Question

In: Finance

Annuity payments are assumed to come at the end of each payment period (termed an ordinary...

Annuity payments are assumed to come at the end of each payment period (termed an ordinary annuity). However, an exception occurs when the annuity payments come at the beginning of each period (termed an annuity due).

What is the future value of a 10-year annuity of $2,600 per period where payments come at the beginning of each period? The interest rate is 7 percent. Use Appendix C for an approximate answer, but calculate your final answer using the formula and financial calculator methods. To find the future value of an annuity due when using the Appendix tables, add 1 to n and subtract 1 from the tabular value. For example, to find the future value of a $100 payment at the beginning of each period for five periods at 10 percent, go to Appendix C for n = 6 and i = 10 percent. Look up the value of 7.716 and subtract 1 from it for an answer of 6.716 or $671.60 ($100 × 6.716).

Solutions

Expert Solution

Future value of annuity due Annual cash flow*FV of annuity due (n=10, i=7%)
Future value of annuity due 2600*14.784
Future value of annuity due $38,438.40
Thus, future value of annuity due is $38,438.40

Related Solutions

Annuity payments are assumed to come at the end of each payment period (termed an ordinary...
Annuity payments are assumed to come at the end of each payment period (termed an ordinary annuity). However, an exception occurs when the annuity payments come at the beginning of each period (termed an annuity due). What is the future value of a 13-year annuity of $3,500 per period where payments come at the beginning of each period? The interest rate is 10 percent. Use Appendix C for an approximate answer, but calculate your final answer using the formula and...
In the following ordinary annuity, the interest is compounded with each payment, and the payment is...
In the following ordinary annuity, the interest is compounded with each payment, and the payment is made at the end of the compounding period. Find the required payment for the sinking fund. (Round your answer to the nearest cent.) Yearly deposits earning 12.9% to accumulate $2500 after 12 years. The Oseola McCarty Scholarship Fund at the University of Southern Mississippi was established by a $150,000 gift from an 87-year-old woman who had dropped out of sixth grade and worked for...
1. In the following ordinary annuity, the interest is compounded with each payment, and the payment...
1. In the following ordinary annuity, the interest is compounded with each payment, and the payment is made at the end of the compounding period. Find the required payment for the sinking fund. (Round your answer to the nearest cent.) Yearly deposits earning 12.8% to accumulate $3500 after 12 years. 2. In the following ordinary annuity, the interest is compounded with each payment, and the payment is made at the end of the compounding period. Find the amount of time...
21. the following ordinary annuity, the interest is compounded with each payment, and the payment is...
21. the following ordinary annuity, the interest is compounded with each payment, and the payment is made at the end of the compounding period. Find the required payment for the sinking fund. (Round your answer to the nearest cent.) Monthly deposits earning 4% to accumulate $3000 after 10 years. 22. the following ordinary annuity, the interest is compounded with each payment, and the payment is made at the end of the compounding period. Find the required payment for the sinking...
An annuity pays $250 at the end of each semi-annual period for 10 years. The payments...
An annuity pays $250 at the end of each semi-annual period for 10 years. The payments are made directly into a savings account with a nominal interest of 4.85% payable monthly, and they are left in the account. Find the effective interest rate for the semi-annual period and use it to calculate the balance immediately after the last payment.
An ordinary annuity selling at $14,755.18 today promises to make equal payments at the end of...
An ordinary annuity selling at $14,755.18 today promises to make equal payments at the end of each year for the next ten years (N). If the annuity’s appropriate interest rate (I) remains at 9.50% during this time, the annual annuity payment (PMT) will be $_____. You just won the lottery. Congratulations! The jackpot is $10,000,000, paid in ten equal annual payments. The first payment on the lottery jackpot will be made today. In present value terms, you really won $...
What is the accumulated sum of each of the following streams of ordinary annuity payments? a....
What is the accumulated sum of each of the following streams of ordinary annuity payments? a. $35 per half-year for three and a half years at 14% p.a. compounded half- yearly. b. $25 a year for three years compounded annually at 2%. c. $500 a year for 10 years compounded annually at 5%
Equal end-of-period semiannual payments of $500, increasing by $100 with each subsequent payment, are made to...
Equal end-of-period semiannual payments of $500, increasing by $100 with each subsequent payment, are made to a fund paying 10 percent compounded continuously. What will the fund amount to after 7 years? What is the present worth equivalent of the total set of payments? What is the equal semiannual equivalent amount of the payments?
Equal end-of-period semiannual payments of $500, increasing by $100 with each subsequent payment, are made to...
Equal end-of-period semiannual payments of $500, increasing by $100 with each subsequent payment, are made to a fund paying 10 percent compounded continuously. What will the fund amount to after 7 years? What is the present worth equivalent of the total set of payments? What is the equal semiannual equivalent amount of the payments?
An annuity-immediate with 20 annual payments starts with a payment of 300 and each payment thereafter...
An annuity-immediate with 20 annual payments starts with a payment of 300 and each payment thereafter is 25 more than the previous payment. The effective annual interest rate is 5%. Calculate the present value. Be sure to include the appropriate equation or expression of value that you use. Instead of a 20 year annuity-immediate, it is a perpetuity. What would the present value be in that case?
ADVERTISEMENT
ADVERTISEMENT
ADVERTISEMENT