How do you find #a_7# for the geometric sequence #729, -243,81,...#?

1 Answer
VNVDVI
Apr 16, 2018

#a_7=1#

Explanation:

We should first find a general formula for the geometric sequence, which will be in the form

#a_n=a(r)^(n-1), r>=1, r# is the common ratio between terms, #a# is the first term.

We see #a=729,# to determine #r,# simply divide one of the terms by the term before it -- we're told the sequence is geometric, so we don't need to test all of the terms for the ratio, as we already know they'll share a common ratio.

#r=-243/729=-1/3#

So, we obtain

#a_n=729(-1/3)^(n-1)#

To find #a_7,# just plug in #n=7:#

#a_7=729(-1/3)^(7-1)=729(-1/3)^6=1#

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