Sequences & Series · Power & Taylor Series
Radius of Convergence
The radius of convergence R determines where a power series converges absolutely. Often found via the ratio or root test.
Worked examples
Find R for Σ n! xⁿ.
- |a_{n+1}/aₙ| = (n+1)|x|
- lim (n+1)|x| = ∞ for any x ≠ 0
Answer: R = 0 (converges only at x = 0).
Find R for Σ xⁿ/n!.
- |a_{n+1}/aₙ| = |x|/(n+1) → 0 for all x
Answer: R = ∞ (converges for all x).
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