I. Obtain a state-space equation and output equation for the system defined by: Y(s) US 233...
5 For a system: Y() 10.4s? +47s +160 U(s) 5+148° +568 +160 use Matlab to do: (a) obtain the state-space representation of the system. (b) transfer the state-space representation into Modal canonical form. (c) find the eigenvalues of the system matrix A, determine the system stability (d) find the controllability and observability matrixes. Determine the controllability and observability.
A) For the schematic above find the state-space equations that define this system. B) Using the controllability rank test determine if this system is controllable. C) Using the observability rank test determine if this system is observable. 1. Controllability and Observability L = 100 m R1 = 10 Ohms Mm R2 = 100 Ohms R4 = 100 Ohms ( = 100 microfarads ult) 1V R3 = 100 Ohms R5 = 100 Ohms Xı = i(t) y = valt) vi(t) =...
For each system below, write the state equations and the output equation for the phase variable representation. R(S) C(s) 5s + 10 $4 +233 + 32 + 5s + 10 R(S) C(s) 34+233 + 12s2 + 7s +3 55+994 + 10s3 + 882 (b)
Convert following the transfer function into state space representation (Marks 5) 3 +45² T($) = 54 +52 +7 Convert the following state space into a transfer function. (Marks 5) x = 11 * = x + ( u 21 y = [02]x + [2]u Evaluate the steady-state error of state-space system. (Marks 5) i [ 10] [21. *= 15 2]* +11 y = [ 02]x + [2]u Evaluate the steady-state error of state-space system. (Marks 5) -1 0x+lu x =...
Consider a single input, single output system with transfer function 10 H(s)- s+10s +25s +100 Obtain a state-space model in observer canonical form for the system, and design a full state estimator for desired eigenvalues of -10.-20 and-30. What are the values of the estimator gain matrix? Consider a single input, single output system with transfer function 10 H(s)- s+10s +25s +100 Obtain a state-space model in observer canonical form for the system, and design a full state estimator for...
For the given RC circuit shown below, ys the output, and ut) is the input. Values of the components are marked on schematic i) Derive the system differential equation and transfer function Y(s)/U(s) ii) Choose voltage across capacitors as states and derive the state equations and state matrices (A, B, C,and D). iii) Validate the states by deriving the transfer function from state matrices. iv) Choose a different set of states and derive a different state equation and state Matrix...
8. Write down the state space equation for the system shown below US) + 2 y(s) $+3 2 s(s+1) 9. Derive the state space equation for the system shown where the coefficients of the system matrix are in diagonal form and the elements of the control matrix are unity. U(S) 1 X2 $+2 X 3+1 X = y $+3 $+4 S
could you please answer this question QUESTION 2 Consider a system with an open-loop trans fer function given by Y(s) s+7 U(s) s2 +3s-8 (a) (8 marks) Derive a state-space model for the system in canonical form. (b) (4 marks) Check the observability of the system. (c) 8 marks) Design a suitable full-order state observer for the system. Explain your choice of the observer's poles. d) (10 marks) Design a PI controller for the system so the output of the...
uestionI. A system is represented by the following transfer function G(s)- (s+1)/(s2+5s+6) 1) Find a state equation and state transition matrices (A,B, C and D) of the system for a step input 6u(t). ii) Find the state transition matrix eAt) ii) Find the output response of system y(t) to a step input 6u(t) using state transition matrix, iv) Obtain the output response y(t) of the system with two other methods for step input óu(t). Question IV. A system is described...
10.Represent the translational mechanical system shown in the Figure in state- space, where xX3(t) is the output IN- 11.Find the state equations and output equation for the phase-variable representation of the transfer function G(s) 2s+1/(s2+7s+ 9) 12. Convert the state and output equations shown to a transfer function. -1.5 2 u(t) X = X 4 0 Y [1.5 0.625]x 13. For each system shown, write the state equations and the output equation for the phase- variable representation 8s10 sh25 t26...