| Charging a Capacitor When a battery is connected to a series resistor and capacitor, the initial current is high as the battery transports charge from one plate of the capacitor to the other. The charging current asymptotically approaches zero as the capacitor becomes charged up to the battery voltage. Charging the capacitor stores energy in the electric field between the capacitor plates. The rate of charging is typically described in terms of a time constant RC.  | Calculation | Derive expressions | Capacitor discharge | Air tank analogy |
| IndexDC CircuitsCapacitor Concepts |
| HyperPhysics***** Electricity and Magnetism | R Nave |
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Capacitor Charge Calculation  | For circuit parameters: | C =μF, RC = s = time constant. |
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 | This circuit will have a maximum current of Imax = A |
just after the switch is closed. | The charge will approach a maximum value Qmax = μC. |
| The charging current is = Imax = A |
| and the charge on the capacitor is = Qmax = μC. |
| Capacitor charging discussion |
| IndexDC CircuitsCapacitor Concepts |
| HyperPhysics***** Electricity and Magnetism | R Nave |
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