Question

How do you find the number of terms given `s_n=3829` and `7+(-21)+63+(-189)+...`?

Answer 1

`n = 6`

Explanation:

`7+(-21)+63+(-189)+cdots = 7sum_{k=0}^{k=n}(-3)^k = S_n`

We know that

`sum_{k=0}^{k=n}z^k = (z^{n+1}-1)/(z-1)`

so

`S_n = 7((-3)^{n+1}-1)/(-3-1) = 3829`

then

`(-3)^{n+1}=(-4)3829/7+1`

and

`(-3)^n = (4 cdot 3829/7-1)/3 = 729 = 3^6`

so

`n = 6`