ࡱ> dgeG  !"#$%&'()*+,-./0123456789H<>?@ABCDEFIJKLMNOPQRSTUVWXYZ[\]^_`abcRdO)3B;PowerPoint Document(SummaryInformation(=DocumentSummaryInformation8:7( / 00DTimes New Roman8\t\pnD< Hk\pnDBook Antiquaan8\t\pnD< Hk\pn DMonotype Sorts8\t\pnD< Hk\pn0DTimespe Sorts8\t\pnD< Hk\pne .  @n?" dd@  @@`` TLE 9)d)    `b !"#$%&'(),-. `1?@] 2ʚ;2Nʚ;g4FdFdp\n4H<H(Hppp@ <4!d!d q\t\ʚp\E<4dddd q\t\ʚp\E___PPT9S_`h___PPT2001D<4Xn? %!+Simple Questions-Practical uses of time value of money factorsMTime Value FactorsTVM factors commonly used in determining equivalences (F/P, i, N) (P/F, i, N) (F/A, i, N) (A/F, i, N) (P/A, i, N) (A/P, i, N) (P/G, i, N) (A/G, i, N) (P/A, g, i, N)*6ZqZ6qSSimple QuestionYou are 20 yrs old and want to retire at age 60 with $1,000,000. How much do you have to put away each year if you earn 10% interest on it? At age 5, you were left $10,000 from an aunt. Your parents put the money in a trust fund earning 10%/year. You are now 25 years old and may draw from the fund. How much money is there? You buy a house for $100,000. You finance the full amount with a 30 years mortgage. The interest rate is 9%/yr and your payments are monthly. What is the total of all the payments made?H" " " Z_Simple Question (continued)You can afford $300/month on a car. If the dealer s interest rate is 6%/yr and the loan is for 60 months, how much can you finance? You win the lottery and the government promises to pay $1,000,000 in ten years. Banks currently pay 10%/yr on savings. What is the prize worth to you right now? You are a freshman in college and you just paid $1000 for tuition and fees for the University. Assuming the cost goes up by $100 per semester for the remaining 7 semesters of your education, how much do you have to have in the bank right now to cover the remaining charges? Assume your investments earn 3% every six months.@l" Z$E{`Simple Question (continued)Your daughter starts college in 18 years. If you put $100/month in a CD returning 6%/year (compounded monthly), how much will you have then? If $1000 is invested now, $1500 two years from now, and $800 four years from now at an interest rate of 8% compounded annually, what will be the total amount in 10 years? What is the amount of 10 equal annual deposits that can provide for the following five annual withdrawals? The first withdrawal of $1000 is made at the end of year 11, and subsequent withdrawals increase at the rate of 6% per year over the previous year s withdrawal. The interest rate is 8%, compounded annually.J" " Z^Simple Question 1 You are 20 yrs old and want to retire at age 60 with $1,000,000. How much do you have to put away each year if you earn 10% interest on it? We want the value of equal payments that are equivalent to a future million of dollars. The interest is compounded, and rate is 10%/yr The number of periods is 40 years. The answer comes from the equivalence between an future worth (F) and an annuity (A)&[4Simple Question 1 (cont d)N=40 years, i=10%, (A/F, i ,N) = i/((1+i)N  1) = 0.1/(1+0.1)40  1) = 0.002259414 Or alternatively, you can find that (A/F, i ,N) = 0.0023 at the end of the Workbook, on page 169 F=$1,000,000 Therefore, A = $1,000,000 (0.0023) = about $2,300.yZ? Z@Z u?h.Simple Question 2At age 5, you were left $10,000 from an aunt. Your parents put the money in a trust fund earning 10%/year. You are now 25 years old and may draw from the fund. How much money is there? We want the future worth of an investment. The interest is compounded, and rate is 10%/yr. The number of periods is 20 years. The answer comes from the equivalence between present worth (P) and future worth (F) F = $10,000 (F/P,0.1 ,20) 10,000 (6.7275) = $67,275 V\4Simple Question 2 (cont d)N=20 years, i=10%, (F/P, i ,N) = (1+i)N = (1+0.1) 20 =6.7275 Or alternatively, you can find that (F/P, i ,N) = 6.7275 at the end of the Workbook, on page 169 P=$10,000 Therefore, F = $10,000 (6.7275) = $67,275f? 4  k! YSimple Question 3You buy a house for $100,000. You finance the full amount with a 30 years mortgage. The interest rate is 9%/yr and your payments are monthly. What is the total of all the payments made? We want the present worth of the value of equal payments. The interest is compounded, and rate is 0.75%/month. The number of periods is 360 months. The answer comes from the equivalence between an annuity (A) and a present worth (P).