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- ==Impulse Response== the impulse response is...2 KB (339 words) - 07:23, 25 September 2008
- ==Unit Impulse and System Function== The unit impulse is the systems response to an input of the function <math>\delta(t)</math>.731 B (144 words) - 06:42, 25 September 2008
- ==unit impulse response== Obtain the unit impulse response h(t) and the system function H(s) of your system. :920 B (187 words) - 07:27, 25 September 2008
- ===Unit Impulse Response=== ===Response to a signal===971 B (188 words) - 08:43, 25 September 2008
- ==Impulse Response== =>impulse response = <math>3\delta(t)</math>2 KB (297 words) - 17:34, 25 September 2008
- == Unit Impulse Response == ...to an input <math>\delta(t)\!</math>. Thus, in our case, the unit impulse response is simply <math>h(t)=2\delta(t)-3\delta(t-2)\!</math>1 KB (275 words) - 11:52, 25 September 2008
- == UNIT IMPULSE RESPONSE OF SYSTEM == ...ath>x(t) = \delta(t)\! </math>. Then we obtain the following unit impulse response:1 KB (238 words) - 08:31, 26 September 2008
- Unit Impulse Response: <math>h(t) = K \delta(t)</math> Frequency Response:1,003 B (203 words) - 12:33, 25 September 2008
- == Obtain the Unit Impulse Response h[n] == By definition, to obtain the unit impulse response from a system defined by <math>y[n] = x[n]\,</math>, simply replace the <ma2 KB (308 words) - 14:13, 25 September 2008
- == Unit Impulse Response == == Frequency Response ==1 KB (242 words) - 13:11, 25 September 2008
- '''a)''' Obtain the unit impulse response h[n] and the system function H(z) of f. '''b)''' Compute the response of f to the signal x[n] found [[HW4.2_Brian_Thomas_ECE301Fall2008mboutin|he2 KB (355 words) - 16:48, 25 September 2008
- Find the system's unit impulse response <math>\,h(t)\,</math> and system function <math>\,H(s)\,</math>. The unit impulse response is simply (plug a <math>\,\delta(t)\,</math> into the system)2 KB (434 words) - 18:11, 25 September 2008
- ...t <math> x[n] = \delta [n] </math> to y[n]. h[n] is then the unit impulse response.<br><br> === b) Response of Signal in Question 1 ===2 KB (390 words) - 07:56, 26 September 2008
- Find the system's unit impulse response <math>\,h[n]\,</math> and system function <math>\,H(z)\,</math>. The unit impulse response is simply (plug a <math>\,\delta[n]\,</math> into the system)2 KB (360 words) - 18:54, 25 September 2008
- ==CT LTI Impulse Response== ==Response to My Function From Part 1==1 KB (207 words) - 18:48, 25 September 2008
- == Part A: Unit Impulse Response and System Function == == Part B: Response of the System ==1 KB (203 words) - 18:54, 25 September 2008
- ==Obtain the input impulse response h(t) and the system function H(s) of your system== ==Compute the response of your system to the signal you defined in Question 1 using H(s) and the F2 KB (349 words) - 08:25, 26 September 2008
- =Obtain the input impulse response h[n] and the system function H(z) of your system= So, we have the unit impulse response:1 KB (241 words) - 09:04, 26 September 2008
- The impulse response, h(t), of this system is computed using the following: The response, y(t) = H(jw)*x(t)837 B (166 words) - 09:55, 26 September 2008
- ==Impulse Response== so the impulse response is 7d(t)426 B (79 words) - 10:24, 26 September 2008
- The unit impulse response of this system is: Taking the laplace transform of the unit impulse response of this system gives us:910 B (185 words) - 14:36, 26 September 2008
- Unit Impulse Response: Frequency Response:1,016 B (194 words) - 15:50, 26 September 2008
- unit impulse response then we can can a unit impulse response as408 B (77 words) - 14:07, 26 September 2008
- ==a) Finding the unit impulse response h[n] and the system function F(z).== Therefore the unit impulse response, <big><math>h[n] = 5\delta [n]</math></big>1 KB (294 words) - 15:59, 26 September 2008
- ==Computing the Impulse Response and System Function== Now computing the actual response:1 KB (239 words) - 17:50, 26 September 2008
- ...is the output and <math>x(t)\,</math> is the input, find the unit impulse response <math>h(t)\,</math> and the system function <math>H(s)\,</math>.<br> Then find the response to <math>x(t) = 5cos(3\pi t) + sin(\pi t)\,</math>1 KB (208 words) - 15:01, 26 September 2008
- ==Unit Impulse Response== Well, this is rather straightforward. You want the response to the unit impulse, do ya? Well, if that is what you want, that is what you will get. All you2 KB (334 words) - 16:10, 26 September 2008
