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- ===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
