Limit $ lim_{n rightarrow infty}sqrt{(1+frac{1}{n}+frac{1}{n^3})^{5n+1}} $
up vote
1
down vote
favorite
What's the limit of this?
$$
lim_{n rightarrow infty}sqrt{left(1+frac{1}{n}+frac{1}{n^3}right)^{5n+1}}
$$
Can't find a way to solve it, I tried to use something looks like $(1+1/n)^n$ but didn't succeed.
Many thanks!
calculus limits exponential-function
add a comment |
up vote
1
down vote
favorite
What's the limit of this?
$$
lim_{n rightarrow infty}sqrt{left(1+frac{1}{n}+frac{1}{n^3}right)^{5n+1}}
$$
Can't find a way to solve it, I tried to use something looks like $(1+1/n)^n$ but didn't succeed.
Many thanks!
calculus limits exponential-function
Start with logarithms; then Taylor series
– Claude Leibovici
Dec 5 at 12:04
Is answer is 1?
– Cloud JR
Dec 5 at 12:10
add a comment |
up vote
1
down vote
favorite
up vote
1
down vote
favorite
What's the limit of this?
$$
lim_{n rightarrow infty}sqrt{left(1+frac{1}{n}+frac{1}{n^3}right)^{5n+1}}
$$
Can't find a way to solve it, I tried to use something looks like $(1+1/n)^n$ but didn't succeed.
Many thanks!
calculus limits exponential-function
What's the limit of this?
$$
lim_{n rightarrow infty}sqrt{left(1+frac{1}{n}+frac{1}{n^3}right)^{5n+1}}
$$
Can't find a way to solve it, I tried to use something looks like $(1+1/n)^n$ but didn't succeed.
Many thanks!
calculus limits exponential-function
calculus limits exponential-function
edited Dec 5 at 19:33
amWhy
191k28224439
191k28224439
asked Dec 5 at 12:00
Omer Gafla
91
91
Start with logarithms; then Taylor series
– Claude Leibovici
Dec 5 at 12:04
Is answer is 1?
– Cloud JR
Dec 5 at 12:10
add a comment |
Start with logarithms; then Taylor series
– Claude Leibovici
Dec 5 at 12:04
Is answer is 1?
– Cloud JR
Dec 5 at 12:10
Start with logarithms; then Taylor series
– Claude Leibovici
Dec 5 at 12:04
Start with logarithms; then Taylor series
– Claude Leibovici
Dec 5 at 12:04
Is answer is 1?
– Cloud JR
Dec 5 at 12:10
Is answer is 1?
– Cloud JR
Dec 5 at 12:10
add a comment |
8 Answers
8
active
oldest
votes
up vote
6
down vote
Let
$$
a_n = left(1 + frac 1n + frac 1{n^3}right)^n.
$$
To use that limit, we squeeze it like so:
$$
left(1 + frac 1nright)^n leqslant a_n leqslant left(1 + frac {n^2+1}{n^3}right)^{n^3/(n^2+1)},
$$
so $lim a_n = mathrm e$. Then the original limit is $mathrm e^{5/2}$ by breaking the expression into
$$
sqrt {a_n ^5 cdot left(1+frac 1n + frac 1{n^3}right)},
$$
and the expression in the () has the limit $1$.
UPDATE
The proof is actually not complete. If only the limit $lim (1+frac 1n)^n$ is allowed to use, then we need to justify
$$
lim_n left(1+frac {n^2+1}{n^3}right)^{n^3/(n^2+1)} = mathrm e.
$$
Then we still need to squeeze this. Let this sequence be $b_n$, then
$$
b_n = left(1 + frac 1{frac {n^3}{n^2+1}}right)^{n^3/(n^2+1)},
$$
note that
$$
frac {n^2+1}{n^3} leqslant frac {n^2+n}{n^3} = frac {n+1}{n^2} leqslant frac {n+1}{n^2-1} = frac 1{n-1},
$$
and also
$$
frac {n^3}{n^2+1} leqslant frac {n^3+n}{n^2+1} = n,
$$
so
$$
left(1+frac 1n right)^n leqslant a_n leqslant b_n leqslant left(1+frac 1{n-1}right)^n = left(1+frac 1{n-1}right)^{n-1}cdot left(1 +frac 1{n-1}right),
$$
then take the limit $nto infty$, we have
$$
lim a_n = lim b_n =mathrm e.
$$
Remark
This seems complicated, so actually you could show that
$$
lim_n left(1 + frac 1 {f(n)}right)^{f(n)} =mathrm e
$$
where $lim f(n) = +infty$ after you learning the limit of functions, i.e. the well known
$$
lim_{xto +infty} left(1+frac 1xright)^x = mathrm e
$$
to make things a bit easier by invoking the relationship between limits of sequences and functions. This answer is a demo when there is some restrictions on the tools you are allowed to use.
add a comment |
up vote
4
down vote
You may use the fact:
$(1+x_n)^{large frac{1}{x_n}} stackrel{n to infty}{longrightarrow} e$ for any sequence $(x_n)$ with $0<x_n stackrel{n to infty}{longrightarrow} 0$
It follows
$$begin{eqnarray*} sqrt{left(1+frac{1}{n}+frac{1}{n^3}right)^{5n+1}}
& = & sqrt{left(1 + frac{n^2+1}{n^3}right)^{largefrac{n^3}{n^2+1}cdot underbrace{large frac{(5n+1)(n^2+1)}{n^3}}_{large stackrel{n to infty}{longrightarrow} 5}}} \
& stackrel{n to infty}{longrightarrow} & sqrt{e^5}
end{eqnarray*}$$
I add large for powers in a square root for a good look! If you feel uncomfortable to this , I'm sorry and kindly edit again!
