ࡱ> 9;8  bjbjVV 1,<<C ?????SSS8 ,Sy0K???3p??6Aՠ S$fI0yS ^S S ? yS  : Interest Rate Problems 1. Find each of the following: a. $500 invested at 4% compounded annually for 10 years. b. $600 invested at 5% compounded annually for 6 years. c. $750 invested at 3% compounded annually for 8 years. d. $1000 invested at 4% compounded annually for 7 years. e. $1250 invested at 3% compounded annually for 15 years. f. $1500 invested at 4% compounded semiannually for 7 years. g. $900 invested at 6% compounded semiannually for 5 years. h. $950 invested at 4% compounded semiannually for 12 years. i. $1100 invested at 5% compounded semiannually for 8 years. j. $1750 invested at 3% compounded semiannually for 10 years. k. $2000 invested at 5% compounded quarterly for 6 years. l. $2250 invested at 4% compounded quarterly for 9 years. m. $3500 invested at 6% compounded quarterly for 12 years. n. $2500 invested at 4% compounded quarterly for 10 years. o. $2100 invested at 5% compounded quarterly for 8 years. p. All of the above compounded continuously. 2. What principal will amount to $2000 if invested at 4% interest compounded semiannually for 5 years? 3. What principal will amount to $3500 if invested at 4% interest compounded quarterly for 5 years? 4. What principal will amount to $3000 if invested at 3% interest compounded semiannually for 10 years? 5. What principal will amount to $2500 if invested at 5% interest compounded semiannually for 7.5 years? 6. What principal will amount to $1750 if invested at 3% interest compounded quarterly for 5 years? 7. In how many years will $300 amount to $500 at 4% compounded annually? 8. In how many years will $350 amount to $1000 at 6% compounded semiannually? 9. In how many years will $400 earn $200 in compound interest if it is invested at 5% compounded annually. 10. In how many years will $100 double itself at 4% compounded annually. 11. In how many years will $100 double itself at 4% compounded quarterly? 12. In how many years will P dollars double itself at 3% compounded semiannually? 13. A thousand dollars is left in a bank savings account drawing 7% interest, compounded quarterly for 10 years. What is the balance at the end of that time? 14. A thousand dollars is left in a credit union drawing 7% compounded monthly. What is the balance at the end of 10 years? 15. $1750 is invested in an account earning 13.5% interest compounded monthly for a 2 year period. 16. You lend out $5500 at 10% compounded monthly. If the debt is repaid in 18 months, what is the total owed at the time of repayment? 17. A $10,000 Treasury Bill earned 16% compounded monthly. If the bill matured in 2 years, what was it worth at maturity? 18. You borrow $25,000 at 12.25% interest compounded monthly. If you are unable to make any payments the first year, how much do you owe, excluding penalties? 19. A savings institution advertises 7% annual interest, compounded daily. How much more interest would you earn over the bank savings account or credit union in problems 13 and 14? 20. An 8.5% account earns continuous interest. If $2500 is deposited for 5 years, what is the total accumulated? 21. You lend $100 at 10% continuous interest. If you are repaid 2 months later, what is owed? 22. If you had a million dollars for just 2 months, how much interest could be earned in an account earning 10% compounded monthly? 23. If $1000 is invested at 16% compounded quarterly, how long will it take to quadruple? 24. If $1000 is invested at 16% compounded continuously, how long will it take to quadruple? 