,000
(5-12) PV of uneven cash flows C J Answer: d MEDIUM
[126]. What is the present value of the following cash flow stream at a rate of 8.0%?
Years: 0 1 2 3
| | | |
CFs: $750 $2,450 $3,175 $4,400
(5-12) PV of uneven cash flows C J Answer: a MEDIUM
[127]. You sold a car and accepted a note with the following cash flow stream as your payment. What was the effective price you received for the car assuming an interest rate of 6.0%?
Years: 0 1 2 3 4
| | | | |
CFs: $0 $1,000 $2,000 $2,000 $2,000
(5-13) FV of uneven cash flows C J Answer: e MEDIUM
[128]. At a rate of 6.5%, what is the future value of the following cash flow stream?
Years: 0 1 2 3 4
| | | | |
CFs: $0 $75 $225 $0 $300
(5-14) Rate in uneven cash flows C J Answer: c MEDIUM
[129]. Your father paid $10,000 (CF at t = 0) for an investment that promises to pay $750 at the end of each of the next 5 years, then an additional lump sum payment of $10,000 at the end of the 5th year. What is the expected rate of return on this investment?
(5-14) Rate in uneven cash flows C J Answer: e MEDIUM
[130]. You are offered a chance to buy an asset for $7,250 that is expected to produce cash flows of $750 at the end of Year 1, $1,000 at the end of Year 2, $850 at the end of Year 3, and $6,250 at the end of Year 4. What rate of return would you earn if you bought this asset?
(5-15) FV, semiannual compounding C J Answer: c MEDIUM
[131]. What’s the future value of $1,500 after 5 years if the appropriate interest rate is 6%, compounded semiannually?
(5-15) FV, semiannual compounding C J Answer: d MEDIUM
[132]. What’s the present value of $4,500 discounted back 5 years if the appropriate interest rate is 4.5%, compounded semiannually?
(5-15) FV, monthly compounding C J Answer: b MEDIUM
[133]. What’s the future value of $1,200 after 5 years if the appropriate interest rate is 6%, compounded monthly?
(5-15) PV, monthly compounding C J Answer: d MEDIUM
[134]. What’s the present value of $1,525 discounted back 5 years if the appropriate interest rate is 6%, compounded monthly?
(5-16) APR vs. EFF% C J Answer: b MEDIUM
[135]. Master Card and other credit card issuers must by law print the Annual Percentage Rate (APR) on their monthly statements. If the APR is stated to be 18.00%, with interest paid monthly, what is the card’s EFF%?
(5-16) Comparing EFF% C J Answer: d MEDIUM
[136]. Riverside Bank offers to lend you $50,000 at a nominal rate of 6.5%, compounded monthly. The loan (principal plus interest) must be repaid at the end of the year. Midwest Bank also offers to lend you the $50,000, but it will charge an annual rate of 7.0%, with no interest due until the end of the year. How much higher or lower is the effective annual rate charged by Midwest versus the rate charged by Riverside?
(5-16) Nominal rate vs. EFF% C J Answer: a MEDIUM
[137]. Suppose Community Bank offers to lend you $10,000 for one year at a nominal annual rate of 8.00%, but you must make interest payments at the end of each quarter and then pay off the $10,000 principal amount at the end of the year. What is the effective annual rate on the loan?
(5-16) Nominal rate vs. EFF% C J Answer: e MEDIUM
[138]. Suppose a bank offers to lend you $10,000 for 1 year on a loan contract that calls for you to make interest payments of $250.00 at the end of each quarter and then pay off the principal amount at the end of the year. What is the effective annual rate on the loan?
(5-16) Nominal rate vs. EFF% C J Answer: c MEDIUM
[139]. Charter Bank pays a 4.50% nominal rate on deposits, with monthly compounding. What effective annual rate (EFF%) does the bank pay?
(5-16) Nominal rate vs. EFF% C J Answer: b MEDIUM
[140]. Suppose your credit card issuer states that it charges a 15.00% nominal annual rate, but you must make monthly payments, which amounts to monthly compounding. What is the effective annual rate?
(5-17) Simple interest C J Answer: a MEDIUM
[141]. Pace Co. borrowed $20,000 at a rate of 7.25%, simple interest, with interest paid at the end of each month. The bank uses a 360-day year. How much interest would Pace have to pay in a 30-day month?
(5-17) Fractional time periods C J Answer: a MEDIUM
[142]. Suppose you deposited $5,000 in a bank account that pays 5.25% with daily compounding based on a 360-day year. How much would be in the account after 8 months, assuming each month has 30 days?
(5-18) Amortization: payment C J Answer: a MEDIUM
[143]. Suppose you borrowed $12,000 at a rate of 9.0% and must repay it in 4 equal installments at the end of each of the next 4 years. How large would your payments be?
(5-18) Amortization: payment C J Answer: c MEDIUM
[144]. Suppose you are buying your first condo for $145,000, and you will make a $15,000 down payment. You have arranged to finance the remainder with a 30-year, monthly payment, amortized mortgage at a 6.5% nominal interest rate, with the first payment due in one month. What will your monthly payments be?
(5-18) Amortization: payment C J Answer: e MEDIUM
[145]. Your uncle will sell you his bicycle shop for $250,000, with “seller financing,” at a 6.0% nominal annual rate. The terms of the loan would require you to make 12 equal end-of-month payments per year for 4 years, and then make an additional final (balloon) payment of $50,000 at the end of the last month. What would your equal monthly payments be?
(5-18) Amortization: interest C J Answer: d MEDIUM
[146]. Suppose you borrowed $14,000 at a rate of 10.0% and must repay it in 5 equal installments at the end of each of the next 5 years. How much interest would you have to pay in the first year?
(5-18) Amortization: interest C J Answer: d MEDIUM
[147]. You plan to borrow $35,000 at a 7.5% annual interest rate. The terms require you to amortize the loan with 7 equal end-of-year payments. How much interest would you be paying in Year 2?
(5-18) Amortization: interest C J Answer: b MEDIUM
[148]. Your bank offers to lend you $100,000 at an 8.5% annual interest rate to start your new business. The terms require you to amortize the loan with 10 equal end-of-year payments. How much interest would you be paying in Year 2?
(Comp.) N, ann. due, monthly comp. C J Answer: d MEDIUM
[149]. You are considering an investment in a Third World bank account that pays a nominal annual rate of 18%, compounded monthly. If you invest $5,000 at the beginning of each month, how many months would it take for your account to grow to $250,000? Round fractional months up.