– Chinnapparaj R
Dec 5 at 12:22
add a comment |
up vote
3
down vote
Short answer: (correct but not 100% rigorous, see @xbh)
The term $1/n^3$ is negligible compared to $1/n$, and $1$ is negligible compared to $5n$. Then your limit is the same as that of
$$left(left(1+frac1nright)^{1/n}right)^{5/2}.$$
With a little more trickery, you can write
$$frac1m=frac1n+frac1{n^3}$$ and it is not a big deal to show
$$n=m+o(m).$$
Now you have
$$sqrt{left(1+frac1mright)^{5m+o(m)+1}}$$ where only the first exponent brings a non-unit contribution.
3
Still more rigorous than the average engineer would do :-)
– Carl Witthoft
Dec 5 at 13:51
add a comment |
up vote
2
down vote
Hint:
$$lim_{ntoinfty}left(1+dfrac{n^2+1}{n^3}right)^{(5n+1)/2}$$
$$=left(lim_{ntoinfty}left(1+dfrac{n^2+1}{n^3}right)^{n^3/(n^2+1)}right)^{lim_{ntoinfty}dfrac{(5n+1)(n^2+1)}{2n^3}}$$
As $lim_{ntoinfty}dfrac{n^2+1}{n^3}=0,$ the inner limit converges to $e$
$lim_{ntoinfty}dfrac{(5n+1)(n^2+1)}{2n^3}=lim_{ntoinfty}dfrac{left(5+dfrac1nright)left(1+dfrac1{n^2}right)}2=?$
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up vote
1
down vote
Rewrite:
$$sqrt{left(1+frac{1}{n}+frac{1}{n^3}right)^{5n+1}}=expleft(tfrac{5n+1}{2}logleft(1+tfrac{1}{n}+tfrac{1}{n^3}right)right)$$
and $log(1+x) approx x$ for small $x$, so:
$$lim_{n to infty}sqrt{left(1+frac{1}{n}+frac{1}{n^3}right)^{5n+1}}=lim_{n to infty}expleft(tfrac{5n+1}{2}left(tfrac{1}{n}+tfrac{1}{n^3}right)right)=e^{5/2}$$
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up vote
0
down vote
It's $$e^{5/2} .$$ I've been involved in a few posts in which the query is like that of this one, recently, the subject being one of my favourite ones.
It scarcely matters about the square-root, really: that doesn't affect the limiting process itself here atall. A crucial point though is that in a limit such as this, the terms of higher order than linear in $1/n$ become negligible. This can be shown in various ways, such as by analysing the terms in a generalised expansion combinatorially. I have discussed this elsewhere; and I think a repetition of any more than a little of it would be a tad redundant here. But I'll say that it's a bit like the way the terms beyond the linear ones fade out in the derivation of the derivative of a function - but that here it's 'cast' in a multiplicative form.
Also the constant (with respect to $n$) in the exponent becomes negligible: this can be seen by noting that leaving it in would be the same as leaving a finite power of the bracket multiplying the whole thing; And the limit of a finite power of it as $ntoinfty$ is certainly 1.
So we are left with $$lim_{ntoinfty}left(1+{1over n}right)^{5nover2}$$ This is now just the standard limit form of the exponential function $$lim_{ntoinfty}left(1+{xover n}right)^n$$$$=$$$$lim_{ntoinfty}left(1+{1over n}right)^{nx}$$$$=$$$$lim_{ntoinfty}left(1+{sqrt{x}over n}right)^{nsqrt{x}}, $$ or whatever.
The reason I have written it several times like that is just to emphasise that factors can be transferred at will between the term in the bracket & the exponent. That the exponential function of $x$ is identical with this limt is a standard result - showing that it is is beyond the ambit of this answer, really. Or is that actually what you're asking for?
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up vote
0
down vote
Because I can :-), in R
> whatlim <- function(n) {
term = sqrt( (1 + 1/n + 1/n^3)^(5*n+1) )
delta = exp(2.5) - term
return(delta) }
> converge = NULL
> for (jj in 0:10) {
converge[jj+1] = whatlim(10^jj) }
> converge
[1] -1.481751e+01 5.525765e-01 8.732760e-02 9.095940e-03 9.132772e-04
[6] 9.136407e-05 9.139366e-06 8.958993e-07 2.765578e-07 -2.510824e-06
[11] -2.519047e-06
Where pretty obviously the last two terms suffer from floating-point precision limit.
add a comment |
up vote
0
down vote
Let's assume the well known result $$lim_{ntoinfty} left(1+frac{1}{n}right)^n=etag{1}$$ and the lemma of Thomas Andrews:
Lemma: If ${a_n} $ is a sequence of real or complex terms such that $n(a_n-1)to 0$ then $a_n^nto 1$ as $nto infty $.
Consider the sequence $$a_n=dfrac{1+dfrac{1}{n}+dfrac {1}{n^3}}{1+dfrac{1}{n}}$$ and check that $n(a_n-1) to 1$ so that $a_n^nto 1$ and using $(1)$ we get $$lim_{nto infty} left(1+frac {1}{n}+frac{1}{n^3}right)^n=etag{2}$$ and then we get $$lim_{ntoinfty} left(1+frac {1}{n}+frac {1}{n^3}right)^{5n+1}=e^5$$ and taking square roots we get the answer as $e^{5/2}$.
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8 Answers
8
active
oldest
votes
8 Answers
8
active
oldest
votes
active
oldest
votes
active
oldest
votes
up vote
6
down vote
Let
$$
a_n = left(1 + frac 1n + frac 1{n^3}right)^n.
$$
To use that limit, we squeeze it like so:
$$
left(1 + frac 1nright)^n leqslant a_n leqslant left(1 + frac {n^2+1}{n^3}right)^{n^3/(n^2+1)},
$$
so $lim a_n = mathrm e$. Then the original limit is $mathrm e^{5/2}$ by breaking the expression into
$$
sqrt {a_n ^5 cdot left(1+frac 1n + frac 1{n^3}right)},
$$
and the expression in the () has the limit $1$.
