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VOOZH | about |
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VOOZH | about |
A kind of circuit in which current emerges from a node and branches off to different paths which eventually meet up at a common node. Due to the branching, the path appears to be in parallel thereby giving it the name parallel circuits. Due to the branching, different current flows in each branch but it is important to note that each branch has the same potential difference which is equal to the potential drop between the two node points.
In these circuits, first, the current is branched out and then it is recombined at the common point. In a parallel circuit, elements are not connected end-to-end.
Here are the three key principles of laws of the parallel circuit:
The parallel circuit looks like any other circuit with the addition of branching as shown below
In the Parallel circuit the voltage across the each parallel component is the same. This is because there are only two sets of the electrically common points in a parallel circuit and the voltage is measured between these sets of points that are same at any given time.
All resistors are connected between the same two nodes, hence the voltage across each resistor is equal.
In a parallel circuit, the current flowing in the circuit is equal to the sum of current in the individual branch. We will apply this in the above circuit.
Hence
Since the voltage across each branch is the same and using ohm's law, we write as
Let Req be the equivalent Resistance of the circuit then in the given current formula, Substituting the value of the resistor
Dividing V from both the side
Hence equivalent resistance of the circuit is
The total conductance of the parallel circuit can be given as the sum of the individual branch conductance. As we add more paths for the current to flow the circuit will becomes more conductive.
Conductance is the reciprocal of resistance , so parallel circuits are easier to analyze using conductance.
There is a need for parallel circuits because they have various applications in different fields some of which are given below:-
This example shows how you can mathematical concepts to calculate current and other parameters in a parallel circuit.
Calculate the total current in the circuit and the power across the 2 kΩ resistor.
Firstly we calculate the total resistance of the circuit to calculate the current. Let the total resistance be Req then
= 0.1 + 0.5 + 1 = 1.6
Req = 1 / 1.6 = 0.625 kΩ
Now on applying ohms law
V = I * Req
I = V / Req = 9 / 0.625 = 14.4 mA
Hence total current in the circuit is 14.4 mA
Now we want to calculate power across 2kΩ resistor. Since voltage across each resistor is same we use the formula
So Power across 2k is:
P = V² / R = 81 / 2000 = 0.0405 W = 40.5 mW
Hence power across 2k resistor is 40.5mW
Parameter | Series Circuit | Parallel Circuit |
|---|---|---|
Voltage distribution | Voltage across each component may not necessarily same | The voltage across each branch is necessarily the same |
Current distribution | Current across each component is necessarily the same | Current is divided so current across each component may not be necessarily the same |
Overall Resistance | Total Resistance has a larger value than the maximum resistance | Overall Resistance has less value than the minimum resistance |
Alignment | In this electrical circuit, components are arranged in a line | In this electrical circuit, components are arranged parallel to each other |
Dependency | If one component in the Circuit breaks down, the whole circuit will get damaged. | Other components will function even if one component breaks down since components are independent |
Example | An example of a series circuit is a string of Diwali lights. If any one of the bulbs gets damaged, no current will flow and none of the lights will go on. | Parallel circuits are like the smaller veins that divide into branches from our heart and then connect to other parts to return blood to the heart. |
