Substitution of x in Integral
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Hi I was wondering how to do the following:
I have this integral:
$$int _ { - L / 2 } ^ { + L / 2 } w' ( x ), d x$$
I know would like to normalize x with respect to L:
$$hat { x } = frac { x } { L }$$
How do I substitute correctly ?
I know that:
$$w' ( x ) = frac { 1 } { L } w' (hat { x })$$
but what about the $dx$?
Thanks!
EDIT:
From the chain rule:
$$
frac{dw}{dx} = frac{dhat{x}}{dx} frac{dw}{dhat{x}} = frac{1}{L} frac{dw}{dhat{x}}
$$
see here: Change of variables in differential equation?
integration
edited Dec 14 '18 at 18:20
egreg
183k1486205
asked Dec 14 '18 at 15:50
jamesjames
15110
$endgroup$
|
show 3 more comments
$begingroup$
Hi I was wondering how to do the following:
I have this integral:
$$int _ { - L / 2 } ^ { + L / 2 } w' ( x ), d x$$
I know would like to normalize x with respect to L:
$$hat { x } = frac { x } { L }$$
How do I substitute correctly ?
I know that:
$$w' ( x ) = frac { 1 } { L } w' (hat { x })$$
but what about the $dx$?
Thanks!
EDIT:
From the chain rule:
$$
frac{dw}{dx} = frac{dhat{x}}{dx} frac{dw}{dhat{x}} = frac{1}{L} frac{dw}{dhat{x}}
$$
see here: Change of variables in differential equation?
integration
edited Dec 14 '18 at 18:20
egreg
183k1486205
asked Dec 14 '18 at 15:50
jamesjames
15110
$endgroup$
$begingroup$
The differential $mathrm d x$ transforms linearly, that is $mathrm d x = mathrm d L hat x = L mathrm d hat x$. But are you sure about $w(x) = frac 1 L w(hat x)$?
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– k.stm
Dec 14 '18 at 15:54
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@k.stm Thanks ! , Uhm, no I am not 100% sure.
$endgroup$
– james
Dec 14 '18 at 15:55
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Well, what is $w$?
$endgroup$
– k.stm
Dec 14 '18 at 15:57
$begingroup$
@james you shall not assume that unless you know that $w$ satisfy the following relation. After substitution, $w(x)$ will trasform into $w(L hat{x})$
$endgroup$
– hyperkahler
Dec 14 '18 at 15:57
$begingroup$
@Arteom Please see my edit for the derivation
$endgroup$
– james
Dec 14 '18 at 15:58
|
show 3 more comments
$begingroup$
Hi I was wondering how to do the following:
I have this integral:
$$int _ { - L / 2 } ^ { + L / 2 } w' ( x ), d x$$
I know would like to normalize x with respect to L:
$$hat { x } = frac { x } { L }$$
How do I substitute correctly ?
I know that:
$$w' ( x ) = frac { 1 } { L } w' (hat { x })$$
but what about the $dx$?
Thanks!
EDIT:
From the chain rule:
$$
frac{dw}{dx} = frac{dhat{x}}{dx} frac{dw}{dhat{x}} = frac{1}{L} frac{dw}{dhat{x}}
$$
see here: Change of variables in differential equation?
integration
edited Dec 14 '18 at 18:20
egreg
183k1486205
asked Dec 14 '18 at 15:50
jamesjames
15110
$endgroup$
Hi I was wondering how to do the following:
I have this integral:
$$int _ { - L / 2 } ^ { + L / 2 } w' ( x ), d x$$
I know would like to normalize x with respect to L:
$$hat { x } = frac { x } { L }$$
How do I substitute correctly ?
I know that:
$$w' ( x ) = frac { 1 } { L } w' (hat { x })$$
but what about the $dx$?
Thanks!
