# 8.S: Capacitance (Summary)

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## Key Terms

 capacitance amount of charge stored per unit volt capacitor device that stores electrical charge and electrical energy dielectric insulating material used to fill the space between two plates dielectric breakdown phenomenon that occurs when an insulator becomes a conductor in a strong electrical field dielectric constant factor by which capacitance increases when a dielectric is inserted between the plates of a capacitor dielectric strength critical electrical field strength above which molecules in insulator begin to break down and the insulator starts to conduct energy density energy stored in a capacitor divided by the volume between the plates induced electric-dipole moment dipole moment that a nonpolar molecule may acquire when it is placed in an electrical field induced electrical field electrical field in the dielectric due to the presence of induced charges induced surface charges charges that occur on a dielectric surface due to its polarization parallel combination components in a circuit arranged with one side of each component connected to one side of the circuit and the other sides of the components connected to the other side of the circuit parallel-plate capacitor system of two identical parallel conducting plates separated by a distance series combination components in a circuit arranged in a row one after the other in a circuit

## Key Equations

 Capacitance $$\displaystyle C=\frac{Q}{V}$$ Capacitance of a parallel-plate capacitor $$\displaystyle C=ε_0\frac{A}{d}$$ Capacitance of a vacuum spherical capacitor $$\displaystyle C=4πε_0\frac{R_1R_2}{R_2−R_1}$$ Capacitance of a vacuum cylindrical capacitor $$\displaystyle C=\frac{2πε_0l}{ln(R_2/R_1)}$$ Capacitance of a series combination $$\displaystyle \frac{1}{C_S}=\frac{1}{C_1}+\frac{1}{C_2}+\frac{1}{C_3}+⋯$$ Capacitance of a parallel combination $$\displaystyle C_P=C_1+C_2+C_3+⋯$$ Energy density $$\displaystyle u_E=\frac{1}{2}ε_0E^2$$ Energy stored in a capacitor $$\displaystyle U_C=\frac{1}{2}V^2C=\frac{1}{2}\frac{Q^2}{C}=\frac{1}{2}QV$$ Capacitance of a capacitor with dielectric $$\displaystyle C=κC_0$$ Energy stored in an isolated capacitor with dielectric $$\displaystyle U=\frac{1}{κ}U_0$$ Dielectric constant $$\displaystyle κ=\frac{E_0}{E}$$ Induced electrical field in a dielectric $$\displaystyle \vec{E_i}=(\frac{1}{κ}−1)\vec{E_0}$$

## Summary

### 8.2 Capacitors and Capacitance

• A capacitor is a device that stores an electrical charge and electrical energy. The amount of charge a vacuum capacitor can store depends on two major factors: the voltage applied and the capacitor’s physical characteristics, such as its size and geometry.
• The capacitance of a capacitor is a parameter that tells us how much charge can be stored in the capacitor per unit potential difference between its plates. Capacitance of a system of conductors depends only on the geometry of their arrangement and physical properties of the insulating material that fills the space between the conductors. The unit of capacitance is the farad, where $$\displaystyle 1F=1C/1V$$.

### 8.3 Capacitors in Series and in Parallel

• When several capacitors are connected in a series combination, the reciprocal of the equivalent capacitance is the sum of the reciprocals of the individual capacitances.
• When several capacitors are connected in a parallel combination, the equivalent capacitance is the sum of the individual capacitances.
• When a network of capacitors contains a combination of series and parallel connections, we identify the series and parallel networks, and compute their equivalent capacitances step by step until the entire network becomes reduced to one equivalent capacitance.

### 8.4 Energy Stored in a Capacitor

• Capacitors are used to supply energy to a variety of devices, including defibrillators, microelectronics such as calculators, and flash lamps.
• The energy stored in a capacitor is the work required to charge the capacitor, beginning with no charge on its plates. The energy is stored in the electrical field in the space between the capacitor plates. It depends on the amount of electrical charge on the plates and on the potential difference between the plates.
• The energy stored in a capacitor network is the sum of the energies stored on individual capacitors in the network. It can be computed as the energy stored in the equivalent capacitor of the network.

### 8.5 Capacitor with a Dielectric

• The capacitance of an empty capacitor is increased by a factor of $$\displaystyle κ$$ when the space between its plates is completely filled by a dielectric with dielectric constant $$\displaystyle κ$$.
• Each dielectric material has its specific dielectric constant.
• The energy stored in an empty isolated capacitor is decreased by a factor of κκ when the space between its plates is completely filled with a dielectric with dielectric constant $$\displaystyle κ$$.

### 8.6 Molecular Model of a Dielectric

• When a dielectric is inserted between the plates of a capacitor, equal and opposite surface charge is induced on the two faces of the dielectric. The induced surface charge produces an induced electrical field that opposes the field of the free charge on the capacitor plates.
• The dielectric constant of a material is the ratio of the electrical field in vacuum to the net electrical field in the material. A capacitor filled with dielectric has a larger capacitance than an empty capacitor.
• The dielectric strength of an insulator represents a critical value of electrical field at which the molecules in an insulating material start to become ionized. When this happens, the material can conduct and dielectric breakdown is observed.

## Contributors and Attributions

Samuel J. Ling (Truman State University), Jeff Sanny (Loyola Marymount University), and Bill Moebs with many contributing authors. This work is licensed by OpenStax University Physics under a Creative Commons Attribution License (by 4.0).

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