In the circuit, the battery emf is 20 V, the resistance is 150 ohm, the inductan
ID: 1632566 • Letter: I
Question
In the circuit, the battery emf is 20 V, the resistance is 150 ohm, the inductance is 700 mH and the capacitance is 0.01 mu F. The switch S is closed for a long time. After the switch is opened, what is the value of maximum voltage across the capacitor? Epsilon = 20 mho, R = 150 ohm, L = 700 mH, C = 01 mu F I_max = epsilon/R I_max = (20 mho)/(150 ohm) I_max = 133 A - when switch is opened, the circuit is reduced to an LC circuit. u = 1/2 LI^2 u = 1/2 (700 mH)(.133 A)^2 u = 0062 J u = 1/2 C epsilon^2 0062 J = 1/2 (.01 mu F) epsilon^2 0124 J = (.01 mu F) epsilon^2 squareroot 1244444.5 V = squareroot epsilon^2 1115.55 mho = epsilonExplanation / Answer
The maximum current in the circuit is:
I(max) = V(bat)/R = 20/150 = 0.133 A
from the conservation of energy, stored energy is inductor is equal to that in capacitor
1/2 C V(max)^2 = 1/2 L I(max)^2
V = I sqrt (L/C) = 0.133 sqrt(700 x 10^-3/0.01 x 10^-6) = 1112.76 V
Hence, V = 1112.76 Volts