real analysis - Prove that if $epsilon > 0$ is given, then $frac{n}{n+2}$ ${approx

Monday, 16 November 2015

real analysis - Prove that if $epsilon > 0$ is given, then $frac{n}{n+2}$ ${approx_epsilon}$ 1, for $n$ $gg$ 1.

The book I am using for my Advance Calculus course is Introduction to Analysis by Arthur Mattuck.

Prove that if $\epsilon > 0$ is given, then $\frac{n}{n+2}$ ${\approx_\epsilon}$ 1, for $n$ $\gg$ 1.

This is my rough proof to this question. I was wondering if anybody can look over it and see if I made a mistake or if there is a simpler way of doing this problem. I want to thank you ahead of time it is greatly appreciated.So lets begin:

Proof:

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Monday, 16 November 2015

real analysis - Prove that if $epsilon > 0$ is given, then $frac{n}{n+2}$ ${approx_epsilon}$ 1, for $n$ $gg$ 1.

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real analysis - How to find $lim_{hrightarrow 0}frac{sin(ha)}{h}$

Monday, 16 November 2015

real analysis - Prove that if epsilon>0epsilon > 0 is given, then fracnn+2frac{n}{n+2} approxepsilon{approx_epsilon} 1, for nn gggg1.

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real analysis - How to find limhrightarrow0fracsin(ha)hlim_{hrightarrow 0}frac{sin(ha)}{h}

real analysis - Prove that if $epsilon > 0$ is given, then $frac{n}{n+2}$ ${approx_epsilon}$ 1, for $n$ $gg$ 1.

real analysis - How to find $lim_{hrightarrow 0}frac{sin(ha)}{h}$