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Hubisan · Answer 1 · 2018-09-28T05:28:51+0000

If you're talking about adding just these four terms, notice that

$S_4=6+2+\frac23+\frac29$

$S_4=6\left(1+\frac13+\frac1{3^2}+\frac1{3^3}\right)$

$\frac13S_4=6\left(\frac13+\frac1{3^2}+\frac1{3^3}+\frac1{3^4}\right)$

$S_4=\frac{80}9$

If you were referring to an infinite sum, so that the pattern continues, note that the same procedure as above can be applied to the

th partial sum:

$S_n=6\left(1+\frac13+\frac1{3^2}+\cdots+\frac1{3^n}\right)$

$\frac23S_n=6\left(1-\frac1{3^(n+1)}\right)$

$S_n=9\left(1-\frac1{3^(n+1)}\right)$

Then as
$n\to\infty$ , the exponential term approaches 0, leaving you with

$6+2+\frac23+\frac29+\cdots=9$

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