Question

How do you find `S_n` for the geometric series `a_1=162`, r=1/3, n=6?

Answer 1

The answer is `=2186/9`

Explanation:

Let `S_n` be the sum of a geometric series

`S_n=a_1+a_1r+ ........ a_1r^n`

Then, `rS_n=a_1r+..................+a_1r^(n+1)`

Therefore,

`S_n(1-r)=a_1(1-r^(n+1))`

`S_n=(a_1(1-r^(n+1)))/(1-r)`

`a_1=162`

`r=1/3`

`n=6`

`S_6=162(1-(1/3)^7)/(1-1/3)`

`=162*3/2(1-(1/3)^7)`

`=243-243/3^7`

`=243-1/9`

`=2186/9`