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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