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11 Nov 2019
Solve the following electronics applications using any method you choose. Find the current I as a function of time t (in seconds), given that I satisfies the differential equation Where R = 550 Ohms, L = 4 Henrys, I(0) = 0. where R is resistance (in Ohms), C is capacitance (in Farads), L is the inductance (in Henrys), E(t) is the electromotive force (in Volts), and q is the charge on the capacitor (in Coulombs). Find the charge q as a function of time for the electrical circuit described. Assume that q(0) = 0 and q'(0)= 0 R = 20, C = 0.02, L = 2, E(t)=35
Solve the following electronics applications using any method you choose. Find the current I as a function of time t (in seconds), given that I satisfies the differential equation Where R = 550 Ohms, L = 4 Henrys, I(0) = 0. where R is resistance (in Ohms), C is capacitance (in Farads), L is the inductance (in Henrys), E(t) is the electromotive force (in Volts), and q is the charge on the capacitor (in Coulombs). Find the charge q as a function of time for the electrical circuit described. Assume that q(0) = 0 and q'(0)= 0 R = 20, C = 0.02, L = 2, E(t)=35
Lelia LubowitzLv2
16 Feb 2019