Series and parallel circuits
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Series and parallel electrical circuits are two basic ways of wiring components. The naming describes the method of attaching components, i.e. one after the other, or next to each other. It is said that two circuit elements are connected in parallel if the ends of one circuit element are connected directly (i.e. a conductor) to the corresponding ends of the other. However, when the circuit elements are connected end to end, it is said that they are connected in series.
A series circuit is one that has a single path for current flow through all of its elements.
A parallel circuit is one that requires more than one path for current flow in order to reach all of the circuit elements.
As a demonstration, consider a very simple circuit consisting of two lightbulbs and one 9 V battery. If a wire joins the battery to one bulb, to the next bulb, then back to the battery, in one continuous loop, the bulbs are said to be in series. If, on the other hand, each bulb is wired separately to the battery in two loops, the bulbs are said to be in parallel.
The measurable quantities used here are R, resistance, measured in ohms (Ω), I, current, measured in amperes (A) (coulombs per second), and V, voltage, measured in volts (V) (joules per coulomb).
Series circuits
Series circuits are sometimes called cascade-coupled or daisy chain-coupled.
The current that enters a series circuit has to flow through every element in the circuit. Therefore, all elements in a series connection have equal currents. Two ammeters placed anywhere in the circuit would prove this.
Resistors
To find the total resistance of all the components, add together the individual resistances of each component:
- [R_\mathrm = R_1 + R_2 + \cdots + R_n]
- for components in series, having resistances [\ R_1], [\ R_2], etc.
To find the current, [\ I] use Ohm's law [I = \frac}]
To find the voltage across any particular component with resistance [\ R_i], use Ohm's law again. [V_i = I \cdot R_i]
- Where [\ I] is the current, as calculated above.
- [\frac = \frac]
Inductors
Inductors follow the same law, in that the total inductance of non-coupled inductors in series is equal to the sum of their individual inductances:
- [L_\mathrm = L_1 + L_2 + \cdots + L_n]
- [\ L_\mathrm = (L_1 + M) + (L_2 + M)] or
- [\ L_\mathrm = (L_1 - M) + (L_2 - M)]
When there are more than two inductors, it gets more complicated, since you have to take into account the mutual inductance of each of them and how each coils influences the other.
So for three coils, there are three mutual inductances ([M_, M_] and [M_]) and eight possible equations.
Capacitors
Capacitors follow a different law. The total capacitance of capacitors in series is equal to the reciprocal of the sum of the reciprocals of their individual capacitances:
- [}} = } + } + \cdots + }]
Parallel circuits
Voltages across components in parallel with each other are the same in magnitude and they also have identical polarities. Hence, the same voltage variable is used for all circuits elements in such a circuit.
To find the total current, I, use Ohm's Law on each loop, then sum. (See Kirchhoff's circuit laws for an explanation of why this works). Factoring out the voltage (which, again, is the same across parallel components) gives:
- [I_\mathrm = V \cdot \left(\frac + \frac + \cdots + \frac \right)]
Notation
The parallel property can be represented in equations by two vertical lines "||" (as in geometry) to simplify equations. For two resistors,
- [ R_\mathrm = R_1 \| R_2 = ]
Resistors
To find the total resistance of all the components, add together the individual reciprocal of each resistance of each component, and take the reciprocal of the sum:
- [} = } + } + \cdots + }]
- for components in parallel, having resistances R1, R2, etc.
- [R_\mathrm = V / I_\mathrm]
To find the current in any particular component with resistance Ri, use Ohm's law again.
- [I_i = V / R_i]
- [I_1 / I_2 = R_2 / R_1]
Inductors
Inductors follow the same law, in that the total inductance of non-coupled inductors in parallel is equal to the reciprocal of the sum of the reciprocals of their individual inductances:
- [}} = } + } + \cdots + }]
- [} = + ] or
- [} = + ]
The principle is the same for more than two inductors, but you now have to take into account the mutual inductance of each inductor on each other inductor and how they influence each other. So for three coils, there are three mutual inductances ([M_, M_] and [M_]) and eight possible equations.
Capacitors
Capacitors follow a different law. The total capacitance of capacitors in parallel is equal to the sum of their individual capacitances:
- [C_\mathrm = C_1 + C_2 + \cdots + C_n]
See also
- Y-Δ transform (a.k.a. Star-Triangle transformation)
- Voltage divider
- Current divider
- Electrical impedance#Combining impedances
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