`C_(p)` ( without dielectric ) = 2C
`C_(Q)` ( without dielectric ) = C
k and 2 k are dielectric constant of two dielectrics . Find resultant capacity between A and B .

For metals the value of dielectric constant (K) is

A parallel plate capacitor without any dielectric has capacitance C_(0) . A dielectric slab is made up of two dielectric slabs of dielectric constants K and 2K and is of same dimensions as that of capacitor plates and both the parts are of equal dimensions arranged serially as shown. If this dielectric slab is introduced (dielectric K enters first) in between the plates at constant speed, then variation of capacitance with time will be best represented by :

A parallel plate capacitor (without dielectric) is charged by a battery and kept connected to the battery. A dielectric salb of dielectric constant 'k' is inserted between the plates fully occupying the space between the plates. The energy density of electric field between the plates will:

Three concentric conducting shells A, B and C of radii a,b and c are as shown in figure. A dielectric of dielectric constant K is filled between A and B . Find the capacitance between A and C.

If the dielectric constant and dielectirc strength be denoted by K and x respectively, then a meterial suitable for use as a dielectric in a capacitor must have

If C_(AB) (equivalent ) = (C ) /(2) and capacitance of all the capacitors are C in vacuum without dielectric . Find the relation between k_(1).k_(2).k_(3)

A parallel plate capacitor with air as the dielectric has capacitance C. A slab of dielectric constant K and having the same thickness as the separation between plates is introduced so as to fill one-fourth of the capacitor as shown in the figure. The new capacitance will be :

The space between the plates of a parallel plate capacitor of capacitance C is filled with three dielectric slabs of identical size as shown in figure. If the dielectric constants of the three slabs are K_1 , K_2 and K_3 find the new capacitance.

In the figure a capacitor is filled with dielectrics K_(1) , K_(2) and K_(3) . The resultant capacitance is

Suppose the space between the two inner shells of the previous problum is filled with a dielectric constant . K. Find the capacitance of the system between A and B.