(Comp.) N, ann. due, monthly comp. C J Answer: b MEDIUM
[150]. You are considering investing in a bank account that pays a nominal annual rate of 7%, compounded monthly. If you invest $3,000 at the end of each month, how many months will it take for your account to grow to $150,000?
(Comp.) Rate, ord. ann., monthly comp. C J Answer: d MEDIUM
[151]. Your child’s orthodontist offers you two alternative payment plans. The first plan requires a $4,000 immediate up-front payment. The second plan requires you to make monthly payments of $137.41, payable at the end of each month for 3 years. What nominal annual interest rate is built into the monthly payment plan?
(5-10) N, lifetime vs. yearly C J Answer: e MEDIUM/HARD
[152]. Your subscription to Investing Wisely Weekly is about to expire. You plan to subscribe to the magazine for the rest of your life, and you can renew it by paying $85 annually, beginning immediately, or you can get a lifetime subscription for $850, also payable immediately. Assuming that you can earn 6.0% on your funds and that the annual renewal rate will remain constant, how many years must you live to make the lifetime subscription the better buy?
(5-15) Non-annual compounding C J Answer: b MEDIUM/HARD
[153]. You just deposited $2,500 in a bank account that pays a 4.0% nominal interest rate, compounded quarterly. If you also add another $5,000 to the account one year (4 quarters) from now and another $7,500 to the account two years (8 quarters) from now, how much will be in the account three years (12 quarters) from now?
(5-16) Comparing EFF% C J Answer: d MEDIUM/HARD
[154]. Farmers Bank offers to lend you $50,000 at a nominal rate of 5.0%, simple interest, with interest paid quarterly. Merchants Bank offers to lend you the $50,000, but it will charge 6.0%, simple interest, with interest paid at the end of the year. What’s the difference in the effective annual rates charged by the two banks?
(5-18) Amortization: princ. repymt. C J Answer: b MEDIUM/HARD
[155]. Suppose you borrowed $15,000 at a rate of 8.5% and must repay it in 5 equal installments at the end of each of the next 5 years. By how much would you reduce the amount you owe in the first year?
(5-18) Amortization: ending bal. C J Answer: e MEDIUM/HARD
[156]. Suppose you borrowed $15,000 at a rate of 8.5% and must repay it in 5 equal installments at the end of each of the next 5 years. How much would you still owe at the end of the first year, after you have made the first payment?
(Comp.) Retirement planning C J Answer: c MEDIUM/HARD
[157]. Your sister turned 35 today, and she is planning to save $7,000 per year for retirement, with the first deposit to be made one year from today. She will invest in a mutual fund that’s expected to provide a return of 7.5% per year. She plans to retire 30 years from today, when she turns 65, and she expects to live for 25 years after retirement, to age 90. Under these assumptions, how much can she spend each year after she retires? Her first withdrawal will be made at the end of her first retirement year.
(5-10) Finding I: annuity due C J Answer: a HARD
[158]. You agree to make 24 deposits of $500 at the beginning of each month into a bank account. At the end of the 24th month, you will have $13,000 in your account. If the bank compounds interest monthly, what nominal annual interest rate will you be earning?
(5-18) Amortization C J Answer: e HARD
[159]. Your company has just taken out a 1-year installment loan for $72,500 at a nominal rate of 11.0% but with equal end-of-month payments. What percentage of the 2nd monthly payment will go toward the repayment of principal?
(5-18) Amortization: interest C J Answer: a HARD
[160]. On January 1, 2010, your brother’s business obtained a 30-year amortized mortgage loan for $250,000 at a nominal annual rate of 7.0%, with 360 end-of-month payments. The firm can deduct the interest paid for tax purposes. What will the interest tax deduction be for 2010?
(Comp.) Retirement planning C J Answer: a HARD
[161]. Steve and Ed are cousins who were both born on the same day, and both turned 25 today. Their grandfather began putting $2,500 per year into a trust fund for Steve on his 20th birthday, and he just made a 6th payment into the fund. The grandfather (or his estate’s trustee) will make 40 more $2,500 payments until a 46th and final payment is made on Steve’s 65th birthday. The grandfather set things up this way because he wants Steve to work, not be a “trust fund baby,” but he also wants to ensure that Steve is provided for in his old age.
Until now, the grandfather has been disappointed with Ed, hence has not given him anything. However, they recently reconciled, and the grandfather decided to make an equivalent provision for Ed. He will make the first payment to a trust for Ed today, and he has instructed his trustee to make 40 additional equal annual payments until Ed turns 65, when the 41st and final payment will be made. If both trusts earn an annual return of 8%, how much must the grandfather put into Ed’s trust today and each subsequent year to enable him to have the same retirement nest egg as Steve after the last payment is made on their 65th birthday?
(Comp.) FV comb. CF lump sum & ann. C J Answer: d HARD
[162]. After graduation, you plan to work for Dynamo Corporation for 12 years and then start your own business. You expect to save and deposit $7,500 a year for the first 6 years (t = 1 through t = 6) and $15,000 annually for the following 6 years (t = 7 through t = 12). The first deposit will be made a year from today. In addition, your grandfather just gave you a $25,000 graduation gift which you will deposit immediately (t = 0). If the account earns 9% compounded annually, how much will you have when you start your business 12 years from now?
(Comp.) CF for given return C J Answer: c HARD
[163]. You are negotiating to make a 7-year loan of $25,000 to Breck Inc. To repay you, Breck will pay $2,500 at the end of Year 1, $5,000 at the end of Year 2, and $7,500 at the end of Year 3, plus a fixed but currently unspecified cash flow, X, at the end of each year from Year 4 through Year 7. Breck is essentially riskless, so you are confident the payments will be made. You regard 8% as an appropriate rate of return on a low risk but illiquid 7-year loan. What cash flow must the investment provide at the end of each of the final 4 years, that is, what is X?
(Comp.) Saving for college C J Answer: e HARD
[164]. John and Daphne are saving for their daughter Ellen’s college education. Ellen just turned 10 (at t = 0), and she will be entering college 8 years from now (at t = 8). College tuition and expenses at State U. are currently $14,500 a year, but they are expected to increase at a rate of 3.5% a year. Ellen should graduate in 4 years–if she takes longer or wants to go to graduate school, she will be on her own. Tuition and other costs will be due at the beginning of each school year (at t = 8, 9, 10, and 11).
So far, John and Daphne have accumulated $15,000 in their college savings account (at t = 0). Their long-run financial plan is to add an additional $5,000 in each of the next 4 years (at t = 1, 2, 3, and 4). Then they plan to make 3 equal annual contributions in each of the following years, t = 5, 6, and 7. They expect their investment account to earn 9%. How large must the annual payments at t = 5, 6, and 7 be to cover Ellen’s anticipated college costs?