UPDATE
The proof is actually not complete. If only the limit $lim (1+frac 1n)^n$ is allowed to use, then we need to justify
$$
lim_n left(1+frac {n^2+1}{n^3}right)^{n^3/(n^2+1)} = mathrm e.
$$
Then we still need to squeeze this. Let this sequence be $b_n$, then
$$
b_n = left(1 + frac 1{frac {n^3}{n^2+1}}right)^{n^3/(n^2+1)},
$$
note that
$$
frac {n^2+1}{n^3} leqslant frac {n^2+n}{n^3} = frac {n+1}{n^2} leqslant frac {n+1}{n^2-1} = frac 1{n-1},
$$
and also
$$
frac {n^3}{n^2+1} leqslant frac {n^3+n}{n^2+1} = n,
$$
so
$$
left(1+frac 1n right)^n leqslant a_n leqslant b_n leqslant left(1+frac 1{n-1}right)^n = left(1+frac 1{n-1}right)^{n-1}cdot left(1 +frac 1{n-1}right),
$$
then take the limit $nto infty$, we have
$$
lim a_n = lim b_n =mathrm e.
$$
Remark
This seems complicated, so actually you could show that
$$
lim_n left(1 + frac 1 {f(n)}right)^{f(n)} =mathrm e
$$
where $lim f(n) = +infty$ after you learning the limit of functions, i.e. the well known
$$
lim_{xto +infty} left(1+frac 1xright)^x = mathrm e
$$
to make things a bit easier by invoking the relationship between limits of sequences and functions. This answer is a demo when there is some restrictions on the tools you are allowed to use.
add a comment |
up vote
6
down vote
Let
$$
a_n = left(1 + frac 1n + frac 1{n^3}right)^n.
$$
To use that limit, we squeeze it like so:
$$
left(1 + frac 1nright)^n leqslant a_n leqslant left(1 + frac {n^2+1}{n^3}right)^{n^3/(n^2+1)},
$$
so $lim a_n = mathrm e$. Then the original limit is $mathrm e^{5/2}$ by breaking the expression into
$$
sqrt {a_n ^5 cdot left(1+frac 1n + frac 1{n^3}right)},
$$
and the expression in the () has the limit $1$.
UPDATE
The proof is actually not complete. If only the limit $lim (1+frac 1n)^n$ is allowed to use, then we need to justify
$$
lim_n left(1+frac {n^2+1}{n^3}right)^{n^3/(n^2+1)} = mathrm e.
$$
Then we still need to squeeze this. Let this sequence be $b_n$, then
$$
b_n = left(1 + frac 1{frac {n^3}{n^2+1}}right)^{n^3/(n^2+1)},
$$
note that
$$
frac {n^2+1}{n^3} leqslant frac {n^2+n}{n^3} = frac {n+1}{n^2} leqslant frac {n+1}{n^2-1} = frac 1{n-1},
$$
and also
$$
frac {n^3}{n^2+1} leqslant frac {n^3+n}{n^2+1} = n,
$$
so
$$
left(1+frac 1n right)^n leqslant a_n leqslant b_n leqslant left(1+frac 1{n-1}right)^n = left(1+frac 1{n-1}right)^{n-1}cdot left(1 +frac 1{n-1}right),
$$
then take the limit $nto infty$, we have
$$
lim a_n = lim b_n =mathrm e.
$$
Remark
This seems complicated, so actually you could show that
$$
lim_n left(1 + frac 1 {f(n)}right)^{f(n)} =mathrm e
$$
where $lim f(n) = +infty$ after you learning the limit of functions, i.e. the well known
$$
lim_{xto +infty} left(1+frac 1xright)^x = mathrm e
$$
to make things a bit easier by invoking the relationship between limits of sequences and functions. This answer is a demo when there is some restrictions on the tools you are allowed to use.
add a comment |
up vote
6
down vote
up vote
6
down vote
Let
$$
a_n = left(1 + frac 1n + frac 1{n^3}right)^n.
$$
To use that limit, we squeeze it like so:
$$
left(1 + frac 1nright)^n leqslant a_n leqslant left(1 + frac {n^2+1}{n^3}right)^{n^3/(n^2+1)},
$$
so $lim a_n = mathrm e$. Then the original limit is $mathrm e^{5/2}$ by breaking the expression into
$$
sqrt {a_n ^5 cdot left(1+frac 1n + frac 1{n^3}right)},
$$
and the expression in the () has the limit $1$.
UPDATE
The proof is actually not complete. If only the limit $lim (1+frac 1n)^n$ is allowed to use, then we need to justify
$$
lim_n left(1+frac {n^2+1}{n^3}right)^{n^3/(n^2+1)} = mathrm e.
$$
Then we still need to squeeze this. Let this sequence be $b_n$, then
$$
b_n = left(1 + frac 1{frac {n^3}{n^2+1}}right)^{n^3/(n^2+1)},
$$
note that
$$
frac {n^2+1}{n^3} leqslant frac {n^2+n}{n^3} = frac {n+1}{n^2} leqslant frac {n+1}{n^2-1} = frac 1{n-1},
$$
and also
$$
frac {n^3}{n^2+1} leqslant frac {n^3+n}{n^2+1} = n,
$$
so
$$
left(1+frac 1n right)^n leqslant a_n leqslant b_n leqslant left(1+frac 1{n-1}right)^n = left(1+frac 1{n-1}right)^{n-1}cdot left(1 +frac 1{n-1}right),
$$
then take the limit $nto infty$, we have
$$
lim a_n = lim b_n =mathrm e.
$$
Remark
This seems complicated, so actually you could show that
$$
lim_n left(1 + frac 1 {f(n)}right)^{f(n)} =mathrm e
$$
where $lim f(n) = +infty$ after you learning the limit of functions, i.e. the well known
$$
lim_{xto +infty} left(1+frac 1xright)^x = mathrm e
$$
to make things a bit easier by invoking the relationship between limits of sequences and functions. This answer is a demo when there is some restrictions on the tools you are allowed to use.
