Show convergence using comparison test on sin(1/n)

ciarax
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Homework Statement




a) Test the following series for convergence using the comparison test
:
sin(1/n)

Explain your conclusion.

Homework Equations





The Attempt at a Solution


i must show f(x)<g(x) in order for it to converge other wise divergence.

g(x) = 1/n

sin(1/n) > 1/n always therefore the series is divergent.
is this correct?
 
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ciarax said:
sin(1/n) > 1/n

How did you obtain this inequality?? It isn't correct.
 
it was an attempt. i was looking back on my notes and thought that might be right :/ do you have any idea how to complete this?
 
The inequality sin(1/n) > 1/n might not hold, but it can be modified in something that does hold.
 
does this prove that it is divergent? or how do i go about proving if its convergent/divergent using the comparison test?
 
For large n, sin(1/n) ≈ 1/n. So use that to find your inequality.
 
does that give sin(1/n) > 1/2n?
 
It does for me.
 
so using that its divergent? thanks :)
 

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