A parallel plate capacitor of area A, plate separation d and capacitance C is filled with three different dielectric materials having dielectric constants K1,K2 and K3 as shown in Fig. If a single dielectric material is to be used to have the same capacitance C in this capacitor, then its dielectric constant K is given by
1K=1K1+K2+12K3
We have C1=ϵ0(A/2)K1(d/2)=ϵ0AK1dC2=ϵ0(A/2)K2(d/2)=ϵ0AK2dand C3=ϵ0(A)K3(d/2)=2ϵ0AK3d
The capacitors C1 and C2 are in parallel and their equivalent capacitance is
C′=C1+C2=ϵ0Ad(K1+K2)
This combination is in series with C3. Hence, the net capacitance is
1C′′=1C′+1C3=dϵ0A(K1+K2)+d2ϵ0AK3=dϵ0A[1(K1+K2)+12K3]or C′′=ϵ0AKd where 1K=1(K1+K2)+12K3
Hence, the correct choice is (b).