CHAPTER 5ANSWERS AND SOLUTIONS |
[1]. (5-2) Compounding F J Answer: a EASY
[2]. (5-2) Compounding F J Answer: b EASY
[3]. (5-2) Compounding F J Answer: a EASY
[4]. (5-2) Compounding F J Answer: b EASY
[5]. (5-2) Compounding F J Answer: a EASY
[6]. (5-2) Compounding F J Answer: b EASY
[7]. (5-2) Compounding F J Answer: a EASY
[8]. (5-2) Compounding F J Answer: b EASY
[9]. (5-2) Compounding F J Answer: a EASY
[10]. (5-2) Compounding F J Answer: b EASY
[11]. (5-3) PV versus FV C J Answer: b EASY
[12]. (5-3) PV versus FV C J Answer: a EASY
[13]. (5-3) PV versus FV C J Answer: a EASY
[14]. (5-3) PV versus FV C J Answer: b EASY
[15]. (5-16) Effective annual rate C J Answer: b EASY
[16]. (5-16) Effective annual rate C J Answer: a EASY
[17]. (5-2) Compounding C J Answer: b MEDIUM
[18]. (5-2) Compounding C J Answer: a MEDIUM
[19]. (5-2) Comparative compounding C J Answer: a MEDIUM
Work out the numbers with a calculator:
PV 1000 FVA = $1,710.34
Rate on A 5% 2 × FVA = $3,420.68
Rate on B 12% FVB = $3,478.55
Years 11 FVB > 2 × FVA, so TRUE
[20]. (5-2) Comparative compounding C J Answer: b MEDIUM
Work out the numbers with a calculator:
PV 1000 FVA = $1,710.34
Rate on A 5% 2 × FVA = $3,420.68
Rate on B 12% FVB = $3,478.55
Years 11 FVB > 2 × FVA, so FALSE
[21]. (5-3) PV of a sum C J Answer: a MEDIUM
[22]. (5-3) PV of a sum C J Answer: b MEDIUM
[23]. (5-9) PV of an annuity C J Answer: a MEDIUM
One could make up an example and see that the statement is true. Alternatively, one could simply recognize that the PV of an annuity declines as the discount rate increases and recognize that more frequent compounding increases the effective rate.
[24]. (5-9) PV of an annuity C J Answer: b MEDIUM
One could make up an example and see that the statement is false. Alternatively, one could simply recognize that the PV of an annuity declines as the discount rate increases and recognize that more frequent compounding increases the effective rate.
[25]. (5-15) Periodic and nominal rates C J Answer: a MEDIUM
[26]. (5-15) Periodic and nominal rates C J Answer: b MEDIUM
[27]. (5-16) Effective and nominal rates C J Answer: a MEDIUM
[28]. (5-16) Effective and nominal rates C J Answer: b MEDIUM
[29]. (5-18) Amortization C J Answer: b MEDIUM
[30]. (5-18) Amortization C J Answer: a MEDIUM
[31]. (5-18) Amortization C J Answer: a MEDIUM
[32]. (5-18) Amortization C J Answer: b MEDIUM
[33]. (5-18) Amortization C J Answer: b HARD
There is no reason to think that this statement would always be true. The portion of the payment representing interest declines, while the portion representing principal repayment increases. Therefore, the statement is false. We could also work out some numbers to prove this point. Here’s an example for a 3‑year loan at a 10% and a 41.45% annual interest rate. The interest component is not equal to the principal repayment component except at the high interest rate.
Original loan $1,000 Original loan $1,000
Rate 10% Rate 41.45%
Life 3 Life 3
Payment $402.11 Payment $640.98
Beg. Balance Interest Principal End. Bal. Beg. Balance Interest Principal End. Bal.
1 $1,000.00 $100.00 $302.11 $697.89 1 $1,000.00 $414.50 $226.48 $773.52
2 $697.89 $69.79 $332.33 $365.56 2 $773.52 $320.62 $320.36 $453.15
3 $365.56 $36.56 $365.56 $0.00 3 $453.15 $187.83 $453.15 $0.00
[34]. (5-18) Amortization C J Answer: a HARD
This statement is true. The portion of the payment representing interest declines, while the portion representing principal repayment increases. The interest portion could be equal to, greater than, or less than the principal portion. We can work out some numbers to prove this point. Here’s an example for a 3-year loan at a 10% and a 41.45% annual interest rate. The interest component is less than the principal at 10%, equal at about 41.45%, and greater at rates above 41.45%.
Original loan $1,000 Original loan $1,000
Rate 10% Rate 41.45%
Life 3 Life 3
Payment $402.11 Payment $640.98
Beg. Balance Interest Principal End. Bal. Beg. Balance Interest Principal End. Bal.
1 $1,000.00 $100.00 $302.11 $697.89 1 $1,000.00 $414.50 $226.48 $773.52
2 $697.89 $69.79 $332.33 $365.56 2 $773.52 $320.62 $320.36 $453.15
3 $365.56 $36.56 $365.56 $0.00 3 $453.15 $187.83 $453.15 $0.00
[35]. (5-1) Time lines F J Answer: b MEDIUM
[36]. (5-1) Time lines F J Answer: d MEDIUM
[37]. (5-1) Time lines F J Answer: c MEDIUM
[38]. (5-1) Time lines F J Answer: e MEDIUM
[39]. (5-3) Effects of factors on PVs C J Answer: b MEDIUM
[40]. (5-3) Effects of factors on PVs C J Answer: b MEDIUM
[41]. (5-6) Annuities F J Answer: d MEDIUM
[42]. (5-6) Annuities F J Answer: c MEDIUM
[43]. (5-16) Quarterly compounding C J Answer: c MEDIUM
[44]. (5-16) Quarterly compounding C J Answer: d MEDIUM
[45]. (5-18) Amortization C J Answer: c MEDIUM
a, d, and e can be ruled out as incorrect by simple reasoning. b is also incorrect because interest in the first year would be Loan amount × interest rate regardless of the life of the loan, so the interest payment would be identical for the first payment. Think about the situation where r = 0%, statement c is the “most logical guess.” One could also set up an amortization schedule and change the numbers to confirm that only c is correct.
[46]. (5-18) Amortization C J Answer: d MEDIUM
a, c, and e are obviously incorrect. b is also incorrect because interest in the first year would be Loan amount × interest rate regardless of the life of the loan. That makes d the “most logical guess.” One could also set up an amortization schedule and change the numbers to confirm that only d is correct.
