Proof of Identity: Differentiating $\alpha^ax$ and $\alpha^by$

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Homework Statement


[tex]\alpha\frac{d}{d\alpha}[f(\alpha^ax,\alpha^by)]|_{\alpha=1}=ax\frac{\partial f}{\partial x}+by\frac{\partial f}{\partial y}[/tex]


Homework Equations





The Attempt at a Solution


Homework Statement


I'm confused. I don't know what to do here. How to differentiate left side? Thanks for your help.
 
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For example

[tex]\frac{d}{d\alpha}f(\alpha^ax)=ax\alpha^{a-1}\frac{\partial f}{\partial \alpha}[/tex]

Right?
 
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Sorry. I made a mistake. You can see know what I meant. I edit my last message.
 
matematikuvol said:

Homework Statement


[tex]\alpha\frac{d}{d\alpha}[f(\alpha^ax,\alpha^by)]|_{\alpha=1}=ax\frac{\partial f}{\partial x}+by\frac{\partial f}{\partial y}[/tex]

Homework Equations



The Attempt at a Solution


Homework Statement


I'm confused. I don't know what to do here. How to differentiate left side? Thanks for your help.
It would help if you would give us the whole problem, word for word as it was given to you.

For instance, what is meant by [itex]\displaystyle\frac{\partial f}{\partial x}\,?[/itex]

I assume that's [itex]\displaystyle\frac{\partial f(x,\,y)}{\partial x}\,,[/itex] evaluated at (x, y) = (αax, αby) rather than [itex]\displaystyle\frac{\partial f(\alpha^a x,\, \alpha^b y)}{\partial x}\,.[/itex]
 
I'm not quite sure. I had only left side. So
[tex]\alpha\frac{d}{d\alpha}[f(\alpha^a x,\alpha^by)]|\alpha=1=[/tex]
Please help if you know. I'm confused.