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Possible Duplicate:
What is Jacobian Matrix?

Is there any physical intuition for the Jacobian?

I understand that it is the matrix of partial derivatives and how to construct it. What I want to know is

  • what's the use of it? Application wise
  • is there a nice intuitive explanation for it? I mean regarding its significance and otherwise
  • 0
    [Wikipedia](http://e$n$.wikipedia.org/wiki/Jacobia$n$_matrix_and_determinant#Jacobian_matrix) offers useful information.2012-07-05

1 Answers 1

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The Jacobian is the matrix that represents the linear transformation that takes a small change in the input of a function to the corresponding small change in output:

For $f:\mathbb R^n\to\mathbb R^m$, a fixed $x \in \mathbb R^n$, we have $f(x+h) = f(x) + J(x)h + o(|h|) \qquad\text{for }h\in\mathbb R^m, h\to 0$ provided that the various partial derivatives exist and behave sufficiently nicely.

In this way the Jacobian is the direct analogue of the derivative in ordinary real analysis.