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6. Given the vectors vi = - 0 -- --(2.).-) no estaba 1. vz = 2 .03 = 1 -1 1 62-5) ,0 = 3, find the value(s) of k so that: de (a) vis in Span{vi, v2, U3}. (b){i, 03, 03} form a linearly independent set. (c){vi, už, va} form a basis for R3. (d) span{ti, uz, va} is a plane in R.
(2 point, Topic M.6) In the circuit shown, obtain the voltages vi and v2 using nodal analysis. 4. 2Ω V1 V2 6 A 5Ω 4Ω 10 Ω 3 A
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1. Using nodal analysis, find V1, V2 and vz in the circuit in Fig.1 below: 2Ω ΑΛΛ 4ix 3Ω 01-- ν2 03 ix 4Ω 6Ω 10A
Using Mesh analysis, solve for power, in W, dissipated by R2. Vi = 3.0 V v2 = 12.0 V R1 = 4.8 ohms R2 = 1.0 ohms R3 = 8.0 ohms 2i2 R, R 1 + .R3 ₂ 4 V2
Given the following circuit, calculate Vi, V2, V3, Ir, I, h, , 14 using nodal analysis. l54 www 100k 1k 10k 1k V2 V1 IT 10k 100k 1k 5V 12
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Vi V2 Problem 1) Show steps below to solve V1 and V2 using Nodal Analysis i) Write equation for controlling current I, in terms of node voltage V2 [2] 21 2 ΚΩk 8 kΩΣ 4 ΚΩΣ ii) Write KVL equation for Supernode source [1] iii) Write Node equation for V, and simplify in terms of V, and V2 [2] iv) Write Node equation for V2 and simplify in terms of V, and V2 [2]...
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h. Referring to vi and V2 in the figure, which of the following is a true statement? a. v, v",sin(t-4) and V2 lags v1 by ф b. V2 :1 v",sin(t-4) and V2 leads vi by ф C. V2-vmSin(t + ф) and V2 lags vi by ф d. v2 vmsin(t + ф) and V2 leads vi by ф vm /v.5% i) The phasor representation of 120 V house voltage is )120V 260Hz 2) I 20...
For the circuit in Fig. 3.69, find vi, V2, and v3 using nodal analysis. 240 V 20/ V2 20 S2 3
a) Using phasor analysis, show that the complex gain is: v2() R VI Ls+1 UTULIILLILUL Figure 4 - First Order RL Circuit Consider the circuit in Figure 4. We are interested in studying the voltage (V2) across the inductor. a) Using phasor analysis, show that the complex gain is: v2(s) R VIC)
Can I get help with questions 2,3,4,6?
be the (2) Determine if the following sequences of vectors vi, V2, V3 are linearly de- pendent or linearly independent (a) ces of V 0 0 V1= V2 = V3 = w. It (b) contains @0 (S) V1= Vo= Va (c) inations (CE) n m. -2 VI = V2= V3 (3) Consider the vectors 6) () Vo = V3 = in R2. Compute scalars ,2, E3 not all 0 such that I1V1+2V2 +r3V3...