Does the p-Series Diverge for p<1?

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Homework Statement



[itex]\sum\frac{1}{n^{p}}[/itex] converges for [itex]p>1[/itex] and diverges for [itex]p<1[/itex], [itex]p\geq0[/itex].

The Attempt at a Solution



(1) Diverges: I want to prove it diverges for [itex]1-p[/itex] and using the comparison test show it also diverges for p. [itex]\sum\frac{1}{n^{1-p}}=\sum\frac{1}{n^{1}n^{-p}}=\sum n^{p}/n=\sum n^{p-1}[/itex] for [itex]p<1[/itex]. [itex]\sum n^{p-1}[/itex] ...but this series converges? Where did I go wrong?
 
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autre said:

Homework Statement



[itex]\sum\frac{1}{n^{p}}[/itex] converges for [itex]p>1[/itex] and diverges for [itex]p<1[/itex], [itex]p\geq0[/itex].

The Attempt at a Solution



(1) Diverges: I want to prove it diverges for [itex]1-p[/itex] and using the comparison test show it also diverges for p. [itex]\sum\frac{1}{n^{1-p}}=\sum\frac{1}{n^{1}n^{-p}}=\sum n^{p}/n=\sum n^{p-1}[/itex] for [itex]<1[/itex]. [itex]\sum n^{p-1}[/itex] ...but this series converges? Where did I go wrong?
It's not very clear what you're thinking here. Can you elaborate a bit? What is less than 1?
 
vela said:
It's not very clear what you're thinking here. Can you elaborate a bit? What is less than 1?

Sorry, typo -- p<1.
 
vela said:
What exactly are you trying to prove? You refer to "it" but what exactly is "it"?

Oh, sorry -- I want to prove that [itex]\sum\frac{1}{n^{p}}[/itex] diverges if [itex]\sum\frac{1}{n^{1-p}}[/itex] diverges using the Comparison Test.