Please solve the questions Q: (10 points) In Fig. 1, a) Using the Differential Equsation Approach,...
Using the differential equation approach, find io(80 ms) in the circuit in the figure below. 60 2H 12v (+) <120 242 t= 0 | t= 0 Biot)
Using differential equations method please 7.82 Use the step-by-step technique to find v,(t) for t>0 in network in Fig. P7.82. 24 V 3 kn 200 Figure P7.82
shown below. (10 points). rmine the differential equation relating vi) and vot) for the RLC circuit i(t) C-0.5 F v(t) V,(t) b.. Suppose that avo(t) vi(t) e-3t u(t). Determine vdt) for t > 0 if vo(0-)-1 and 1 t-o-=2. (10 points). at
Find closed loop gain and i0 he circuit 8.28. For Fig. 8.58, using ideal op-amp model, cal- at choice Vinl to culate the closed-loop gain . Also find io when us 1.2V. 12 0 V2 + io 20 kQ + 2.5 k2 Vo 10 k Figure 8.58 he circuit 8.28. For Fig. 8.58, using ideal op-amp model, cal- at choice Vinl to culate the closed-loop gain . Also find io when us 1.2V. 12 0 V2 + io 20 kQ...
Problem 1 (10 points): The switch in the circuit of Fig. 1 has been in position a for a long time. Att 0, the switch moves to position b 1. (4 points) Construct an s-domain circuit for t> 0 2. (4 points) Find Vo(s) and vo(t) for t> 0 3. (2 points) Find IL(s) and iL () fort > 0. t-0 Ri R2 R1 = 400 ohms, R2 = 1000 ohms, C = 6.25 nF L 16 mH, and vg-360...
K1=10, k2=7. Please do both 3) Using Laplace transforms, solve the following differential equations with the initial conditions indicated. Sketch the resulting functions of time dy 0, with y(O) - k2 bk2)+ kik20, with z(0) - 0, t( 2 dt2
Please solve it clearly and by steps 8.1 For an NMOS differential pair with a common-mode voltage Vay applied, as shownin Fig. 8.2, let VppV 1.0 V k, = 0.4 mA/V2. (WIL),.-10·V," 0.4 V, 1-0. 16 mA. R 5 k2, and neglect channel-length modulation. (a) Find Vov and Vos for each transistor. (b) For Vo 0, find V, lp Ip, Vo, and V (c) Repeat (b) for Vcu+0.4 V (d) Repeat (b) for Vc-0.1 V. (e) What is the highest...
Differential Equations 1. (10 points) Identify the equation and solve it. 2. (10 points) Solve the following initial value problem 3.(5 points) Solve the following exact equation. (Solve it by using the method for exact equations)
Answer all questions (100 marks) 1. Given x(0) = 0 and transform. = 0, solve the following differential equation using Laplace d?x(t) dx +6 dt2 + 8x(t) = 2e-31 dt (20 marks) 2. Find the vo(t) in the network in Figure I using Laplace approach. 12 S 2 w O 1,(s) Ls) V.(5) Figure 1 (30 mrks)
need a step by step solution please Challenge problem for extra credit (10 points)-Prove using Laplace Transforms that, for a system described by a linear ordinary differential equation, sine in -> sine out, and find the equation for the scaling Challenge problem for extra credit (10 points)-Prove using Laplace Transforms that, for a system described by a linear ordinary differential equation, sine in -> sine out, and find the equation for the scaling