How do you find $S_n$ for the geometric series $a_1=1296$ , $a_n=1$ , r=-1/6?

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How do you find $S_n$ for the geometric series $a_1=1296$ , $a_n=1$ , r=-1/6?

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Answer 1 · 2017-01-01T18:32:08

1111

Explanation:

One important observation to make here is, that first term is 1296 that is $6^4$ and nth term is $6^0$ =1. That means the series consists of 5 terms. So n=5. Now

Sum of a geometric series is given by the formula $a (1-r^n)/(1-r)$

Here a = 1296, $r= (-1/6)$ , thus Sum= $1296 (1- (-1/6)^n)/ (1+1/6)$ = $1296 (1+1/7776)/(7/6)$ = 1111.

The sum can be found more easily by writing the 5 terms of the series 1296, -216, 36,-6 ,1 and adding.

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How do you find $S_n$ for the geometric series $a_1=1296$ , $a_n=1$ , r=-1/6?

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Explanation:

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Science

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How do you find S_nS_n for the geometric series a_1=1296a_1=1296, a_n=1a_n=1, r=-1/6?

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Explanation:

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How do you find $S_n$ for the geometric series $a_1=1296$ , $a_n=1$ , r=-1/6?