Across
- 4. if terms grow without bound, series diverges
- 5. lim as n approaches zero of general term = 0 and terms decrease, series converges
- 6. lim as n approaches ∞ of ratio of (n+1) term/nth term > 1, series converges
- 7. general term = a₁r^n, converges if -1 < r < 1
Down
- 1. if lim as n approaches ∞ of ratio of comparison series/general term is positive and finite, then series behaves like comparison series
- 2. if an integral converges, series converges
- 3. general term = 1/n^p, converges if p > 1