Question

How do you write a rule for the nth term of the arithmetic sequence `a_10=2, a_22=-8.8`?

Answer 1

`a_n=11 - 0.9n`

Explanation:

The `n`-th term of an arihmetic progression is defined as:

`a_n = a_1 + (n-1)d`

where `d` is the common difference.

We know that

`a_10 = 2`
`a_22 = -8.8`

`:. {(a_1+9d=2),(a_1+21d = -8.8) :}`

To find the general rule, we have to solve this system of linear equation. It is fairly easy; substract the first equation from the second:

`(a_1+21d)-(a_1+9d) = -10.8`

`12d = -10.8 => d = -0.9`

Now substitute `d` in any of the two equations to find `a_1`.

`a_1 - 8.1 = 2 => a_1 = 10.1`

Hence the general rule of the `n`-term is going to be

`a_n = 10.1-0.9(n-1)`

Which is equivalent to

`a_n =11 - 0.9n`