An application of Cauchy-Schwarz inequality for two lists of positive inumbers with equal sum [on hold] The 2019 Stack Overflow Developer Survey Results Are InProof of the Bergström inequality using CauchyQuestion on a proof of Hilbert's Inequality using Cauchy SchwarzProve Inequality with Cauchy SchwarzLower and Upper bounds for Ratio of Sum of two Sequences of positive numbersCauchy-Schwarz Inequality and series proofAn inequality involving $a_i, b_i$ such that $sum_i=1^n a_i = sum_i=1^n b_i = 1$Show using Cauchy-Schwarz inequalityProving Cauchy-Schwarz with Arithmetic Geometric meanCauchy-Schwarz with AM-GMProof of inequality using Cauchy–Schwarz inequality
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An application of Cauchy-Schwarz inequality for two lists of positive inumbers with equal sum [on hold]
The 2019 Stack Overflow Developer Survey Results Are InProof of the Bergström inequality using CauchyQuestion on a proof of Hilbert's Inequality using Cauchy SchwarzProve Inequality with Cauchy SchwarzLower and Upper bounds for Ratio of Sum of two Sequences of positive numbersCauchy-Schwarz Inequality and series proofAn inequality involving $a_i, b_i$ such that $sum_i=1^n a_i = sum_i=1^n b_i = 1$Show using Cauchy-Schwarz inequalityProving Cauchy-Schwarz with Arithmetic Geometric meanCauchy-Schwarz with AM-GMProof of inequality using Cauchy–Schwarz inequality
$begingroup$
Let $a_1,dots,a_n,b_1,dots,b_n$ be positive numbers with
$$
a_1+dots+a_n=b_1+dots+b_n = m
$$
We need to prove that
$$
frac1m sum_i=1^n fraca_i^2b_ige 1
$$
The hint that I get is to use Cauchy-Schwarz inequality. But I fail to see how this can be applied here.
inequality cauchy-schwarz-inequality
edited Mar 30 at 10:21
Maria Mazur
50k1361125
asked Mar 30 at 9:35
ablmfablmf
2,58152452
$endgroup$
put on hold as off-topic by Saad, user21820, José Carlos Santos, RRL, GNUSupporter 8964民主女神 地下教會 7 hours ago
This question appears to be off-topic. The users who voted to close gave this specific reason:
- "This question is missing context or other details: Please provide additional context, which ideally explains why the question is relevant to you and our community. Some forms of context include: background and motivation, relevant definitions, source, possible strategies, your current progress, why the question is interesting or important, etc." – Saad, user21820, José Carlos Santos, RRL, GNUSupporter 8964民主女神 地下教會
add a comment |
$begingroup$
Let $a_1,dots,a_n,b_1,dots,b_n$ be positive numbers with
$$
a_1+dots+a_n=b_1+dots+b_n = m
$$
We need to prove that
$$
frac1m sum_i=1^n fraca_i^2b_ige 1
$$
The hint that I get is to use Cauchy-Schwarz inequality. But I fail to see how this can be applied here.
inequality cauchy-schwarz-inequality
edited Mar 30 at 10:21
Maria Mazur
50k1361125
asked Mar 30 at 9:35
ablmfablmf
2,58152452
$endgroup$
put on hold as off-topic by Saad, user21820, José Carlos Santos, RRL, GNUSupporter 8964民主女神 地下教會 7 hours ago
This question appears to be off-topic. The users who voted to close gave this specific reason:
- "This question is missing context or other details: Please provide additional context, which ideally explains why the question is relevant to you and our community. Some forms of context include: background and motivation, relevant definitions, source, possible strategies, your current progress, why the question is interesting or important, etc." – Saad, user21820, José Carlos Santos, RRL, GNUSupporter 8964民主女神 地下教會
add a comment |
$begingroup$
Let $a_1,dots,a_n,b_1,dots,b_n$ be positive numbers with
$$
a_1+dots+a_n=b_1+dots+b_n = m
$$
We need to prove that
$$
frac1m sum_i=1^n fraca_i^2b_ige 1
$$
The hint that I get is to use Cauchy-Schwarz inequality. But I fail to see how this can be applied here.
