Question

How do you find the sum of the infinite geometric series `-3(3/4)^(n - 1)`?

Answer 1

Sum of the infinite geometric series `-3(3/4)^(n-1)` is `-12`.

Explanation:

Sum of a geometric series `{a,ar,ar^2,ar^3,.....,ar^(n-1)}` where `a` is first term and ratio is `r` (note `n^(th)` term is `ar^(n-1)`) is given by

`axx((r^n-1)/(r-1))` where `r>1` and `axx((1-r^n)/(1-r))` where `r<1`.

In the above case, `a=-3` and `n^(th)` term is `-3(3/4)^(n-1)`.

As `r<1` as `n->oo`, `r^n->0`.

Hence, sum of infinite series will be `(-3)xx1/(1-3/4)` or

`-3xx1/(1/4)` or `-3xx4=-12`