Chapter 22 Problem 30

Problem

Non-conducting sphere with a charge inside

A nonconducting sphere has a spherical cavity of radius ${\displaystyle r_{1}}$ centered at the sphere’s center. Assuming the charge ${\displaystyle Q}$ is distributed uniformly in the “shell” (between ${\displaystyle r=r_{1}}$ and ${\displaystyle r=r_{0}}$ ), determine the electric field as a function of ${\displaystyle r}$ for

(a) ${\displaystyle 0<r<r_{1}}$

(b) ${\displaystyle r_{1}<r<r_{0}}$

(c) ${\displaystyle r>r_{0}}$

Solution

Superposition principle

${\displaystyle {\vec {E}}_{T}={\vec {E}}_{\textrm {sphere}}+{\vec {E}}_{q}}$

Failed to parse (unknown function "\r"): {\displaystyle E_q=\frac{q}{4\pi\epsilon_0r^2}<math> (radially pointing from the charge) <math>E_\textrm{sphere}\rightarrow \oint \vec{E} \cdot d\vec{A}=E(4\pi\r^2)=\frac{Q_\textrm{encl}}{\epsilon_0}} (radial direction)

${\displaystyle E_{\textrm {sphere}}={\frac {Q_{\textrm {encl}}}{4\pi \epsilon _{0}r^{2}}}}$

so the question is about finding the ${\displaystyle Q_{\textrm {encl}}}$