Question

How do you find the number of terms n given the sum `s_n=375` of the series `-10+(-5)+0+5+10+...`?

Answer 1

There are `15` terms in this series.

Explanation:

We use the formula `s_n = n/2(2a + (n -1)d)` to find the sum of an arithmetic series.

Here, `a = -10`, `d = 5`, `s_n = 375` and `n = ?`

We will thus be solving for n.

`375 = n/2(2(-10) + (n - 1)5)`

`375 = n/2(-20 + 5n - 5)`

`375 = -25/2n + 5/2n^2`

`750 = 5n^2 - 25n`

`0 = 5n^2 - 25n - 750`

`0 = 5(n^2 - 5n - 150)`

`0 = (n - 15)(n + 10)`

`n = 15 or -10`

A negative answer is impossible, so there are `15` terms in this series.

Hopefully this helps!