A fully charged parallel plate capacitor is connected across an unchanged identical capacitor . Show that the energy stored in the combination is less than that stored initially in the single capacitor .

A fully charged parallel plate capacitor is connected across an unchan

1.	A fully charged parallel plate capacitor is connected across an unchanged identical capacitor . Show that the energy stored in the combination is less than that stored initially in the single capacitor .
Answer» Solution :Let a parallel plate capacitor of capacitance C is fully charged to a potential V so that electrostatic energy STORED in it is `U = (1)/(2) CV^(2)` When this capacitor is connected across an unchanged identical capacitor , it shares its charge with that and COMMON potential of two capacitors become : `V. = (C_(1) V_(1) + C_(2) V_(2))/(C_(1) + C_(2)) = (CV + 0)/(C + C) = (V)/(2)` `therefore` Electrostatic energy stored in the capacitor combination now is `U. = (1)/(2) C. V^(2) = 1/2 (2 C) ((V)/(2))^(2) = (1)/(4) CV^(2)` This shows that U. `LT U` . In fact `U. = (U)/(2)`

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A fully charged parallel plate capacitor is connected across an unchanged identical capacitor . Show that the energy stored in the combination is less than that stored initially in the single capacitor .

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