I know if $\sum{a_n}$ converges absolutely then $\sum{\frac{a_n}{n}}$ converges since $0\le \frac{|a_n|}{n} \le |a_n| $ for all $n$ so it converges absolutely by the basic comparison test and therefore converges. However, I cannot prove the convergence of $\sum \frac{a_n}{n}$ if $\sum{a_n}$ converges but not absolutely even though I suspect it to be true. Can you give me a proof or a counterexample for this?
[Math] If $\sum{a_n}$ converges does that imply that $\sum{\frac{a_n}{n}}$ converges
sequences-and-series
Best Answer
You might want to consider Dirichlet's test.