(2) The circuit is at steady state for t<0. Find v(t) for t>0. Answer t=0 ZF Navt)14 T
Given the network in fig., find v(t) for t>0. 2 A 1 H 4Ω 6 A 1Ω 0.03 F v (t) = cos sin
(4) Find the Laplace transform of this function: Set if 0 <t <2, 0 if 2 <t.
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
Given the circuit in Figure 8.6, find vc(t) for all t>0. t=0 102 20 V * vc(t) 1/10 F 10H Figure 8.6
value: 10.00 points For the network shown in the given figure, find v(t) for t> 0. Assume L = 0.9 H. 592 692 20 V 2 A 1292 > 200 + v L The voltage v(t) = V for t>0. Hints References eBook & Resources Hint #1 Hint #2 Hint #3 Hint #4 Check my work
5. Determine v(t) for t < 0 and t > 0 in the circuit shown 0.5 H 0 3? 8? 4i0 24 V (+ 20v
Find the length of the curve 3 v=ln(1 +t), 0< < 2. 1+ Length
P3. In the circuit shown, let DUO 0, -00<t<0 v(t) = { 1, Ost<10s at (10, 1055t<00 (a) Find the energy stored in the capacitor as a function of t, for 0 st 50. (b) Find the energy delivered by the source as a function of t, for 0 stsoo. va) 0.1F 322 Figure P4.7
Find i(t) for t> 0 in the op amp circuit of Fig. P4. (u(t) is unit step function. It is 1 for t> 0 and 0 for t<0.) 1/6F It 3 Ω 212 + 2 u(t) V 1/6 F 10 Ω Figure P4