Alex Meir recently won a lottery and has the option of receiving one of the following three prizes: (1) $62,000 cash immediately
, (2) $19,000 cash immediately and a six-period annuity of $7,600 beginning one year from today, or (3) a six-period annuity of $12,500 beginning one year from today. (FV of $1, PV of $1, FVA of $1, PVA of $1, FVAD of $1 and PVAD of $1) (Use appropriate factor(s) from the tables provided.) 1. Assuming an interest rate of 6%, determine the present value for the above options. Which option should Alex choose? 2. The Weimer Corporation wants to accumulate a sum of money to repay certain debts due on December 31, 2030. Weimer will make annual deposits of $110,000 into a special bank account at the end of each of 10 years beginning December 31, 2021. Assuming that the bank account pays 7% interest compounded annually, what will be the fund balance after the last payment is made on December 31, 2030?
1 answer:
Answer:
Explanation:
We must find the option with the greatest net present value (NPV).
1) The NPV is $62,000
2) First, you must calculate the NPV with the formula attached, for example:
NVP= ($7,600/(1+6%)^1)+($7,600/(1+6%^2)+($7,600/(1+6%^3)... and so on until year 6
With the excel formula "NPV" you can calculate the net present value specifying the interest rate, the cash flows.
NPV= $37,371.66
The TOTAL NPV= $19,000+$37,371.66= $56,371.66
3) NVP= ($12,500/(1+6%)^1)+($12,500/(1+6%^2)+($12,500/(1+6%^3)... and so on until year 6
NPV= $61,466.55
The best option is option 1.
Question 2.
We must use the compound interest formula:
Final Capital (FC)= Initial Capital (IC)*[(1+interest(i))]^(number of periods(n))
In Dec 31, 2022:
FC= $110,000*(1+7%)^1
FC=$117,000
Balance in Dec 31,2022 = $117,000+$110,000=$227,000
In Dec 31,2023
FC= $227,000*(1+7%)^1
FC= $243,639
Balance in Dec 31,2023= $243,639+$110,000= $353,639
And so on until 2030
If the Weimer corporation makes the last payment in 2030;
The balance in Dec,31 2030= $1,409,809+$110,000= $1,519,809
You might be interested in