5. Use mesh analysis to calculate the current iand iz of the circuit below (Fig. 3.92...
3.50 Use mesh analysis to find the current in the circuit of Fig 393 100 320 380 52V Figure 3.95
In circuit analysis, the mesh current method is used to solve for currents in planar circuits. To solve for the currents, you might produce a set of linear equations such as: 30i1 – 25 + 5(iz – iz) + 10(ių – iz) – 90 = 0 2i2 – 96 + 5(iz - i1) + 4(iz – iz) +93 = 0 20iz + 4 + 4(iz – iz) + 10(i3 – 11) = 0 Rewrite these equations as a matrix equation...
Question: Use mesh analysis to calculate the following currents for the circuit fig. 3: i. 11, 12 ii. IA, IB, Ic, ID, IE, IF 3 Ω 3A 13 2 22 5 Ω 21 12 5V 10Ω 20v Fig. 3
Use mesh-current analysis to calculate i, in the circuit below. 21 i { 42 112 © 12v 3A
1a) Mesh Analysis [ 5 marks ] Consider the circuit shown below. All resistances are in Ohms. 8 v1 592 + + V1 422 7V2 3 Ω 5 V 2 Ω iz V2 + 622 10 22 i) Write down the KVL in the super mesh based on the mesh currents (ii, i2 and i3) given on the circuit. Do not solve the equations. [2 marks ] ii) Write down other equations in terms of mesh currents (ii, i2 and...
In the circuit below, v1 = -2 V and i1 = -4.5 A. Use mesh analysis to find Vx and ix. ne crcat tatalsd 45U mesh 5i 30 Ω 16 Ω i1 20 Ω 10Ω 5Ω 2 Vx 40 Ω 50 Ω 25 Ω V. 10Ω 4 i 2013 Paul Hummel BY NC SA
In the circuit below, v1 = -8 V and i1 = 3.5 A. Use mesh analysis to find Vx and ix
For the circuit below, using the mesh (Kirchhoff's loop law) analysis, calculate the current through each resistors. Clearly level all the currents 3. R30 812n R312
4. Use the mesh-current method to find i, iandi in the circuit shown in Figure 4. W 1.50 Fig. 4 5. Use the mesh-current method to find i, toi, in the circuit shown in Figure 5. 250 m . 1000 200 V +) 500 10 Fig. 5 6. Use the mesh-current method to find the power that the current source delivers to the circuit shown in Figure 6. 5.60 0.80 30 A Fig. 6
Use mesh analysis to determine the currents h(t) and iz(t) in the given circuit. Assume V1 = 10e-40 V, V2 = 12e V, R = 82, R2 = 42, R3 = 60, X = 10 , and Xc = 14 (The phase angle for V, and V2 is measured in degrees. Round the final answers to the nearest whole numbers.) R: 3 The currents if(t) = 731 cos(wt+-46°) mA and iz(t) = 641 cos(wt+-171 ®°)mA.