Let
$$
a_n = left(1 + frac 1n + frac 1{n^3}right)^n.
$$
To use that limit, we squeeze it like so:
$$
left(1 + frac 1nright)^n leqslant a_n leqslant left(1 + frac {n^2+1}{n^3}right)^{n^3/(n^2+1)},
$$
so $lim a_n = mathrm e$. Then the original limit is $mathrm e^{5/2}$ by breaking the expression into
$$
sqrt {a_n ^5 cdot left(1+frac 1n + frac 1{n^3}right)},
$$
and the expression in the () has the limit $1$.
UPDATE
The proof is actually not complete. If only the limit $lim (1+frac 1n)^n$ is allowed to use, then we need to justify
$$
lim_n left(1+frac {n^2+1}{n^3}right)^{n^3/(n^2+1)} = mathrm e.
$$
Then we still need to squeeze this. Let this sequence be $b_n$, then
$$
b_n = left(1 + frac 1{frac {n^3}{n^2+1}}right)^{n^3/(n^2+1)},
$$
note that
$$
frac {n^2+1}{n^3} leqslant frac {n^2+n}{n^3} = frac {n+1}{n^2} leqslant frac {n+1}{n^2-1} = frac 1{n-1},
$$
and also
$$
frac {n^3}{n^2+1} leqslant frac {n^3+n}{n^2+1} = n,
$$
so
$$
left(1+frac 1n right)^n leqslant a_n leqslant b_n leqslant left(1+frac 1{n-1}right)^n = left(1+frac 1{n-1}right)^{n-1}cdot left(1 +frac 1{n-1}right),
$$
then take the limit $nto infty$, we have
$$
lim a_n = lim b_n =mathrm e.
$$
Remark
This seems complicated, so actually you could show that
$$
lim_n left(1 + frac 1 {f(n)}right)^{f(n)} =mathrm e
$$
where $lim f(n) = +infty$ after you learning the limit of functions, i.e. the well known
$$
lim_{xto +infty} left(1+frac 1xright)^x = mathrm e
$$
to make things a bit easier by invoking the relationship between limits of sequences and functions. This answer is a demo when there is some restrictions on the tools you are allowed to use.
edited Dec 6 at 4:54
answered Dec 5 at 12:21
xbh
5,6351422
5,6351422
add a comment |
add a comment |
up vote
4
down vote
You may use the fact:
$(1+x_n)^{large frac{1}{x_n}} stackrel{n to infty}{longrightarrow} e$ for any sequence $(x_n)$ with $0<x_n stackrel{n to infty}{longrightarrow} 0$
It follows
$$begin{eqnarray*} sqrt{left(1+frac{1}{n}+frac{1}{n^3}right)^{5n+1}}
& = & sqrt{left(1 + frac{n^2+1}{n^3}right)^{largefrac{n^3}{n^2+1}cdot underbrace{large frac{(5n+1)(n^2+1)}{n^3}}_{large stackrel{n to infty}{longrightarrow} 5}}} \
& stackrel{n to infty}{longrightarrow} & sqrt{e^5}
end{eqnarray*}$$
I add large for powers in a square root for a good look! If you feel uncomfortable to this , I'm sorry and kindly edit again!
– Chinnapparaj R
Dec 5 at 12:22
add a comment |
up vote
4
down vote
You may use the fact:
$(1+x_n)^{large frac{1}{x_n}} stackrel{n to infty}{longrightarrow} e$ for any sequence $(x_n)$ with $0<x_n stackrel{n to infty}{longrightarrow} 0$
It follows
$$begin{eqnarray*} sqrt{left(1+frac{1}{n}+frac{1}{n^3}right)^{5n+1}}
& = & sqrt{left(1 + frac{n^2+1}{n^3}right)^{largefrac{n^3}{n^2+1}cdot underbrace{large frac{(5n+1)(n^2+1)}{n^3}}_{large stackrel{n to infty}{longrightarrow} 5}}} \
& stackrel{n to infty}{longrightarrow} & sqrt{e^5}
end{eqnarray*}$$
I add large for powers in a square root for a good look! If you feel uncomfortable to this , I'm sorry and kindly edit again!
– Chinnapparaj R
Dec 5 at 12:22
add a comment |
up vote
4
down vote
up vote
4
down vote
You may use the fact:
$(1+x_n)^{large frac{1}{x_n}} stackrel{n to infty}{longrightarrow} e$ for any sequence $(x_n)$ with $0<x_n stackrel{n to infty}{longrightarrow} 0$
It follows
$$begin{eqnarray*} sqrt{left(1+frac{1}{n}+frac{1}{n^3}right)^{5n+1}}
& = & sqrt{left(1 + frac{n^2+1}{n^3}right)^{largefrac{n^3}{n^2+1}cdot underbrace{large frac{(5n+1)(n^2+1)}{n^3}}_{large stackrel{n to infty}{longrightarrow} 5}}} \
& stackrel{n to infty}{longrightarrow} & sqrt{e^5}
end{eqnarray*}$$
You may use the fact:
$(1+x_n)^{large frac{1}{x_n}} stackrel{n to infty}{longrightarrow} e$ for any sequence $(x_n)$ with $0<x_n stackrel{n to infty}{longrightarrow} 0$
It follows
$$begin{eqnarray*} sqrt{left(1+frac{1}{n}+frac{1}{n^3}right)^{5n+1}}
& = & sqrt{left(1 + frac{n^2+1}{n^3}right)^{largefrac{n^3}{n^2+1}cdot underbrace{large frac{(5n+1)(n^2+1)}{n^3}}_{large stackrel{n to infty}{longrightarrow} 5}}} \
& stackrel{n to infty}{longrightarrow} & sqrt{e^5}
end{eqnarray*}$$
edited Dec 5 at 12:21
Chinnapparaj R
4,9951825
4,9951825
answered Dec 5 at 12:17
trancelocation
8,8601521
8,8601521
I add large for powers in a square root for a good look! If you feel uncomfortable to this , I'm sorry and kindly edit again!