inequality cauchy-schwarz-inequality
edited Mar 30 at 10:21
Maria Mazur
50k1361125
asked Mar 30 at 9:35
ablmfablmf
2,58152452
$endgroup$
Let $a_1,dots,a_n,b_1,dots,b_n$ be positive numbers with
$$
a_1+dots+a_n=b_1+dots+b_n = m
$$
We need to prove that
$$
frac1m sum_i=1^n fraca_i^2b_ige 1
$$
The hint that I get is to use Cauchy-Schwarz inequality. But I fail to see how this can be applied here.
inequality cauchy-schwarz-inequality
inequality cauchy-schwarz-inequality
edited Mar 30 at 10:21
Maria Mazur
50k1361125
asked Mar 30 at 9:35
ablmfablmf
2,58152452
edited Mar 30 at 10:21
Maria Mazur
50k1361125
asked Mar 30 at 9:35
ablmfablmf
2,58152452
edited Mar 30 at 10:21
Maria Mazur
50k1361125
edited Mar 30 at 10:21
Maria Mazur
50k1361125
edited Mar 30 at 10:21
Maria Mazur
50k1361125
50k1361125
asked Mar 30 at 9:35
ablmfablmf
2,58152452
asked Mar 30 at 9:35
ablmfablmf
2,58152452
asked Mar 30 at 9:35
ablmfablmf
2,58152452
2,58152452
put on hold as off-topic by Saad, user21820, José Carlos Santos, RRL, GNUSupporter 8964民主女神 地下教會 7 hours ago
This question appears to be off-topic. The users who voted to close gave this specific reason:
- "This question is missing context or other details: Please provide additional context, which ideally explains why the question is relevant to you and our community. Some forms of context include: background and motivation, relevant definitions, source, possible strategies, your current progress, why the question is interesting or important, etc." – Saad, user21820, José Carlos Santos, RRL, GNUSupporter 8964民主女神 地下教會
put on hold as off-topic by Saad, user21820, José Carlos Santos, RRL, GNUSupporter 8964民主女神 地下教會 7 hours ago
This question appears to be off-topic. The users who voted to close gave this specific reason:
- "This question is missing context or other details: Please provide additional context, which ideally explains why the question is relevant to you and our community. Some forms of context include: background and motivation, relevant definitions, source, possible strategies, your current progress, why the question is interesting or important, etc." – Saad, user21820, José Carlos Santos, RRL, GNUSupporter 8964民主女神 地下教會
add a comment |
add a comment |
4 Answers
4
active
oldest
votes
$begingroup$
By Cauchy:
$$(b_1+b_2+...+b_n)cdot(a_1^2over b_1+a_2^2over b_2+...+a_n^2over b_n)geq (a_1+a_2+...+a_n)^2$$
So $$mcdot sum_i=1^nfraca_i^2b_igeq m^2$$
and we are done
answered Mar 30 at 9:38
Maria MazurMaria Mazur
50k1361125
$endgroup$
add a comment |
$begingroup$
Hint: Use Cauchy Schwarz in Engel form
$$frac1msum_i=1^nfraca_i^2b_igeq frac1mfrac(a_1+a_2+...+a_n)^2b_1+b_2+...+b_n$$
answered Mar 30 at 9:39
Dr. Sonnhard GraubnerDr. Sonnhard Graubner
78.8k42867
$endgroup$
add a comment |
$begingroup$
Also, we can use AM-GM:
$$frac1msum_k=1^nfraca_k^2b_k=frac1msum_k=1^nleft(fraca_k^2b_k+b_k-b_kright)geqfrac1msum_k=1^nleft(2sqrtfraca_k^2b_kcdot b_k-b_kright)=frac1msum_k=1^nb_k=1.$$
