I want to determine the limit of this succession, for this I suppose that n 2 </msup>

ddcon4r

ddcon4r

Answered question

2022-07-11

I want to determine the limit of this succession, for this I suppose that
n 2 ( n 3 n ) n n 2 ( 1 + n 3 n ) n n 2 ( 2 n 3 n ) n

Answer & Explanation

toriannucz

toriannucz

Beginner2022-07-12Added 16 answers

This first comment no longer applies, the post was edited
Your second inequality is not correct. Take for example n=2. Then
n 2 ( 1 + n 3 n ) n = 1 , ( 2 n 3 n ) n = 4 9 ,
and clearly 1 4 9
This is still relevant
What you could do, however, is notice that you can rewrite it as
n 2 ( 1 + n 3 n ) n = n 2 ( 1 3 n + 1 3 ) n = n 2 3 n ( 1 + 1 n ) n .
Now notice that
lim n n 2 3 n = 0
(I will assume you already know this), and
lim n ( 1 + 1 n ) n = e .
Thus if you take the limit, you can split it up into a product of limits, and what you end up with is
lim n n 2 ( 1 + n 3 n ) n = 0 e = 0.
woowheedr

woowheedr

Beginner2022-07-13Added 2 answers

You have n 2 ( 1 + n 3 n ) n = n 2 3 n ( 1 + 1 n ) n
It is well-known that lim n ( 1 + 1 n ) n converges to e and it can be shown that lim n n 2 3 n = 0 (for example, by using L'hospital's Rule twice).
Therefore, lim n n 2 ( 1 + n 3 n ) n = 0

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