A parallel-plate capacitor is made using two circular plates of radius a, with the bottom plate on the xy plane, centered at the origin. The top plate is located at z = d, with its center on the z axis. Potential V0is on the top plate; the bottom plate is grounded. Dielectric having radially dependent permittivity fills the region between plates. The permittivity is given by ϵ(ρ) = ϵ0(1 + ρ2/a2). Find (a) V(z); (b) E; (c) Q; (d) C. This is a reprise of Problem 6.8, but it starts with Laplace’s equation.
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