Create an Account

Already have account?

Forgot Your Password ?

Home / Questions / Use Gausss law in integral form to show that an inverse distance field in spherical coordinates

Use Gausss law in integral form to show that an inverse distance field in spherical coordinates

Use Gauss’s law in integral form to show that an inverse distance field in spherical coordinates, D = Aar /r, where A is a constant, requires every spherical shell of1m thickness to contain 4πA coulombs of charge. Does this indicate a continuous charge distribution? If so, find the charge density variation with r.

 

 

 

Jun 14 2020 View more View Less

Answer (Solved)

question Subscribe To Get Solution

Related Questions