You have applied for a job with a local bank. As part of its evaluation process, you must take an examination on time value of money analysis covering the following questions: Draw time lines for (1) a existexist100 lump sum cash flow at the end of year 2: (2) an ordinary annuity of exist100 per year for 3 years: and (3) an uneven cash flow stream of -exist50, exist100, exist75, and exist75, and exist50 at the end of years 0 through 3. What's the future value of exist100 after 3 year if it earns 4% annual compounding? What's the present value of exist100 to be received in 3 years if the interest rate is 4% annual compounding? What annual interest rate would cause exist100 to grow to exist119.10 in 3 years? If a company's sales are growing at a rate of 10% annually, how long will it take sales to double? What's the difference between an ordinary annuity and an annuity due? What type of annuity is shown here? How would you change it to the other type of annuity? What is the future value of 3-year, exist100 ordinary annuity if the annual interest rate is 4%? What is its present value? What would the future and present values be if it was an annuity due? A 5-year exist100 ordinary annuity has an annual interest rate of 4% What is its present value? What would the present value be if it was a 10-year annuity? What would the present value be if it was a 25-year annuity? What would the present value be this was a perpetuity? A 20-year-old student wants to save exist5 a day for her retirement. Every day she places exist5 in a drawer, At the end of each year, she invests the accumulated savings (exist1, 825) in a brokerage account with an expected annual return of 8%. If she keeps saving in this manner, how much will she have accumulated at age 65? If a 40-year-old investor began savings in this manner, how much would he have at age 65? How much would the 40--year-old investor have to save each year to accumulated the same amount at 65 as the 20-year-old investor? What is the present value of the following uneven cash flow stream? The annual interest rate is 4% Will the future value be larger or smaller if we compound an initial amount more often than annually (e.g., semiannually, holding the stated (nominal) rate constant)? why? Define (a) the stated (or quoted or nominal) rate, (b) the periodic rate, and (c) the effective annual rate (EAR or EFF%) What is the EAR corresponding to a nominal rate of 4% compounded semiannually? Compounded quarterly? Compounded daily? What is the future value of exist100 after 3 years under 4% semiannual compounding ? Quarterly compounding