How to calculate Limit of this sequenceHow to prove that exponential grows faster than polynomial?Proving $|P(Acap B)-P(A)P(B)|leq frac14$Calculate the limit of a sequenceHaving trouble with this limitLimit with L'Hospital with infinite indeterminate formatsHow to evaluate the limit $lim_x to inftyleft(left(x+frac1xright)arctan(x)-fracpi2xright)$?Limit of sequence in which each term is the average of its preceding k terms.How to calculate $lim_x to 0 frac(x-sqrt2)^4sin^3(x)cos^2(x)int_0^x fract^2t^4+1dt$?Evaluation of $lim _ xrightarrow 0 frac sin ^ -1 x -tan ^ -1 x x ^ 3 quad $ without using L'Hospital rulecalculate limit without L'Hospital's RulesHaving the sequence $(a_n)_ngeq1$, $a_n=int_0^1 x^n(1-x)^ndx$, find $limlimits_nrightarrowinfty fraca_n+1a_n$
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How to calculate Limit of this sequence
How to prove that exponential grows faster than polynomial?Proving $|P(Acap B)-P(A)P(B)|leq frac14$Calculate the limit of a sequenceHaving trouble with this limitLimit with L'Hospital with infinite indeterminate formatsHow to evaluate the limit $lim_x to inftyleft(left(x+frac1xright)arctan(x)-fracpi2xright)$?Limit of sequence in which each term is the average of its preceding k terms.How to calculate $lim_x to 0 frac(x-sqrt2)^4sin^3(x)cos^2(x)int_0^x fract^2t^4+1dt$?Evaluation of $lim _ xrightarrow 0 frac sin ^ -1 x -tan ^ -1 x x ^ 3 quad $ without using L'Hospital rulecalculate limit without L'Hospital's RulesHaving the sequence $(a_n)_ngeq1$, $a_n=int_0^1 x^n(1-x)^ndx$, find $limlimits_nrightarrowinfty fraca_n+1a_n$
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Does the sequence $e^-(n^frac12)(n+1)^100$ converge? If yes what is the limit?
What I tried:Expanding
$$(n+1)^100= 1+^100C_1n+^100C_2n^2+^100C_3n^3+ dots + ^100C_100n^100$$
Multiplying each term by $e^-(n^frac12)$ and taking limits using L'Hospital Rule we get the limit of the sequence 0, but that is a lengthy and I think it is not a proper approach. [Actually applying L'Hospital rule twice to each term gives the preceding term(I checked it upto $[n^3e^-(n^frac12)$] and hence ultimately limit will be 0 because lim($e^-(n^frac12))=0$]
Can anyone please tell me whether this is a correct method to solve the problem and please suggest me a proper method if there is any. Thank you.
The answer is limit of the sequence is 0
sequences-and-series limits
edited 9 hours ago
Robert Z
113k10 gold badges79 silver badges153 bronze badges
asked 9 hours ago
aditya bhattaditya bhatt
497 bronze badges
$endgroup$
add a comment
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$begingroup$
Does the sequence $e^-(n^frac12)(n+1)^100$ converge? If yes what is the limit?
What I tried:Expanding
$$(n+1)^100= 1+^100C_1n+^100C_2n^2+^100C_3n^3+ dots + ^100C_100n^100$$
Multiplying each term by $e^-(n^frac12)$ and taking limits using L'Hospital Rule we get the limit of the sequence 0, but that is a lengthy and I think it is not a proper approach. [Actually applying L'Hospital rule twice to each term gives the preceding term(I checked it upto $[n^3e^-(n^frac12)$] and hence ultimately limit will be 0 because lim($e^-(n^frac12))=0$]
Can anyone please tell me whether this is a correct method to solve the problem and please suggest me a proper method if there is any. Thank you.
The answer is limit of the sequence is 0
sequences-and-series limits
edited 9 hours ago
Robert Z
113k10 gold badges79 silver badges153 bronze badges
asked 9 hours ago
aditya bhattaditya bhatt
497 bronze badges
$endgroup$
$begingroup$
Yes, the searched limit is zero.
$endgroup$
– Dr. Sonnhard Graubner
9 hours ago
add a comment
|
$begingroup$
Does the sequence $e^-(n^frac12)(n+1)^100$ converge? If yes what is the limit?
