Since from given circuit
Vo(t)= Vin(t),so h(t)= Vo(t)/Vin(t) h(t)= 1
Vo(t)= Vin(t)*h(t)
If Vin(t)= del(t)
Vo(t)= del(t)* h(t) = 1. Vo(t)= 1
if Vin(t)=8u(t)
Then Vo(t)= 8u(t)
more notes 2 The inpud VE 1oV 20V peak to þeak ad looo H3 freguency. + RL loo C looMF loV T=I m S wave rectipur find oaut, oove and ppeal For thin half r 2 The inpud VE 1oV 20V peak to þeak ad looo H3 freguency. + RL loo C looMF loV T=I m S wave rectipur find oaut, oove and ppeal For thin half r
(e) Consider an LTI system with impulse response h(t) = π8ǐnc(2(t-1). i. (5 pts) Find the frequency response H(jw). Hint: Use the FT properties and pairs tables. ii. (5 pts) Find the output y(t) when the input is (tsin(t) by using the Fourier Transform method. 3. Fourier Transforms: LTI Systems Described by LCCDE (35 pts) (a) Consider a causal (meaning zero initial conditions) LTI system represented by its input-output relationship in the form of a differential equation:-p +3讐+ 2y(t)--r(t). i....
Question 3 A filter has a unit-impulse response h(t)=0.5e-2'u(t). an (i) Find the frequency response H(jo). (ii) Determine an expression for the steady-state response of the filter to v> 02 sáng)
The answer key says Underdamped, but i do not understand why. Question 10 In the circuit below, the inductor current, iz(), for t2 0 is known to be, -10t 1012 ve(t)) Vc(t) Find the response curve that best represents the inductor current above iL(t) iL(t) (2) Underdamped (1) Undamped it t) i(t) (4) Overdamped (3) Critically damped (5) None of the above Question 10 In the circuit below, the inductor current, iz(), for t2 0 is known to be, -10t...
Question One (a) The Impulse Response of a second order system is given by h(t) where: h (t) 4000 e 3000 e20 where the time, t, is given in milliseconds (ms) and h(t) is considered to be the resulting voltage in volts. (0) Derive the Transfer Function, the Laplace Transform H(s) of h(t). (i) Using part (0, write out the Frequency Response, H(jo), of the second order (ii) Express the Frequency Response obtained in part (i) as a single response...
Question One (a) The Impulse Response of a second order system is given by h(t) where: h(t) 4000e 3000 c0, where the time, t, is given in milliseconds (ms) and h(t) is considered to be the resulting voltage in volts. 0) Derive the Transfer Function, the Laplace Transform H(s) of h(t). () Using part (0). write out the Frequency Response, HGo), of the second order (ii) Express the Frequency Response obtained in part (i) as a single response system. and...
Problem 4. Use the convolution integral to find the response y(t) of the LTI system with impulse response h(t) to input x(t) a) x(I)-2expl_2t)u(t) , h(1)-expl-t)u(t)
Problem 1 Use the convolution integral to find the zero-state response for x(t)-u(t), and h(t)- eu(t)
Determine the specific configuration for the four stereocenters below. H3C OH fO H3 H- H3C -OH Br H H T T Determine the specific configuration for the four stereocenters below. H3C OH fO H3 H- H3C -OH Br H H T T
Question 3) Given a system with an impulse response of: h(t) = te-2t(U(t)-U(t-4)). Use MATLAB to compute the output of the system with an input of: x(t)-3(U(t -2)-U(t - 5) Question 3) Given a system with an impulse response of: h(t) = te-2t(U(t)-U(t-4)). Use MATLAB to compute the output of the system with an input of: x(t)-3(U(t -2)-U(t - 5)