Respuesta :
We are asked to determine the future value for an annuity that is paid at the beginning of every six months with an interest rate of 4.62% compounded semi-annually (every six months). To do that we will use the following formula:
[tex]FV_{\text{due}}=PMT(\frac{(1+i)^n-1}{i})(1+i)[/tex]Where:
[tex]\begin{gathered} \text{PMT}=\text{payments in each time period} \\ i=\text{ interest rate in decimal form} \\ n=\text{ time periods} \end{gathered}[/tex]The PMT is the $40 payments every six months and the interest rate "i" in decimal form is:
[tex]i=\frac{4.62}{100}=0.0462[/tex]And the time period "n" is the number of six months in a year, since every year there are two periods of six months, in 18 years we have:
[tex]n=18\text{years}\frac{2periods}{1year}=36periods[/tex]Replacing the values we get:
[tex]FV_{\text{due}}=(40)(\frac{(1+0.0462)^{36}-1}{0.0462})(1+0.0462)[/tex]Now we solve the operations:
[tex]FV_{\text{due}}=(40)(\frac{5.08-1}{0.0462})(1.0462)[/tex]Solving the operations we get:
[tex]FV_{\text{due}}=5168.41[/tex]Therefore, the accumulated value is $5168.41
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