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Obtain the expression for the energy stored in a parallel plate capacitor. |
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Answer» Solution :Energystored in the capacitor : Capacitor not only stores the charge but also it stores energy.When a battery is connected to the capacitor electrons of total charge - Q are transferred from One plate to the other plate . To transfer the the charge work is done by the battery . This work done is stored as ELECTROSTATIC potential energy in the capacitor . To transfer an INFINITESIMAL charge DQ for a potential difference V the work done is given by dW = VdQ where `V=(Q)/(C ) ` The total work done to charge a capacitor is ` W = int_(0)^(Q) (Q)/(C) dQ = (Q^(2))/(2C)` This work done is stored as electrostatic potential energy `(U_(E))` in the capacitor. `U_(E)= (Q^(2))/(2C) = (1)/(2) CV^(2) ( :. Q = CV)` where Q = CV is used . This stored energy is thus directly proportional to the CAPACITANCE of the capacitor and the square of the voltage between the plates of the capacitor. But where is this energy stored in the capacitor ? To understand this question the equation (3) is rewritten as follows using the results `C = (epsilon_(0)A)/(d) `and V = Ed `U_(E) =(1)/(2) ((epsilon_(0)A)/(d) (Ed)^(2) = (1)/(2) epsilon_(0)(Ad) E^(2)` where Ad = volume of the space between the capacitor plates . The energystrored per unit volume of space is defined as energy density volume . From equation (4) we get `mu_(E) = (1)/(2) epsilon_(0)E^(2)` From equation (5) we infer that the energy is stored in the ELECTRIC field existing between between the plates of the capacitor . Once the capacitor is allowed to discharge the energy is retrieved . |
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