Consider a charged sphere with the following charge density ρ(r)
=(ρ0(1− r Rmax) r ≤ Rmax 0 r > Rmax
Using Gauß’ law, calculate the electric field
(a) ~ E1 inside the sphere (i.e. r ≤ Rmax),
(b) ~ E2 outside the sphere (i.e r ≥ Rmax),
(c) Check that lim r→Rmax ~ E1 = lim r→Rmax ~ E2. Reminder: Due
to spherical symmetryRRRV ρ(r0)dxdydz =Rr 0 ρ(r0)4πr02dr0
Please provide an explanation for the solution.
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Consider a charged sphere with the following charge density ρ(r)
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