Understanding Sequence Limits: Convergence and Divergence

What is the common difference in the arithmetic sequence defined by a_n = 3n + 4?

As n approaches infinity, what happens to the sequence a_n = 1/(3^n)?

What is the limit of the sequence a_n = 8n/(3n - 5) as n approaches infinity?

Which theorem is used to determine the convergence of the sequence sin(n)/n?

What is the limit of the sequence a_n = ln(n^4)/(5n) as n approaches infinity?

How does the sequence n!/(n+1)! behave as n approaches infinity?

What is the limit of the sequence (1 + 1/n)^n as n approaches infinity?

What is the result of applying L'Hôpital's rule to the sequence n*sin(1/n)?

What is the limit of the sequence 4n/sqrt(n^2 + 5) as n approaches infinity?

What is the behavior of the sequence n!/(n+2)! as n approaches infinity?