[47]. (5-18) Amortization C J Answer: b MEDIUM
b is the correct answer. Thinking through the question, the other answers can all be eliminated. One could also set up an amortization schedule to prove that only statement b is correct.
[48]. (5-18) Amortization C J Answer: e MEDIUM
e is the correct answer. Thinking through the question, the other answers can all be eliminated. One could also set up an amortization schedule to prove that only statement e is correct.
[49]. (5-18) Amortization C J Answer: b MEDIUM
b is correct. a is clearly wrong, as are c and d. It is not obvious whether e is correct or not, but we could set up an example to see:
Loan 100000 Term 30
Rate 10% Periods/Year 12
Periodic rate 0.008333333 Total periods 360
Payment -$877.57 Interest, Month 1 $833.33
Interest as % of total #360 payment: 1% Interest, Month 360 $7.25
Principal as % of total #360 payment 99% Principal, Month 360 $870.32
[50]. (5-18) Amortization C J Answer: b MEDIUM
b is correct. a is clearly wrong, as are c and d. It is not obvious whether e is correct or not, but we could set up an example to see:
Loan 100000 Term 30
Rate 10% Periods/Year 12
Periodic rate 0.00833333 Total periods 360
Payment -$877.57 Interest Month 1 $833.33
Interest as % of total payment: 95%, which is much larger than 10%.
[51]. (Comp.) Time value concepts C J Answer: a MEDIUM
A dominates B because it provides the same total amount, but it comes faster, hence it can earn more interest over the 10 years. A also dominates C and E for the same reason, and it dominates D because with D no interest whatever is earned. We could also do these calculations to answer the question:
A $4,382.79 Largest EFF% 10.00% 10 250
B $4,081.59 NOM% 9.76% 125
C $4,280.81 125
D $2,500.00 2500
E $3,984.36 250
[52]. (Comp.) Time value concepts C J Answer: d MEDIUM
A is smaller than E and B is smaller than C because the money comes in later. A is smaller than B because a larger annuity is received later. So, now the choice comes down to either A or D. Since all of D is received at the end, this is the logical choice. We could also do these calculations to answer the question:
A $1,536.14 EFF% 10.00% 10 250
B $1,573.63 NOM% 9.76% 125
C $1,650.44 125
D $963.86 Smallest 2500
E $1,689.76 250
[53]. (Comp.) Time value concepts C J Answer: d MEDIUM
[54]. (Comp.) Time value concepts C J Answer: e MEDIUM
[55]. (Comp.) Time value concepts C J Answer: c MEDIUM
[56]. (Comp.) Time value concepts C J Answer: d MEDIUM
[57]. (Comp.) Time value concepts C J Answer: a MEDIUM
[58]. (Comp.) Time value concepts C J Answer: b MEDIUM
[59]. (Comp.) Annuities C J Answer: d MEDIUM
[60]. (Comp.) Annuities C J Answer: a MEDIUM
[61]. (5-14) Solving for I: uneven CFs C J Answer: c HARD
[62]. (5-14) Solving for I: uneven CFs C J Answer: e HARD
[63]. (5-16) Effective annual rate C J Answer: e HARD
By inspection, we can see that e dominates a and b, and that c dominates d because, with the same interest rate, the account with the most frequent compounding has the highest EFF%. Thus, the correct answer must be either e or c. Moreover, we can see by inspection that since c and e have the same compounding frequency yet e has the higher nominal rate, e must have the higher EFF%. You could also prove that e is the correct choice by calculating the EFF%s:
[64]. (5-16) Effective annual rate C J Answer: d HARD
By inspection, we can see that b must have a lower EFF% than either a or e because they all pay the same nominal rate but b is compounded least frequently. Similarly, c and d pay the same rate, but d is compounded less frequently, hence d must have the lower EFF%. So, the correct answer must be either b or d. It is not obvious which of these two has the lower EFF%, so we must do a quick calculation to determine the correct response. As the following calculations show, d is the correct answer.
[65]. (5-16) Effective annual rate C J Answer: e HARD
By inspection, we can see that e dominates b, c, and d because, with the same interest rate, the account with the most frequent compounding has the highest EFF%. Thus, the correct answer must be either a or e. However, we cannot tell by inspection whether a or e provides the higher EFF%. We know that with one compounding period a’s EFF% is 6.1%, so we can calculate e’s EFF%. It is 6.183%, so e is the correct answer.
[66]. (5-2) FV of a lump sum C J Answer: d EASY
N 8
I/YR 8.5%
PV $125
PMT $0
FV $240.08
[67]. (5-2) FV of a lump sum C J Answer: d EASY
N 6
I/YR 5.5%
PV $500
PMT $0
FV $689.42
[68]. (5-2) FV of a lump sum C J Answer: a EASY
N 5
I/YR 3.5%
PV $1,500
PMT $0
FV $1,781.53
[69]. (5-2) FV of a lump sum C J Answer: a EASY
N 10
I/YR 6.5%
PV $2,000
PMT $0
FV $3,754.27
[70]. (5-2) FV of a lump sum C J Answer: c EASY
N 5
I/YR 6.0%
PV $225.00
PMT $0.00
FV $301.10
[71]. (5-2) FV of a lump sum C J Answer: c EASY
N 8
I/YR 7.5%
PV $525.00
PMT $0.00
FV $936.33
[72]. (5-2) FV of a lump sum C J Answer: b EASY
N 75
I/YR 3.5%
PV $1.00
PMT $0.00
FV $13.20
[73]. (5-2) FV of a lump sum C J Answer: b EASY
N 75
I/YR 5.0%
PV $100.00
PMT $0.00
FV $3,883.27
[74]. (5-2) FV of a lump sum C J Answer: b EASY
N 25
I/YR 3.5%
PV $1,000
PMT $0
FV $2,363.24
[75]. (5-2) FV of a lump sum C J Answer: b EASY