What I tried:Expanding
$$(n+1)^100= 1+^100C_1n+^100C_2n^2+^100C_3n^3+ dots + ^100C_100n^100$$
Multiplying each term by $e^-(n^frac12)$ and taking limits using L'Hospital Rule we get the limit of the sequence 0, but that is a lengthy and I think it is not a proper approach. [Actually applying L'Hospital rule twice to each term gives the preceding term(I checked it upto $[n^3e^-(n^frac12)$] and hence ultimately limit will be 0 because lim($e^-(n^frac12))=0$]
Can anyone please tell me whether this is a correct method to solve the problem and please suggest me a proper method if there is any. Thank you.
The answer is limit of the sequence is 0
sequences-and-series limits
edited 9 hours ago
Robert Z
113k10 gold badges79 silver badges153 bronze badges
asked 9 hours ago
aditya bhattaditya bhatt
497 bronze badges
$endgroup$
Does the sequence $e^-(n^frac12)(n+1)^100$ converge? If yes what is the limit?
What I tried:Expanding
$$(n+1)^100= 1+^100C_1n+^100C_2n^2+^100C_3n^3+ dots + ^100C_100n^100$$
Multiplying each term by $e^-(n^frac12)$ and taking limits using L'Hospital Rule we get the limit of the sequence 0, but that is a lengthy and I think it is not a proper approach. [Actually applying L'Hospital rule twice to each term gives the preceding term(I checked it upto $[n^3e^-(n^frac12)$] and hence ultimately limit will be 0 because lim($e^-(n^frac12))=0$]
Can anyone please tell me whether this is a correct method to solve the problem and please suggest me a proper method if there is any. Thank you.
The answer is limit of the sequence is 0
sequences-and-series limits
sequences-and-series limits
edited 9 hours ago
Robert Z
113k10 gold badges79 silver badges153 bronze badges
asked 9 hours ago
aditya bhattaditya bhatt
497 bronze badges
edited 9 hours ago
Robert Z
113k10 gold badges79 silver badges153 bronze badges
asked 9 hours ago
aditya bhattaditya bhatt
497 bronze badges
edited 9 hours ago
Robert Z
113k10 gold badges79 silver badges153 bronze badges
edited 9 hours ago
Robert Z
113k10 gold badges79 silver badges153 bronze badges
edited 9 hours ago
Robert Z
113k10 gold badges79 silver badges153 bronze badges
113k10 gold badges79 silver badges153 bronze badges
asked 9 hours ago
aditya bhattaditya bhatt
497 bronze badges
asked 9 hours ago
aditya bhattaditya bhatt
497 bronze badges
asked 9 hours ago
aditya bhattaditya bhatt
497 bronze badges
497 bronze badges
$begingroup$
Yes, the searched limit is zero.
$endgroup$
– Dr. Sonnhard Graubner
9 hours ago
add a comment
|
$begingroup$
Yes, the searched limit is zero.
$endgroup$
– Dr. Sonnhard Graubner
9 hours ago
$begingroup$
Yes, the searched limit is zero.
$endgroup$
– Dr. Sonnhard Graubner
9 hours ago
$begingroup$
Yes, the searched limit is zero.
$endgroup$
– Dr. Sonnhard Graubner
9 hours ago
add a comment
|
6 Answers
6
active
oldest
votes
$begingroup$
Yes, the final limit is zero. Note that as $nto +infty$
$$e^-sqrtn(n+1)^100=expleft(-sqrtnunderbraceleft(1-frac100ln(n+1)sqrtnright)_to 1right)to0$$
because, for example by using L'Hopital,
$$lim_nto +inftyfracln(n+1)sqrtn=0.$$
answered 9 hours ago
Robert ZRobert Z
113k10 gold badges79 silver badges153 bronze badges
$endgroup$
add a comment
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$begingroup$
Set $m^2=n$ and you get the product of a negative exponential by a polynomial of degree $200$. The exponential always wins.
