A parallel plate capacitor has square plates of area A separated by distance ‘d’ between them. It is filled with a dielectric which has a dielectric constant that varies as `k(y)=K_0(1+betay)` where 'y' is the distance measured from bottom of capacitor. The total capacitance of the system is given by the expression:

A parallel plate capacitor has plates of area A separated by distance ‘d’ between them. It is filled with a dielectric which has dielectric constant that varies as K (y) = k _(0) (1+ alpha y) where ‘y’ is the vertical distance measured from base of the plates. The total capacitance of the system is best given by: (K _(0) is constant)

A parallel plate capacitor has plates of area A separated by distance ‘d’ between them. It is filled with a dielectric which has dielectric constant that varies as K (y) = k _(0) (1+ alpha y) where ‘y’ is the vertical distance measured from base of the plates. The total capacitance of the system is best given by: (K _(0) is constant)

A parallel plate capacitor has plates of area A separated by distance ‘d’ between them. It is filled with a dielectric which has dielectric constant that varies as K (y) = k _(0) (1+ alpha y) where ‘y’ is the vertical distance measured from base of the plates. The total capacitance of the system is best given by: (K _(0) is constant)

A parallel plate capacitor has plates of area A separated by distance ‘d’ between them. It is filled with a dielectric which has a dielectric constant that varies as k(x)=K(1+ax) where ‘x’ is shown in figure. If (al)lt lt 1 , the total capacitance of the system is best given by the expression:

A capacitor of plate area A and separation between plates d is half filled with dielectric of dielectric constant K. What is equivalent capacitance?

A parallel plate capacitor has plate area of A separated by distance between them. It is completely filled with dielectric medium, its dielectric constant increases linearly as move from one plate to other plate from k_(1) to k_(2) . Then the capacitance of system is given by :

A parallel plate capacitor has plate area of A separated by distance between them. It is completely filled with dielectric medium, its dielectric constant increases linearly as move from one plate to other plate from k_(1) to k_(2) . Then the capacitance of system is given by :

A parallel plate capacitor has plate area of A separated by distance between them. It is completely filled with dielectric medium, its dielectric constant increases linearly as move from one plate to other plate from k_(1) to k_(2) . Then the capacitance of system is given by :

A parallel plate capacitor has plate area A and plate separation d. The space between the plates is filled up to a thickness x (ltd) with a dielectric constant K. Calculate the capacitance of the system.