Contol systems: Please use the Impedence method
Contol systems: Please use the Impedence method (problem 2.28) Find the TF for Xz(s)/F(s) for the...
Find the transfer function, X1(s)/F(s) for the diagram below A consultant engineer is assigned by his manager to obtain the transfer function X1 F(s) for train carriage model as shown in Figure below. Given that K1 -5 N/m, K2 = 7 N/m, fv1 = 4 N-s/m.fv2 = 3 N-s/m.fv3 = 2 N-5/m and M1-M2 = 1kg. X1 (t) Xz(t) fv1 M fit Frictionless
For the following systems, find the transfer function using MATLAB. Also, determine the poles and zeros of each transfer. You should be able to use some combination of the following MATLAB functions: 'ss2tf( )', 'ss( )', 'tf( )', 'pole( )', "zero( )', and 'roots() 100 ).y) = [0_1)|) 2 a. |x2(t)] -10 [x1 (t lx20 21 b. + 01 x1 (t) 0 x2(t) 1 u(t), y(t): ol]x3(t)] [(t)] x2(t) 3(t) [x1 (t)] [o 0 1x2(t) [x3(t)] -4 -2 0 2...
Solve the following problems using the Simplex method and verify it graphically Problem 4 Minimize f=5x1 + 4x2 - 23 subject to X1 + 2x2 - X3 = 1 2x1 + x2 + x3 = 4 X1, X2 2 0; xz is unrestricted in sign
Please explain (1 pt) Use Stokes' Theorem to find the circulation of F = (xy, yz, xz) around the boundary of the surface S given by z 0 x 4 and -2 < y < 2, oriented upward. Sketch both S and its boundary C 16 - x2 for Fdr = Circulation = (1 pt) Use Stokes' Theorem to find the circulation of F = (xy, yz, xz) around the boundary of the surface S given by z 0 x...
Please complete #3. 2. Let f(x,y,z 3x2 + 4y2 +5z2- xy - xz - 2zy +2x -3y +5z. Apply 20 steps of Euler's method with a step size of h 0.1 to the system x'(t) y(t)Vf(x(t), y(t), z(t)) z'(t) (x(0), y(0), z(0)) = (-0.505-08) to approximate a point where the minimum of f occurs. Give the value of x (2) (which is the x coordinate of the approximate point where the minimum occurs). Note: This process is called the modified...
For the second part, please use method of undetermined coefficient The suspension system in a car can be described using the 2nd order ODE: day c dyk Ft) +- +U 2 dt2mdry= m dtm 7 where y is vertical poition, c is the damping coefficient, k is the spring constant, m is mass and F(t) is the external forcing function. Consider that m= 1000 kg, c = 4000 Nm-15-1, k = 40000 Nm-1 and F(t) = -2000 N 1. Find...
signals and systems. please solve all parts of the question. Problem 1 (150 Points) 1) Determine y[n] = x1[n]* x2 [n] where: xi[n]=e="u[n-4) and x2[n]=3" u [n - 2] 2) Using impulse matching method or simplified impulse matching method, find the impulse response for the following system: (Dº +4),(t)=;D -=?)00)
3.25 Determine the response function due to the input function for one of the systems shown in parts of (a)of Fig. 3.22. Eaclh system is quiescent at t- 0. Use an input function f(t) and part 6) K 100 N -| C 4 kg/s y(t) F(t) f(t) f(t) (3) 10 2π ft) (5) 사 4π 3.25 Determine the response function due to the input function for one of the systems shown in parts of (a)of Fig. 3.22. Eaclh system is...
Problem 2 (20 points total): 4 Consider the following system for Parts a-c. 2 N-s/m x2(t) xz(t) 0000- 6 N/m 2 N-s/m xi(t) 2 N-s/m 6 N/m 4 kg 4 kg 00004 kg f(t) Frictionless Part 2a (8 points): Draw free body diagrams for each mass Part 2b (6 points): Write the equations of motion for each mass as differential equations in the time domain." Part 2c (6 points): Convert the equations of motion for each mass into algebraic equations...
Please solve thank you. In Problem 27 of Exercises 4.9 you were asked to solve the following linear system dx1 1 dt 50 dx2 1 2 dt 50 75 dx3 1 2 x2 75 dt 25 using elimination techniques. This system is a mathematical model for the number of pounds of salt x(t), x2(t), and x3(t) in the connected mixing tanks A, B, and C shown in Figure 3.3.8 on page 112 (a) Use the eigenvalue method of this section...