- The unit impulse response is then <math>h(t) =3u(t-1)</math> The response of the input <math>x(t)</math> to the system <math>y(t)</math> using <math>986 B (178 words) - 16:31, 26 September 2008
- The unit impulse response of the system would then simply be ...be determined by taking the Laplace Transform of the system's unit impulse response, h(t).1 KB (233 words) - 17:43, 26 September 2008
- ==Unit Impulse Response h(t) and System Function H(s)== ==Response of the Signal and Fourier Series Coefficients==1 KB (214 words) - 17:41, 26 September 2008
- ===Unit Impulse Response=== The unit impulse response of the system is found by substituting <math>\delta(t)</math> for <math>x(t1 KB (204 words) - 17:09, 26 September 2008
- ===The Unit Impulse Response=== ===HW 4.1 Response===550 B (110 words) - 17:36, 26 September 2008
- Obtain the unit impulse response h(t) and the system function H(s)<br><br> Compute the response of the system to the signal using H(s) and the Fourier series coefficients905 B (182 words) - 19:11, 26 September 2008
- Unit Impulse Response This is also the Laplace transform of the impulse response evaulated .1 KB (205 words) - 19:22, 26 September 2008
- Fourier Transforms and the frequency response of a system. The frequency response has a fundamental relationship to the unit step response through Fourier Transforms as follows3 KB (449 words) - 17:07, 8 October 2008
- * An LTI system has unit impulse response h[n] =u[-n]. Compute the system's response to the input <math>x[n] = 2^{n}u[-n].</math> Simplify your answer until all725 B (114 words) - 14:31, 10 October 2008
- An LTI system has unit impulse response <math> h[n] = u[-n] </math> Compute the system's response to the input <math> x[n] = 2^{n}u[-n] </math>907 B (154 words) - 10:57, 12 October 2008
- ...has unit impulse response <math>h[n] = u[-n]</math>. compute the system's response to the751 B (125 words) - 11:06, 14 October 2008
- ...as unit impulse response <math> h[n] = u[-n] </math>. Compute the system's response to the input <math> x[n] = 2^nu[-n] </math>. (simplify your answer until al1 KB (189 words) - 07:52, 22 October 2008
- ...Compute (a) the system's function <math>H(z)</math> and (b) the system's response to the input <math>x[n]=\cos(\pi n)</math>. The response to the input signal <math>z^n</math> is <math>H(z)z^n</math>, giving680 B (127 words) - 03:59, 15 October 2008
- ...tem has unit impulse response <math>h[n]=u[-n]</math> Compute the system's response to the input <math> x[n]=2^{n}u[-n].</math>(Simplify your answer until all748 B (146 words) - 10:56, 15 October 2008
- ...Compute (a) the system's function <math>H(z)</math> and (b) the system's response to the input <math>x[n]=\cos(\pi n)</math>.919 B (166 words) - 14:34, 15 October 2008
- An LTI system has unit impulse response <math>h[n] = u[n] - u[n - 2]\,</math>. b)Use the answer from a) to compute the system's response to the input <math>x[n] = cos(\pi n)\,</math>577 B (102 words) - 15:16, 15 October 2008
- '''Problem 5''' An LTI system has unit impulse response h[n] = u[n] -u[n-2]. b.) Use your answer in a) to compute the system's response to the input x[n] = cos(pi n)403 B (78 words) - 15:27, 15 October 2008
- An LTI system has unit impulse response h[n] = u[n] - u[n-2]. b) the system's response to the input <math>x[n]=\cos(\pi n)</math>.568 B (112 words) - 16:14, 15 October 2008
- An LTI system has unit impulse response h[n]=u[n]-u[n-2]. b) Use your answer in a) to compute the system's response to the input x[n] = cos(<math>\pi</math>n).814 B (167 words) - 18:03, 15 October 2008
- An LTI system has unit impulse response <math>h[n] = u[n] - u[n-2]\,</math>. b) What is the system response to the input <math>x[n]=\cos(\pi n)\,</math>.543 B (107 words) - 18:07, 15 October 2008
- The impulse response of an LTI system is <math>h(t)=e^{-2t}u(t)+u(t+2)-u(t-2)</math>. What is the Frequency response <math>H(j\omega)</math> of the system?4 KB (753 words) - 16:48, 23 April 2013
- ...thcal{F}((a)^n u[n]) = \frac{1}{1-a}, a<0 \,</math>, thus the unit impulse response for <math>\mathcal{X}(\omega)\,</math> is ...is <math> \frac{1}{1-ae^{-j\omega}}, a<1 \,</math>, thus the unit impulse response for <math>\mathcal{X}(\omega)\,</math> is11 KB (1,951 words) - 03:48, 25 March 2011
- ...a})</math>, the unit impulse response <math>\,h[n]</math>, or the system's response to an input <math>\,x[n]</math>.4 KB (633 words) - 11:13, 24 October 2008
