a geometric series has a sum of 9,837. the common ratio is 3 and the first term is 9. how many terms are in a series? answer

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asked Sep 13, 2018 209k views

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a geometric series has a sum of 9,837. the common ratio is 3 and the first term is 9. how many terms are in a series? answer

Mathematics
high-school

Vitule asked

by Vitule

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1 Answer

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$S_n=9(3)^0+9(3)^1+\cdots+9(3)^(n-1)+9(3)^n$

$3S_n=9(3)^1+9(3)^2+\cdots+9(3)^n+9(3)^(n+1)$

S_n-3S_n=9(3)^0-9(3)^(n+1)

$S_n=\frac92(3^(n+1)-1)$

We're given that

$S_n=9837=\frac92(3^(n+1)-1)$

$\implies2186=3^(n+1)-1$

$\implies2187=3^(n+1)$

$\implies\log_32187=\log_33^(n+1)=n+1$

$\implies7=n+1$

$\implies n=6$

so there are 6 terms in the series.

Ahmed Farag Mostafa answered Sep 18, 2018

by Ahmed Farag Mostafa

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