Question

How do you find the sum of the geometric series `1/16+1/4+1+...` to 7 terms?

Answer 1

`4^(-2)(1-4^7)/(1-4)=5461/16`

Explanation:

By collecting `4^(-2)` the progression can be rewritten as

`4^(-2)(1+4+4^2+....+4^6)`
in general we know that `1+q+q^2+....+q^n=(1-q^(n+1))/(1-q)`
in our case we have `4^(-2)(1-4^7)/(1-4)=5461/16`

Answer 2

The sum of the first 7 terms is `5461/16= 341 5/16`

Explanation:

The formula for the sum of a particular number of terms of a geometric sequence is

`S_n=frac{a_1(1-r^n)}{1-r}` where

`a_1=`the first term of the sequence

`r=` the common ratio

To find `r`, divide a term by the previous term.

To find the sum of the first 7 terms of the sequence `1/16, 1/4, 1...`

`a_1=1/16`

`r=1/4 -: 1/16=4`

`n=7`

`S_n= frac{1/16(1-4^7)}{1-4} = 5461/16=341 5/16`