N 25
I/YR 3.5%
PV $500
PMT $0
FV $1,181.62
[76]. (5-3) PV of a lump sum C J Answer: a EASY
N 10
I/YR 5.5%
PMT $0
FV $1,000.00
PV $585.43
[77]. (5-3) PV of a lump sum C J Answer: a EASY
N 8
I/YR 5.5%
PMT $0
FV $1,000.00
PV $651.60
[78]. (5-3) PV of a lump sum C J Answer: e EASY
N 50
I/YR 7.5%
PMT $0
FV $20,000
PV $537.78
[79]. (5-3) PV of a lump sum C J Answer: e EASY
N 25
I/YR 5.5%
PMT $0
FV $5,000
PV $1,311.17
[80]. (5-3) PV of a lump sum C J Answer: b EASY
N 5
I/YR 4.25%
PMT $0
FV $2,500.00
PV $2,030.30
[81]. (5-3) PV of a lump sum C J Answer: b EASY
N 10
I/YR 4.25%
PMT $0
FV $4,500.00
PV $2,967.92
[82]. (5-4) Finding I C J Answer: d EASY
N 5
PV $747.25
PMT $0
FV $1,000.00
I/YR 6.00%
[83]. (5-4) Finding I C J Answer: d EASY
N 10
PV $3,000.00
PMT $0
FV $5,000.00
I/YR 5.24%
[84]. (5-4) Growth rate C J Answer: b EASY
N 10
PV $0.50
PMT $0
FV $2.20
I/YR 15.97%
[85]. (5-4) Growth rate C J Answer: b EASY
N 5
PV $1.50
PMT $0
FV $3.20
I/YR 16.36%
[86]. (5-5) Finding N C J Answer: e EASY
I/YR 3.8%
PV $5,000.00
PMT $0
FV $15,000.00
N 29.46
[87]. (5-5) Finding N C J Answer: e EASY
I/YR 4.0%
PV $2,500.00
PMT $0
FV $5,000.00
N 17.67
[88]. (5-5) Finding N C J Answer: d EASY
I/YR 9.0%
PV $3.50
PMT $0
FV $10.50
N 12.75
[89]. (5-5) Finding N C J Answer: e EASY
I/YR 8.0%
PV $5,000.00
PMT $0
FV $9,140.20
N 7.84
[90]. (5-5) Finding N C J Answer: e EASY
I/YR 6.0%
PV $10,000.00
PMT $0
FV $30,000.00
N 18.85
[91]. (5-7) FV of ordinary annuity C J Answer: c EASY
N 3
I/YR 5.2%
PV $0.00
PMT $4,200
FV $13,266.56
[92]. (5-7) FV of ordinary annuity C J Answer: c EASY
N 2
I/YR 6.2%
PV $0.00
PMT $8,200
FV $16,908
[93]. (5-7) FV of ordinary annuity C J Answer: a EASY
N 5
I/YR 8.5%
PV $0.00
PMT $3,100
FV $18,369
[94]. (5-8) FV of annuity due C J Answer: a EASY
BEGIN Mode
N 4 Alternative setup:
I/YR 5.7% 0 1 2 3 4
PV $0.00 $3,500 $3,500 $3,500 $3,500
PMT $3,500 FV = $16,112
FV $16,112
[95]. (5-8) FV of annuity due C J Answer: c EASY
BEGIN Mode
N 3 Alternative setup:
I/YR 5.2% 0 1 2 3
PV $0.00 $7,000 $7,000 $7,000 $7,000
PMT $7,000 FV = $23,261
FV $23,261
[96]. (5-9) PV of ordinary annuity C J Answer: e EASY
N 10
I/YR 5.5%
PMT $2,700
FV $0.00
PV $20,352
[97]. (5-9) PV of ordinary annuity C J Answer: e EASY
N 5
I/YR 4.5%
PMT $4,700
FV $0.00
PV $20,633
[98]. (5-9) PV of ordinary annuity C J Answer: e EASY
N 3
I/YR 5.5%
PMT $2,500
FV $0.00
PV $6,744.83
[99]. (5-9) PV of ordinary annuity C J Answer: e EASY
N 20
I/YR 5.0%
PMT $5,000
FV $0.00
PV $62,311
[100]. (5-9) PV of ordinary annuity C J Answer: b EASY
N 30
I/YR 7.25%
PMT $50,000
FV $0.00
PV $605,183
[101]. (5-9) PV of annuity due C J Answer: a EASY
BEGIN Mode
N 5
I/YR 5.5%
PMT $2,500
FV $0.00
PV $11,262.88
[102]. (5-11) PV of a perpetuity C J Answer: b EASY
I/YR 5.0%
PMT $250
PV $5,000
[103]. (5-11) Return on a perpetuity C J Answer: a EASY
Cost (PV) $950
PMT $85
I/YR 8.95%
[104]. (5-9) PV of annuity due C J Answer: c MEDIUM
BEGIN Mode
N 3
I/YR 5.5%
PMT $550
FV $0.00
PV $1,565.48
[105]. (5-9) PV of annuity due C J Answer: c MEDIUM
BEGIN Mode
N 5
I/YR 4.5%
PMT $5,000
FV $0.00
PV $22,938
[106]. (5-9) PV of annuity due C J Answer: d MEDIUM
BEGIN Mode
N 20
I/YR 5.25%
PMT $75,000
FV $0.00
PV $963,213
[107]. (5-9) PV of annuity due C J Answer: d MEDIUM
BEGIN Mode
N 25
I/YR 5.15%
PMT $85,000
FV $0.00
PV $1,240,960
[108]. (5-9) PV of annuity due C J Answer: b MEDIUM
BEGIN Mode
N 25
I/YR 7.5%
PMT $25,000
FV $0.00
PV $299,574
[109]. (5-9) PV of annuity due C J Answer: b MEDIUM
BEGIN Mode
N 15
I/YR 7.5%
PMT $25,000
FV $0.00
PV $237,229
[110]. (5-9) PV of ord. ann. & end. pmt. C J Answer: e MEDIUM
Alternative setup:
N 4 0 1 2 3 4
I/YR 5.0% $2,250 $2,250 $2,250 $2,250
PMT $2,250 $3,000
FV $3,000 $2,250 $2,250 $2,250 $5,250
PV $10,446 PV = $10,446.50
[111]. (5-10) Ord. annuity payments C J Answer: a MEDIUM
N 20
I/YR 8.25%
PV $275,000
FV $0.00
PMT $28,532
[112]. (5-10) Ord. annuity payments C J Answer: d MEDIUM
N 25
I/YR 7.5%
PV $375,000
FV $0.00
PMT $33,641.50
[113]. (5-10) Annuity due payments C J Answer: c MEDIUM
BEGIN Mode
N 25
I/YR 7.5%
PV $375,000
FV $0.00
PMT $31,294.42
[114]. (5-10) Annuity due payments C J Answer: c MEDIUM
BEGIN Mode
N 4
I/YR 6.5%
PV $100,000
FV $0.00
PMT $27,409
[115]. (5-10) Annuity due payments C J Answer: d MEDIUM
BEGIN Mode
N 20
I/YR 8.25%
PV $275,000
FV $0.00
PMT $26,357.92
[116]. (5-10) Finding annuity periods C J Answer: a MEDIUM
I/YR 7.5%
PV $375,000
PMT $35,000
FV $0.00
N 22.50
[117]. (5-10) Finding annuity periods C J Answer: b MEDIUM
I/YR 7.50%
PV $300,000
PMT $35,000
FV $25,000
N 14.96
[118]. (5-10) Finding annuity due periods C J Answer: e MEDIUM
BEGIN Mode
I/YR 6.5%
PV $500,000
PMT $40,000
FV $0.00
N 22.86
[119]. (5-10) Finding annuity due periods C J Answer: c MEDIUM
BEGIN Mode
I/YR 5.5%
PV $500,000
PMT $45,000
FV $50,000
N 17.22
[120]. (5-10) Finding I: annuity C J Answer: b MEDIUM
N 20
PV $2,550,000
PMT $250,000
FV $0.00
I/YR 7.49%
[121]. (5-10) Finding I: annuity C J Answer: a MEDIUM
N 20
PV $15,000,000
PMT $1,050,000
FV $0.00
I/YR 3.44%
[122]. (5-10) Finding I: annuity due C J Answer: e MEDIUM
BEGIN Mode
N 12
PV $120,000
PMT $15,000
FV $0.00
I/YR 8.41%
[123]. (5-11) Payments on a perpetuity C J Answer: b MEDIUM
Cost (PV) $1,250
I/YR 6.5%
PMT $81.25 Multiply Cost by I/YR.
