In fact, since capacitors simply add in parallel, in many circuits, capacitors are placed in parallel to increase the capacitance. For example, if a circuit designer wants 0.44µF in a certain part of the circuit, he may not have a 0.44µF capacitor or one may not exist.
In a parallel connected capacitor circuit, the overall capacitance (CT) is higher than the value of the biggest capacitor as the capacitances are added together.
Well, just replace C1 in the circuit above with a 100 µF and a 47 µF capacitor in parallel, and you end up with a total capacitance of 147 µF. Another typical place where you’ll see capacitors connected in parallel is with microcontroller circuits. Microcontroller chips often have several power pins.
These two basic combinations, series and parallel, can also be used as part of more complex connections. Figure 8.3.1 8.3. 1 illustrates a series combination of three capacitors, arranged in a row within the circuit. As for any capacitor, the capacitance of the combination is related to both charge and voltage:
When 4, 5, 6 or higher capacitors are connected in parallel, the total capacitance of the circuit is the sum of all the individual capacitors. As we now know, the total capacitance of a parallel circuit is always equal to or greater than the highest value capacitor.
Parallel capacitors are widely used in audio systems for their ability to increase total capacitance, providing better energy storage and smoothing capabilities. This is particularly important in power supply circuits, where stable voltage levels are critical for high-fidelity audio performance.