Question

The sum of the first `3` terms in a geometric series with common ratio `3` is `52`. What are the values of `t_1` and `t_6`?

Answer 1

`t_1 = 4`
`t_6 = 972`

Explanation:

You start by finding `a` in the formula `s_n = (a(1 - r^n))/(1 - r)`, since we know the sum, the common ratio (`r`) and the number of terms.

`52 = (a(1 - 3^3))/(1 - 3)`

`52(-2) = a(1 - 27)`

`-104 = -26a`

`a = (-104)/(-26)`

`a = 4`

Hence, the first term is `4`. We can find the 6th term using the formula for the nth term of a geometric sequence, `t_n = a xx r^(n - 1)`.

`t_6 = 4 xx 3^(6 - 1)`

`t_6 = 972`

Hopefully this helps!