[124]. (5-12) PV of uneven cash flows C J Answer: e MEDIUM
I/YR = 6.25%
0 1 2 3 4
CFs: $0 $75 $225 $0 $300
PV of CFs: $0 $71 $199 $0 $235
PV = $505.30 Found using the Excel NPV function.
PV = $505.30 Found by summing individual PVs.
You can find the individual PVs and sum them. Alternately, you can automate the process using Excel or a calculator, by inputting the data into the cash flow register and pressing the NPV key.
[125]. (5-12) PV of uneven cash flows C J Answer: c MEDIUM
I/YR = 12.0%
0 1 2 3 4
CFs: $0 $1,500 $3,000 $4,500 $6,000
PV of CFs: $0 $1,339 $2,392 $3,203 $3,813
PV = $10,747 Found using the Excel NPV function.
PV = $10,747 Found by summing individual PVs.
PV = $10,747 Found using the calculator NPV key.
[126]. (5-12) PV of uneven cash flows C J Answer: d MEDIUM
I/YR = 8.0%
0 1 2 3
CFs: $750 $2,450 $3,175 $4,400
PV of CFs: $750 $2,269 $2,722 $3,493
PV = $9,233 Found by summing individual PVs.
PV = $9,233 Found with a calculator or Excel to automate the process. With a calculator, input the cash flows and I into the cash flow register, then press the NPV key.
[127]. (5-12) PV of uneven cash flows C J Answer: a MEDIUM
I/YR = 6.0%
0 1 2 3 4
CFs: $0 $1,000 $2,000 $2,000 $2,000
PV of CFs: $0 $943 $1,780 $1,679 $1,584
PV = $5,987 Found using the Excel NPV function.
PV = $5,987 Found by summing individual PVs.
PV = $5,987 Found using the calculator NPV key.
[128]. (5-13) FV of uneven cash flows C J Answer: e MEDIUM
I/YR = 6.5%
0 1 2 3 4
CFs: $0 $75 $225 $0 $300
FV of CFs: $0 $91 $255 $0 $300
FV = $645.80 Found by summing individual FVs.
FV = $645.80 Found with the NFV key in some calculators.
FV = $645.80 Found with a calculator by first finding the PV of the stream, then finding the FV of that PV.
PV of the stream: $501.99
FV of the PV: $645.80
[129]. (5-14) Rate in uneven cash flows C J Answer: c MEDIUM
0 1 2 3 4 5
CFs: -$10,000 $750 $750 $750 $750 $750
$10,000
-$10,000 $750 $750 $750 $750 $10,750
I/YR 7.50% I is the discount rate that causes the PV of the inflows to equal the initial negative CF, and is found with Excel’s IRR function or by inputting the CFs into a calculator and pressing the IRR key.
[130]. (5-14) Rate in uneven cash flows C J Answer: e MEDIUM
0 1 2 3 4
CFs: -$7,250 $750 $1,000 $850 $6,250
I/YR 6.05% I is the discount rate that causes the PV of the positive inflows to equal the initial negative CF. I can be found using Excel’s IRR function or by inputting the CFs into a calculator and pressing the IRR key.
[131]. (5-15) FV, semiannual compounding C J Answer: c MEDIUM
Years 5
Periods/Yr 2
Nom. I/YR 6.0%
N = Periods 10
PMT $0
I = I/Period 3.0%
PV $1,500 Could be found using a calculator, an equation, or Excel.
FV = $2,016 Note that we must first convert to periods and rate per period.
[132]. (5-15) FV, semiannual compounding C J Answer: d MEDIUM
Years 5
Periods/Yr 2
Nom. I/YR 4.5%
FV $4,500
N = Periods 10
PMT $0
I = I/Period 2.25% Could be found using a calculator, the equation, or Excel.
PV = $3,602 Note that we must first convert to periods and rate per period.
[133]. (5-15) FV, monthly compounding C J Answer: b MEDIUM
Years 5
Periods/Yr 12
Nom. I/YR 6.0%
N = Periods 60
PMT $0
I/Period 0.5%
PV $1,200 Could be found using a calculator, the equation, or Excel.
FV $1,618.62 Note that we must first convert to periods and rate per period.
[134]. (5-15) PV, monthly compounding C J Answer: d MEDIUM
Years 5
Periods/Yr 12
Nom. I/YR 6.0%
N=Periods 60
PMT $0
I/Period 0.5%
FV $1,525
PV = $1,131 = FV/(1+rPer)N
PV = $1,131 Found using a calculator or Excel
[135]. (5-16) APR vs. EFF% C J Answer: b MEDIUM
APR = Nominal rate 18.00%
Periods/yr 12
EFF% =(1+(rNOM/N))N − 1 = 19.56%
[136]. (5-16) Comparing EFF% C J Answer: d MEDIUM
This problem can be worked using the interest conversion feature of a calculator or Excel. It could also be worked using the conversion formula. We used the conversion formula.
Nominal rate, Riverside 6.5%
Nominal rate, Midwest 7.0%
Periods/yr, Riverside 12
Periods/yr, Midwest 1
EFF% Riverside = (1+(rNOM/N))N – 1 = 6.70%
EFF% Midwest 7.00%
Difference 0.30%
[137]. (5-16) Nominal rate vs. EFF% C J Answer: a MEDIUM
Nominal I/YR 8.00%
Periods/yr 4
EFF% = (1+(rNOM/N))N − 1 = 8.24%
You could also find the EFF% as follows:
Interest paid each quarter = Loan × rate/4 = Qtrly PMT = $200.00
Then find the IRR as a quarterly rate and convert to an annual rate. This procedure is obviously longer.
