収束域

(1) >Σ(n=1→∞）(-1)^n(1/(2n+1)^x^2n+1) Σ(n=1→∞）((-1)^n)(1/(2n+1))x^(2n+1) の間違いでは？ そうなら lim(n→∞)|a[n+1]/a[n]| =lim(n→∞){(2n+1)/(2n+3)}x^2 =lim(n→∞){(2+1/n)/(2+3/n)}x^2 =(2/2)x^2 =x^2<1 ∴ -1<x<1 (2) >Σ(n=1→∞）(1/n！)x^n lim(n→∞)|a[n+1]/a[n]| =lim(n→∞){n!/(n+1)!}|x| =lim(n→∞){1/(n+1)}|x| =0<1(常に成立) ∴ 全ての実数x (|x|<∞) (3) >Σ(n=1→∞）((n！)^2/(2n)！)x^n lim(n→∞)|a[n+1]/a[n]| =lim(n→∞) [{((n+1)!)^2*(2n)!}/{(n!)^2*(2n+2)!}]|x| =lim(n→∞) [{((n+1)^2)}/{(2n+2)(2n+1)}]|x| =lim(n→∞) [{((1+1/n)^2)}/{(2+2/n)(2+1/n)}]|x| =lim(n→∞) [{(1+1/n)}/{2(2+1/n)}]|x| =(1/4)|x| <1 |x|<4 ∴-4<x<4 (4) >Σ(n=1→∞）(-1)^n(1/log(n+1))x^n lim(n→∞)|a[n+1]/a[n]| =lim(n→∞) {log(n+1)/log(n+2)}|x| =lim(n→∞) {(n+2)/(n+1)}|x| (ロピタルの定理適用) =lim(n→∞) {(1+2/n)/(1+1/n)}|x| =|x| <1 ∴ -1<x<1