Line Integrals and Green’s Theorem

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Bog'liq
greenstheorem

First answers to our questions

Example GT.15. If F is the electric field of an electric charge it is conservative.
Example GT.16. A gravitational field of a mass is conservative.

Potential functions

Definition. If F = ∇f is a gradient vector field then we call f apotential function for F. Note. The usual physics terminology would be to call −f the potential function for F. This section is devoted to answering two questions.

How do we know if a vector field F is a gradient vector field, i.e. if F = ∇f for some potential function f ?
If it exists, how do we find the potential function f ?

First answers to our questions

Theorem GT.17. Suppose F = (M, N ). We have the following answer to our two questions.

If F = ∇f , then

∂M ∂N
_∂y= _∂x, i.e. M_y = N_x.

If M_y = N_x in the whole plane then F is a gradient vector field, i.e F = ∇f for some

potential function f .

If F is conservative on a connected region, then F is a gradient field.

Notes. The restriction that F is defined on the whole plane is too stringent for our needs. Below, we will give what we call the Potential theorem, which only requires that F be defined and differentiable on what is called a ‘simply connected region’.

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Line Integrals and Green’s Theorem

Potential functions

First answers to our questions