Good job!

The series

¥
å
n = 2

(-1)ⁿ

ln(n)

is an example of an alternating series

¥
å
n = 1

(-1)ⁿb_n

with b_n = 1/ln(n). We verify that the three conditions of the hold:

1
ln(n)
³ 0  for  all  n

1
ln(n+1)
£ 1
ln(n)
  for  all  n
(since ln(n) is positive and increasing for n ³ 2, its reciprocal is decreasing)

lim
n® ¥
1
ln(n)
= 0
(since

lim
n® ¥
ln(n) = ¥
)

Consequently, the series
¥
å
n = 2
a_n = ¥
å
n = 2
(-1)ⁿ
ln(n)

converges.

To determine whether the convergence is ,
we consider the series
¥
å
n = 2
| a_n| = ¥
å
n = 2
1
ln(n)

We can use either the or the ,
comparing our series to
¥
å
n = 2
1
n

Using the , it follows that since [1/ln(n)] ³ [1/n] ³ 0, (which follows from n ³ ln(n))
the divergence of the harmonic series
¥
å
n = 2
1
n

(i.e. a with p=1),

implies the divergence of
¥
å
n = 2
1
ln(n)

and hence, conditional convergence of the original series.