Difference between revisions of "Chapter 22 Problem 9"

Problem

${\displaystyle {\vec {E}}}$ muffler device

In a certain region of space, the electric field is constant in direction (say horizontal, in the ${\displaystyle {\vec {x}}}$ direction), but its magnitude decreases from ${\displaystyle E=560{\textrm {N}}/{\textrm {C}}}$ at ${\displaystyle x=0}$ to ${\displaystyle E=410{\textrm {N}}/{\textrm {C}}}$ at ${\displaystyle x=25m}$. Determine the charge within a cubical box of side ${\displaystyle l=25{\textrm {m}}}$, where the box is oriented so that four of its sides are parallel to the field lines

Solution

Out of 6 faces the cube has, only the left and the right face contributes, since the electric field, ${\displaystyle {\vec {E}}}$, is perpendicular to the surface normal, ${\displaystyle {\hat {n}}}$ (${\displaystyle {\vec {E}}\cdot {\hat {n}}=0}$ for these 4 surfaces)

The surface normal on the left hand side is towards left (${\displaystyle -{\hat {x}}}$), and on the right hand side is right (${\displaystyle {\hat {x}}}$)

Total flux is

${\displaystyle \Phi _{E}=\left({\vec {E}}\cdot {\vec {A}}\right)_{\textrm {right}}+\left({\vec {E}}\cdot {\vec {A}}\right)_{\textrm {left}}+0+0+0+0}$

The Gauss's law states the total flux through the surfaces of an enclosed volume is proportional to the charge it encapsulates

${\displaystyle \Phi _{E}=E_{\textrm {right}}l^{2}-E_{\textrm {left}}l^{2}={\frac {Q_{\textrm {encl}}}{\epsilon _{0}}}}$

so the enclosed charge should be

${\displaystyle Q_{\textrm {encl}}=\left(E_{\textrm {right}}-E_{\textrm {left}}\right)l^{2}\epsilon _{0}=\left(410{\textrm {N}}/{\textrm {C}}-560{\textrm {N}}/{\textrm {C}}\right)\left(25{\textrm {m}}\right)^{2}\left(8.85\times 10^{-12}{\textrm {C}}^{2}/{\textrm {N}}{\textrm {m}}^{2}\right)=-8.3\times 10^{-7}{\textrm {C}}}$