Absolute & conditional convergence
Absolute & conditional convergence
Lessons
Notes:
Let $\sum a_n$ be a convergent series. Then we say that $\sum a_n$ is absolutely convergent if $\sum a_n$ is convergent.
If $\sum a_n$ is divergent, then we say that $\sum a_n$ is conditionally convergent.

2.
Questions based on Absolute & Conditional Convergence
Determine if the series is absolutely convergent, conditionally convergent, or divergent