A central force is defined as a force depends only on separation distance

[math]\vec{F} = f(\vec r) \hat r[/math]

ie

Coulomb force and gravitation force.

Spherical Coordinates

Forest_UCM_NLM_Ch1_CoordSys#Spherical

Gradient in spherical coordinates

The differential change of [math]\vec r[/math] in spherical coordinates occurs in three directions.

In the radial direction

[math]dr \hat r[/math]

In the polar angle direction

[math]r d \theta \hat \theta[/math]

In the azimuthal angle direction

[math]r \sin \phi d \phi \hat \phi[/math]

The differential force of the displacement vector in spherical coordinates is

[math]d \vec r = dr \hat r + r d \theta \hat \theta + r \sin \phi d \phi \hat \phi[/math]

The derivative may be represented as

[math]df = f(x+dx) -f(x) = \frac{df}{dx} dx[/math]

in three dimensional cartesian coordinates this may be written in terms of the gradient as

[math]df = \frac{df}{dx} dx + \frac{df}{dy} dy + \frac{df}{dz} dz =\vec \nabla f \cdot d \vec r[/math]

To determine the gradient in sperical coordinates on just compares the two equations

[math]\frac{df}{dr} dr + \frac{df}{d \theta} d\theta + \frac{df}{d\phi} d\phi =\vec \nabla f \cdot d \vec r[/math]

[math]\vec \nabla f \cdot d \vec r = \vec \nabla f \cdot dr \hat r + r d \theta \hat \theta + r \sin \phi d \phi \hat \phi[/math]

[math]= \left . \vec \nabla f \right |_r dr +\left . \vec \nabla f \right |_(\theta} r d\theta +\left . \vec \nabla f \right |_{\phi} r \sin \theta d\phi + [/math]

comparing terms of the above with

[math]d \vec r = dr \hat r + r d \theta \hat \theta + r \sin \phi d \phi \hat \phi[/math]

Forest_UCM_Energy#Central_Forces