EDIT:
From the chain rule:
$$
frac{dw}{dx} = frac{dhat{x}}{dx} frac{dw}{dhat{x}} = frac{1}{L} frac{dw}{dhat{x}}
$$
see here: Change of variables in differential equation?
integration
integration
edited Dec 14 '18 at 18:20
egreg
183k1486205
asked Dec 14 '18 at 15:50
jamesjames
15110
edited Dec 14 '18 at 18:20
egreg
183k1486205
asked Dec 14 '18 at 15:50
jamesjames
15110
edited Dec 14 '18 at 18:20
egreg
183k1486205
edited Dec 14 '18 at 18:20
egreg
183k1486205
edited Dec 14 '18 at 18:20
egreg
183k1486205
183k1486205
asked Dec 14 '18 at 15:50
jamesjames
15110
asked Dec 14 '18 at 15:50
jamesjames
15110
asked Dec 14 '18 at 15:50
jamesjames
15110
15110
$begingroup$
The differential $mathrm d x$ transforms linearly, that is $mathrm d x = mathrm d L hat x = L mathrm d hat x$. But are you sure about $w(x) = frac 1 L w(hat x)$?
$endgroup$
– k.stm
Dec 14 '18 at 15:54
$begingroup$
@k.stm Thanks ! , Uhm, no I am not 100% sure.
$endgroup$
– james
Dec 14 '18 at 15:55
$begingroup$
Well, what is $w$?
$endgroup$
– k.stm
Dec 14 '18 at 15:57
$begingroup$
@james you shall not assume that unless you know that $w$ satisfy the following relation. After substitution, $w(x)$ will trasform into $w(L hat{x})$
$endgroup$
– hyperkahler
Dec 14 '18 at 15:57
$begingroup$
@Arteom Please see my edit for the derivation
$endgroup$
– james
Dec 14 '18 at 15:58
|
show 3 more comments
$begingroup$
The differential $mathrm d x$ transforms linearly, that is $mathrm d x = mathrm d L hat x = L mathrm d hat x$. But are you sure about $w(x) = frac 1 L w(hat x)$?
$endgroup$
– k.stm
Dec 14 '18 at 15:54
$begingroup$
@k.stm Thanks ! , Uhm, no I am not 100% sure.
$endgroup$
– james
Dec 14 '18 at 15:55
$begingroup$
Well, what is $w$?
$endgroup$
– k.stm
Dec 14 '18 at 15:57
$begingroup$
@james you shall not assume that unless you know that $w$ satisfy the following relation. After substitution, $w(x)$ will trasform into $w(L hat{x})$
$endgroup$
– hyperkahler
Dec 14 '18 at 15:57
$begingroup$
@Arteom Please see my edit for the derivation
$endgroup$
– james
Dec 14 '18 at 15:58
$begingroup$
The differential $mathrm d x$ transforms linearly, that is $mathrm d x = mathrm d L hat x = L mathrm d hat x$. But are you sure about $w(x) = frac 1 L w(hat x)$?
$endgroup$
– k.stm
Dec 14 '18 at 15:54
$begingroup$
The differential $mathrm d x$ transforms linearly, that is $mathrm d x = mathrm d L hat x = L mathrm d hat x$. But are you sure about $w(x) = frac 1 L w(hat x)$?
$endgroup$
– k.stm
Dec 14 '18 at 15:54
$begingroup$
@k.stm Thanks ! , Uhm, no I am not 100% sure.
$endgroup$
– james
Dec 14 '18 at 15:55
$begingroup$
@k.stm Thanks ! , Uhm, no I am not 100% sure.
$endgroup$
– james
Dec 14 '18 at 15:55
$begingroup$
Well, what is $w$?
$endgroup$
– k.stm
Dec 14 '18 at 15:57
$begingroup$
Well, what is $w$?
$endgroup$
– k.stm
Dec 14 '18 at 15:57
$begingroup$
@james you shall not assume that unless you know that $w$ satisfy the following relation. After substitution, $w(x)$ will trasform into $w(L hat{x})$
$endgroup$
– hyperkahler
Dec 14 '18 at 15:57
$begingroup$
@james you shall not assume that unless you know that $w$ satisfy the following relation. After substitution, $w(x)$ will trasform into $w(L hat{x})$
$endgroup$
– hyperkahler
Dec 14 '18 at 15:57
$begingroup$
@Arteom Please see my edit for the derivation
$endgroup$
– james
Dec 14 '18 at 15:58
$begingroup$
@Arteom Please see my edit for the derivation
$endgroup$
– james
Dec 14 '18 at 15:58
|
show 3 more comments
2 Answers
2
active
oldest
votes
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Note. You know that $displaystylefrac{d[w(x)]}{dx}=w'(x)implies d[w(x)]=w'(x)dx$
$displaystyleint_{-L/2}^{L/2}w'(x)dx=int_{-L/2}^{L/2}d[w(x)]=w(L/2)-w(-L/2)$
Method $1$
$hat x=frac xLimplies x=Lhat x$
Since $x$ ranges from $-L/2to L/2, hat x=frac xL$ ranges from $-1/2to1/2$.