answered Mar 30 at 11:05
Michael RozenbergMichael Rozenberg
110k1896201
$endgroup$
add a comment |
$begingroup$
You may also use Jensen's inequality using the convexity of $f(x) = frac1x$:
$$frac1msum_i=1^n fraca_i^2b_i = frac1msum_i=1^n a_ifrac1fracb_ia_istackrelJensengeqfrac1frac1msum_i=1^n a_ifracb_ia_i = 1$$
answered Mar 30 at 11:43
trancelocationtrancelocation
13.7k1829
$endgroup$
add a comment |
4 Answers
4
active
oldest
votes
4 Answers
4
active
oldest
votes
active
oldest
votes
active
oldest
votes
$begingroup$
By Cauchy:
$$(b_1+b_2+...+b_n)cdot(a_1^2over b_1+a_2^2over b_2+...+a_n^2over b_n)geq (a_1+a_2+...+a_n)^2$$
So $$mcdot sum_i=1^nfraca_i^2b_igeq m^2$$
and we are done
answered Mar 30 at 9:38
Maria MazurMaria Mazur
50k1361125
$endgroup$
add a comment |
$begingroup$
By Cauchy:
$$(b_1+b_2+...+b_n)cdot(a_1^2over b_1+a_2^2over b_2+...+a_n^2over b_n)geq (a_1+a_2+...+a_n)^2$$
So $$mcdot sum_i=1^nfraca_i^2b_igeq m^2$$
and we are done
answered Mar 30 at 9:38
Maria MazurMaria Mazur
50k1361125
$endgroup$
add a comment |
$begingroup$
By Cauchy:
$$(b_1+b_2+...+b_n)cdot(a_1^2over b_1+a_2^2over b_2+...+a_n^2over b_n)geq (a_1+a_2+...+a_n)^2$$
So $$mcdot sum_i=1^nfraca_i^2b_igeq m^2$$
and we are done
answered Mar 30 at 9:38
Maria MazurMaria Mazur
50k1361125
$endgroup$
By Cauchy:
$$(b_1+b_2+...+b_n)cdot(a_1^2over b_1+a_2^2over b_2+...+a_n^2over b_n)geq (a_1+a_2+...+a_n)^2$$
So $$mcdot sum_i=1^nfraca_i^2b_igeq m^2$$
and we are done
answered Mar 30 at 9:38
Maria MazurMaria Mazur
50k1361125
answered Mar 30 at 9:38
Maria MazurMaria Mazur
50k1361125
answered Mar 30 at 9:38
Maria MazurMaria Mazur
50k1361125
answered Mar 30 at 9:38
Maria MazurMaria Mazur
50k1361125
50k1361125
add a comment |
add a comment |
$begingroup$
Hint: Use Cauchy Schwarz in Engel form
$$frac1msum_i=1^nfraca_i^2b_igeq frac1mfrac(a_1+a_2+...+a_n)^2b_1+b_2+...+b_n$$
answered Mar 30 at 9:39
Dr. Sonnhard GraubnerDr. Sonnhard Graubner
78.8k42867
$endgroup$
add a comment |
$begingroup$
Hint: Use Cauchy Schwarz in Engel form
$$frac1msum_i=1^nfraca_i^2b_igeq frac1mfrac(a_1+a_2+...+a_n)^2b_1+b_2+...+b_n$$
answered Mar 30 at 9:39
Dr. Sonnhard GraubnerDr. Sonnhard Graubner
78.8k42867
$endgroup$
add a comment |
$begingroup$
Hint: Use Cauchy Schwarz in Engel form
$$frac1msum_i=1^nfraca_i^2b_igeq frac1mfrac(a_1+a_2+...+a_n)^2b_1+b_2+...+b_n$$
answered Mar 30 at 9:39
Dr. Sonnhard GraubnerDr. Sonnhard Graubner
78.8k42867
$endgroup$
Hint: Use Cauchy Schwarz in Engel form
$$frac1msum_i=1^nfraca_i^2b_igeq frac1mfrac(a_1+a_2+...+a_n)^2b_1+b_2+...+b_n$$
answered Mar 30 at 9:39
Dr. Sonnhard GraubnerDr. Sonnhard Graubner
78.8k42867
answered Mar 30 at 9:39
Dr. Sonnhard GraubnerDr. Sonnhard Graubner
78.8k42867
answered Mar 30 at 9:39
Dr. Sonnhard GraubnerDr. Sonnhard Graubner
78.8k42867
answered Mar 30 at 9:39
