system #1 is described by y(t) = ramp(x(t)) and system #2 is described by y(t) = x(t) ramp(t). Classify both systems as to BIBO stability, linearity, invertibility and time invariance.
We need at least 10 more requests to produce the answer.
0 / 10 have requested this problem solution
The more requests, the faster the answer.
system #1 is described by y(t) = ramp(x(t)) and system #2 is described by y(t) =...
Problem 4.28 A system is described by the block diagram in Figure E.28. 0.25 + + →y(t) Figure E.28 Classify the system as to homogeneity, additivity, linearity, time invariance, BIBO stability, causality, memory and invertibility.
Classify or characterize the following systems as homegeneous, additive, linearity, time-invariance, BIBO stability, causality, invertible and memoryless (a) y(n)= Re(z(n)), (b) y(n) = Re(ejiHz(n)) (e) y(n)=x(4n +1) e) y(n)r(n -2) - 2x(n - 8) (g) y(n) Evenfx(n - 1))
Classify or characterize the following systems as homogeneous, additive, linearity, time-invariance, BIBO stability, causality, invertible, and memoryless: (a) y(n) = Re(a(n)), (c) y(n-2(4n + 1) (d) y(n)=x(-n) (e) y(n) = 2(n-2)-22(n-8) (f) y(n) = nx(n) (g) y(n) = Even{x(n-1))
Examine the properties (memory, stability, casuality, linearity, and time-invariance) for the following systems (a) y(t) = 2*log x(t) (b) y[n] = (1/n) x(n-1) (c) y[n] = 3x [2n-1] (d) y[n] = |x[n]|
A system with input x(t) and output y(t) is described by y(t) = 5 sin(x(t)). Identify the properties of the given system. Select one: a. Non-linear, time invariant, BIBO stable, memoryless, and causal b. Non-linear, time invariant, unstable, memoryless, and non-causal c. Linear, time varying, unstable, not memoryless, and non-causal d. Linear, time invariant, BIBO stable, not memoryless, and non-causal e. Linear, time invariant, BIBO stable, memoryless, and non-causal 0
need answers for all 1. Which terminology correctly defines the system property described below? (2 pts) A system is stationary and does not vary over time. (a) Linearity (b) Time invariance (c) Periodicity (d) Causality 2. Which terminology correctly defines the system property described below? (2 pts) (a) Linearity (b) Time invariance (c) Periodicity (d) Causality 3. Which is true about a linear and time-invariant (LTI) system? (2 pts) (a) The system's output is always equivalent to an impulse reponse....
(d) [5] The input-output relation for DT system is described by following system equation y[n] = 31[] State if the system possesses the following properties: Linear BIBO-Stable Casual Memoryless Time-Invariance
For the system described by y[n] = n2 x[n – 1], determine whether it is a) Linear or not b) Time-invariant or not c) BIBO stable or not d) Causal or not and e) Memoryless or not
External Stability Problem Determine the following systems are BIBO stable? (a) y(t)-x(t) *x(t) (b) y(t)=tx(t) (c) y(t)-d(/d
For LTI dynamical system (0 y(t) 1 0(t) study the internal stability, the controllability and the observability of the system; before computing G(s), try to figure out the BIBO stability properties of the system given the information obtained at the previous point; compute G(s), verifying that, if the system is not fully controllable or not fully observable, some zero/pole cancellations occur; also, draw conclusions about BIBO stability. For LTI dynamical system (0 y(t) 1 0(t) study the internal stability, the...