Answer:
[tex]C' = \frac{A\epsilon_{o}}{d - a}[/tex]
Solution:
As per the question:
Area of the plates is given by 'A'
Separation distance between the plates is 'd'
Now, after insertion of the metal plate with same area 'A' and thickness, a < d
in between the plates, the capacitance of the capacitor changes.
The capacitance of the air capacitor (parallel plate) is generally given by:
[tex]C = \frac{A\epsilon_{o}}{d}[/tex]
where
C = Capacitor's capacitance
[tex]\epsilon_{o}[/tex] = Permittivity of the free space
Now, when the metal slab is inserted the distance is reduced to (d - a)
Thus
[tex]C' = \frac{1}{2}(\frac{A\epsilon_{o}}{\frac{d - a}{2}})[/tex]
[tex]C' = \frac{A\epsilon_{o}}{d - a}[/tex]
A capacitor consists of two plates with a dielectric between.
The question is incomplete but I will try to help you the much I can. First of all, a capacitor is a device that is used to store electric charges. A capacitor consists of two plates with a dielectric between.
The capacitance of the capacitor depends on the distance between the plates and the cross sectional area.
Learn more about capacitors: https://brainly.com/question/731147?
