$\"\"$

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Step 1 :

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Initially at time $\"\"$ , the voltage across the capacitor is $\"\"$ .

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At time $\"\"$ , the capacitor starts discharging.

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$\"\"$

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Solving the differential equation, $\"\"$ , where $\"\"$ is the maximum charge at starting time.

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Since charge is directly proportional to voltage, $\"\"$ , where $\"\"$ is the maximum charge at starting time.

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Substitute $\"\"$ , $\"\"$ and $\"\"$ .

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$\"\"$

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Therefore voltage across the resistor is $\"\"$ V.

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Solution :

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Voltage across the resistor is $\"\"$ V.

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Step 1 :

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Find the current flowing in the circuit.

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Current in the series network is same.

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Voltage across the resistor is $\"\"$ .

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Find the current across the resistor.

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Current across the resistor is $\"\"$ .

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Subtitute $\"\"$ and $\"\"$ in the above.

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$\"\"$

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Current in the circuit is $\"\"$ A.

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Solution :

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Current in the circuit is $\"\"$ A.

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