– Chinnapparaj R
Dec 5 at 12:22
add a comment |
I add large for powers in a square root for a good look! If you feel uncomfortable to this , I'm sorry and kindly edit again!
– Chinnapparaj R
Dec 5 at 12:22
I add large for powers in a square root for a good look! If you feel uncomfortable to this , I'm sorry and kindly edit again!
– Chinnapparaj R
Dec 5 at 12:22
I add large for powers in a square root for a good look! If you feel uncomfortable to this , I'm sorry and kindly edit again!
– Chinnapparaj R
Dec 5 at 12:22
add a comment |
up vote
3
down vote
Short answer: (correct but not 100% rigorous, see @xbh)
The term $1/n^3$ is negligible compared to $1/n$, and $1$ is negligible compared to $5n$. Then your limit is the same as that of
$$left(left(1+frac1nright)^{1/n}right)^{5/2}.$$
With a little more trickery, you can write
$$frac1m=frac1n+frac1{n^3}$$ and it is not a big deal to show
$$n=m+o(m).$$
Now you have
$$sqrt{left(1+frac1mright)^{5m+o(m)+1}}$$ where only the first exponent brings a non-unit contribution.
3
Still more rigorous than the average engineer would do :-)
– Carl Witthoft
Dec 5 at 13:51
add a comment |
up vote
3
down vote
Short answer: (correct but not 100% rigorous, see @xbh)
The term $1/n^3$ is negligible compared to $1/n$, and $1$ is negligible compared to $5n$. Then your limit is the same as that of
$$left(left(1+frac1nright)^{1/n}right)^{5/2}.$$
With a little more trickery, you can write
$$frac1m=frac1n+frac1{n^3}$$ and it is not a big deal to show
$$n=m+o(m).$$
Now you have
$$sqrt{left(1+frac1mright)^{5m+o(m)+1}}$$ where only the first exponent brings a non-unit contribution.
3
Still more rigorous than the average engineer would do :-)
– Carl Witthoft
Dec 5 at 13:51
add a comment |
up vote
3
down vote
up vote
3
down vote
Short answer: (correct but not 100% rigorous, see @xbh)
The term $1/n^3$ is negligible compared to $1/n$, and $1$ is negligible compared to $5n$. Then your limit is the same as that of
$$left(left(1+frac1nright)^{1/n}right)^{5/2}.$$
With a little more trickery, you can write
$$frac1m=frac1n+frac1{n^3}$$ and it is not a big deal to show
$$n=m+o(m).$$
Now you have
$$sqrt{left(1+frac1mright)^{5m+o(m)+1}}$$ where only the first exponent brings a non-unit contribution.
Short answer: (correct but not 100% rigorous, see @xbh)
The term $1/n^3$ is negligible compared to $1/n$, and $1$ is negligible compared to $5n$. Then your limit is the same as that of
$$left(left(1+frac1nright)^{1/n}right)^{5/2}.$$
With a little more trickery, you can write
$$frac1m=frac1n+frac1{n^3}$$ and it is not a big deal to show
$$n=m+o(m).$$
Now you have
$$sqrt{left(1+frac1mright)^{5m+o(m)+1}}$$ where only the first exponent brings a non-unit contribution.
edited Dec 5 at 13:44
answered Dec 5 at 13:36
Yves Daoust
123k668219
123k668219
3
Still more rigorous than the average engineer would do :-)
– Carl Witthoft
Dec 5 at 13:51
add a comment |
3
Still more rigorous than the average engineer would do :-)
– Carl Witthoft
Dec 5 at 13:51
3
3
Still more rigorous than the average engineer would do :-)
– Carl Witthoft
Dec 5 at 13:51
Still more rigorous than the average engineer would do :-)
– Carl Witthoft
Dec 5 at 13:51
add a comment |
up vote
2
down vote
Hint:
$$lim_{ntoinfty}left(1+dfrac{n^2+1}{n^3}right)^{(5n+1)/2}$$
$$=left(lim_{ntoinfty}left(1+dfrac{n^2+1}{n^3}right)^{n^3/(n^2+1)}right)^{lim_{ntoinfty}dfrac{(5n+1)(n^2+1)}{2n^3}}$$
As $lim_{ntoinfty}dfrac{n^2+1}{n^3}=0,$ the inner limit converges to $e$
$lim_{ntoinfty}dfrac{(5n+1)(n^2+1)}{2n^3}=lim_{ntoinfty}dfrac{left(5+dfrac1nright)left(1+dfrac1{n^2}right)}2=?$
add a comment |
up vote
2
down vote
Hint:
$$lim_{ntoinfty}left(1+dfrac{n^2+1}{n^3}right)^{(5n+1)/2}$$
$$=left(lim_{ntoinfty}left(1+dfrac{n^2+1}{n^3}right)^{n^3/(n^2+1)}right)^{lim_{ntoinfty}dfrac{(5n+1)(n^2+1)}{2n^3}}$$
As $lim_{ntoinfty}dfrac{n^2+1}{n^3}=0,$ the inner limit converges to $e$
$lim_{ntoinfty}dfrac{(5n+1)(n^2+1)}{2n^3}=lim_{ntoinfty}dfrac{left(5+dfrac1nright)left(1+dfrac1{n^2}right)}2=?$
add a comment |
up vote
2
down vote
up vote
2
down vote
Hint:
$$lim_{ntoinfty}left(1+dfrac{n^2+1}{n^3}right)^{(5n+1)/2}$$
$$=left(lim_{ntoinfty}left(1+dfrac{n^2+1}{n^3}right)^{n^3/(n^2+1)}right)^{lim_{ntoinfty}dfrac{(5n+1)(n^2+1)}{2n^3}}$$