*ZZT4Simple Question 3 (cont d)N = 360 months i = 0.75% (A/P, i, N) = (0.0075(1.0075) 360)/((1.0075)360  1) = 0.0080462 Therefore, A = P(A/P, i ,N) = 100,00 (0.0080462) = $804.62/month Total of all payments = 360 (804.62) = $289,664.Z7 bVSimple Question 4 You can afford $300/month on a car. If the dealer s interest rate is 6%/yr and the loan is for 60 months, how much can you finance? We want the present worth of the value of equal payments. The interest is compounded, and rate is 0.5%/mo. The number of periods is 60 months. The answer comes from the equivalence between an an annuity (A) and a present worth (P).&W4Simple Question 4 (cont d)cN=60 months, i=0.5%, (P/A, 0.5, 60 )= 51.7256, A = $300 Therefore, P= $300 (51.7256) = $15,518Dd LUSimple Question 5sYou win the lottery and the government promises to pay $1,000,000 in ten years. Banks currently pay 10%/yr on savings. What is the prize worth to you right now? We want the present worth of a future cash flow. The interest is compounded, and rate is 10%/yr. The number of periods is 10. The answer comes from the equivalence between future worth (F) and present worth (P)&X4Simple Question 5 (cont d)N=10 years, i=10%, (P/F, i ,N) = 1/(1+i)N = (1+0.1) -10 =0.3855 Or alternatively, you can find that (P/F, i ,N) = 0.3855 at the end of the Workbook, on page 169 F=$1,000,000 Therefore, P = $1,000,000 (0.3855) = $385,500.i? <  k;ZSimple Question 7kYour daughter starts college in 18 years. If you put $100/month in a CD returning 6%/year (compounded monthly), how much will you have then? We want the future worth of a series of equal payments. The interest is compounded, and rate is 0.5%/mo The number of periods is 216 months. 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Lecture 0EcoValerie Tardifu(Time, Money, Uncertainty, OrganizationsimeaDuo:Microsoft Office:Microsoft PowerPoint 4:Templates:Color Overheads:movnglnc.ppt - Moving Lines: Paul Jensen65lMicrosoft PowerPoint 4.0oso@E@*?Ҽ@1C.@4GPICTz @@ HH Zz 2PPPP2PPPP.PPPP.PPPP.PPPP2PPPP2PPPP.PPPP.PPPP BX   # SPF            g PPPP PP PP Current User+8\t\pnD<  \pn DMonotype Sorts8\t\pnD<  \pn0DTimespe Sorts8\t\pnD<  \pne .  @n?" dd@  @@`` TLE 9)d)    `b !"#$%&'(),-. `1?@ 2ʚ;2Nʚ;g4FdFdp\n4H<HXHppp@ <4!d!d q\t\ʚp\E<4dddd q\t\ʚp\E<4BdBd q\t\ʚp\E___PPT9S_`h___PPT2001D<4Xn? %!+Simple Questions-Practical uses of time value of money factorsMTime Value FactorsTVM factors commonly used in determining equivalences (F/P, i, N) (P/F, i, N) (F/A, i, N) (A/F, i, N) (P/A, i, N) (A/P, i, N) (P/G, i, N) (A/G, i, N) (P/A, g, i, N)*6ZqZ6qSSimple QuestionYou are 20 yrs old and want to retire at age 60 with $1,000,000. How much do you have to put away each year if you earn 10% interest on it? At age 5, you were left $10,000 from an aunt. Your parents put the money in a trust fund earning 10%/year. You are now 25 years old and may draw from the fund. How much money is there? You buy a house for $100,000. You finance the full amount with a 30 years mortgage. The interest rate is 9%/yr and your payments are monthly. What is the total of all the payments made?H" " " Z_Simple Question (continued)You can afford $300/month on a car. If the dealer s interest rate is 6%/yr and the loan is for 60 months, how much can you finance? You win the lottery and the government promises to pay $1,000,000 in ten years. Banks currently pay 10%/yr on savings. What is the prize worth to you right now? You are a freshman in college and you just paid $1000 for tuition and fees for the University. Assuming the cost goes up by $100 per semester for the remaining 7 semesters of your education, how much do you have to have in the bank right now to cover the remaining charges? Assume your investments earn 3% every six months.@l" Z$E{`Simple Question (continued)Your daughter starts college in 18 years. If you put $100/month in a CD returning 6%/year (compounded monthly), how much will you have then? If $1000 is invested now, $1500 two years from now, and $800 four years from now at an interest rate of 8% compounded annually, what will be the total amount in 10 years? What is the amount of 10 equal annual deposits that can provide for the following five annual withdrawals? The first withdrawal of $1000 is made at the end of year 11, and subsequent withdrawals increase at the rate of 6% per year over the previous year s withdrawal. The interest rate is 8%, compounded annually.J" " Z^Simple