Ncert Exercises & Solutions

Question 2.25:

Obtain the equivalent capacitance of the network in Figure. For a 300 V supply, determine the charge and voltage across each capacitor.

The capacitance of capacitor C₁ is 100 PF.

The capacitance Of capacitor C₂ is 200 PF.

The capacitance of capacitor C₃ is 200 PF.

The capacitance of capacitor C₄ is 100 PF.

Supply potential, V = 300 V

Capacitors C₂ and C₃ are connected in series.

Let their equivalent capacitance be C'. Therefore,

\frac{1}{C^{'}} = \frac{1}{200} + \frac{1}{200} = \frac{2}{200} = \frac{1}{100} \Rightarrow C^{'} = 100 pF

Capacitors C1 and C2 are in parallel. Let their equivalent capacitance be C".

C" = C' +C = 100 + 100 = 200 pF

C" and C4 are connected in series. Let their equivalent capacitance be C.

\frac{1}{C} = \frac{1}{C^{''}} + \frac{1}{C_{4}} = \frac{1}{200} + \frac{1}{100} = \frac{3}{200} \Rightarrow C = \frac{200}{3} pF

Hence, the equivalent capacitance of the circuit is pF

The Potential difference across C" = V"

The potential difference across C₄ = V₄

∴ V^{''} + V_{4} = V = 300 V

Charge on C4 is given by

\begin{aligned} \begin{matrix} Q_{4} = CV \\ = \frac{200}{3} \times 10^{- 12} \times 300 \\ = 2 \times 10^{- 8} C \\ ∴ V_{4} = \frac{Q_{4}}{C_{4}} \\ = \frac{2 \times 10^{- 8}}{100 \times 10^{- 12}} = 200 V \end{matrix} \\ ∴ Voltage across C_{1} is given by, \\ V_{1} = V - V_{4} \\ = 300 - 200 = 100 V \end{aligned}

Hence, the potential difference, V₁, across C₁ is 100 V.

Charge on C₁ is given by,

\begin{aligned} Q_{1} & = C_{1} V_{1} \\ = 100 \times 10^{- 12} \times 100 \\ = 10^{- 8} C \end{aligned}

C₂ and C₃ have the same capacitances have a potential difference of 100 V together. Since C₂ and C₃ are in series, the potential difference across C₂ and C₃ is given by, V₂ = V₃ = 50 v
Therefore, charge on C₂ is given by,

\begin{aligned} Q_{2} & = C_{2} V_{2} \\ = 200 \times 10^{- 12} \times 50 \\ = 10^{- 8} C \end{aligned}

And charge on C₃ is given by,

\begin{aligned} Q_{3} & = C_{3} V_{3} \\ = 200 \times 10^{- 12} \times 50 \\ = 10^{- 8} C \end{aligned}

Hence, the equivalent capacitance Of the given circuit is 200/3 pF with

\begin{array}{ll} Q_{1} = 10^{- 8} C, & V_{1} = 100 V \\ Q_{2} = 10^{- 8} C, & V_{2} = 50 V \\ Q_{3} = 10^{- 8} C, & V_{3} = 50 V \\ Q_{4} = 2 \times 10^{- 8} C, & V_{4} = 200 V \end{array}

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