77-2. Set up a system of equations that determines the branch currents in the networks below...
Set up and solve the system of equations for the currents in
the branches of the given network. ( explain using matricies
).
Set up and solve the system of equations for the currents in the branches of the given networlk (11.々, i3)-( 15 V 3s 362 5Ω 62 eBook
w set 1, page4 o 4 ade ApPL 5. Find a system of differential equations and initial conditions for the currents in the network given below. Assume that all initial currents are zero. Solve for the currents in the network. 10Ω 5Ω
w set 1, page4 o 4 ade ApPL 5. Find a system of differential equations and initial conditions for the currents in the network given below. Assume that all initial currents are zero. Solve for the currents in...
Find equations using Kirchhoff's laws to solve the currents in
each branch of the following circuit. Show all the important steps
required in finding the equations. Solve the equations to calculate
the currents for some extra credits. [Note: You are allowed to use
any valid method to solve the equation.]
C-40F Cs-15F C Circuit 2 C -6.0F AV - 12 V
Need
help answering these physics 2 problems
Set-up the simultaneous equations to find the currents in the following network. R_1 = 3 Ohm R_2 = 9 Ohm R_3 = 18 Ohm epsilon = 12 V, epsilon_2 = 24 V epsilon_3 = 6 V Find the magnetic force on the electric current in the semicircular conductor B = B_0 i The current i is flowing counter-clockwise.
Write the set of equations that determines the three currents in the circuit shown in the figure. (Assume that the capacitor is initially uncharged.) V + (V)e^-2, 990t s^-1 - 85.0 V = 0 85.0 V - [V + (V)e^-2, 990t s^-1] = 0 V + (V)e^-2, 990 t s^-1 +170 V = 0 (-0.521 A) e^-2, 990 t s^-1 = (-1.30 A)e^-2, 990 t s^-1 + (A)e^-2, 990 t s
5) (15 pts) Set up the equations that would be necessary to solve for the currents labeled 11, 12 & Iz in the following circuit diagram 1 12 R2 Ri AAA 13 Vi AM R3 R4 $ AAA RS V2
10.) Set up the system of equations. Do not solve A load of 30ON at the origin is supported by three cables hung at A(0,10, 10), B( -4,,-6,10), and C(4,-6,10) respectively. Find the tension in each of the supporting cables. 1 K0.10.10), 10/2 OB 2/38 4.-6.10), OC 2 38 Let OA (4,-6.10), w (0.0.-300) B-loBOB. OA= OC= and for equilibrium OA + OB+OC w 0- (0,0,0) Now equate components to get the equations
10.) Set up the system of equations....
you must set up 2 equations, you must set up the
matrices.
Solve the following word problems. Remember: define your variables, write a system of equations to represent the situation, and use elimination or substitution to solve. 1. The sum of twice a number and 4 times another number is 4. The first number decreased by the second number is 5. Find the numbers.
(a) Show that the system of differential equations for the currents i2(t) and i3(t) in the electrical network shown in the figure below is L1*(di2/dt) + Ri2 + Ri3 = E(t) L2*(di3/dt) + Ri2 + Ri3 = E(t) Solve the system in part (a) if R = 5 Ω, L1 = 0.01 h, L2 = 0.05 h, E = 100 V, i2(0) = 0, and i3(0) = 0. i2(t) = ?? i3(t) = ?? (c) Determine the current i1(t). i1(t)...
.2 K3 R39.1 k2 6 v 1.1 kn FIG. 8.120 Problems 18 and 23. $19. For the network in Fig. 8.121 a. Write the equations necessary to solve for the branch currents b. By substitution of Kirchhoff's current law, reduce the c. Rewrite the equations in a format that can be solved d. Solve for the branch current through the resistor R3. set to three equations. using third-order determinants. R3 R5 4 2 3Ω FIG. 8.121 Problems 19, 24, and...