Substitute $x$ by $Lhat x$ wherever you find $x$ in the integrand.
$displaystyleint_{-L/2}^{L/2}w'(x)dx=int_{-1/2}^{1/2}w'(Lhat x)d(Lhat x)=Lint_{-1/2}^{1/2}w'(Lhat x)dhat xbecause d(Lhat x)=Ld(hat x)$
Method $2$
$displaystyle w'(x)=frac d{dx}[w(x)]=frac d{dx}[w(y)]$, where $y=Lhat x=x$
$displaystyle w'(x)=frac d{dx}[w(y)]=frac d{dy}[w(y)]times frac{dy}{dx}=w'(y)timesfrac{dy}{dx}=w'(y)timesfrac{dx}{dx}=w'(y)=w'(Lhat x)$
The error in your approach lies when you claim that $displaystylefrac{d[w(x)]}{dhat x}=w'(hat x)$. Since $displaystyle x=Lhat x,frac{d[w(x)]}{dhat x}=frac{d[w(Lhat x)]}{dhat x}$
By the chain rule, for finding this expression, you have to differentiate it with respect to the inner function and multiply with the derivative of the inner function with respect to $hat x$.
$displaystylefrac{d[w(Lhat x)]}{dhat x}=frac{d[w(Lhat x)]}{d(Lhat x)}timesfrac{d(Lhat x)}{dhat x}=Lw'(Lhat x)because w'(Lhat x)=frac d{d(Lhat x)}[w(Lhat x)]$
answered Dec 14 '18 at 15:59
Shubham JohriShubham Johri
5,204718
$endgroup$
$begingroup$
Can't you go further with $w(Lhat{x})$ ?
$endgroup$
– james
Dec 14 '18 at 16:05
$begingroup$
Not unless we have some more information about $w(x)$
$endgroup$
– Shubham Johri
Dec 14 '18 at 16:06
$begingroup$
Please have a look at my new edit. Thanks !
$endgroup$
– james
Dec 14 '18 at 16:09
$begingroup$
Oh, sorry ! I made an error in my question. It is now fixed. Would you mind to have a second look ?
$endgroup$
– james
Dec 14 '18 at 16:12
$begingroup$
Note that $displaystylefrac{dw}{dhat x}ne w'(hat x)$
$endgroup$
– Shubham Johri
Dec 14 '18 at 16:12
|
show 14 more comments
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If you substitute $hat{x}=x/L$, then $dhat{x}=L^{-1},dx$ and the integral becomes
$$
int_{-1/2}^{1/2} Lw'(Lhat{x}),dhat{x}
$$
Not really a progress, because you need to apply the chain rule to show that, if $u(hat{x})=w(Lhat{x})$, then
$$
u'(hat{x})=Lw'(Lhat{x})
$$
and so the integral can be rewritten as
$$
int_{-1/2}^{1/2} u'(hat{x}),dhat{x}=u(1/2)-u(-1/2)=w(L/2)-w(-L/2)
$$
which was directly clear from the beginning with the fundamental theorem of calculus.
answered Dec 14 '18 at 18:31
egregegreg
183k1486205
$endgroup$
$begingroup$
@ShubhamJohri Yes, you're right. Fixed.
$endgroup$
– egreg
Dec 14 '18 at 21:02
add a comment |
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2 Answers
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2 Answers
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$begingroup$
Note. You know that $displaystylefrac{d[w(x)]}{dx}=w'(x)implies d[w(x)]=w'(x)dx$
$displaystyleint_{-L/2}^{L/2}w'(x)dx=int_{-L/2}^{L/2}d[w(x)]=w(L/2)-w(-L/2)$
Method $1$
$hat x=frac xLimplies x=Lhat x$
Since $x$ ranges from $-L/2to L/2, hat x=frac xL$ ranges from $-1/2to1/2$.
Substitute $x$ by $Lhat x$ wherever you find $x$ in the integrand.
