How do you use the Nth term test on the infinite series #sum_(n=1)^ooln((2n+1)/(n+1))# ?

1 Answer
Wataru
Sep 3, 2014

By the nth term test (Divergence Test), we can conclude that the posted series diverges.

Recall: Divergence Test
If #lim_{n to infty}a_n ne 0#, then #sum_{n=1}^{infty}a_n# diverges.

Let us evaluate the limit.
#lim_{n to infty}ln({2n+1}/{n+1})#
by squeezing the limit inside the log,
#=ln(lim_{n to infty}{2n+1}/{n+1})#
by dividing the numerator and the denominator by #n#,
#=ln(lim_{n to infty}{2n+1}/{n+1}cdot{1/n}/{1/n}) =ln(lim_{n to infty}{2+1/n}/{1+1/n})#
since #1/n to 0#, we have
#=ln2ne 0#

By Divergence Test, we may conclude that
#sum_{n=1}^{infty}ln({2n+1}/{n+1})# diverges.

Caution: This test does not detect all divergent series; for example, the harmonic series #sum_{n=1}^{infty}1/n# diverges even though #lim_{n to infty}1/n=0#.

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