Proving that <munder> <mo movablelimits="true" form="prefix">lim <mrow class="MJX-TeXAtom

Damon Stokes

Damon Stokes

Answered question

2022-06-17

Proving that lim n x 1 / n = 1 at x > 0

Answer & Explanation

zalitiaf

zalitiaf

Beginner2022-06-18Added 27 answers

An easier approach, if permitted, is to let y = log ( x )
Then, regardless of whether y is positive, negative, or zero, you have that
lim n y n = 0.
Therefore, it is routine to set up an ε demonstration, choosing N large enough so that for all n N, you have that e ( y / n ) is in the neighborhood of ( 1 ε , 1 + ε ) .
That is, you want to choose N large enough so that
| y N | < log ( 1 + ε )
and
| y N | < | log ( 1 ε ) | .

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