Jacobian when there's a multivariate function inside it

Join the discussion
Ask a follow-up here, or get your own question answered by working scientists, mathematicians and engineers — people, not an autocomplete.
Real named experts · corrections over time · the nuance an AI answer skips
3 replies · 2K views
gummz
Messages
32
Reaction score
2

Homework Statement



differentiate the function F(x,y) = f( g(x)k(y) ; g(x)+h(y) )

Homework Equations



Standard rules for partial differentiation

The Attempt at a Solution



The Jacobian will have two columns because of the variables x and y. But what then? f is a multivariate function inside the Jacobian!
 
Physics news on Phys.org
So on top of the standard rules you get the chain rule.
Show some attempt at solution and help is on the way.

To demo my ignorance: Differentiating gives two columns, but one row only, right ?
Is there a significance in the ";" ? You write F ( x , y ) -- a notation which I am also familiar with -- , but then you write f ( u ; v )
 
gummz said:

Homework Statement



differentiate the function F(x,y) = f( g(x)k(y) ; g(x)+h(y) )

Homework Equations



Standard rules for partial differentiation

The Attempt at a Solution



The Jacobian will have two columns because of the variables x and y. But what then? f is a multivariate function inside the Jacobian!

Do you mean ##F(x,y) = f(u,v)##, where ##u = g(x) k(y)## and ##v = g(x) + h(y)##? If so, just apply the chain rule for derivatives. You need to express the answers in terms of the functions ##f_1, f_2##, where ##f_1(u,v) \equiv \partial f(u,v)/\partial u## and ##f_2(u,v) \equiv \partial f(u,v) / \partial v##.
 
Consider the partial derivatives that make up the derivative matrix. It should be a 2x2, you have two functions, and take the derivative of both functions wrt x or wrt y.