An example of mixed resistors circuit is shown below

It consists of four resistors R1, R2, R3 and R4 in a mixed resistor circuit combination. The supply voltage is V and the total current flowing in the circuit is I. The current flowing through the resistors R2 and R3 is I1 and the current flowing through the resistor R4 is I2. Here the resistors R2 and R3 are in series combination. Hence applying the rule of resistors in series combination the equivalent resistance of R2 and R3 is given as RA = R2 + R3 Here RA is the equivalent resistance of R2 and R3 Now the resistors R2 and R3 can be replaced by a single resistor RA. The resulting circuit is shown below.

Now the resistors RA and R4 are in parallel combination. Hence by applying the rule of resistors in parallel combination the equivalent resistance of RA and R4 is RB = RA × R4 / (RA + R4) Here RB is the equivalent resistance of RA and R4 Now we can replace the resistors RA and R4 with a single resistor RB.After replacing the resistors the resulting circuit is shown below.

Now the circuit consists of only two resistors. Here also the resistors R1 and RB are in series combination. Hence by applying the rule of resistors in series the total circuit equivalent resistance is given as REQ = R1 + RB Here REQ is the total circuit equivalent resistance. Now the resistors R1 and RB can be replaced by a single resistor REQ. The final equivalent circuit for above complex circuit is shown below.

Though they look complicated, the mixed resistor circuits can be reduced to a simple circuit consisting of only one voltage source and a single resistor by following the simple rules of resistors in series and resistors in parallel.

Resistors in series and parallel Example

Let us calculate the equivalent resistance for the below circuit which consists of 7 resistors R1 = 4 Ω, R2 = 4 Ω, R3 = 8 Ω, R4 = 10 Ω, R5 = 4Ω, R6 = 2 Ω and R7 = 2Ω.The supply voltage is 5 V.

Now the resistors R6 and R7 are in series combination. If the equivalent resistance of R6 and R7in series is Ra, then Ra = R6 + R7 = 2+2 = 4Ω The resulting circuit is reduced to the one shown below.

In the above circuit the resistors Ra and R5 are in parallel combination. Hence the equivalent resistance of Ra and R5 is Rb = (Ra × R5) / (Ra + R5) = (4 × 4) / (4 + 4) = 2Ω. Then the simplified circuit is shown is below.

In this circuit the resistors R4 and Rb are in series combination. Rc = R4 + Rb = 10 + 2 = 12 Ω. Now we can replace the resistors R4 and Rb with resistor Rc as shown below.

In the above circuit again the resistors R2 and R3 are in series combination. If Rd is the equivalent resistance of R2 and R3then Rd = R2 + R3 = 4 + 8 = 12 Ω. The equivalent circuit is

Here resistors Rc and Rd are in parallel combination. Let Rp be the equivalent resistance of Rc and Rd in parallel. Then Rp = (Rc × Rd) / (Rc + Rd) = (12 × 12) / (12 + 12) = 6 Ω. The resulting circuit is

Here, the resistors R1 and Rp are in series combination. Let REQ be the equivalent resistance of this combination. Then REQ = R1 + Rp = 4 + 6 = 10 Ω. This is the equivalent resistance of the circuit. Hence the given circuit can be finally redrawn as

The current in the circuit can be calculated from Ohm’s law I = V / REQ = 5 / 10 = 0.5 A

Resistor Network

Let us calculate the equivalent resistance for a complex resistor circuit. The below circuit consists of ten resistors R1 to R10 connected in a combination of series and parallel connections.

The values of the resistances mentioned in the circuit are in Ohms (Ω) and the supply voltage is in Volts (V). Here the resistors R9 and R10 are in series combination. Let RA is the equivalent resistance of this combination. Therefore RA = R9 + R10 = 3 + 3 = 6 Ω. The circuit after replacing R9 and R10 with RA is

In this circuit, the resistors R8 and RA are in parallel combination. Then the equivalent resistance of R8 and RA is RB = (R8 × RA) / (R8 + RA) = (6 × 6) / (6 + 6) = 3 Ω. Now replacing R8 and RA with RB, we get the following circuit.

  In this circuit, the resistors R7 and RB are in series combination. RC = R7 + RB = 9 + 3 = 12 Ω. The equivalent circuit after replacing R7 and RB with RC is

It is clear that the resistors R6 and Rc are in parallel combination. If RD is the equivalent resistance of this combination, then RD = (R6 × Rc) / (R6 + Rc) = (12 × 12) / (12 + 12) = 6 Ω. The circuit with R¬D replacing R6 and Rc is

Now the resistors R4 and RD are in series combination. If RE is the equivalent resistance of R4 and RD then RE = R4 + RD = 6 + 6 = 12 Ω. The resulting reduced circuit after replacing R4 and RD  with RE  is

In this circuit, the resistors R5 and RE are in parallel combination. Let RF be the equivalent resistance of R5 and RE in parallel. Then RF = (R5 × RE) / (R5 + RE) = (12 × 12) / (12 + 12) = 6 Ω. The simplified circuit is as shown below.

