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11 Nov 2019
These questions go hand and hand into a bigger question so if you can not answer both don't bother trying to even answer. Thanks in advance. Solve the following electronics applications using any method you choose. 1. Find the current I as a function of time t (in seconds), given that I satisfies the differential equation I'+R/L I = 1/L sin(2t). Where R = 550 Ohms, L = 4 Henrys, I(0) = 0. 2. q"+ R/L q'+1/(LC) q=1/L E(t) 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
These questions go hand and hand into a bigger question so if you can not answer both don't bother trying to even answer. Thanks in advance. Solve the following electronics applications using any method you choose. 1. Find the current I as a function of time t (in seconds), given that I satisfies the differential equation I'+R/L I = 1/L sin(2t). Where R = 550 Ohms, L = 4 Henrys, I(0) = 0. 2. q"+ R/L q'+1/(LC) q=1/L E(t) 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
Reid WolffLv2
28 Oct 2019