Determine state-space model of the following ODE 10 -2] L2 ri y(t) = [1 1] T2...
1. Write the state-space equations for the system shown below ri (t) +2 (t) u (t) Figure 1: System of Problem#1 2. Evaluate the state transition matrix eA for the matrix below and find the homogenous solution given x (0) 1 1 ] A=10-21 3. Find the power lution in powers of x. Show the details of your work. s (b) y" +4y=0 4. Determine if either the Frobenus or regular power series could be the method of your choice...
Problem 3 Convert the following ODE to state space: dv(t) 50v(t)ut) dt 1000 Output of the system y(t) = v(t)
Given lines L1 : Ty (1-1)+(21) -2 1 and L2: y 4 8+t2 3 (a) Find the point of intersection of lines Lị and L2. (b) Determine the cosine of the angle between lines L, and L2 at the point of intersection. © Find an equation in form ax +by+cz = d for the plane containing lines L, and Lu. (d) Find the intersection, if any, of the line Ly and the plane P : 3x – 4y + 72...
please solve problems 1 and problems 2. PROBLEM 1: Derive state-space equations for the following circuit in the form of L1 where χ = :L2 L3 L1 and (a) y 7 V L3 R1 L1 L3 R3 Vt R2 Vc し2 (c) For Part (a), use the file CircuitStateSpace.slx (define the four matrices in Matlab) to verify your derivation using the following numerical values: R1-1; R3-1 R2-10; L1-1e-3 L3-1e-3 L2-10e-2 ; C1-10e-6 PROBLEM 2: (a) What are eigenvalues of the...
3. Consider the following system of equations (a) Check if the explicit functions, y,-hi (ri,T2) and y-h2(zi,T2), exist. (b) Find explicit functions. (c) Find and 2 h21, 2), exist all. 3. Consider the following system of equations (a) Check if the explicit functions, y,-hi (ri,T2) and y-h2(zi,T2), exist. (b) Find explicit functions. (c) Find and 2 h21, 2), exist all.
Problem 1 consider the ODE dy (B): 2y+2t-- 1. Show that y(t)2 is a solution to (E) with initial value y(0)-0 and that Show that yi(t)-t2 + Lis a solution to (E) with initial value y(0) 1 2, if y(t) is a solution of (E) with initial value y(0) = 0.4, what can t?
2. (6 points). Consider a state space system: C1 =22 22 = - 2.c 1 - 3.02 y=21 +22 Eco with Xo = (-1,1). (a) Specify the state space matrices (A,B,C,D). (b) Compute the matrix exponential eAl using similarity transformation. (e) Find the complete state response (solution of the SS system x(t)) if u(t) = 1. (d) Find the output response y(t) = Cx(t).
2- Solve for y(t) for the following system 1 01 -3 represented in state space, where u(t) is the unit step. Use the Laplace transform approach to solve the state eqiation. 1 u(t) 0 -6 1|x + 0 -5 [0 1 1 ]x; x(0) = 0 %3D
3. Determine the intersection of the two lines, if any: 2 y+1; z 1. 3 L2: =5-t. y = t, 2 = 1-+3t, t E R L and evaluate the distance between R(1, 1. -1) and Li 3. Determine the intersection of the two lines, if any: 2 y+1; z 1. 3 L2: =5-t. y = t, 2 = 1-+3t, t E R L and evaluate the distance between R(1, 1. -1) and Li
4. (8 marks) Let V be the vector space of solutions to the ODE y" hyperbolic functions y 0, spanned by the cosh r and y2 = sinh r, and let z1 = e and z2 = e = (a) Show that 21, %2} is a basis for V {1, 2to {yı, Y2}. Show all working (b) Find the transition matrix from the basis 3 4. (8 marks) Let V be the vector space of solutions to the ODE y"...