Don't be impressed by this exponent,
$$sqrt[100]e^-m(m^2+1)^100=e^-m/100(m^2+1)=10000,e^-kk^2+e^-k.$$
As $e^-kto 0$, you can finally reduce to
$$e^-jj.$$
answered 9 hours ago
Yves DaoustYves Daoust
146k10 gold badges89 silver badges249 bronze badges
$endgroup$
$begingroup$
The exponential wins always if they would play!
$endgroup$
– Dr. Sonnhard Graubner
9 hours ago
$begingroup$
@Dr.SonnhardGraubner: there is a big jackpot tonight.
$endgroup$
– Yves Daoust
9 hours ago
$begingroup$
Ok, i will be there.
$endgroup$
– Dr. Sonnhard Graubner
9 hours ago
add a comment
|
$begingroup$
Let $n=u^2$, then $$L=lim_u rightarrow infty u^200 e^-u (1+frac1u^2)^100 =lim u^200 e^-u= lim_urightarrow inftyfracu^200e^u rightarrow frac00.$$ Apply L'Hospital Rule D. w. r. t. $u$ up and down separately 200 times to get $$lim_u rightarrow infty frac200! u^0e^u=lim _u rightarrow infty 200!~ e^-infty=0.$$
answered 9 hours ago
Dr Zafar Ahmed DScDr Zafar Ahmed DSc
6,2501 gold badge4 silver badges20 bronze badges
$endgroup$
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$begingroup$
$e^sqrt n geq frac (sqrt n)^201 (201)!$. Can you complete the proof from this? [$frac (201)! (n+1)^100 n^201/2 to 0$].
answered 9 hours ago
Kavi Rama MurthyKavi Rama Murthy
121k6 gold badges46 silver badges93 bronze badges
$endgroup$
$begingroup$
Unrelated: can you post your deleted answer as answer to this question ?
$endgroup$
– Gabriel Romon
7 hours ago
add a comment
|
$begingroup$
If you know expansion of $e^x=1+x+fracx^22!+fracx^33!+...$
$$lim_n to infty e^-(sqrt n)(n+1)^100=\
lim_n to infty frac(n+1)^100e^sqrt n=\
lim_n to infty frac(n+1)^1001+sqrtn+frac(sqrtn)^22!+fracsqrtn^33!+...+fracsqrtn^201201!+....to 0\$$
answered 9 hours ago
KhosrotashKhosrotash
17k1 gold badge26 silver badges63 bronze badges
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$begingroup$
Consider
$$f(x)=e^-(x^frac12)(x+1)^100$$
and by $x=y^2to infty$
$$e^-(x^frac12)(x+1)^100=frac(y^2+1)^100e^yto 0$$
indeed for any $m€mathbb N$
$$fracy^me^yto 0$$
for which you can refer to the related
- How to prove that exponential grows faster than polynomial?
answered 9 hours ago
gimusigimusi
94.8k8 gold badges46 silver badges95 bronze badges
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6 Answers
6
active
oldest
votes
6 Answers
6
active
oldest
votes
active
oldest
votes
active
oldest
votes
$begingroup$
Yes, the final limit is zero. Note that as $nto +infty$
$$e^-sqrtn(n+1)^100=expleft(-sqrtnunderbraceleft(1-frac100ln(n+1)sqrtnright)_to 1right)to0$$
because, for example by using L'Hopital,
$$lim_nto +inftyfracln(n+1)sqrtn=0.$$
answered 9 hours ago
Robert ZRobert Z
113k10 gold badges79 silver badges153 bronze badges
$endgroup$
add a comment
|
$begingroup$
Yes, the final limit is zero. Note that as $nto +infty$
$$e^-sqrtn(n+1)^100=expleft(-sqrtnunderbraceleft(1-frac100ln(n+1)sqrtnright)_to 1right)to0$$
because, for example by using L'Hopital,
$$lim_nto +inftyfracln(n+1)sqrtn=0.$$
answered 9 hours ago
Robert ZRobert Z
113k10 gold badges79 silver badges153 bronze badges
$endgroup$
add a comment
|
$begingroup$
Yes, the final limit is zero. Note that as $nto +infty$
$$e^-sqrtn(n+1)^100=expleft(-sqrtnunderbraceleft(1-frac100ln(n+1)sqrtnright)_to 1right)to0$$
because, for example by using L'Hopital,
$$lim_nto +inftyfracln(n+1)sqrtn=0.$$
answered 9 hours ago
Robert ZRobert Z
113k10 gold badges79 silver badges153 bronze badges
$endgroup$
Yes, the final limit is zero. Note that as $nto +infty$
$$e^-sqrtn(n+1)^100=expleft(-sqrtnunderbraceleft(1-frac100ln(n+1)sqrtnright)_to 1right)to0$$
because, for example by using L'Hopital,
$$lim_nto +inftyfracln(n+1)sqrtn=0.$$
answered 9 hours ago
Robert ZRobert Z
113k10 gold badges79 silver badges153 bronze badges
edited 9 hours ago
answered 9 hours ago
Robert ZRobert Z
113k10 gold badges79 silver badges153 bronze badges
answered 9 hours ago
Robert ZRobert Z
113k10 gold badges79 silver badges153 bronze badges
answered 9 hours ago
Robert ZRobert Z
113k10 gold badges79 silver badges153 bronze badges
113k10 gold badges79 silver badges153 bronze badges
add a comment
|
add a comment
|
$begingroup$
Set $m^2=n$ and you get the product of a negative exponential by a polynomial of degree $200$. The exponential always wins.
