please circle final answer thank you!
please circle final answer thank you! Question 34 Solve the problem. At time t > 0,...
Find i(t) for t> 0 in the given circuit. Assume v;= 34 V. t=0 10 22 6022 [i(t) 1 mF Vi + 40 Ω 2.5 H O (0) = –10.88te-20+ (0) A i(t) = -27.20 te-20tu(t) A i(t) = 13.60te-20tu() A O i(t) = –17.00 te-20t4() A
pls answer! my last attempt :) Use the step-by-step method to find io(t) for t> 0 in the circuit in the figure below. 36 V 4 k2 4 k2 24 ko X . 341 500uF t = 0 34 22 i.lt) Please round all numbers to 3 significant digits. Click here to enter or edit your answer jo(t) = mA Use the step-by-step method to find io(t) for t > 0 in the circuit in the figure below. 200 uF...
Help please and circle the answer to the blank problem and make it clear and visible. Ive also included a similar problem so you know what the answer should look like. Thanks Evaluate. Assureu > when in u appears. (Hint: Use the properties of logarithms.) Inx? (Type an exact answer.) Evaluate. Assume u> 0 when in u appears. (Hint: Use the properties of logarithms.) x10 Substitute for In x und du for dx in the integral Inx -dx= Integrale with...
Solve for Iz(t) in the circuit shown for t>O as the switch is closed for t>0. t=0 R3=2000 Rz=2000 Ix V. 24V R; 2009 R2 1000 30 mH
5KR MM 10K2 V (4) 40nF 340k RA lokh 75V + 100V 1+0 -> 1.(t) + Ca for The switch in the above circut has been at long while. When't=o, it moves to position b'instantaneously. Determine (Fortz ot) ① Volt) @ io (+)
Solve the heat flow problem: au t> 0, ди (x, t) = 2 (x, t), 0<x< 1, ot дх2 uz(0, t) = uz(1,t) = 0, t>0, u(x,0) = 1- x, 0 < x < 1.
differential equations Problem 2 Solve y"+y= ſt/2, if 0 <t<6, if t > 6 y(0) = 6, 7(0) = 8
Solve for Vc(t) for t> 0 as the switch (SW1) becomes open for t>0. t=0 R2=5k0 SW1 + Vs1 18V R2 4kΩ Vc R3 с 10uF 2kΩ 132 2mA
8. Consider the circuit: t=0 212 f(t)t 222 11 Pilt) 1F yt (a) Show that the transfer function of the circuit for t > 0 is † (s) = F(*) 452 +55+2 (b) What are the characteristic modes of the circuit (c) Determine the response y(t) for t > 0 if f(t) = 1, y(0-) = 1 V and i(0-) = 0.
Solve the y"+ 4y = initial value problem s 1 if 0<xsa To if x>,T ylo)= 1, g(0)=0