For the given question, the summation that represents the money in account is:
[tex]\begin{aligned}\sum_{10}^{n=1}316.5(1.055)^{n-1} \end{aligned}[/tex]
The principal amount if compounded annually, the formula that represents the amount to be received after n years is:
[tex] \rm A = P(1 + \dfrac{r}{100})^t[/tex] where A is the amount received after compounding, P is the principal, r is the rate of interest and t is the tenure.
Given:
Annual interest rate(r) is 5.5%
Principal is(P) $300
Tenure is(t) 10 years
On substituting the values in the formula [tex] \rm A = P(1 + \dfrac{r}{100})^t[/tex]
The amount received after compounding at the end of 1 year will be:
[tex] \rm A = 300(1 + \dfrac{5.5}{100})^1\\ \\ A=300(1.055)\\ \\ A=\$316.5[/tex]
Similarly, the amount to be received after 2 years will be:
[tex]316.5+316.5(1.055)[/tex]
The amount received after 10 years will be:
[tex]316.5+316.5(1.055)+316.5(1.055)^2+.......[/tex] upto 10 years
Therefore the summation that represents the money in account after 10 years is:
[tex]\begin{aligned}\sum_{10}^{n=1}316.5(1.055)^{n-1} \end{aligned}[/tex]
Learn more about compound interest here:
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