How do you find the sum of the infinite geometric series 7/8 + 7/12 + 7/18 + 7/27 ...?

1 Answer
Jan 3, 2016

This sum exists and is equal to #21/8#.

Explanation:

General form of geometric series:
#a+aq+aq^2+aq^3+...#

Factor out first term #a# to see what the quotient #q# of this geometric series could be:

#7/8(1+8/7*7/12+8/7*7/18+8/7*7/27+...)=7/8(1+2/3+4/9+8/27+...)=7/8(1+2/3+(2/3)^2+(2/3)^3+...)#

Now we could see that #a=7/8# and #q=2/3#. As long as #-1< q<1# the series converges and sum exists:
#a+aq+aq^2+aq^3+...=a/(1-q)=(7/8)/(1-2/3)=7/8*3=21/8#

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