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Q. The surface charge density of a thin charged disc of radius $R$ is $\sigma$. The value of the electric field at the centre of the disc is $\frac{\sigma}{2 \in_{0}} \cdot$ With respect to the field at the centre, the electric field along the axis at a distance $R$ from the centre of the disc :

JEE MainJEE Main 2013Electric Charges and Fields

Solution:

(a)Electric field intensity at the centre of the disc.
$E=\frac{\sigma}{2 \in_{0}} \, $ (given)
Electric field along the axis at any distance x from the centre of the disc
$E'=\frac{\sigma}{2 \in_{0}} \left(1-\frac{x}{\sqrt{x^{2}+R^{2}}}\right)$
From question, x=R (radius of disc)
$\therefore E' =\frac{\sigma}{2 \in_{0}} \left(1-\frac{R}{\sqrt{R^{2}+R^{2}}}\right)$
$=\frac{\sigma}{2 \in_{0}} \left(\frac{\sqrt{2}R-R}{\sqrt{2}R}\right)$
$=\frac{4}{14} E$
$\therefore $ % reduction in the value of electric field
$=\frac{\left(E-\frac{4}{14}E\right)\times100}{E}=\frac{1000}{14} \% \approx70.7\%$