Compute Sum of 1/(n^2(2n-1)): Tips & Hints

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Discussion Overview

The discussion revolves around computing the sum of the series 1/(n^2(2n-1)) as n approaches infinity. Participants explore various methods to simplify and evaluate the sum, including partial fraction decomposition and comparisons to known convergent series.

Discussion Character

  • Mathematical reasoning
  • Exploratory
  • Homework-related

Main Points Raised

  • One participant presents the series and attempts to manipulate it into a more manageable form, suggesting a connection to the known sum of 1/n^2.
  • Another participant recommends using partial fractions to simplify the term 4/(2n(2n-1)), proposing a specific decomposition.
  • A participant expresses confusion over the correct form of the series and discusses convergence properties of two different interpretations of the series.
  • There is mention of the limit comparison test as a method to analyze the convergence of the series in question.

Areas of Agreement / Disagreement

Participants do not reach a consensus on the correct interpretation of the series or the best method for evaluating it. Multiple approaches and interpretations are presented, indicating ongoing uncertainty.

Contextual Notes

There are unresolved assumptions regarding the manipulation of series terms and the specific form of the series being discussed. The convergence tests mentioned depend on the correct interpretation of the series.

cateater2000
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Compute the following sum
when n goes from 1 to oo of
1/(n^2(2n-1))


So far this is what I've done
1/(n^2(2n-1))=4/(2n(2n-1))-1/n^2
I know the sum from 1 to oo of 1/n^2 =(pi^2)/6
So I get
1/(n^2(2n-1))=4/(2n(2n-1)) - pi^2/6

so I need to compute the sum of 4/(2n(2n-1)) which i have no idea how to do.

Any hints or tips would be great
 
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Assuming u did the first part correctly,
for ur question,
use partial fractions,
4/((2n)(2n-1))
= (4/(2n-1))-(4/(2n))

Now write the first few numbers of the series in this fashion and see if can notice something peculiar ...

-- AI
 
thankyou the reason I couldn't do the question is because I went
4/(2n(2n-1))=4/(2n-1)-2/n

and I couldn't see any apparent pattern.

I will try your partial fraction right now. Thankyou
 
by the way i was wondering if i got your question right is it 1 / n ^(4n-2)

or is it 1/n^2 * (2n-1)

in any case the first one does converge since n^2 / n^4n < n^2 / n^4 = 1 / n^2 which is a convergent p series
the second one you can use the limit comparison test to show that it is lesser the 1/n^2 which is a convergent p series
 

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