Don't be impressed by this exponent,
$$sqrt[100]e^-m(m^2+1)^100=e^-m/100(m^2+1)=10000,e^-kk^2+e^-k.$$
As $e^-kto 0$, you can finally reduce to
$$e^-jj.$$
answered 9 hours ago
Yves DaoustYves Daoust
146k10 gold badges89 silver badges249 bronze badges
$endgroup$
$begingroup$
The exponential wins always if they would play!
$endgroup$
– Dr. Sonnhard Graubner
9 hours ago
$begingroup$
@Dr.SonnhardGraubner: there is a big jackpot tonight.
$endgroup$
– Yves Daoust
9 hours ago
$begingroup$
Ok, i will be there.
$endgroup$
– Dr. Sonnhard Graubner
9 hours ago
add a comment
|
$begingroup$
Set $m^2=n$ and you get the product of a negative exponential by a polynomial of degree $200$. The exponential always wins.
Don't be impressed by this exponent,
$$sqrt[100]e^-m(m^2+1)^100=e^-m/100(m^2+1)=10000,e^-kk^2+e^-k.$$
As $e^-kto 0$, you can finally reduce to
$$e^-jj.$$
answered 9 hours ago
Yves DaoustYves Daoust
146k10 gold badges89 silver badges249 bronze badges
$endgroup$
$begingroup$
The exponential wins always if they would play!
$endgroup$
– Dr. Sonnhard Graubner
9 hours ago
$begingroup$
@Dr.SonnhardGraubner: there is a big jackpot tonight.
$endgroup$
– Yves Daoust
9 hours ago
$begingroup$
Ok, i will be there.
$endgroup$
– Dr. Sonnhard Graubner
9 hours ago
add a comment
|
$begingroup$
Set $m^2=n$ and you get the product of a negative exponential by a polynomial of degree $200$. The exponential always wins.
Don't be impressed by this exponent,
$$sqrt[100]e^-m(m^2+1)^100=e^-m/100(m^2+1)=10000,e^-kk^2+e^-k.$$
As $e^-kto 0$, you can finally reduce to
$$e^-jj.$$
answered 9 hours ago
Yves DaoustYves Daoust
146k10 gold badges89 silver badges249 bronze badges
$endgroup$
Set $m^2=n$ and you get the product of a negative exponential by a polynomial of degree $200$. The exponential always wins.
Don't be impressed by this exponent,
$$sqrt[100]e^-m(m^2+1)^100=e^-m/100(m^2+1)=10000,e^-kk^2+e^-k.$$
As $e^-kto 0$, you can finally reduce to
$$e^-jj.$$
answered 9 hours ago
Yves DaoustYves Daoust
146k10 gold badges89 silver badges249 bronze badges
edited 7 hours ago
answered 9 hours ago
Yves DaoustYves Daoust
146k10 gold badges89 silver badges249 bronze badges
answered 9 hours ago
Yves DaoustYves Daoust
146k10 gold badges89 silver badges249 bronze badges
answered 9 hours ago
Yves DaoustYves Daoust
146k10 gold badges89 silver badges249 bronze badges
146k10 gold badges89 silver badges249 bronze badges
$begingroup$
The exponential wins always if they would play!
