How do you find the sum of the infinite geometric series 12+4+4/3+...?

1 Answer
Trevor Ryan.
Dec 9, 2015

#18#

Explanation:

An infinite geometric series of the form #sum_(n=1)^ooar^(n-1) # converges if and only if #|r|<1#, where r is the common ration between terms and given by #r=x_(n+1)/(x_n)#.
In this case it converges to the value #a/(1-r)# where a is the first term in the corresponding sequence #(x_n)#.

So in this case, #r=4/12=4/3/4=1/3<1# hence the series converges.

Its sum is hence #sum_(n=1)^oo12*(1/3)^(n-1)=12/(1-1/3)=18#

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