0 1 2 3 4
CFs: 10,000.00 -200.00 -200.00 -200.00 -200.00
-10,000.00
10,000.00 -200.00 -200.00 -200.00 -10,200.00
IRR (quarterly) = 2.00%
Annual effective rate = 8.24% vs. nominal rate = 8.00%
[138]. (5-16) Nominal rate vs. EFF% C J Answer: e MEDIUM
Interest payment: $250.00
0 1 2 3 4
CFs: 10,000 -250 -250 -250 -250
-10,000
10,000 -250 -250 -250 -10,250
IRR (quarterly) = 2.50%
Annual effective rate = 10.38% vs. nominal rate = 10.00%
[139]. (5-16) Nominal rate vs. EFF% C J Answer: c MEDIUM
Nominal I/YR 4.50%
Periods/yr 12
Periodic rate 0.38%
EFF% = (1+(rNOM/N))N – 1 = 4.59%
[140]. (5-16) Nominal rate vs. EFF% C J Answer: b MEDIUM
Nominal I/YR = APR 15.00%
Periods/yr 12
EFF% = (1+(rNOM/N))N – 1 = 16.08%
[141]. (5-17) Simple interest C J Answer: a MEDIUM
Nominal I/YR 7.25% Days in month 30
Days/yr 360 Daily rate 0.020139%
Amount borrowed $20,000 Interest per day $4.02778
Interest per month = Interest/day × 30 = $120.83
[142]. (5-17) Fractional time periods C J Answer: a MEDIUM
Nominal I/YR 5.25% Rate/day = rNOM/360 = 0.0146%
Number of months 8 Days = Months × 30 = 240
Days in year 360
Days in month 30
Amount deposited $5,000
Ending amount $5,178.09
[143]. (5-18) Amortization: payment C J Answer: a MEDIUM
Years = N 4
I/YR 9.0%
FV $0
Amount borrowed = PV $12,000
Payments = PMT $3,704.02 Found with a calculator, as the PMT.
[144]. (5-18) Amortization: payment C J Answer: c MEDIUM
Years 30 N 360
Payments/year 12 Periodic rate 0.54%
Nominal rate 6.50% PV $130,000
Purchase price $145,000 FV $0.00
Down payment $15,000 PMT $821.69
[145]. (5-18) Amortization: payment C J Answer: e MEDIUM
Monthly annuity, so interest must be calculated on a monthly basis.
Years 4 Payments/year 12
N 48 Nominal rate 6.0%
PV $250,000 I/period 0.5%
FV $50,000 PMT $4,947.01
[146]. (5-18) Amortization: interest C J Answer: d MEDIUM
I/YR 10.0%
Years 5
Amount borrowed $14,000
Interest in Year 1 $1,400.00 Simply multiply the rate times the amount borrowed.
[147]. (5-18) Amortization: interest C J Answer: d MEDIUM
Find the required payment:
N 7
I 7.5%
PV $35,000
FV $0
PMT $6,608.01 Found with a calculator or Excel.
Amortization schedule (first 2 years)
Year Beg. Balance Payment Interest Principal End. Balance
1 35,000.00 6,608.01 2,625.00 3,983.01 31,016.99
2 31,016.99 6,608.01 2,326.27 4,281.74 26,735.25
[148]. (5-18) Amortization: interest C J Answer: b MEDIUM
Find the required payment:
N 10
I 8.5%
PV $100,000
FV $0
PMT $15,241 Found with a calculator or Excel.
Amortization schedule (first 2 years)
Year Beg. Balance Payment Interest Principal End. Balance
1 100,000 15,241 8,500 6,741 93,259
2 93,259 15,241 7,927 7,314 85,945
[149]. (Comp.) N, ann. due, monthly comp. C J Answer: d MEDIUM
BEGIN Mode
I/YR 18.0%
I/MO 1.5% Monthly annuity due, so interest must be calculated on monthly basis. rNOM/12.
PV $0
PMT $5,000
FV $250,000
N 37.16 Rounded up: 38
[150]. (Comp.) N, ann. due, monthly comp. C J Answer: b MEDIUM
I/YR 7.0%
I/MO 0.583333% Monthly annuity, so interest must be calculated on monthly basis
PV $0
PMT $3,000
FV $150,000
N 44.0021
[151]. (Comp.) ord. ann., monthly comp. C J Answer: d MEDIUM
N 36
PV $4,000
PMT $137.41
FV $0
I/MO 1.20% Monthly annuity, so interest must be calculated on monthly basis
I/YR = I/MO × 12 = 14.36%
[152]. (5-10) N, lifetime vs. yearly C J Answer: e MEDIUM/HARD
Find N for an annuity due with the indicated terms to determine how long you must live to make the lifetime subscription worthwhile.
BEGIN Mode
Interest rate (I/YR) 6.0%
Annual cost (PMT) $85
Lifetime subscription cost (PV) $850
Number of payments made (N) 14.33
[153]. (5-15) Non-annual compounding C J Answer: b MEDIUM/HARD
Interest rate 4.0%
Periods/year 4 Years on Quarters Ending
Quarterly rate 1.0% Deposit on Deposit Amount
1st deposit $2,500 3 12 $ 2,817.06
2nd deposit $5,000 2 8 5,414.28
3rd deposit $7,500 1 4 7,804.53
Total $16,035.87
[154]. (5-16) Comparing EFF% C J Answer: d MEDIUM/HARD
Students must understand that “simple interest with interest paid quarterly” means that the bank gets the interest at the end of each quarter, hence it can invest it, presumably at the same nominal rate. This results in the same effective rate as if it were stated as “6%, quarterly compounding.”