25. If $3600 is invested at 15% interest compounded daily, how much money will there be in 7 years? (Use a 365 day year; this is called exact interest.) 26. If $10,000 is invested at 14% interest compounded daily, how much money will there be in 6 months? (Use a 360 day year; this is called ordinary interest.) 27. A bank offers an interest rate of 7% per annum, compounded daily. What is the effective (simple) interest rate? 28. What principle should you deposit at 5.5% interest per annum, compounded semiannually, so as to have $6000 after 10 years? 29. You have two savings accounts. On account starts with a balance of $1000 and grows at 7% compounded quarterly. The other account starts at $500 and grows at 7% compounded continuously. After how many years will the account balances be equal? 30. You have $10,000 to invest over a period of 5 years. You have a choice of two investments. The first investment pays 6% per annum, compounded quarterly. The second pays 5% per annum, compounded continuously. Which is the better investment under these conditions. 31. Assuming that the Indians really did sell Manhattan for the legendary $24, and further assuming that the sale took place exactly 300 years ago, compute the amount of money the Indians would now have if they had placed the money in a bank that paid 5% interest per year, compounded quarterly, and kept it there until today. 32. Suppose that Rip van Winkle fell asleep having just deposited his $175 pay check in a savings bank offering 5% interest, compounded quarterly. How much money would he have when he woke up 20 years later? Answers Interest Rate Problems 1. a. 740.12; 745.91 b. 804.06; 809.92 c. 950.08; 953.44 d. 1315.93; 1323.13 e. 1947.46; 1960.39 f. 1979.22; 1984.69 g. 1209.52; 1214.87 h. 1528.02; 1535.27 i. 1632.96; 1641.01 j. 2357.00; 2362.25 k. 2694.70; 2699.72 l. 3219.23; 3224.99 m. 7152.17; 7190.52 n. 3722.16; 3729.56 o. 3125.07; 3132.83 2. 1640.70 3. 2868.41 4. 2227.41 5. 1726.16 6. 1507.08 7. 13.02 8. 17.75 9. 8.31 10. 17.67 11. 17.42 12. 23.28 13. 2001.60 14. 2009.66 15. 2288.98 16. 6386.12 17. 13742.19 18. 28240.43 19. 12.02; 3.96 20. 3823.98 21. 101.68 22. 1016736.11 23. 8.84 24. 8.66 25. 10285.33 26. 10724.94 27. 7.25% 28. 3487.5 29. 1144.85 30. quarterly 31. 71,490,693 32. 472.76 3/24/98     Math 150 PAGE4 Exponential and Logarithm problems DI  hSmHnHujh: vU h: vCJ h: vCJ h: v6h: v9r U H 5 p ? @  w x $a$x &'uv+,vwijKLPQ|}\]UVk=>1$a$1jZ:hd  p@ H $ @ ^ 8,^ 8,^      $$d N d /01/ =!"#8$8% f 666666666vvvvvvvvv666666>6666666666666666666666666666666666666666666666666hH6666666666666666666666666666666666666666666666666666666666666666662 0@P`p2( 0@P`p 0@P`p 0@P`p 0@P`p 0@P`p 0@P`p8XV~OJQJ_HmH nH sH tH J`J NormaldCJOJQJ_HmH sH tH PP  Heading 1$0dx^`0KH@@  Heading 2$d^HH  Heading 3$Pd^`PLL  Heading 4$Pd^`PCJ66  Heading 5 ^::  Heading 6 ^CJ::  Heading 7 ^CJ::  Heading 8 h^hCJDA D Default Paragraph FontViV 0 Table Normal :V 44 la (k ( 0No List >>  Normal Indent ^D @D Footerd$d %CJ Numberedp & FP>T.^`PCJ:O": Problem0^`0<2< Style1^`CJ@O!B@ SubProblemP^`P>R> Subtext^`CJ>b> TitleHeading$a$CJPK![Content_Types].xmlj0Eжr(΢Iw},-j4 wP-t#bΙ{UTU^hd}㨫)*1P' ^W0)T9<l#$yi};~@(Hu* Dנz/0ǰ $ X3aZ,D0j~3߶b~i>3\`?/[G\!-Rk.sԻ..a濭?PK!֧6 _rels/.relsj0 }Q%v/C/}(h"O = C?hv=Ʌ%[xp{۵_Pѣ<1H0ORBdJE4b$q_6LR7`0̞O,En7Lib/SeеPK!kytheme/theme/themeManager.xml M @}w7c(EbˮCAǠҟ7՛K Y, e.|,H,lxɴIsQ}#Ր ֵ+!,^$j=GW)E+& 8PK!Ptheme/theme/theme1.xmlYOo6w toc'vuر-MniP@I}úama[إ4:lЯGRX^6؊>$ !)O^rC$y@/yH*񄴽)޵߻UDb`}"qۋJחX^)I`nEp)liV[]1M<OP6r=zgbIguSebORD۫qu gZo~ٺlAplxpT0+[}`jzAV2Fi@qv֬5\|ʜ̭NleXdsjcs7f W+Ն7`g ȘJj|h(KD- dXiJ؇(x$( :;˹! 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