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I need help solving this practice problem from my prep guide

I need help solving this practice problem from my prep guide-example-1
User Wilhelm Sorban
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1 Answer

12 votes
12 votes

ANSWER


\lim _(n\to\infty)\text{ }(\frac{3n^5^{}}{6n^6+1})\text{ = 0}

Step-by-step explanation

Step 1: Given that:


\sum ^(\infty)_(n\mathop=1)(\frac{3n^5^{}}{6n^6+1})

Step 2: Expand the limit


\begin{gathered} \lim _(n\to\infty)(\frac{3n^5^{}}{6n^6+1})\text{ } \\ \text{ = }\lim _(n\to\infty)(n^5)/(n^5)(\frac{3^{}}{6n^{}+(1)/(n^5)}) \\ \text{ = }\lim _(n\to\infty)(\frac{3^{}}{6n^{}+(1)/(n^5)}) \\ =\text{ }\lim _(n\to\infty)(\frac{3^{}}{6(\infty)^{}+(1)/((\infty)^5)}) \\ \text{ = }\lim _(n\to\infty)(\frac{3^{}}{6(\infty)^{}+(1)/(\infty)}) \\ \text{ = }\lim _(n\to\infty)(\frac{3^{}}{6(\infty)^{}+0^{}}) \\ \text{ = }\lim _(n\to\infty)(\frac{3^{}}{6(\infty)^{}^{}})\text{ = 0} \\ \end{gathered}

Hence,


\lim _(n\to\infty)((3n^5)/(6n^6+1))\text{ = 0}

User VahidShir
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