How can I tell if this is convergent or divergent?

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How can I tell if this is convergent or divergent?

I'm not sure what test to use. Any help is really appreciated.

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Answer 1 · 2018-04-02T08:10:43

It is divergent, by comparison with the harmonic series.

Explanation:

Given:

$sum_(n=1)^oo (n(n-1))/(4n^3+3n+1)$

Quick assessment

For large values of $n$ , the numerator is going to be close to $n^2$ and the denominator to $4n^3$ , so the quotient behaves like $1/(4n)$ and the sum diverges like the harmonic series $sum 1/n$ .

Comparison test

We can make a comparison test with a multiple of the harmonic series by noting that:

The first term of the sum is $0$ . Though this does not matter for us in terms of convergence or divergence, it does mean we can ignore it in our expressions below.
$(n-1) >= n/2$ for all $n >= 2$
$4n^3+3n+1 < 5n^3$ for all $n >= 2$

So:

$sum_(n=1)^oo (n(n-1))/(4n^3+3n+1) >= sum_(n=2)^oo (n^2)/(10n^3) >= 1/10 sum_2^oo 1/n = +oo$

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How can I tell if this is convergent or divergent?

I'm not sure what test to use. Any help is really appreciated.

1 Answer

Explanation:

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