Question

How do you write an nth term rule for `a_3=10` and `a_6=300`?

Answer 1

`a_n=1.0359*3.107^(n-1)`

Explanation:

I'm assuming this is a geometric sequence...

The general formula for an arithmetic sequence is

`a_n=a_1*r^(n-1)` with `a_1` as the first term and `r` as the common ratio.

Plug in:

`a_3=10=a_1*r^(3-1)`
`a_6=300=a_1*r^(6-1)`

`10=a_1*r^(2)`
`300=a_1*r^(5)`

Divide:

`300/10=(a_1*r^(5))/(a_1*r^(2))`

`30=(cancel(a_1)*r^(5))/(cancel(a_1)*r^(2))`

`30=r^3`

`root3(30)=r or 30^(1/3)`

`r~~3.107`

Then find `a_1`:

`10=a_1*9.653`

`a_1~~1.0359`

Plug in the information into the general formula:

`a_n=1.0359*3.107^(n-1)`

Note: This is not exact as I rounded somewhere.