$endgroup$
– Dr. Sonnhard Graubner
9 hours ago
$begingroup$
@Dr.SonnhardGraubner: there is a big jackpot tonight.
$endgroup$
– Yves Daoust
9 hours ago
$begingroup$
Ok, i will be there.
$endgroup$
– Dr. Sonnhard Graubner
9 hours ago
add a comment
|
$begingroup$
The exponential wins always if they would play!
$endgroup$
– Dr. Sonnhard Graubner
9 hours ago
$begingroup$
@Dr.SonnhardGraubner: there is a big jackpot tonight.
$endgroup$
– Yves Daoust
9 hours ago
$begingroup$
Ok, i will be there.
$endgroup$
– Dr. Sonnhard Graubner
9 hours ago
$begingroup$
The exponential wins always if they would play!
$endgroup$
– Dr. Sonnhard Graubner
9 hours ago
$begingroup$
The exponential wins always if they would play!
$endgroup$
– Dr. Sonnhard Graubner
9 hours ago
$begingroup$
@Dr.SonnhardGraubner: there is a big jackpot tonight.
$endgroup$
– Yves Daoust
9 hours ago
$begingroup$
@Dr.SonnhardGraubner: there is a big jackpot tonight.
$endgroup$
– Yves Daoust
9 hours ago
$begingroup$
Ok, i will be there.
$endgroup$
– Dr. Sonnhard Graubner
9 hours ago
$begingroup$
Ok, i will be there.
$endgroup$
– Dr. Sonnhard Graubner
9 hours ago
add a comment
|
$begingroup$
Let $n=u^2$, then $$L=lim_u rightarrow infty u^200 e^-u (1+frac1u^2)^100 =lim u^200 e^-u= lim_urightarrow inftyfracu^200e^u rightarrow frac00.$$ Apply L'Hospital Rule D. w. r. t. $u$ up and down separately 200 times to get $$lim_u rightarrow infty frac200! u^0e^u=lim _u rightarrow infty 200!~ e^-infty=0.$$
answered 9 hours ago
Dr Zafar Ahmed DScDr Zafar Ahmed DSc
6,2501 gold badge4 silver badges20 bronze badges
$endgroup$
add a comment
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$begingroup$
Let $n=u^2$, then $$L=lim_u rightarrow infty u^200 e^-u (1+frac1u^2)^100 =lim u^200 e^-u= lim_urightarrow inftyfracu^200e^u rightarrow frac00.$$ Apply L'Hospital Rule D. w. r. t. $u$ up and down separately 200 times to get $$lim_u rightarrow infty frac200! u^0e^u=lim _u rightarrow infty 200!~ e^-infty=0.$$
answered 9 hours ago
Dr Zafar Ahmed DScDr Zafar Ahmed DSc
6,2501 gold badge4 silver badges20 bronze badges
$endgroup$
add a comment
|
$begingroup$
Let $n=u^2$, then $$L=lim_u rightarrow infty u^200 e^-u (1+frac1u^2)^100 =lim u^200 e^-u= lim_urightarrow inftyfracu^200e^u rightarrow frac00.$$ Apply L'Hospital Rule D. w. r. t. $u$ up and down separately 200 times to get $$lim_u rightarrow infty frac200! u^0e^u=lim _u rightarrow infty 200!~ e^-infty=0.$$
answered 9 hours ago
Dr Zafar Ahmed DScDr Zafar Ahmed DSc
6,2501 gold badge4 silver badges20 bronze badges
$endgroup$
Let $n=u^2$, then $$L=lim_u rightarrow infty u^200 e^-u (1+frac1u^2)^100 =lim u^200 e^-u= lim_urightarrow inftyfracu^200e^u rightarrow frac00.$$ Apply L'Hospital Rule D. w. r. t. $u$ up and down separately 200 times to get $$lim_u rightarrow infty frac200! u^0e^u=lim _u rightarrow infty 200!~ e^-infty=0.$$
answered 9 hours ago
Dr Zafar Ahmed DScDr Zafar Ahmed DSc
6,2501 gold badge4 silver badges20 bronze badges
edited 5 hours ago
answered 9 hours ago
Dr Zafar Ahmed DScDr Zafar Ahmed DSc
6,2501 gold badge4 silver badges20 bronze badges
answered 9 hours ago
Dr Zafar Ahmed DScDr Zafar Ahmed DSc
6,2501 gold badge4 silver badges20 bronze badges
answered 9 hours ago
Dr Zafar Ahmed DScDr Zafar Ahmed DSc
6,2501 gold badge4 silver badges20 bronze badges
6,2501 gold badge4 silver badges20 bronze badges
add a comment
|
add a comment
|
$begingroup$
$e^sqrt n geq frac (sqrt n)^201 (201)!$. Can you complete the proof from this? [$frac (201)! (n+1)^100 n^201/2 to 0$].