Question 1 You are 20 yrs old and want to retire at age 60 with $1,000,000. How much do you have to put away each year if you earn 10% interest on it? We want the value of equal payments that are equivalent to a future million of dollars. The interest is compounded, and rate is 10%/yr The number of periods is 40 years. The answer comes from the equivalence between an future worth (F) and an annuity (A)&[4Simple Question 1 (cont d)N=40 years, i=10%, (A/F, i ,N) = i/((1+i)N  1) = 0.1/(1+0.1)40  1) = 0.002259414 Or alternatively, you can find that (A/F, i ,N) = 0.0023 at the end of the Workbook, on page 169 F=$1,000,000 Therefore, A = $1,000,000 (0.0023) = about $2,300.yZ? Z@Z u?h.Simple Question 2At age 5, you were left $10,000 from an aunt. Your parents put the money in a trust fund earning 10%/year. You are now 25 years old and may draw from the fund. How much money is there? We want the future worth of an investment. The interest is compounded, and rate is 10%/yr. The number of periods is 20 years. The answer comes from the equivalence between present worth (P) and future worth (F) F = $10,000 (F/P,0.1 ,20) 10,000 (6.7275) = $67,275 V\4Simple Question 2 (cont d)N=20 years, i=10%, (F/P, i ,N) = (1+i)N = (1+0.1) 20 =6.7275 Or alternatively, you can find that (F/P, i ,N) = 6.7275 at the end of the Workbook, on page 169 P=$10,000 Therefore, F = $10,000 (6.7275) = $67,275f? 4  k! YSimple Question 3You buy a house for $100,000. You finance the full amount with a 30 years mortgage. The interest rate is 9%/yr and your payments are monthly. What is the total of all the payments made? We want the present worth of the value of equal payments. The interest is compounded, and rate is 0.75%/month. The number of periods is 360 months. The answer comes from the equivalence between an annuity (A) and a present worth (P).*ZZT4Simple Question 3 (cont d)N = 360 months i = 0.75% (A/P, i, N) = (0.0075(1.0075) 360)/((1.0075)360  1) = 0.0080462 Therefore, A = P(A/P, i ,N) = 100,00 (0.0080462) = $804.62/month Total of all payments = 360 (804.62) = $289,664.Z7 bVSimple Question 4 You can afford $300/month on a car. If the dealer s interest rate is 6%/yr and the loan is for 60 months, how much can you finance? We want the present worth of the value of equal payments. The interest is compounded, and rate is 0.5%/mo. The number of periods is 60 months. The answer comes from the equivalence between an an annuity (A) and a present worth (P).&W4Simple Question 4 (cont d)cN=60 months, i=0.5%, (P/A, 0.5, 60 )= 51.7256, A = $300 Therefore, P= $300 (51.7256) = $15,518Dd LUSimple Question 5sYou win the lottery and the government promises to pay $1,000,000 in ten years. Banks currently pay 10%/yr on savings. What is the prize worth to you right now? We want the present worth of a future cash flow. The interest is compounded, and rate is 10%/yr. The number of periods is 10. The answer comes from the equivalence between future worth (F) and present worth (P)&X4Simple Question 5 (cont d)N=10 years, i=10%, (P/F, i ,N) = 1/(1+i)N = (1+0.1) -10 =0.3855 Or alternatively, you can find that (P/F, i ,N) = 0.3855 at the end of the Workbook, on page 169 F=$1,000,000 Therefore, P = $1,000,000 (0.3855) = $385,500.i? <  k;ZSimple Question 7kYour daughter starts college in 18 years. If you put $100/month in a CD returning 6%/year (compounded monthly), how much will you have then? We want the future worth of a series of equal payments. The interest is compounded, and rate is 0.5%/mo The number of periods is 216 months. The answer comes from the equivalence between an annuity (A) and future worth (F)&]4Simple Question 7 (cont d)N=216 months, i=0.5%, (F/A, i ,N) = ((1+i)N  1)/i = ((1+0.005) 216 -1)/0.005 = 387.3531944 Unfortunately, your Workbook (page 161) can t help here. A=$100 Therefore, F = $100 (387.3531944) = about $38,735.8+ sR9Psx(HHR[ (hh t2 HKdE6Ad r1oS  oRdO) ;@PowerPoint Document(SummaryInformation(=DocumentSummaryInformation8  !"#$%&'()*+,-./0123456789Hi>?@ABCDEFIJKLMNOPQRSTUVWXYZ[\]^_`abcfhCurrent UserA tion (continued)Simple Question 1 Simple Question 1 (contd)Simple Question 2Simple Question 2 (contd)Simple Question 3Simple Question 3 (contd)Simple Question 4 Simple Question 4 (contd)Simple Question 5Simple Question 5 (contd)Simple Question 7Simple Question 7 (contd)  Fonts UsedDesign Template Slide Titles#_Ǧ Paul JensenPaul Jensen