$displaystyleint_{-L/2}^{L/2}w'(x)dx=int_{-1/2}^{1/2}w'(Lhat x)d(Lhat x)=Lint_{-1/2}^{1/2}w'(Lhat x)dhat xbecause d(Lhat x)=Ld(hat x)$
Method $2$
$displaystyle w'(x)=frac d{dx}[w(x)]=frac d{dx}[w(y)]$, where $y=Lhat x=x$
$displaystyle w'(x)=frac d{dx}[w(y)]=frac d{dy}[w(y)]times frac{dy}{dx}=w'(y)timesfrac{dy}{dx}=w'(y)timesfrac{dx}{dx}=w'(y)=w'(Lhat x)$
The error in your approach lies when you claim that $displaystylefrac{d[w(x)]}{dhat x}=w'(hat x)$. Since $displaystyle x=Lhat x,frac{d[w(x)]}{dhat x}=frac{d[w(Lhat x)]}{dhat x}$
By the chain rule, for finding this expression, you have to differentiate it with respect to the inner function and multiply with the derivative of the inner function with respect to $hat x$.
$displaystylefrac{d[w(Lhat x)]}{dhat x}=frac{d[w(Lhat x)]}{d(Lhat x)}timesfrac{d(Lhat x)}{dhat x}=Lw'(Lhat x)because w'(Lhat x)=frac d{d(Lhat x)}[w(Lhat x)]$
answered Dec 14 '18 at 15:59
Shubham JohriShubham Johri
5,204718
$endgroup$
$begingroup$
Can't you go further with $w(Lhat{x})$ ?
$endgroup$
– james
Dec 14 '18 at 16:05
$begingroup$
Not unless we have some more information about $w(x)$
$endgroup$
– Shubham Johri
Dec 14 '18 at 16:06
$begingroup$
Please have a look at my new edit. Thanks !
$endgroup$
– james
Dec 14 '18 at 16:09
$begingroup$
Oh, sorry ! I made an error in my question. It is now fixed. Would you mind to have a second look ?
$endgroup$
– james
Dec 14 '18 at 16:12
$begingroup$
Note that $displaystylefrac{dw}{dhat x}ne w'(hat x)$
$endgroup$
– Shubham Johri
Dec 14 '18 at 16:12
|
show 14 more comments
$begingroup$
Note. You know that $displaystylefrac{d[w(x)]}{dx}=w'(x)implies d[w(x)]=w'(x)dx$
$displaystyleint_{-L/2}^{L/2}w'(x)dx=int_{-L/2}^{L/2}d[w(x)]=w(L/2)-w(-L/2)$
Method $1$
$hat x=frac xLimplies x=Lhat x$
Since $x$ ranges from $-L/2to L/2, hat x=frac xL$ ranges from $-1/2to1/2$.
Substitute $x$ by $Lhat x$ wherever you find $x$ in the integrand.
$displaystyleint_{-L/2}^{L/2}w'(x)dx=int_{-1/2}^{1/2}w'(Lhat x)d(Lhat x)=Lint_{-1/2}^{1/2}w'(Lhat x)dhat xbecause d(Lhat x)=Ld(hat x)$
Method $2$
$displaystyle w'(x)=frac d{dx}[w(x)]=frac d{dx}[w(y)]$, where $y=Lhat x=x$
$displaystyle w'(x)=frac d{dx}[w(y)]=frac d{dy}[w(y)]times frac{dy}{dx}=w'(y)timesfrac{dy}{dx}=w'(y)timesfrac{dx}{dx}=w'(y)=w'(Lhat x)$
The error in your approach lies when you claim that $displaystylefrac{d[w(x)]}{dhat x}=w'(hat x)$. Since $displaystyle x=Lhat x,frac{d[w(x)]}{dhat x}=frac{d[w(Lhat x)]}{dhat x}$
By the chain rule, for finding this expression, you have to differentiate it with respect to the inner function and multiply with the derivative of the inner function with respect to $hat x$.
$displaystylefrac{d[w(Lhat x)]}{dhat x}=frac{d[w(Lhat x)]}{d(Lhat x)}timesfrac{d(Lhat x)}{dhat x}=Lw'(Lhat x)because w'(Lhat x)=frac d{d(Lhat x)}[w(Lhat x)]$
answered Dec 14 '18 at 15:59
Shubham JohriShubham Johri
5,204718
$endgroup$
$begingroup$
Can't you go further with $w(Lhat{x})$ ?
