4.(Axes Synchronization)Each axis of a two axes system is described by2Xi(s)=0.02s+1U1(s),i=1,2Verify that the state equation for this system is图=[50-01+[801001]The control objective is to obtain a state feedback controller of the formu(t)=-Kx(t),K∈R2x2which minimizes the cost functional00J={x好()+x好()+y(x1()-x2(0)2+p(u()+u()}dt0where y and p are weights and the third term y((t)-x2(t))penalizes thesynchronization error between the two axes;i.e.the larger the value of y,the more thecontrol action will try to make the synchronization error (x,(t)-x2(t))small.(a)Set p=1.Determine (analytically)the optimal feedback gain K and the resultingclosed loop poles of A.A-BK for y 1.(Hint:first conver the objectivefunction to a standard formulation of infinite-horizon linear quadratic optimal controlproblem;find matrices Q and R (see lecture notes #7);then solve the ARE.)(b)Still set p=l.Use the MATLAB function“lqr”to determine the optimal feedbackgain K and the resulting closed loop poles of Ac A-BK for y 0 and y=100.Eigenvalues of a matrix can be obtained using the MATLAB function“eig”.

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