answered 9 hours ago
Kavi Rama MurthyKavi Rama Murthy
121k6 gold badges46 silver badges93 bronze badges
$endgroup$
$begingroup$
Unrelated: can you post your deleted answer as answer to this question ?
$endgroup$
– Gabriel Romon
7 hours ago
add a comment
|
$begingroup$
$e^sqrt n geq frac (sqrt n)^201 (201)!$. Can you complete the proof from this? [$frac (201)! (n+1)^100 n^201/2 to 0$].
answered 9 hours ago
Kavi Rama MurthyKavi Rama Murthy
121k6 gold badges46 silver badges93 bronze badges
$endgroup$
$begingroup$
Unrelated: can you post your deleted answer as answer to this question ?
$endgroup$
– Gabriel Romon
7 hours ago
add a comment
|
$begingroup$
$e^sqrt n geq frac (sqrt n)^201 (201)!$. Can you complete the proof from this? [$frac (201)! (n+1)^100 n^201/2 to 0$].
answered 9 hours ago
Kavi Rama MurthyKavi Rama Murthy
121k6 gold badges46 silver badges93 bronze badges
$endgroup$
$e^sqrt n geq frac (sqrt n)^201 (201)!$. Can you complete the proof from this? [$frac (201)! (n+1)^100 n^201/2 to 0$].
answered 9 hours ago
Kavi Rama MurthyKavi Rama Murthy
121k6 gold badges46 silver badges93 bronze badges
answered 9 hours ago
Kavi Rama MurthyKavi Rama Murthy
121k6 gold badges46 silver badges93 bronze badges
answered 9 hours ago
Kavi Rama MurthyKavi Rama Murthy
121k6 gold badges46 silver badges93 bronze badges
answered 9 hours ago
Kavi Rama MurthyKavi Rama Murthy
121k6 gold badges46 silver badges93 bronze badges
121k6 gold badges46 silver badges93 bronze badges
$begingroup$
Unrelated: can you post your deleted answer as answer to this question ?
$endgroup$
– Gabriel Romon
7 hours ago
add a comment
|
$begingroup$
Unrelated: can you post your deleted answer as answer to this question ?
$endgroup$
– Gabriel Romon
7 hours ago
$begingroup$
Unrelated: can you post your deleted answer as answer to this question ?
$endgroup$
– Gabriel Romon
7 hours ago
$begingroup$
Unrelated: can you post your deleted answer as answer to this question ?
