For the series LCR circuit connected with a.c. source as shown in the figure, the power factor is . The value of is _____.

- A
- B
- C
- D
For the series LCR circuit connected with a.c. source as shown in the figure, the power factor is . The value of is _____.

Correct answer:D
Standard Method
Given: In the series LCR circuit, , , and .
Find: The value of if power factor .
For a series LCR circuit, the net reactance is
So,
The negative sign indicates that the circuit is capacitive.
The impedance is
Substituting the values,
The power factor is
Hence,
Given that
Therefore,
So, the correct option is D.
Using impedance and power factor relation
Given: , , .
Find: Power factor and then .
First determine the effective reactance of the circuit:
Now calculate the impedance magnitude:
For a series circuit, power factor depends only on the ratio of resistance to impedance:
Comparing with
we get
Therefore, the value of is .
Using the source voltage to compute the power factor. This is wrong because for a series LCR circuit the power factor is determined by , not directly by the applied voltage. First calculate the impedance and then use .
Adding and directly as . This is wrong because inductive and capacitive reactances oppose each other in a series LCR circuit. Use the net reactance .
Ignoring the square while calculating impedance and writing . This is wrong because impedance magnitude in a series LCR circuit is . Always use the Pythagorean relation.
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