93 2 나 Vi=100V loo 2. in each Find the eSis tor
Coulomb's Force can be expressed a as O a. F = (1/411 € 0) (9192/r4) Ob. F = (1/411 Eo) [9192/r)] d. None OC. F = (1/411 €0) [9192/r2
FIGURE 23-10 +160V 100V 40V V 00V-160V The equipotential surfaces between two spherical conductors are shown in Fig 23-10, with the value of the potential marked for each line. What is the potential difference between points G and D? O +160 V +320 V -160 V O None of the other choices is correct
il 150,51 iv. {S1) v. (S2) vi. All of the above 6. Construct a Turing machine that reads a binary number and converts it to its 1's complement number.
2r Problem 3 (20pts). Given 2 concentric loops in free space po = 411 x 10-7 (H/m), The magnetic field of a loop is B = Mo!, assume B1 is uniform inside all the loops. Rz=2002 and 11 = sin(wt) A. Find: a) Self and Mutual Inductance due to 11. b) Current direction for 12 c) Vi and V2 1 a 12 V R2 V2 w
a. For the circuit shown in Fig. 1, find i(t) and vi(t) for all t. b. For the circuit shown in Fig. 2, find vclt) and ic(t) for all t. 10 kΩ 20 kΩ ic 10 mH 18 V 100u(-1) V 40u(C) V F, 13 a. For the circuit shown in Fig. 1, find i(t) and vi(t) for all t. b. For the circuit shown in Fig. 2, find vclt) and ic(t) for all t. 10 kΩ 20 kΩ ic...
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
5. Given a linear map f R3R3 if V Vi, V2, va) is a basis of R3, and further, a) State the defining matrix of f under the basis vi, V2, vs) -3 2 0 b) Let W-(w1, w2, w3) be another basis of R3 and P42 be the change- 01-1 of-coordinate matrix from V to W. Let A be the defining matrix for f under the basis W diagonalize A. 5. Given a linear map f R3R3 if V...
2 ° 10 f+ 24 1 Ostermne axial, Vi and M 1zl 2n.
3. (10 points) Solve using nodal analysis, where vi(t) 7270° V and 2(t) 12460 v RI Ro LI 1(t)