Option 2 resembles the answer ,this is matlab script in which i i have assumed intial condition to zero hence converting differential equations to transfer function the values bof B and C are adjusted accordingly
Required information Use MATLAB to create a state variable model and obtain the expressions for the...
Required information Use MATLAB to create a state variable model and obtain the expressions for the matrices A, B, C, and D. Consider the following equation to obtain the state model: Y() F(x) The input is no) and the output is y. Multiple Choice A = [0 1.25], B- - [8], 0 - 1 - 2 - 3 and D -(0) O A-173],3-[a] .c -60, and D - 10 1.25) A-[7.], B-[].C-10 1.25), and D - (0) A-10), B =[],c-[72]...
! Required information Use MATLAB to create a state-variable model and obtain the expressions for the matrices A, B, C, and D. Choose the correct transfer functions of the following models for the given inputs and outputs. -621 + 7x2 2 = 21 - 5x2 + bu The outputs are xy and x2; the input is u. Multiple Choice X.) UG) 42 2+11+23 and X(s) U() 6s+36 2+115+23 X) U) 36 32+10s+23 and U) 68+42 +105+23 25 32-10-18 and U(3)...
Required information Use MATLAB to create a state-variable model and obtain the expressions for the matrices A, B, C, and D. Choose the correct transfer functions of the following models for the given inputs and outputs. -6a1 + 782 + 4u 2 = x1 - 522 + 3u2 The output is xy: the inputs are u and u2. Multiple Choice X () U.) 4s+20 and 2-11-23 X,() Us(s) 21 2-118-23 Ui() 45-+20 2+11s+23 and X U (0) 21 2+115+23 X;)...
! Required information Use MATLAB to obtain a state variable model. Consider the following transfer function: 4s+7 Y(s) F() Choose the correct expressions for the state variable model. Multiple Choice ¿= -3x + 2f and y= -6x +4f = -6x +4f and y= -4.25x +4f 3 = 6x-4f and y-4.25- 4f O i = 3x – 2f and y = 62 – 4f
! Required information Use MATLAB to obtain a state variable model. Consider the following transfer function: Y(3) F(*) 8+2 3+48+3 Choose the correct expressions for the state-variable model. Multiple Choice 1 = -4c1 - 1.522 +2f, *2 =221, and y=0.581 +0.5x2 1 -41 -202 +2f, 2 = 2.01, and y=2.01 -0.5x2 1 = -2x1 - 3x2 +2f, -81, and y21-22 1 - - 2x1 - 362 +28,62 -4.01, and y2 +0.5x2
Obtain the state model for the reduced-form model 2x + 6x + 12x = 10y(t). Use x; and.x, as the state variables. Put the equations in standard form and find [A] and [B] matrices. whereſ (1) and S(1) are the inputs, ii) Given the state-variable model *; = x; - 5x, +1,0 , = -30x, +10/20 and the output equations y = x; – X, +1,0) Y2 = x Y = -x; + f₂ (1) obtain the expressions for the...
i) Obtain the state model for the reduced-form model 2x + 68 + 12x = 10y(t). Use x, and xz as the state variables. Put the equations in standard form and find [A] and [B] matrices. Given the state-variable model = x; – 5x, + f(t) , where fi(t) and f (t) are the inputs, *, = -30x, +10/20 and the output equations y = x; – x2 + f,0 y2 = x2 Y; = -x + f20 obtain the...
2. i) Obtain the state model for the reduced-form model 28 + 61 + 12x = 10y(t). Use x, and xz as the state variables. Put the equations in standard form and find [A] and [B] matrices. ii) where f (t) and f (t) are the inputs, Given the state-variable model i; = x; – 5x, +f,(t) * = -30x, +10f20) and the output equations Y; = x; – x2 + f (0) Y2 = x2 Yz = -x +...
For a Mechanical Engineering System Dynamics class 2. i) Obtain the state model for the reduced-form model 28 +62 + 12x = 10y(t). Use x, and xz as the state variables. Put the equations in standard form and find [A] and [B] matrices. Given the state variable model x = x; – 5x, + f (1) * = -30x, +10f2(1) where f(t) and f (t) are the inputs, and the output equations y = x, - x2 + f,0 Y2...
write state-space model matrices and obtain the transfer function H(s)=Y(s)U(s) (please use the matlab simulink)