1. Determine the differential equations for the given electrical circuit shown below. Equa- tions should be...
(20 points) Determine the differential equations for the given electrical circuit shown below. Equa- tions should be purely in the form of in, and in and their derivatives (no integral terms). Simplify to the simplest form. Assume: E(t) = 2sin(t) Volts, R1 = 11, R2 = 512, L1 = 2H, L2 = 4H, C1 = 0.5F, C2 = 0.25F R1 C L2 + E(1) i2 C2 R2
1. (20 points) Determine the differential equations for the given electrical circuit shown below. Equa- tions should be purely in the form of in, and in and their derivatives (no integral terms). Simplify to the simplest form. Assume: E(t) = 2sin(t)Volts, R1 = 112, R2 = 52, L1 = 2H, L2 = 4H, C1 = 0.5F, C2 = 0.25F R1 C1 L2 E(t) :C2 } R2
Please write very clear
1. (20 points) Determine the differential equations for the given electrical circuit shown below. Equa- tions should be purely in the form of i1, and i2 and their derivatives (no integral terms). Simplify to the simplest form. Assume: E(t) = 2sin(t)Volts, R2 = 112, R2 = 512, L1 = 2H, L2 = 4H, C = 0.5F, C2 = 0.25F font E(t)
The system of differential equations for the currents i1 (t) and i2(t) in the electrical network shown in the figure is dt(々 =( R2-212/ R2/L1 Use variation of parameters to solve the syster if R1 = 8 Ω, R2-3 Ω, L1 = 1 h, L2-1 h, E(t) = 150 sin(t) V i1(0) = 0, and i2(0) = 0. (i1 (t),ら(t) = R2 し2