Question

How do you use the limit comparison test for `sum( 3n-2)/(n^3-2n^2+11)` as n approaches infinity?

Answer 1

The series converges.

Explanation:

The terms of `sum(3n-2)/(n^3-2n^2+11)`,

in the limit look like those of

`sum3/n^2" "` -- a series we know to be convergent.

To apply the limit comparison test, evaluate

`c = lim_(nrarroo)((3n-2)/(n^3-2n^2+11))/(3/n^2)`

`= lim_(nrarroo)((3n-2)/(n^3-2n^2+11))* (n^2/3)`

`= lim_(nrarroo)((3n^3-2n^2)/(3n^3-6n^2+33))`

`= lim_(nrarroo)((3-2/n)/(3-6/n+33/n^2))`

`=1`

Because `c` is positive and finite, the series either both converge or both diverge.

`sum3/n^2" "` converges, so we conclude that

`sum(3n-2)/(n^3-2n^2+11)" "` also converges.

Note

We could have used the series `sum1/n^2` for the limit comparison, (We would have gotten `c = 3`.)

But I think it is more clear that the terms eventually behave like `3/n^2`