The capacity of a full cylindrical capacitor of length L with inner radius a and outer radius b, C = (2πϵrϵo)*L / (ln (b / a)) is known to be. The capacitor is angularly composed of two insulating regions and these insulating regions are; With ø1 = 2.3 rad and a region with a relative dilutive constant εr1 = 5.6 Regions with relative dilutive constant ø2 = 3.9831 rad r2 = 3.2 The equivalent capacity of this capacitor is how many times the capacitor whose insulator is the space. (ø2 + ø2 = 2π) The gap dielectric constant εo = 8.842 pF / m and capacitor dimensions; L = 20 cm a = 1.5 cm b = 3.4 cm

The capacity of a full cylindrical capacitor of length L with inner radius a and outer radius b, C = (2πϵrϵo)*L / (ln (b / a)) is known to be. The capacitor is angularly composed of two insulating regions and these insulating regions are; With ø1 = 2.3 rad and a region with a relative dilutive constant εr1 = 5.6 Regions with relative dilutive constant ø2 = 3.9831 rad r2 = 3.2 The equivalent capacity of this capacitor is how many times the capacitor whose insulator is the space. (ø2 + ø2 = 2π) The gap dielectric constant εo = 8.842 pF / m and capacitor dimensions; L = 20 cm a = 1.5 cm b = 3.4 cm

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Question

The capacity of a full cylindrical capacitor of length L with inner radius a and outer radius b,

C = (2πϵ_rϵ_o)*L / (ln (b / a))
is known to be.

The capacitor is angularly composed of two insulating regions and these insulating regions are;

With ø₁ = 2.3 rad and a region with a relative dilutive constant ε_r1 = 5.6

Regions with relative dilutive constant ø₂ = 3.9831 rad r₂ = 3.2

The equivalent capacity of this capacitor is how many times the capacitor whose insulator is the space. (ø₂ + ø₂ = 2π)

The gap dielectric constant ε_o = 8.842 pF / m and capacitor dimensions;

L = 20 cm

a = 1.5 cm

b = 3.4 cm

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