Esercizio serie numeriche con criterio del rapporto, del confronto e della radice

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\text{Per }n\to+\infty\\2^n+\log(n)\sim 2^n\\e^{-n}=\frac{1}{e^n}=\frac{1}{``\infty"}\to0

\sum_{n=2}^{+\infty}\frac{3n^{5/2}\cdot2^n}{7^n}

l=\lim_{n\to+\infty}\frac{b_{n+1}}{b_n}=\underbrace{\frac{3(n+1)^{5/2}\cdot2^{n+1}}{7^{n+1}}}_{\displaystyle b_{n+1}}\cdot\underbrace{\frac{7^n}{3n^{5/2}\cdot2^n}}_{\displaystyle b_n}

\lim_{n\to+\infty}\frac{3(n+1)^{5/2}\cdot\cancel{2^n}\cdot2}{\cancel{7^n}}\cdot\frac{\cancel{7^n}}{3n^{5/2}\cdot2^n}

\lim_{n\to+\infty}\frac{2}{7}\frac{(n+1)^{5/2}}{n^{5/2}}

\lim_{n\to+\infty}\frac{2}{7}\cdot\frac{(n+1)^{5/2}}{n^{5/2}}=\lim_{n\to+\infty}\frac{2}{7}\cdot\underbrace{\frac{\cancel{n^{5/2}}}{\cancel{n^{5/2}}}}_{=\,\,1}=\frac{2}{7}=l