$endgroup$
– james
Dec 14 '18 at 16:05
$begingroup$
Not unless we have some more information about $w(x)$
$endgroup$
– Shubham Johri
Dec 14 '18 at 16:06
$begingroup$
Please have a look at my new edit. Thanks !
$endgroup$
– james
Dec 14 '18 at 16:09
$begingroup$
Oh, sorry ! I made an error in my question. It is now fixed. Would you mind to have a second look ?
$endgroup$
– james
Dec 14 '18 at 16:12
$begingroup$
Note that $displaystylefrac{dw}{dhat x}ne w'(hat x)$
$endgroup$
– Shubham Johri
Dec 14 '18 at 16:12
|
show 14 more comments
$begingroup$
Note. You know that $displaystylefrac{d[w(x)]}{dx}=w'(x)implies d[w(x)]=w'(x)dx$
$displaystyleint_{-L/2}^{L/2}w'(x)dx=int_{-L/2}^{L/2}d[w(x)]=w(L/2)-w(-L/2)$
Method $1$
$hat x=frac xLimplies x=Lhat x$
Since $x$ ranges from $-L/2to L/2, hat x=frac xL$ ranges from $-1/2to1/2$.
Substitute $x$ by $Lhat x$ wherever you find $x$ in the integrand.
$displaystyleint_{-L/2}^{L/2}w'(x)dx=int_{-1/2}^{1/2}w'(Lhat x)d(Lhat x)=Lint_{-1/2}^{1/2}w'(Lhat x)dhat xbecause d(Lhat x)=Ld(hat x)$
Method $2$
$displaystyle w'(x)=frac d{dx}[w(x)]=frac d{dx}[w(y)]$, where $y=Lhat x=x$
$displaystyle w'(x)=frac d{dx}[w(y)]=frac d{dy}[w(y)]times frac{dy}{dx}=w'(y)timesfrac{dy}{dx}=w'(y)timesfrac{dx}{dx}=w'(y)=w'(Lhat x)$
The error in your approach lies when you claim that $displaystylefrac{d[w(x)]}{dhat x}=w'(hat x)$. Since $displaystyle x=Lhat x,frac{d[w(x)]}{dhat x}=frac{d[w(Lhat x)]}{dhat x}$
By the chain rule, for finding this expression, you have to differentiate it with respect to the inner function and multiply with the derivative of the inner function with respect to $hat x$.
$displaystylefrac{d[w(Lhat x)]}{dhat x}=frac{d[w(Lhat x)]}{d(Lhat x)}timesfrac{d(Lhat x)}{dhat x}=Lw'(Lhat x)because w'(Lhat x)=frac d{d(Lhat x)}[w(Lhat x)]$
answered Dec 14 '18 at 15:59
Shubham JohriShubham Johri
5,204718
$endgroup$
Note. You know that $displaystylefrac{d[w(x)]}{dx}=w'(x)implies d[w(x)]=w'(x)dx$
$displaystyleint_{-L/2}^{L/2}w'(x)dx=int_{-L/2}^{L/2}d[w(x)]=w(L/2)-w(-L/2)$
Method $1$
$hat x=frac xLimplies x=Lhat x$
Since $x$ ranges from $-L/2to L/2, hat x=frac xL$ ranges from $-1/2to1/2$.
Substitute $x$ by $Lhat x$ wherever you find $x$ in the integrand.
$displaystyleint_{-L/2}^{L/2}w'(x)dx=int_{-1/2}^{1/2}w'(Lhat x)d(Lhat x)=Lint_{-1/2}^{1/2}w'(Lhat x)dhat xbecause d(Lhat x)=Ld(hat x)$
Method $2$
$displaystyle w'(x)=frac d{dx}[w(x)]=frac d{dx}[w(y)]$, where $y=Lhat x=x$
$displaystyle w'(x)=frac d{dx}[w(y)]=frac d{dy}[w(y)]times frac{dy}{dx}=w'(y)timesfrac{dy}{dx}=w'(y)timesfrac{dx}{dx}=w'(y)=w'(Lhat x)$
The error in your approach lies when you claim that $displaystylefrac{d[w(x)]}{dhat x}=w'(hat x)$. Since $displaystyle x=Lhat x,frac{d[w(x)]}{dhat x}=frac{d[w(Lhat x)]}{dhat x}$
By the chain rule, for finding this expression, you have to differentiate it with respect to the inner function and multiply with the derivative of the inner function with respect to $hat x$.
