A) \[\vec{E}\] must be the electric field due to the enclosed charge
B) If net charge inside the Gaussian surface = 0, then \[\vec{E}\] must be zero everywhere over the Gaussian surface.
C) If the only charge inside the Gaussian surface is an electric dipole, then the integral is zero.
D) \[\vec{E}\]is parallel to\[\overrightarrow{dA}\]everywhere over the Gaussian surface.
Correct Answer: C
Solution :
\[\phi =\frac{{{Q}_{net}}}{{{\in }_{0}}}\]For dipole\[{{Q}_{net}}=0\Rightarrow \phi =0\]You need to login to perform this action.
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