Prove: \(\displaystyle\lim_{{{n}\rightarrow\infty}}{\ln{{\left({\frac{{{n}+{1}}}{{{n}}}}\right)}}}={0}\)

encaderpwp

encaderpwp

Answered question

2022-03-31

Prove:
limnln(n+1n)=0

Answer & Explanation

haiguetenteme7zyu

haiguetenteme7zyu

Beginner2022-04-01Added 13 answers

Here an=ln(n+1n) and a=0
Then, for any given ξ>0
Let |ana|<ξ
|ln(n+1n)0|<ξ
ln(n+1n<ξ
n+1n<eξ
nn+1n<eξ
1+1n<eξ
1n<eξ1
Thus, by Archimedian Property NN such that
1n<eξ1, nN
Therefore, limnan=a
limnln(n+1n)=0

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