$displaystylefrac{d[w(Lhat x)]}{dhat x}=frac{d[w(Lhat x)]}{d(Lhat x)}timesfrac{d(Lhat x)}{dhat x}=Lw'(Lhat x)because w'(Lhat x)=frac d{d(Lhat x)}[w(Lhat x)]$
answered Dec 14 '18 at 15:59
Shubham JohriShubham Johri
5,204718
edited Dec 14 '18 at 18:15
answered Dec 14 '18 at 15:59
Shubham JohriShubham Johri
5,204718
answered Dec 14 '18 at 15:59
Shubham JohriShubham Johri
5,204718
answered Dec 14 '18 at 15:59
Shubham JohriShubham Johri
5,204718
5,204718
$begingroup$
Can't you go further with $w(Lhat{x})$ ?
$endgroup$
– james
Dec 14 '18 at 16:05
$begingroup$
Not unless we have some more information about $w(x)$
$endgroup$
– Shubham Johri
Dec 14 '18 at 16:06
$begingroup$
Please have a look at my new edit. Thanks !
$endgroup$
– james
Dec 14 '18 at 16:09
$begingroup$
Oh, sorry ! I made an error in my question. It is now fixed. Would you mind to have a second look ?
$endgroup$
– james
Dec 14 '18 at 16:12
$begingroup$
Note that $displaystylefrac{dw}{dhat x}ne w'(hat x)$
$endgroup$
– Shubham Johri
Dec 14 '18 at 16:12
|
show 14 more comments
$begingroup$
Can't you go further with $w(Lhat{x})$ ?
$endgroup$
– james
Dec 14 '18 at 16:05
$begingroup$
Not unless we have some more information about $w(x)$
$endgroup$
– Shubham Johri
Dec 14 '18 at 16:06
$begingroup$
Please have a look at my new edit. Thanks !
$endgroup$
– james
Dec 14 '18 at 16:09
$begingroup$
Oh, sorry ! I made an error in my question. It is now fixed. Would you mind to have a second look ?
$endgroup$
– james
Dec 14 '18 at 16:12
$begingroup$
Note that $displaystylefrac{dw}{dhat x}ne w'(hat x)$
$endgroup$
– Shubham Johri
Dec 14 '18 at 16:12
$begingroup$
Can't you go further with $w(Lhat{x})$ ?
$endgroup$
– james
Dec 14 '18 at 16:05
$begingroup$
Can't you go further with $w(Lhat{x})$ ?
$endgroup$
– james
Dec 14 '18 at 16:05
$begingroup$
Not unless we have some more information about $w(x)$
$endgroup$
– Shubham Johri
Dec 14 '18 at 16:06
$begingroup$
Not unless we have some more information about $w(x)$
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– Shubham Johri
Dec 14 '18 at 16:06
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Please have a look at my new edit. Thanks !
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– james
Dec 14 '18 at 16:09
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Please have a look at my new edit. Thanks !
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– james
Dec 14 '18 at 16:09
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Oh, sorry ! I made an error in my question. It is now fixed. Would you mind to have a second look ?
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– james
Dec 14 '18 at 16:12
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Oh, sorry ! I made an error in my question. It is now fixed. Would you mind to have a second look ?
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– james
Dec 14 '18 at 16:12
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Note that $displaystylefrac{dw}{dhat x}ne w'(hat x)$
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– Shubham Johri
Dec 14 '18 at 16:12
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Note that $displaystylefrac{dw}{dhat x}ne w'(hat x)$
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– Shubham Johri
Dec 14 '18 at 16:12
|
show 14 more comments
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If you substitute $hat{x}=x/L$, then $dhat{x}=L^{-1},dx$ and the integral becomes
$$
int_{-1/2}^{1/2} Lw'(Lhat{x}),dhat{x}
$$
Not really a progress, because you need to apply the chain rule to show that, if $u(hat{x})=w(Lhat{x})$, then
$$
u'(hat{x})=Lw'(Lhat{x})
$$
and so the integral can be rewritten as
$$
int_{-1/2}^{1/2} u'(hat{x}),dhat{x}=u(1/2)-u(-1/2)=w(L/2)-w(-L/2)
$$
which was directly clear from the beginning with the fundamental theorem of calculus.
answered Dec 14 '18 at 18:31
egregegreg
183k1486205
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@ShubhamJohri Yes, you're right. Fixed.
