Answer:
This question is incomplete since the interest rate is not included and so is the requirement. Â However, if it asking for the annual contributions Bonnie can make, you can calculate it as shown below and assuming a discount rate of 10%;
Explanation:
Since Bonnie's goal is $300,000, this will be the future value and you can use a financial calculator to solve for recurring deposits (PMT);
Time to retirement; N = 12
Interest rate; I/Y = 10%
Future value; FV = 300,000
One time present cashflow; PV = 0
then compute the recurring deposits; CPT PMT = 14,028.995
Therefore, she will need to contribute $14,029 every year to meet her goal.
The annual contribution to be made by Bonnie to reach the accumulated amount of $300,000 after 12 years is $149,090.
The present value can be defined as the current value of the future cash flow at a specific interest rate.
To calculate the yearly contribution, we need to find the present value of $300,000 at the rate of 6% per annul.
The formula to calculate present value is:
[tex]\rm PV = FV \dfrac{1}{(1 +r)^n}[/tex], where PV is the present value, FV is the future value, r is the rate of interest and n is the number of periods.
The present value of $300,000 can be calculated as follows:
Given:
Future value is $300,000
Rate is 6%
Number of years is 12 years.
[tex]\rm PV = FV \dfrac{1}{(1 +r)^n}\\\\\rm PV =\$300,000\times \dfrac{1}{(1 +0.06)^{12}}\\\\\rm PV = \$300,000 \times\dfrac{1}{2.0122}\\\\\rm PV = \$300,000 \times 0.497\\\\\rm PV = \$149,090[/tex]
Therefore the annual contribution should be $149,090.
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