Dr. Sonnhard GraubnerDr. Sonnhard Graubner
78.8k42867
78.8k42867
add a comment |
add a comment |
$begingroup$
Also, we can use AM-GM:
$$frac1msum_k=1^nfraca_k^2b_k=frac1msum_k=1^nleft(fraca_k^2b_k+b_k-b_kright)geqfrac1msum_k=1^nleft(2sqrtfraca_k^2b_kcdot b_k-b_kright)=frac1msum_k=1^nb_k=1.$$
answered Mar 30 at 11:05
Michael RozenbergMichael Rozenberg
110k1896201
$endgroup$
add a comment |
$begingroup$
Also, we can use AM-GM:
$$frac1msum_k=1^nfraca_k^2b_k=frac1msum_k=1^nleft(fraca_k^2b_k+b_k-b_kright)geqfrac1msum_k=1^nleft(2sqrtfraca_k^2b_kcdot b_k-b_kright)=frac1msum_k=1^nb_k=1.$$
answered Mar 30 at 11:05
Michael RozenbergMichael Rozenberg
110k1896201
$endgroup$
add a comment |
$begingroup$
Also, we can use AM-GM:
$$frac1msum_k=1^nfraca_k^2b_k=frac1msum_k=1^nleft(fraca_k^2b_k+b_k-b_kright)geqfrac1msum_k=1^nleft(2sqrtfraca_k^2b_kcdot b_k-b_kright)=frac1msum_k=1^nb_k=1.$$
answered Mar 30 at 11:05
Michael RozenbergMichael Rozenberg
110k1896201
$endgroup$
Also, we can use AM-GM:
$$frac1msum_k=1^nfraca_k^2b_k=frac1msum_k=1^nleft(fraca_k^2b_k+b_k-b_kright)geqfrac1msum_k=1^nleft(2sqrtfraca_k^2b_kcdot b_k-b_kright)=frac1msum_k=1^nb_k=1.$$
answered Mar 30 at 11:05
Michael RozenbergMichael Rozenberg
110k1896201
answered Mar 30 at 11:05
Michael RozenbergMichael Rozenberg
110k1896201
answered Mar 30 at 11:05
Michael RozenbergMichael Rozenberg
110k1896201
answered Mar 30 at 11:05
Michael RozenbergMichael Rozenberg
110k1896201
110k1896201
add a comment |
add a comment |
$begingroup$
You may also use Jensen's inequality using the convexity of $f(x) = frac1x$:
$$frac1msum_i=1^n fraca_i^2b_i = frac1msum_i=1^n a_ifrac1fracb_ia_istackrelJensengeqfrac1frac1msum_i=1^n a_ifracb_ia_i = 1$$
answered Mar 30 at 11:43
trancelocationtrancelocation
13.7k1829
$endgroup$
add a comment |
$begingroup$
You may also use Jensen's inequality using the convexity of $f(x) = frac1x$:
$$frac1msum_i=1^n fraca_i^2b_i = frac1msum_i=1^n a_ifrac1fracb_ia_istackrelJensengeqfrac1frac1msum_i=1^n a_ifracb_ia_i = 1$$
answered Mar 30 at 11:43
trancelocationtrancelocation
13.7k1829
$endgroup$
add a comment |
$begingroup$
You may also use Jensen's inequality using the convexity of $f(x) = frac1x$:
$$frac1msum_i=1^n fraca_i^2b_i = frac1msum_i=1^n a_ifrac1fracb_ia_istackrelJensengeqfrac1frac1msum_i=1^n a_ifracb_ia_i = 1$$
answered Mar 30 at 11:43
trancelocationtrancelocation
13.7k1829
$endgroup$
You may also use Jensen's inequality using the convexity of $f(x) = frac1x$:
$$frac1msum_i=1^n fraca_i^2b_i = frac1msum_i=1^n a_ifrac1fracb_ia_istackrelJensengeqfrac1frac1msum_i=1^n a_ifracb_ia_i = 1$$
answered Mar 30 at 11:43
trancelocationtrancelocation
13.7k1829
answered Mar 30 at 11:43
trancelocationtrancelocation
13.7k1829
answered Mar 30 at 11:43
trancelocationtrancelocation
13.7k1829
answered Mar 30 at 11:43
trancelocationtrancelocation
13.7k1829
13.7k1829
add a comment |
add a comment |
