Each payment of an annuity due is compounded for one period, so the future value of an annuity due is equal to the future value of an ordinary annuity compounded for one period. The equation is: FVA_due = FVA_ordinary (1 + I) The present value of an ordinary annuity, is the value today that would be equivalent to the annuity payments (PMT) received at fixed intervals over the annuity period. The equation is: PVA_N = PMT Each payment of an annuity due is discounted for one period, so the present value of an annuity due is equal to the present value of an ordinary annuity multiplied by (1 + I). The equation is: PVA_due = PVA_ordinary (1 + I) One can solve for payments (PMT), periods (N) and interest rates for5 annuities. The easiest way to solve for these variables is with a financial calculator or a spreadsheet. You plan to deposit $2, 200 per year for 4 years into a money market account with an annual return of 35. You plan to make your first deposit one year from today. a. What amount will be in your account at the end of 4 years? Round your answer to the nearest cent. Do not round intermediate calculations. b. Assume that your deposits will begin today. What amount will be in your account after 4 years? Round your answer to the nearest cent. Do not round intermediate calculations. You and your wife are making plans for retirement. You plan on living 30 years after you retire and would like to have $100,000 annually on which to live. Your first withdrawal will be made one year after you retire and you anticipate that your retirement account will earn 12% annually. a. What amount do you need in your retirement account the day you retire? Round your answer to the nearest cent. Do not round intermediate calculations. b. Assume that your first withdrawal will be made the day you retire. Under this assumption, what amount do you now need in your retirement account the day you retire? Round your answer to the nearest cent. Do not round intermediate calculations