MCQEasyJEE 2023Capacitors & Dielectrics

JEE Physics 2023 Question with Solution

In the network shown below, the charge accumulated in the capacitor in steady state will be:

  • A

    4.8muC4.8 \\mu\text{C}

  • B

    12muC12 \\mu\text{C}

  • C

    7.2muC7.2 \\mu\text{C}

  • D

    10.3muC10.3 \\mu\text{C}

Answer

Correct answer:C

Step-by-step solution

Standard Method

Given: In steady state, the capacitor is connected in a circuit with resistors 6Ω6 \, \Omega and 4Ω4 \, \Omega in series, a source of 3V3 \, \text{V}, and capacitor C=4μFC = 4 \, \mu\text{F}.

Find: The charge accumulated in the capacitor.

In steady state, no current passes through the capacitor. Hence, the capacitor acts as an open circuit.

The total resistance in the conducting branch is

Rtotal=6+4=10ΩR_{\text{total}} = 6 + 4 = 10 \, \Omega

So, the current in the circuit is

i1=310=0.3Ai_1 = \frac{3}{10} = 0.3 \, \text{A}

The potential difference across the 6Ω6 \, \Omega resistor is

V=i1R=0.36=1.8VV = i_1 \cdot R = 0.3 \cdot 6 = 1.8 \, \text{V}

Since the capacitor is in parallel with the 6Ω6 \, \Omega resistor, the potential difference across the capacitor is also 1.8V1.8 \, \text{V}.

Now,

Q=CVQ = C \cdot V

Substituting the values,

Q=41.8=7.2μCQ = 4 \cdot 1.8 = 7.2 \, \mu\text{C}

Therefore, the charge accumulated in the capacitor is 7.2μC7.2 \, \mu\text{C}. The correct option is C.

Why the capacitor voltage equals resistor voltage

Given: The capacitor is in steady state.

Find: The voltage across the capacitor before calculating charge.

At steady state, the capacitor branch carries no current, so that branch is effectively open. The remaining circuit current flows only through the resistors.

Because the capacitor is in parallel with the 6Ω6 \, \Omega resistor, both elements have the same potential difference. After finding the circuit current as 0.3A0.3 \, \text{A}, the voltage across that resistor becomes

V=IR=0.3×6=1.8VV = IR = 0.3 \times 6 = 1.8 \, \text{V}

Hence the capacitor also has 1.8V1.8 \, \text{V} across it. Using

Q=CVQ = CV

we get

Q=4μF×1.8V=7.2μCQ = 4 \, \mu\text{F} \times 1.8 \, \text{V} = 7.2 \, \mu\text{C}

Therefore, the correct option is C.

Common mistakes

  • Assuming current flows through the capacitor in steady state is incorrect because an ideal capacitor behaves as an open circuit for DC after a long time. First remove the capacitor branch from current calculation, then find its voltage.

  • Using the full source voltage directly across the capacitor is wrong because the capacitor is parallel only to the 6Ω6 \, \Omega resistor, not across the entire battery. First find the voltage drop across that resistor.

  • Adding charge using an incorrect formula such as Q=VCQ = \frac{V}{C} is wrong. For a capacitor, the correct relation is Q=CVQ = CV.

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