Given a input x(t) output y(t) relation as y(t) = x(0.5+t) + e^( - | x(0.5-t)...

Consider a system defined by the input-output relationship given below: y(t) = x(t)x(t-2) a) Is the...

Consider a system defined by the input-output relationship given below: y(t) = x(t)x(t-2) a) Is the system memoryless? Why? b) Is the system stable? Why? c) Is the system causal? Why? d) Is the system invertible? Show why? e) Find the impulse response of the system. PLEASE ANSWER ALL QUESTIONS!

A continuous-time system, with time t in seconds (s), input f(t), and output y(t), is specified...

A continuous-time system, with time t in seconds (s), input f(t), and output y(t), is specified by the equations: y(t) = f(sin(t)) y(t) = f(cos(t)) a) are these systems causal? Justify your answer. b) are these systems linear? Clearly show and explain your work

1.28 Dectermine which of the properties listed in 1.27 hold and which do not hold for...

1.28 Dectermine which of the properties listed in 1.27 hold and which do not hold for each of the following discrite-time systems. Justify your answers. In each example, y[n] denotes the system output and x[n] is the system input. b) y[n] = x[n-2]-2x[n-8] c) y[n]=nx[n] system may or may not be: 1) Memoryless 2) Time invariant 3) Linear 4) causal

A linear time invariant system has an impulse response given by ℎ[?] = 2(−0.5) ? ?[?]...

A linear time invariant system has an impulse response given by ℎ[?] = 2(−0.5) ? ?[?] − 3(0.5) 2? ?[?] where u[n] is the unit step function. a) Find the z-domain transfer function ?(?). b) Draw pole-zero plot of the system and indicate the region of convergence. c) Is the system stable? Explain. d) Is the system causal? Explain. e) Find the unit step response ?[?] of the system, that is, the response to the unit step input. f) Provide...

6. Consider a causal linear system whose (zero-state) response to an input signal, f(t) = e...

6. Consider a causal linear system whose (zero-state) response to an input signal, f(t) = e −3tu(t), is y(t) = (−e −t + 4e −2t − 3e −3t )u(t). ( a) Find the transfer function H(s) of the system. (b) Write the differential equation that describes the system. (c) Plot the pole-zero diagram of system. Is the system stable? (d) Plot the frequency response of the system, |H(w)|. (e) Whats the systems zero-state response to another input signal, f1(t) =...

subject-DSP 1)y(n)=2x^2(n-1) determine the system is(and justify your decision) a)linear b)time invariant c)stable d)causal

subject-DSP 1)y(n)=2x^2(n-1) determine the system is(and justify your decision) a)linear b)time invariant c)stable d)causal

Y(t)=tx(-t) Memory less ? Causal? Stable? Invertible? Time invariant ?

Y(t)=tx(-t) Memory less ? Causal? Stable? Invertible? Time invariant ?

Find the pole and zero values for the system whose input-output relation is given below and...

Find the pole and zero values for the system whose input-output relation is given below and show them in the z plane. Also calculate the impulse response of this system. y[n-1] - (10/3)y[n] + y[n+1] = x[n]

Which of the following systems are dynamical? Stable? Causal? Time-invariant? Linear? 1. y(t) = 5x(t) 2....

Which of the following systems are dynamical? Stable? Causal? Time-invariant? Linear? 1. y(t) = 5x(t) 2. y(t) = x(t)^4 3. y(t) = x(t−1)^2 4. dy/dt = x(t) 5. dy/dt = y(t) + x(t) 6. dy/dt = −y(t) + x(t)^2 7. dy/dt = −y(t) + x(t + 4) 8. dy/dt = tx(t)

Demonstrate step by step if the following system is: 1. Static or dynamic. 2. Linear or...

Demonstrate step by step if the following system is: 1. Static or dynamic. 2. Linear or non-linear. 3. Invariant or variant in time. 4. Causal or not causal. 5. Stable or unstable. y(n)=x(n)+nx(n-2)