As $lim_{ntoinfty}dfrac{n^2+1}{n^3}=0,$ the inner limit converges to $e$
$lim_{ntoinfty}dfrac{(5n+1)(n^2+1)}{2n^3}=lim_{ntoinfty}dfrac{left(5+dfrac1nright)left(1+dfrac1{n^2}right)}2=?$
Hint:
$$lim_{ntoinfty}left(1+dfrac{n^2+1}{n^3}right)^{(5n+1)/2}$$
$$=left(lim_{ntoinfty}left(1+dfrac{n^2+1}{n^3}right)^{n^3/(n^2+1)}right)^{lim_{ntoinfty}dfrac{(5n+1)(n^2+1)}{2n^3}}$$
As $lim_{ntoinfty}dfrac{n^2+1}{n^3}=0,$ the inner limit converges to $e$
$lim_{ntoinfty}dfrac{(5n+1)(n^2+1)}{2n^3}=lim_{ntoinfty}dfrac{left(5+dfrac1nright)left(1+dfrac1{n^2}right)}2=?$
answered Dec 5 at 12:17
lab bhattacharjee
222k15155273
222k15155273
add a comment |
add a comment |
up vote
1
down vote
Rewrite:
$$sqrt{left(1+frac{1}{n}+frac{1}{n^3}right)^{5n+1}}=expleft(tfrac{5n+1}{2}logleft(1+tfrac{1}{n}+tfrac{1}{n^3}right)right)$$
and $log(1+x) approx x$ for small $x$, so:
$$lim_{n to infty}sqrt{left(1+frac{1}{n}+frac{1}{n^3}right)^{5n+1}}=lim_{n to infty}expleft(tfrac{5n+1}{2}left(tfrac{1}{n}+tfrac{1}{n^3}right)right)=e^{5/2}$$
add a comment |
up vote
1
down vote
Rewrite:
$$sqrt{left(1+frac{1}{n}+frac{1}{n^3}right)^{5n+1}}=expleft(tfrac{5n+1}{2}logleft(1+tfrac{1}{n}+tfrac{1}{n^3}right)right)$$
and $log(1+x) approx x$ for small $x$, so:
$$lim_{n to infty}sqrt{left(1+frac{1}{n}+frac{1}{n^3}right)^{5n+1}}=lim_{n to infty}expleft(tfrac{5n+1}{2}left(tfrac{1}{n}+tfrac{1}{n^3}right)right)=e^{5/2}$$
add a comment |
up vote
1
down vote
up vote
1
down vote
Rewrite:
$$sqrt{left(1+frac{1}{n}+frac{1}{n^3}right)^{5n+1}}=expleft(tfrac{5n+1}{2}logleft(1+tfrac{1}{n}+tfrac{1}{n^3}right)right)$$
and $log(1+x) approx x$ for small $x$, so:
$$lim_{n to infty}sqrt{left(1+frac{1}{n}+frac{1}{n^3}right)^{5n+1}}=lim_{n to infty}expleft(tfrac{5n+1}{2}left(tfrac{1}{n}+tfrac{1}{n^3}right)right)=e^{5/2}$$
Rewrite:
$$sqrt{left(1+frac{1}{n}+frac{1}{n^3}right)^{5n+1}}=expleft(tfrac{5n+1}{2}logleft(1+tfrac{1}{n}+tfrac{1}{n^3}right)right)$$
and $log(1+x) approx x$ for small $x$, so:
$$lim_{n to infty}sqrt{left(1+frac{1}{n}+frac{1}{n^3}right)^{5n+1}}=lim_{n to infty}expleft(tfrac{5n+1}{2}left(tfrac{1}{n}+tfrac{1}{n^3}right)right)=e^{5/2}$$
answered Dec 5 at 12:17
StackTD
21.9k1946
21.9k1946
add a comment |
add a comment |
up vote
0
down vote
It's $$e^{5/2} .$$ I've been involved in a few posts in which the query is like that of this one, recently, the subject being one of my favourite ones.
It scarcely matters about the square-root, really: that doesn't affect the limiting process itself here atall. A crucial point though is that in a limit such as this, the terms of higher order than linear in $1/n$ become negligible. This can be shown in various ways, such as by analysing the terms in a generalised expansion combinatorially. I have discussed this elsewhere; and I think a repetition of any more than a little of it would be a tad redundant here. But I'll say that it's a bit like the way the terms beyond the linear ones fade out in the derivation of the derivative of a function - but that here it's 'cast' in a multiplicative form.
Also the constant (with respect to $n$) in the exponent becomes negligible: this can be seen by noting that leaving it in would be the same as leaving a finite power of the bracket multiplying the whole thing; And the limit of a finite power of it as $ntoinfty$ is certainly 1.
So we are left with $$lim_{ntoinfty}left(1+{1over n}right)^{5nover2}$$ This is now just the standard limit form of the exponential function $$lim_{ntoinfty}left(1+{xover n}right)^n$$$$=$$$$lim_{ntoinfty}left(1+{1over n}right)^{nx}$$$$=$$$$lim_{ntoinfty}left(1+{sqrt{x}over n}right)^{nsqrt{x}}, $$ or whatever.
The reason I have written it several times like that is just to emphasise that factors can be transferred at will between the term in the bracket & the exponent. That the exponential function of $x$ is identical with this limt is a standard result - showing that it is is beyond the ambit of this answer, really. Or is that actually what you're asking for?
add a comment |
up vote
0
down vote
It's $$e^{5/2} .$$ I've been involved in a few posts in which the query is like that of this one, recently, the subject being one of my favourite ones.