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– egreg
Dec 14 '18 at 21:02
add a comment |
$begingroup$
If you substitute $hat{x}=x/L$, then $dhat{x}=L^{-1},dx$ and the integral becomes
$$
int_{-1/2}^{1/2} Lw'(Lhat{x}),dhat{x}
$$
Not really a progress, because you need to apply the chain rule to show that, if $u(hat{x})=w(Lhat{x})$, then
$$
u'(hat{x})=Lw'(Lhat{x})
$$
and so the integral can be rewritten as
$$
int_{-1/2}^{1/2} u'(hat{x}),dhat{x}=u(1/2)-u(-1/2)=w(L/2)-w(-L/2)
$$
which was directly clear from the beginning with the fundamental theorem of calculus.
answered Dec 14 '18 at 18:31
egregegreg
183k1486205
$endgroup$
$begingroup$
@ShubhamJohri Yes, you're right. Fixed.
$endgroup$
– egreg
Dec 14 '18 at 21:02
add a comment |
$begingroup$
If you substitute $hat{x}=x/L$, then $dhat{x}=L^{-1},dx$ and the integral becomes
$$
int_{-1/2}^{1/2} Lw'(Lhat{x}),dhat{x}
$$
Not really a progress, because you need to apply the chain rule to show that, if $u(hat{x})=w(Lhat{x})$, then
$$
u'(hat{x})=Lw'(Lhat{x})
$$
and so the integral can be rewritten as
$$
int_{-1/2}^{1/2} u'(hat{x}),dhat{x}=u(1/2)-u(-1/2)=w(L/2)-w(-L/2)
$$
which was directly clear from the beginning with the fundamental theorem of calculus.
answered Dec 14 '18 at 18:31
egregegreg
183k1486205
$endgroup$
If you substitute $hat{x}=x/L$, then $dhat{x}=L^{-1},dx$ and the integral becomes
$$
int_{-1/2}^{1/2} Lw'(Lhat{x}),dhat{x}
$$
Not really a progress, because you need to apply the chain rule to show that, if $u(hat{x})=w(Lhat{x})$, then
$$
u'(hat{x})=Lw'(Lhat{x})
$$
and so the integral can be rewritten as
$$
int_{-1/2}^{1/2} u'(hat{x}),dhat{x}=u(1/2)-u(-1/2)=w(L/2)-w(-L/2)
$$
which was directly clear from the beginning with the fundamental theorem of calculus.
answered Dec 14 '18 at 18:31
egregegreg
183k1486205
edited Dec 14 '18 at 21:01
answered Dec 14 '18 at 18:31
egregegreg
183k1486205
answered Dec 14 '18 at 18:31
egregegreg
183k1486205
answered Dec 14 '18 at 18:31
egregegreg
183k1486205
183k1486205
$begingroup$
@ShubhamJohri Yes, you're right. Fixed.
$endgroup$
– egreg
Dec 14 '18 at 21:02
add a comment |
$begingroup$
@ShubhamJohri Yes, you're right. Fixed.
$endgroup$
– egreg
Dec 14 '18 at 21:02
$begingroup$
@ShubhamJohri Yes, you're right. Fixed.
$endgroup$
– egreg
Dec 14 '18 at 21:02
$begingroup$
@ShubhamJohri Yes, you're right. Fixed.
$endgroup$
– egreg
Dec 14 '18 at 21:02
add a comment |
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$begingroup$
The differential $mathrm d x$ transforms linearly, that is $mathrm d x = mathrm d L hat x = L mathrm d hat x$. But are you sure about $w(x) = frac 1 L w(hat x)$?
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– k.stm
Dec 14 '18 at 15:54
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@k.stm Thanks ! , Uhm, no I am not 100% sure.
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– james
Dec 14 '18 at 15:55
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Well, what is $w$?
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– k.stm
Dec 14 '18 at 15:57
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@james you shall not assume that unless you know that $w$ satisfy the following relation. After substitution, $w(x)$ will trasform into $w(L hat{x})$
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– hyperkahler
Dec 14 '18 at 15:57
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@Arteom Please see my edit for the derivation
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– james
Dec 14 '18 at 15:58