Respuesta :
[tex]\bf \qquad \textit{sum of a finite geometric sequence}
\\ \quad \\
S_n=a_1\left( \cfrac{1-r^n}{1-r} \right)\quad
\begin{cases}
n=\textit{last term}\\
a_1=\textit{first term}\\
r=\textit{common ratio}
\end{cases}
\\ \quad \\
S_8=3\left( \cfrac{1-0.5^8}{1-0.5} \right)[/tex]
Answer: The required sum of first eight terms of the given geometric series is 5.98.
Step-by-step explanation: We are given to find the sum of first eight terms of a geometric series whose first term is 3 and whose common ratio is 0.5.
We know that
the sum of first n terms of a geometric series with first term a and common ratio r is given by
[tex]S_n=\dfrac{a(1-r^n)}{1-}.[/tex]
For the given geometric series, we have
first term, a = 3 and common ratio, r = 0.5.
So, the sum of first eight terms of the given geometric series will be
[tex]S_8\\\\\\=\dfrac{a(1-r^8)}{1-r}\\\\\\=\dfrac{3\left(1-\left(\frac{1}{2}\right)^8\right)}{1-\frac{1}{2}}\\\\\\=\dfrac{3\left(1-\frac{1}{256}\right)}{\frac{1}{2}}\\\\\\=3\times2\times\dfrac{256-1}{256}\\\\\\=3\times\dfrac{255}{128}\\\\\\=\dfrac{765}{128}\\\\=5.98.[/tex]
Thus, the required sum of first eight terms of the given geometric series is 5.98.