It scarcely matters about the square-root, really: that doesn't affect the limiting process itself here atall. A crucial point though is that in a limit such as this, the terms of higher order than linear in $1/n$ become negligible. This can be shown in various ways, such as by analysing the terms in a generalised expansion combinatorially. I have discussed this elsewhere; and I think a repetition of any more than a little of it would be a tad redundant here. But I'll say that it's a bit like the way the terms beyond the linear ones fade out in the derivation of the derivative of a function - but that here it's 'cast' in a multiplicative form.
Also the constant (with respect to $n$) in the exponent becomes negligible: this can be seen by noting that leaving it in would be the same as leaving a finite power of the bracket multiplying the whole thing; And the limit of a finite power of it as $ntoinfty$ is certainly 1.
So we are left with $$lim_{ntoinfty}left(1+{1over n}right)^{5nover2}$$ This is now just the standard limit form of the exponential function $$lim_{ntoinfty}left(1+{xover n}right)^n$$$$=$$$$lim_{ntoinfty}left(1+{1over n}right)^{nx}$$$$=$$$$lim_{ntoinfty}left(1+{sqrt{x}over n}right)^{nsqrt{x}}, $$ or whatever.
The reason I have written it several times like that is just to emphasise that factors can be transferred at will between the term in the bracket & the exponent. That the exponential function of $x$ is identical with this limt is a standard result - showing that it is is beyond the ambit of this answer, really. Or is that actually what you're asking for?
add a comment |
up vote
0
down vote
up vote
0
down vote
It's $$e^{5/2} .$$ I've been involved in a few posts in which the query is like that of this one, recently, the subject being one of my favourite ones.
It scarcely matters about the square-root, really: that doesn't affect the limiting process itself here atall. A crucial point though is that in a limit such as this, the terms of higher order than linear in $1/n$ become negligible. This can be shown in various ways, such as by analysing the terms in a generalised expansion combinatorially. I have discussed this elsewhere; and I think a repetition of any more than a little of it would be a tad redundant here. But I'll say that it's a bit like the way the terms beyond the linear ones fade out in the derivation of the derivative of a function - but that here it's 'cast' in a multiplicative form.
Also the constant (with respect to $n$) in the exponent becomes negligible: this can be seen by noting that leaving it in would be the same as leaving a finite power of the bracket multiplying the whole thing; And the limit of a finite power of it as $ntoinfty$ is certainly 1.
So we are left with $$lim_{ntoinfty}left(1+{1over n}right)^{5nover2}$$ This is now just the standard limit form of the exponential function $$lim_{ntoinfty}left(1+{xover n}right)^n$$$$=$$$$lim_{ntoinfty}left(1+{1over n}right)^{nx}$$$$=$$$$lim_{ntoinfty}left(1+{sqrt{x}over n}right)^{nsqrt{x}}, $$ or whatever.
The reason I have written it several times like that is just to emphasise that factors can be transferred at will between the term in the bracket & the exponent. That the exponential function of $x$ is identical with this limt is a standard result - showing that it is is beyond the ambit of this answer, really. Or is that actually what you're asking for?
It's $$e^{5/2} .$$ I've been involved in a few posts in which the query is like that of this one, recently, the subject being one of my favourite ones.
It scarcely matters about the square-root, really: that doesn't affect the limiting process itself here atall. A crucial point though is that in a limit such as this, the terms of higher order than linear in $1/n$ become negligible. This can be shown in various ways, such as by analysing the terms in a generalised expansion combinatorially. I have discussed this elsewhere; and I think a repetition of any more than a little of it would be a tad redundant here. But I'll say that it's a bit like the way the terms beyond the linear ones fade out in the derivation of the derivative of a function - but that here it's 'cast' in a multiplicative form.
Also the constant (with respect to $n$) in the exponent becomes negligible: this can be seen by noting that leaving it in would be the same as leaving a finite power of the bracket multiplying the whole thing; And the limit of a finite power of it as $ntoinfty$ is certainly 1.
So we are left with $$lim_{ntoinfty}left(1+{1over n}right)^{5nover2}$$ This is now just the standard limit form of the exponential function $$lim_{ntoinfty}left(1+{xover n}right)^n$$$$=$$$$lim_{ntoinfty}left(1+{1over n}right)^{nx}$$$$=$$$$lim_{ntoinfty}left(1+{sqrt{x}over n}right)^{nsqrt{x}}, $$ or whatever.
The reason I have written it several times like that is just to emphasise that factors can be transferred at will between the term in the bracket & the exponent. That the exponential function of $x$ is identical with this limt is a standard result - showing that it is is beyond the ambit of this answer, really. Or is that actually what you're asking for?
answered Dec 5 at 13:49
AmbretteOrrisey
53610
53610
add a comment |
add a comment |
up vote
0
down vote
Because I can :-), in R
> whatlim <- function(n) {
term = sqrt( (1 + 1/n + 1/n^3)^(5*n+1) )
delta = exp(2.5) - term
return(delta) }
> converge = NULL
> for (jj in 0:10) {
converge[jj+1] = whatlim(10^jj) }
> converge
[1] -1.481751e+01 5.525765e-01 8.732760e-02 9.095940e-03 9.132772e-04
[6] 9.136407e-05 9.139366e-06 8.958993e-07 2.765578e-07 -2.510824e-06
[11] -2.519047e-06
Where pretty obviously the last two terms suffer from floating-point precision limit.