Nominal rate, Farmers 5.0%
Periods/yr, Farmers 4
Nominal rate, Merchants 6.0%
Periods/yr, Merchants 1
EFF% Farmers 5.09%
EFF% Merchants 6.00%
Difference 0.91%
[155]. (5-18) Amortization: princ. repymt. C J Answer: b MEDIUM/HARD
Interest rate 8.5%
Years 5
Amount borrowed $15,000
Step 1: Find the PMT 3,806.49
Step 2: Find the 1st year’s interest 1,275.00
Step 3: Subtract the interest from the payment; this is repayment of principal 2,531.49
[156]. (5-18) Amortization: ending bal. C J Answer: e MEDIUM/HARD
Interest rate 8.5%
Years 5
Amount borrowed $15,000
Step 1: Find the PMT $3,806.49
Step 2: Find the 1st year’s interest $1,275.00
Step 3: Subtract the interest from the payment; this is repayment of principal $2,531.49
Step 4: Subtract the repayment of principal from the beginning amount owed $12,468.51
[157]. (Comp.) Retirement planning C J Answer: c MEDIUM/HARD
Interest rate 7.5%
Years to retirement 30
Years in retirement 25
Amount saved per year $7,000
Step 1: Find the amount at age 65; use the FV function 723,796
Step 2: Find the PMT for a 25-year ordinary annuity using the FV you just found as the PV. 64,932
[158]. (5-10) Finding I: annuity due C J Answer: a HARD
BEGIN Mode
N 24
PV $0
PMT $500
FV $13,000
I/MO 0.63%
I/YR 7.62%
[159]. (5-18) Amortization C J Answer: e HARD
N 12
rNOM 11.0%
Per. r 0.9167%
PV $72,500
PMT $6,407.67
FV $0 % prin. = Prin2/PMT = 90.45%
Amortization schedule(first 4 months)
Month Beg. Balance Payment Interest Principal Ending Balance
1 72,500.00 6,407.67 664.58 5,743.09 66,756.91
2 66,756.91 6,407.67 611.94 5,795.73 60,961.18
3 60,961.18 6,407.67 558.81 5,848.86 55,112.32
4 55,112.32 6,407.67 505.20 5,902.47 49,209.85
[160]. (5-18) Amortization: interest C J Answer: a HARD
Years 30 Nominal r 7.00%
Periods/yr 12 I/period 0.5833%
N (12 mo.) 360 PMT $1,663.26
PV = Loan $250,000 Interest, 2010 $17,419.55
FV $0
Amortization schedule(first 3 months)
Year Beg. Balance Payment Interest Principal End. Balance
1 250,000.00 1,663.26 1,458.33 204.92 249,795.08
2 249,795.08 1,663.26 1,457.14 206.12 249,588.96
3 249,588.96 1,663.26 1,455.94 207.32 249,381.64
4 249,381.64 1,663.26 1,454.73 208.53 249,173.11
5 249,173.11 1,663.26 1,453.51 209.75 248,963.36
6 248,963.36 1,663.26 1,452.29 210.97 248,752.39
7 248,752.39 1,663.26 1,451.06 212.20 248,540.19
8 248,540.19 1,663.26 1,449.82 213.44 248,326.75
9 248,326.75 1,663.26 1,448.57 214.68 248,112.07
10 248,112.07 1,663.26 1,447.32 215.94 247,896.13
11 247,896.13 1,663.26 1,446.06 217.20 247,678.94
12 247,678.94 1,663.26 1,444.79 218.46 247,460.48
19,959.07 17,419.55 2,539.52
[161]. (Comp.) Retirement planning C J Answer: a HARD
Steve’s retirement account Ed’s retirement account
No. of payments thus far, including today’s payment 6 Payment today 1
Number of remaining payments 40 40
N = total payments 46 N 41
I/YR 8.0% I/YR 8.0%
PV $0 PV $0
PMT $2,500 FV = Ed’s FV = $1,046,065
FV Steve’s FV = $1,046,065 PMT $3,726
[162]. (Comp.) FV comb. CF lump sum & ann. C J Answer: d HARD
There are 3 cash flow streams: the gift and the two annuities. The gift will grow for 12 years. Then there is a 6-year annuity whose FV at the end of Year 6 will compound for an additional 6 years. Finally, there is a second 6-year annuity. The sum of the compounded values of those three sets of cash flows is the final amount.
Amount Amount
at end of at end of
Year 6 Year 12
Interest rate 9.0%
1st annuity $7,500 $56,425 Compound @ 9% $94,630
2nd annuity $15,000 NA $112,850
Gift $25,000 NA $70,317
Total years 12
Annuity years 6 Final amt: $277,797
[163]. (Comp.) CF for given return C J Answer: c HARD
This is a relatively difficult problem for an efficient calculator solution or classroom exam, but it is appropriate for a challenging take-home or online exam.
I/YR = 8%
0 1 2 3 4 5 6 7
-$25,000 $2,500 $5,000 $7,500 X X X X
Calculator solution:
Step 1. Use the CF register to find the NPV of the 4 known cash flows, CF0 to CF3: -$12,444.75
Step 2. Find the FV of this NPV at the end of period 3, i.e., compound the NPV
you found for 3 years. -$15,676.80
Step 3. Now find the PMT for a 4-year annuity with this PV. $4,733.15
[164]. (Comp.) Saving for college C J Answer: e HARD
This is a very difficult problem. It should only be used as a take-home assignment.
Current college cost/year $14,500
College cost inflation 3.5%
Return on investment account 9.0%
Payments at t = 1, 2, 3, and 4 $5,000
Account balance at t = 0 $15,000
Cost PV at t=8
Year 1 (t = 8) = Current cost × (1+infl)8 = -19,093.73 -19,093.73
Year 2 (t = 9) = Prior year × (1+infl) = -19,762.01 -18,130.29
Year 3 (t = 10) = Prior year × (1+infl) = -20,453.68 -17,215.45
Year 4 (t = 11) = Prior year × (1+infl) = -21,169.56 -16,346.79
Find PV (at t = 8) of all college costs = amount needed at t = 8: -70,786.26
0 1 2 3 4 5
Known values; X for unknown: $15,000.00 $5,000.00 $5,000.00 $5,000.00 $5,000.00 X
Solution value for X: $2,412.76
Cash flows: $15,000.00 $5,000.00 $5,000.00 $5,000.00 $5,000.00 $2,412.76
6 7 8 9 10 11
X X -$19,093.73 -$19,762.01 -$20,453.68 -$21,169.56
$2,412.76 $2,412.76
Cash flows, continued: $2,412.76 $2,412.76 -$19,093.73 -$19,762.01 -$20,453.68 -$21,169.56
Their sum is shown to the right. -70,786.26
1 $5,000.00 $9,140.20
2 $5,000.00 $8,385.50
3 $5,000.00 $7,693.12
4 $5,000.00 $7,057.91
$62,165.16
$2,412.76
Original price was: $30.00.$20.00Current price is: $20.00.
Original price was: $30.00.$20.00Current price is: $20.00.
Original price was: $30.00.$20.00Current price is: $20.00.
Original price was: $30.00.$20.00Current price is: $20.00.
Original price was: $30.00.$20.00Current price is: $20.00.
Original price was: $30.00.$20.00Current price is: $20.00.