Here the resistors R2 and R3 are in series. If RG is the equivalent of this combination, then RG = R2 + R3 = 4 + 2 = 6 Ω. After replacing R2 and R3 with RG, the circuit will be transformed to

The resistors RF and RG are in parallel. Let RT be the equivalent of this combination. Then RT = (RF × RG) / (RF + RG) = (6 × 6) / (6 + 6) = 3 Ω.

Now the resistors R1 and RT are in series. If REQis the total circuit equivalent resistance, then REQ = R1 + RT = 3 + 3 = 6 Ω. Finally the above complex circuit can be redrawn as follows

The total current in the circuit can be calculated using Ohm’s law I = V1 / REQ = 6 / 6 = 1 A Hence any complex resistive circuit consisting of number of resistors connected in combination of both series and parallel combinations can be reduced by first identifying the simple parallel resistor branches and series resistor branches. The equivalent resistance of these simple branches is calculated and the branches are replaced with the equivalent resistor. This process reduces the complexity of the circuit. By continuing this process we can replace a complex resistive circuit with a single resistor. There are some complex resistive circuits which cannot be reduced to simple circuits by simply applying the rules of series resistive combinations and parallel resistive combinations.Circuits like T-Pad Attenuators and some complex resistive bridge networks are examples of such complex resistive circuits. In order to simplify these complex resistive circuits, a different approach is to be followed. Some complex resistive circuits can be reduced by using Kirchhoff’s Current Law and Kirchhoff’s Voltage Law. To find the currents and voltages in a complex resistive circuit just by using Ohm’s law might not possible. For such type of circuits Kirchhoff’s Circuit Laws will be helpful. Kirchhoff’s Circuits laws are based on the concept of conservation of current and energy in a circuit. There are two Kirchhoff’s Circuit laws. First is Kirchhoff’s Current Law which deals with current at node and the second is Kirchhoff’s Voltage Law which deals with voltage in a closed circuit. Kirchhoff’s Current Law states that “The current entering a node is equal to the current leaving the node because it has no other place to go and no current is lost in the node.” In simple words, the Kirchhoff’s Current Law states that the sum of currents entering a node is equal to sum of currents leaving the circuit. Kirchhoff’s Voltage Law states that “the total voltage in a closed loop is equal to sum of all voltage drops in that loop.” In simple words, the Kirchhoff’s Voltage Law states that the directed algebraic sum of voltages in a closed loop is equal to zero. With the help of these two laws the values of currents and voltages in any complex circuit can be calculated. Still we may have some complex resistive circuits in which it is difficult to identify the equivalent resistance, in such situations we will use Star Delta Transformations of resistors in order to simplify the resistor networks.   For example what is the current through the R10, 3 Ohm resistor? Comment * Name * Email * Website

Δ

Resistors in Series and Parallel Combination of Networks - 99Resistors in Series and Parallel Combination of Networks - 80Resistors in Series and Parallel Combination of Networks - 2Resistors in Series and Parallel Combination of Networks - 33Resistors in Series and Parallel Combination of Networks - 77Resistors in Series and Parallel Combination of Networks - 70Resistors in Series and Parallel Combination of Networks - 74Resistors in Series and Parallel Combination of Networks - 80Resistors in Series and Parallel Combination of Networks - 93Resistors in Series and Parallel Combination of Networks - 9Resistors in Series and Parallel Combination of Networks - 25Resistors in Series and Parallel Combination of Networks - 85Resistors in Series and Parallel Combination of Networks - 28Resistors in Series and Parallel Combination of Networks - 56Resistors in Series and Parallel Combination of Networks - 30Resistors in Series and Parallel Combination of Networks - 74Resistors in Series and Parallel Combination of Networks - 13Resistors in Series and Parallel Combination of Networks - 68Resistors in Series and Parallel Combination of Networks - 11Resistors in Series and Parallel Combination of Networks - 8Resistors in Series and Parallel Combination of Networks - 10Resistors in Series and Parallel Combination of Networks - 41Resistors in Series and Parallel Combination of Networks - 65Resistors in Series and Parallel Combination of Networks - 45Resistors in Series and Parallel Combination of Networks - 7Resistors in Series and Parallel Combination of Networks - 54Resistors in Series and Parallel Combination of Networks - 19