Partial Derivative Homework: Show x\nablaf(x)=pf(x)

[ak123456]

Homework Statement

A function f: R^n--R is homogenous of degree p if f( [tex]\lambda[/tex]x)=[tex]\lambda[/tex]^p f(x) for all [tex]\lambda[/tex][tex]\in[/tex]R and all x[tex]\in[/tex]R^n
show that if f is differentiable at x ,then x[tex]\nabla[/tex]f(x)=pf(x)

Homework Equations

The Attempt at a Solution

set g([tex]\lambda[/tex])=f([tex]\lambda[/tex]x)
find out g'(1)
then how to continue ?

 

[ak123456]

any help?

 

[Office_Shredder]

[tex] g( \lambda _ = f( \lambda x)[/tex]

Then [tex]g'( \lambda ) = \sum_{i=1}^{n} \frac{df}{dx_i} \frac{d( \lambda x}{dx_i}[/tex]

The right hand side is obtained using the chain rule. Try to calculate what the right hand side really is

 

[ak123456]

[tex] g( \lambda _ = f( \lambda x)[/tex]

Then [tex]g'( \lambda ) = \sum_{i=1}^{n} \frac{df}{dx_i} \frac{d( \lambda x}{dx_i}[/tex]

The right hand side is obtained using the chain rule. Try to calculate what the right hand side really is

i don't know where is the formula for g' comes from

 

[HallsofIvy]

Office Shredder told you: it is the chain rule.