add a comment |
up vote
0
down vote
Because I can :-), in R
> whatlim <- function(n) {
term = sqrt( (1 + 1/n + 1/n^3)^(5*n+1) )
delta = exp(2.5) - term
return(delta) }
> converge = NULL
> for (jj in 0:10) {
converge[jj+1] = whatlim(10^jj) }
> converge
[1] -1.481751e+01 5.525765e-01 8.732760e-02 9.095940e-03 9.132772e-04
[6] 9.136407e-05 9.139366e-06 8.958993e-07 2.765578e-07 -2.510824e-06
[11] -2.519047e-06
Where pretty obviously the last two terms suffer from floating-point precision limit.
add a comment |
up vote
0
down vote
up vote
0
down vote
Because I can :-), in R
> whatlim <- function(n) {
term = sqrt( (1 + 1/n + 1/n^3)^(5*n+1) )
delta = exp(2.5) - term
return(delta) }
> converge = NULL
> for (jj in 0:10) {
converge[jj+1] = whatlim(10^jj) }
> converge
[1] -1.481751e+01 5.525765e-01 8.732760e-02 9.095940e-03 9.132772e-04
[6] 9.136407e-05 9.139366e-06 8.958993e-07 2.765578e-07 -2.510824e-06
[11] -2.519047e-06
Where pretty obviously the last two terms suffer from floating-point precision limit.
Because I can :-), in R
> whatlim <- function(n) {
term = sqrt( (1 + 1/n + 1/n^3)^(5*n+1) )
delta = exp(2.5) - term
return(delta) }
> converge = NULL
> for (jj in 0:10) {
converge[jj+1] = whatlim(10^jj) }
> converge
[1] -1.481751e+01 5.525765e-01 8.732760e-02 9.095940e-03 9.132772e-04
[6] 9.136407e-05 9.139366e-06 8.958993e-07 2.765578e-07 -2.510824e-06
[11] -2.519047e-06
Where pretty obviously the last two terms suffer from floating-point precision limit.
answered Dec 5 at 13:55
Carl Witthoft
32118
32118
add a comment |
add a comment |
up vote
0
down vote
Let's assume the well known result $$lim_{ntoinfty} left(1+frac{1}{n}right)^n=etag{1}$$ and the lemma of Thomas Andrews:
Lemma: If ${a_n} $ is a sequence of real or complex terms such that $n(a_n-1)to 0$ then $a_n^nto 1$ as $nto infty $.
Consider the sequence $$a_n=dfrac{1+dfrac{1}{n}+dfrac {1}{n^3}}{1+dfrac{1}{n}}$$ and check that $n(a_n-1) to 1$ so that $a_n^nto 1$ and using $(1)$ we get $$lim_{nto infty} left(1+frac {1}{n}+frac{1}{n^3}right)^n=etag{2}$$ and then we get $$lim_{ntoinfty} left(1+frac {1}{n}+frac {1}{n^3}right)^{5n+1}=e^5$$ and taking square roots we get the answer as $e^{5/2}$.
add a comment |
up vote
0
down vote
Let's assume the well known result $$lim_{ntoinfty} left(1+frac{1}{n}right)^n=etag{1}$$ and the lemma of Thomas Andrews:
Lemma: If ${a_n} $ is a sequence of real or complex terms such that $n(a_n-1)to 0$ then $a_n^nto 1$ as $nto infty $.
Consider the sequence $$a_n=dfrac{1+dfrac{1}{n}+dfrac {1}{n^3}}{1+dfrac{1}{n}}$$ and check that $n(a_n-1) to 1$ so that $a_n^nto 1$ and using $(1)$ we get $$lim_{nto infty} left(1+frac {1}{n}+frac{1}{n^3}right)^n=etag{2}$$ and then we get $$lim_{ntoinfty} left(1+frac {1}{n}+frac {1}{n^3}right)^{5n+1}=e^5$$ and taking square roots we get the answer as $e^{5/2}$.
add a comment |
up vote
0
down vote
up vote
0
down vote
Let's assume the well known result $$lim_{ntoinfty} left(1+frac{1}{n}right)^n=etag{1}$$ and the lemma of Thomas Andrews:
Lemma: If ${a_n} $ is a sequence of real or complex terms such that $n(a_n-1)to 0$ then $a_n^nto 1$ as $nto infty $.
Consider the sequence $$a_n=dfrac{1+dfrac{1}{n}+dfrac {1}{n^3}}{1+dfrac{1}{n}}$$ and check that $n(a_n-1) to 1$ so that $a_n^nto 1$ and using $(1)$ we get $$lim_{nto infty} left(1+frac {1}{n}+frac{1}{n^3}right)^n=etag{2}$$ and then we get $$lim_{ntoinfty} left(1+frac {1}{n}+frac {1}{n^3}right)^{5n+1}=e^5$$ and taking square roots we get the answer as $e^{5/2}$.
Let's assume the well known result $$lim_{ntoinfty} left(1+frac{1}{n}right)^n=etag{1}$$ and the lemma of Thomas Andrews:
Lemma: If ${a_n} $ is a sequence of real or complex terms such that $n(a_n-1)to 0$ then $a_n^nto 1$ as $nto infty $.
Consider the sequence $$a_n=dfrac{1+dfrac{1}{n}+dfrac {1}{n^3}}{1+dfrac{1}{n}}$$ and check that $n(a_n-1) to 1$ so that $a_n^nto 1$ and using $(1)$ we get $$lim_{nto infty} left(1+frac {1}{n}+frac{1}{n^3}right)^n=etag{2}$$ and then we get $$lim_{ntoinfty} left(1+frac {1}{n}+frac {1}{n^3}right)^{5n+1}=e^5$$ and taking square roots we get the answer as $e^{5/2}$.
edited Dec 6 at 5:17
answered Dec 6 at 3:59
Paramanand Singh
48.7k555156
48.7k555156
add a comment |
add a comment |
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Start with logarithms; then Taylor series
– Claude Leibovici
Dec 5 at 12:04
Is answer is 1?
– Cloud JR
Dec 5 at 12:10