2. For a real number alpha, consider the series2. For a real number alpha, consider the series
A necessary and sufficient condition for this series to be convergent is
|
A. |
B. |
C. |
|
D. |
E. |
Solution: The answer is B
If
then
does not go to to 0 as n goes to infinity, so the series diverges.
If
then
for sufficiently
large n, so
, which implies that
.
Consequently, by the comparison test, the series converges.
