y where-, + of a system with s1-3/2 and s2-1 is in the product state, Calculate uncoubled basis of 2 y where-, + of a system with s1-3/2 and s2-1 is in the product state, Calculate uncoubled bas...
Problem #2 Given the system below: C(s) R(s) s2 (s1) s2 (s +3) (a) Determine the system type. (b) Calculate the steady-state error for an input of 5u(t). [0] (c) Calculate the steady-state error for an input of 5tu(t). [15] (d) Discuss the validity of your answers to part (b) and (c). HINT: Is the system stable?
Let S1 = { 1, 2, 3 }, S2 = { a, b }, S3 = { 4, 5, 6 }. Show a B-tree of minimum degree t = 3 that contains the 18 tuple keys in S1 × S2 × S3, ordered by the linear order defined in (a). Assume that a <2 b in S2. please show the 18 tuple at first which is a cartesian product of s1,s2 and s3 and insert them into a B tree...
S1=(x, y, z) belongs to R^3,x^2+y2 =1 and s2=(x, y, z) belongs to R^3 and y=x find parametrization of intersection s1and s2
Write a ladder logic diagram for a system with 3 switches S1, S2, and S3. For turning the system on, either S1 and S2 have to be turned on simultaneously, else S3 has to be turned off.
Given the two dynamic systems S2 a ER Si has state r1, control u, and output y. S2 has state (x2, r3), control w and output z. (a) Draw a dynamic diagram of system S2 (b) Express the equations for S1 and S2 in matrix from and determine whether each system is controllable, observable. (c) These two systems are connected in series with w-y. The resulting system is called S3. Write down the matrix form of the equation for S3...
Given the following sequence of instructions: lw $s2, 0($s1) //1 lw $s1, 40($s3) //2 sub $s3, $s1, $s2 //3 add $s3, $s2, $s2 //4 or $s4, $s3, $zero //5 sw $s3, 50($s1) //6 a. List the read after write (current instruction is reading certain registers which haven’t been written back yet) data dependencies. As an example , 3 on 1 ($s2) shows instruction 3 has data dependency on instruction 1 since it is reading register $s2. b. Assume the 5...
show steps 7 pts) Consider an FSK system where bits 1 and 0 are transmitted using signals si(t) and s2(t) 2Eb 2Eb where θ1 and 02 are the phases of the two signals. (a) (3 pt) Find the correlation between the signal s1(t) ard salt), i.e., find oin(t)s2(t)dt. b) (2 pt) Assuming non-coherent carriers, i.e., θ|メ02, state the condition for which the correlation derived in part (a) goes to zero. (c) (2 pt) Repeat part (b) for the case where...
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
1. Why do S1 and S2 exist? 2. Where does equation 2 come from? subsets of a vector space and let S, be a subset of S2. Then Let Si and S2 be finite subsets of a vector the following statements are true: (a) If S, is linearly dependent, so is S2. (b) If S2 is linearly independent, so is Si. Proof Let Si = {V1, V2, ..., vk and S2 = {V1, V2, ..., Vk, Vx+1, ..., Vm). We...
Let S1 be the unit circle with the usual topology, S1 × S1 be the product space, and define the torus T : = [0,1] × [0,1] / ∼ as a quotient space, where ∼ is the equivalence relation that (1,y) ∼ (0,y) for all y ∈ [0,1] and (x,0) ∼ (x,1) for all x ∈ [0,1]. Prove that S1 × S1 and T are homeomorphic. Let Sl be the unit circle with the usual topology, Stx St be the...