$endgroup$
– Gabriel Romon
7 hours ago
add a comment
|
$begingroup$
If you know expansion of $e^x=1+x+fracx^22!+fracx^33!+...$
$$lim_n to infty e^-(sqrt n)(n+1)^100=\
lim_n to infty frac(n+1)^100e^sqrt n=\
lim_n to infty frac(n+1)^1001+sqrtn+frac(sqrtn)^22!+fracsqrtn^33!+...+fracsqrtn^201201!+....to 0\$$
answered 9 hours ago
KhosrotashKhosrotash
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$begingroup$
If you know expansion of $e^x=1+x+fracx^22!+fracx^33!+...$
$$lim_n to infty e^-(sqrt n)(n+1)^100=\
lim_n to infty frac(n+1)^100e^sqrt n=\
lim_n to infty frac(n+1)^1001+sqrtn+frac(sqrtn)^22!+fracsqrtn^33!+...+fracsqrtn^201201!+....to 0\$$
answered 9 hours ago
KhosrotashKhosrotash
17k1 gold badge26 silver badges63 bronze badges
$endgroup$
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$begingroup$
If you know expansion of $e^x=1+x+fracx^22!+fracx^33!+...$
$$lim_n to infty e^-(sqrt n)(n+1)^100=\
lim_n to infty frac(n+1)^100e^sqrt n=\
lim_n to infty frac(n+1)^1001+sqrtn+frac(sqrtn)^22!+fracsqrtn^33!+...+fracsqrtn^201201!+....to 0\$$
answered 9 hours ago
KhosrotashKhosrotash
17k1 gold badge26 silver badges63 bronze badges
$endgroup$
If you know expansion of $e^x=1+x+fracx^22!+fracx^33!+...$
$$lim_n to infty e^-(sqrt n)(n+1)^100=\
lim_n to infty frac(n+1)^100e^sqrt n=\
lim_n to infty frac(n+1)^1001+sqrtn+frac(sqrtn)^22!+fracsqrtn^33!+...+fracsqrtn^201201!+....to 0\$$
answered 9 hours ago
KhosrotashKhosrotash
17k1 gold badge26 silver badges63 bronze badges
answered 9 hours ago
KhosrotashKhosrotash
17k1 gold badge26 silver badges63 bronze badges
answered 9 hours ago
KhosrotashKhosrotash
17k1 gold badge26 silver badges63 bronze badges
answered 9 hours ago
KhosrotashKhosrotash
17k1 gold badge26 silver badges63 bronze badges
17k1 gold badge26 silver badges63 bronze badges
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add a comment
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$begingroup$
Consider
$$f(x)=e^-(x^frac12)(x+1)^100$$
and by $x=y^2to infty$
$$e^-(x^frac12)(x+1)^100=frac(y^2+1)^100e^yto 0$$
indeed for any $m€mathbb N$
$$fracy^me^yto 0$$
for which you can refer to the related
- How to prove that exponential grows faster than polynomial?
answered 9 hours ago
gimusigimusi
94.8k8 gold badges46 silver badges95 bronze badges
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add a comment
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$begingroup$
Consider
$$f(x)=e^-(x^frac12)(x+1)^100$$
and by $x=y^2to infty$
$$e^-(x^frac12)(x+1)^100=frac(y^2+1)^100e^yto 0$$
indeed for any $m€mathbb N$
$$fracy^me^yto 0$$
for which you can refer to the related
- How to prove that exponential grows faster than polynomial?
answered 9 hours ago
gimusigimusi
94.8k8 gold badges46 silver badges95 bronze badges
$endgroup$
add a comment
|
$begingroup$
Consider
$$f(x)=e^-(x^frac12)(x+1)^100$$
and by $x=y^2to infty$
$$e^-(x^frac12)(x+1)^100=frac(y^2+1)^100e^yto 0$$
indeed for any $m€mathbb N$
$$fracy^me^yto 0$$
for which you can refer to the related
- How to prove that exponential grows faster than polynomial?
answered 9 hours ago
gimusigimusi
94.8k8 gold badges46 silver badges95 bronze badges
$endgroup$
Consider
$$f(x)=e^-(x^frac12)(x+1)^100$$
and by $x=y^2to infty$
$$e^-(x^frac12)(x+1)^100=frac(y^2+1)^100e^yto 0$$
indeed for any $m€mathbb N$
$$fracy^me^yto 0$$
for which you can refer to the related
- How to prove that exponential grows faster than polynomial?
answered 9 hours ago
gimusigimusi
94.8k8 gold badges46 silver badges95 bronze badges
edited 8 hours ago
answered 9 hours ago
gimusigimusi
94.8k8 gold badges46 silver badges95 bronze badges
answered 9 hours ago
gimusigimusi
94.8k8 gold badges46 silver badges95 bronze badges
answered 9 hours ago
gimusigimusi
94.8k8 gold badges46 silver badges95 bronze badges
94.8k8 gold badges46 silver badges95 bronze badges
add a comment
|
add a comment
|
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Yes, the searched limit is zero.
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– Dr. Sonnhard Graubner
9 hours ago